isabelle: src/HOL/Multivariate_Analysis/Integration.thy@3567d0571932 (annotated)

35172 579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2	header {* Kurzweil-Henstock gauge integration in many dimensions. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3	(* Author: John Harrison
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	4	Translation from HOL light: Robert Himmelmann, TU Muenchen *)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	5
35292 e4a431b6d9b7 Replaced Integration by Multivariate-Analysis/Real_Integration hoelzl parents: 35291 diff changeset	6	theory Integration
35172 579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	7	imports Derivative SMT
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	8	begin
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	9
35292 e4a431b6d9b7 Replaced Integration by Multivariate-Analysis/Real_Integration hoelzl parents: 35291 diff changeset	10	declare [[smt_certificates="~~/src/HOL/Multivariate_Analysis/Integration.cert"]]
36244 009b0ee1b838 Only use provided SMT-certificates in HOL-Multivariate_Analysis. hoelzl parents: 36243 diff changeset	11	declare [[smt_fixed=true]]
35172 579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	12	declare [[z3_proofs=true]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	13
36243 027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	14	subsection {* Sundries *}
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	15
35172 579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	16	lemma conjunctD2: assumes "a \<and> b" shows a b using assms by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	17	lemma conjunctD3: assumes "a \<and> b \<and> c" shows a b c using assms by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	18	lemma conjunctD4: assumes "a \<and> b \<and> c \<and> d" shows a b c d using assms by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	19	lemma conjunctD5: assumes "a \<and> b \<and> c \<and> d \<and> e" shows a b c d e using assms by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	20
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	21	declare smult_conv_scaleR[simp]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	22
36243 027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	23	lemma simple_image: "{f x \|x . x \<in> s} = f ` s" by blast
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	24
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	25	lemma linear_simps: assumes "bounded_linear f"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	26	shows "f (a + b) = f a + f b" "f (a - b) = f a - f b" "f 0 = 0" "f (- a) = - f a" "f (s \<^sub>R v) = s \<^sub>R (f v)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	27	apply(rule_tac[!] additive.add additive.minus additive.diff additive.zero bounded_linear.scaleR)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	28	using assms unfolding bounded_linear_def additive_def by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	29
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	30	lemma bounded_linearI:assumes "\<And>x y. f (x + y) = f x + f y"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	31	"\<And>r x. f (r \<^sub>R x) = r \<^sub>R f x" "\<And>x. norm (f x) \<le> norm x * K"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	32	shows "bounded_linear f"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	33	unfolding bounded_linear_def additive_def bounded_linear_axioms_def using assms by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	34
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	35	lemma real_le_inf_subset:
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	36	assumes "t \<noteq> {}" "t \<subseteq> s" "\<exists>b. b <=* s" shows "Inf s <= Inf (t::real set)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	37	apply(rule isGlb_le_isLb) apply(rule Inf[OF assms(1)])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	38	using assms apply-apply(erule exE) apply(rule_tac x=b in exI)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	39	unfolding isLb_def setge_def by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	40
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	41	lemma real_ge_sup_subset:
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	42	assumes "t \<noteq> {}" "t \<subseteq> s" "\<exists>b. s *<= b" shows "Sup s >= Sup (t::real set)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	43	apply(rule isLub_le_isUb) apply(rule Sup[OF assms(1)])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	44	using assms apply-apply(erule exE) apply(rule_tac x=b in exI)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	45	unfolding isUb_def setle_def by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	46
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	47	lemma dist_trans[simp]:"dist (vec1 x) (vec1 y) = dist x (y::real)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	48	unfolding dist_real_def dist_vec1 ..
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	49
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	50	lemma Lim_trans[simp]: fixes f::"'a \<Rightarrow> real"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	51	shows "((\<lambda>x. vec1 (f x)) ---> vec1 l) net \<longleftrightarrow> (f ---> l) net"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	52	using assms unfolding Lim dist_trans ..
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	53
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	54	lemma bounded_linear_component[intro]: "bounded_linear (\<lambda>x::real^'n. x $ k)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	55	apply(rule bounded_linearI[where K=1])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	56	using component_le_norm[of _ k] unfolding real_norm_def by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	57
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	58	lemma bounded_vec1[intro]: "bounded s \<Longrightarrow> bounded (vec1 ` (s::real set))"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	59	unfolding bounded_def apply safe apply(rule_tac x="vec1 x" in exI,rule_tac x=e in exI) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	60
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	61	lemma transitive_stepwise_lt_eq:
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	62	assumes "(\<And>x y z::nat. R x y \<Longrightarrow> R y z \<Longrightarrow> R x z)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	63	shows "((\<forall>m. \<forall>n>m. R m n) \<longleftrightarrow> (\<forall>n. R n (Suc n)))" (is "?l = ?r")
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	64	proof(safe) assume ?r fix n m::nat assume "m < n" thus "R m n" apply-
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	65	proof(induct n arbitrary: m) case (Suc n) show ?case
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	66	proof(cases "m < n") case True
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	67	show ?thesis apply(rule assms[OF Suc(1)[OF True]]) using `?r` by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	68	next case False hence "m = n" using Suc(2) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	69	thus ?thesis using `?r` by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	70	qed qed auto qed auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	71
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	72	lemma transitive_stepwise_gt:
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	73	assumes "\<And>x y z. R x y \<Longrightarrow> R y z \<Longrightarrow> R x z" "\<And>n. R n (Suc n) "
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	74	shows "\<forall>n>m. R m n"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	75	proof- have "\<forall>m. \<forall>n>m. R m n" apply(subst transitive_stepwise_lt_eq)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	76	apply(rule assms) apply(assumption,assumption) using assms(2) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	77	thus ?thesis by auto qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	78
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	79	lemma transitive_stepwise_le_eq:
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	80	assumes "\<And>x. R x x" "\<And>x y z. R x y \<Longrightarrow> R y z \<Longrightarrow> R x z"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	81	shows "(\<forall>m. \<forall>n\<ge>m. R m n) \<longleftrightarrow> (\<forall>n. R n (Suc n))" (is "?l = ?r")
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	82	proof safe assume ?r fix m n::nat assume "m\<le>n" thus "R m n" apply-
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	83	proof(induct n arbitrary: m) case (Suc n) show ?case
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	84	proof(cases "m \<le> n") case True show ?thesis apply(rule assms(2))
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	85	apply(rule Suc(1)[OF True]) using `?r` by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	86	next case False hence "m = Suc n" using Suc(2) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	87	thus ?thesis using assms(1) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	88	qed qed(insert assms(1), auto) qed auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	89
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	90	lemma transitive_stepwise_le:
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	91	assumes "\<And>x. R x x" "\<And>x y z. R x y \<Longrightarrow> R y z \<Longrightarrow> R x z" "\<And>n. R n (Suc n) "
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	92	shows "\<forall>n\<ge>m. R m n"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	93	proof- have "\<forall>m. \<forall>n\<ge>m. R m n" apply(subst transitive_stepwise_le_eq)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	94	apply(rule assms) apply(rule assms,assumption,assumption) using assms(3) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	95	thus ?thesis by auto qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	96
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	97
35172 579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	98	subsection {* Some useful lemmas about intervals. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	99
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	100	lemma empty_as_interval: "{} = {1..0::real^'n}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	101	apply(rule set_ext,rule) defer unfolding vector_le_def mem_interval
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	102	using UNIV_witness[where 'a='n] apply(erule_tac exE,rule_tac x=x in allE) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	103
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	104	lemma interior_subset_union_intervals:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	105	assumes "i = {a..b::real^'n}" "j = {c..d}" "interior j \<noteq> {}" "i \<subseteq> j \<union> s" "interior(i) \<inter> interior(j) = {}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	106	shows "interior i \<subseteq> interior s" proof-
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	107	have "{a<..<b} \<inter> {c..d} = {}" using inter_interval_mixed_eq_empty[of c d a b] and assms(3,5)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	108	unfolding assms(1,2) interior_closed_interval by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	109	moreover have "{a<..<b} \<subseteq> {c..d} \<union> s" apply(rule order_trans,rule interval_open_subset_closed)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	110	using assms(4) unfolding assms(1,2) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	111	ultimately show ?thesis apply-apply(rule interior_maximal) defer apply(rule open_interior)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	112	unfolding assms(1,2) interior_closed_interval by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	113
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	114	lemma inter_interior_unions_intervals: fixes f::"(real^'n) set set"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	115	assumes "finite f" "open s" "\<forall>t\<in>f. \<exists>a b. t = {a..b}" "\<forall>t\<in>f. s \<inter> (interior t) = {}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	116	shows "s \<inter> interior(\<Union>f) = {}" proof(rule ccontr,unfold ex_in_conv[THEN sym]) case goal1
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	117	have lem1:"\<And>x e s U. ball x e \<subseteq> s \<inter> interior U \<longleftrightarrow> ball x e \<subseteq> s \<inter> U" apply rule defer apply(rule_tac Int_greatest)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	118	unfolding open_subset_interior[OF open_ball] using interior_subset by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	119	have lem2:"\<And>x s P. \<exists>x\<in>s. P x \<Longrightarrow> \<exists>x\<in>insert x s. P x" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	120	have "\<And>f. finite f \<Longrightarrow> (\<forall>t\<in>f. \<exists>a b. t = {a..b}) \<Longrightarrow> (\<exists>x. x \<in> s \<inter> interior (\<Union>f)) \<Longrightarrow> (\<exists>t\<in>f. \<exists>x. \<exists>e>0. ball x e \<subseteq> s \<inter> t)" proof- case goal1
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	121	thus ?case proof(induct rule:finite_induct)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	122	case empty from this(2) guess x .. hence False unfolding Union_empty interior_empty by auto thus ?case by auto next
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	123	case (insert i f) guess x using insert(5) .. note x = this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	124	then guess e unfolding open_contains_ball_eq[OF open_Int[OF assms(2) open_interior],rule_format] .. note e=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	125	guess a using insert(4)[rule_format,OF insertI1] .. then guess b .. note ab = this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	126	show ?case proof(cases "x\<in>i") case False hence "x \<in> UNIV - {a..b}" unfolding ab by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	127	then guess d unfolding open_contains_ball_eq[OF open_Diff[OF open_UNIV closed_interval],rule_format] ..
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	128	hence "0 < d" "ball x (min d e) \<subseteq> UNIV - i" using e unfolding ab by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	129	hence "ball x (min d e) \<subseteq> s \<inter> interior (\<Union>f)" using e unfolding lem1 by auto hence "x \<in> s \<inter> interior (\<Union>f)" using `d>0` e by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	130	hence "\<exists>t\<in>f. \<exists>x e. 0 < e \<and> ball x e \<subseteq> s \<inter> t" apply-apply(rule insert(3)) using insert(4) by auto thus ?thesis by auto next
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	131	case True show ?thesis proof(cases "x\<in>{a<..<b}")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	132	case True then guess d unfolding open_contains_ball_eq[OF open_interval,rule_format] ..
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	133	thus ?thesis apply(rule_tac x=i in bexI,rule_tac x=x in exI,rule_tac x="min d e" in exI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	134	unfolding ab using interval_open_subset_closed[of a b] and e by fastsimp+ next
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	135	case False then obtain k where "x$k \<le> a$k \<or> x$k \<ge> b$k" unfolding mem_interval by(auto simp add:not_less)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	136	hence "x$k = a$k \<or> x$k = b$k" using True unfolding ab and mem_interval apply(erule_tac x=k in allE) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	137	hence "\<exists>x. ball x (e/2) \<subseteq> s \<inter> (\<Union>f)" proof(erule_tac disjE)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	138	let ?z = "x - (e/2) *\<^sub>R basis k" assume as:"x$k = a$k" have "ball ?z (e / 2) \<inter> i = {}" apply(rule ccontr) unfolding ex_in_conv[THEN sym] proof(erule exE)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	139	fix y assume "y \<in> ball ?z (e / 2) \<inter> i" hence "dist ?z y < e/2" and yi:"y\<in>i" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	140	hence "\<bar>(?z - y) $ k\<bar> < e/2" using component_le_norm[of "?z - y" k] unfolding vector_dist_norm by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	141	hence "y$k < a$k" unfolding vector_component_simps vector_scaleR_component as using e[THEN conjunct1] by(auto simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	142	hence "y \<notin> i" unfolding ab mem_interval not_all by(rule_tac x=k in exI,auto) thus False using yi by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	143	moreover have "ball ?z (e/2) \<subseteq> s \<inter> (\<Union>insert i f)" apply(rule order_trans[OF _ e[THEN conjunct2, unfolded lem1]]) proof
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	144	fix y assume as:"y\<in> ball ?z (e/2)" have "norm (x - y) \<le> \<bar>e\<bar> / 2 + norm (x - y - (e / 2) *\<^sub>R basis k)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	145	apply-apply(rule order_trans,rule norm_triangle_sub[of "x - y" "(e/2) *\<^sub>R basis k"])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	146	unfolding norm_scaleR norm_basis by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	147	also have "\<dots> < \<bar>e\<bar> / 2 + \<bar>e\<bar> / 2" apply(rule add_strict_left_mono) using as unfolding mem_ball vector_dist_norm using e by(auto simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	148	finally show "y\<in>ball x e" unfolding mem_ball vector_dist_norm using e by(auto simp add:field_simps) qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	149	ultimately show ?thesis apply(rule_tac x="?z" in exI) unfolding Union_insert by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	150	next let ?z = "x + (e/2) *\<^sub>R basis k" assume as:"x$k = b$k" have "ball ?z (e / 2) \<inter> i = {}" apply(rule ccontr) unfolding ex_in_conv[THEN sym] proof(erule exE)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	151	fix y assume "y \<in> ball ?z (e / 2) \<inter> i" hence "dist ?z y < e/2" and yi:"y\<in>i" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	152	hence "\<bar>(?z - y) $ k\<bar> < e/2" using component_le_norm[of "?z - y" k] unfolding vector_dist_norm by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	153	hence "y$k > b$k" unfolding vector_component_simps vector_scaleR_component as using e[THEN conjunct1] by(auto simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	154	hence "y \<notin> i" unfolding ab mem_interval not_all by(rule_tac x=k in exI,auto) thus False using yi by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	155	moreover have "ball ?z (e/2) \<subseteq> s \<inter> (\<Union>insert i f)" apply(rule order_trans[OF _ e[THEN conjunct2, unfolded lem1]]) proof
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	156	fix y assume as:"y\<in> ball ?z (e/2)" have "norm (x - y) \<le> \<bar>e\<bar> / 2 + norm (x - y + (e / 2) *\<^sub>R basis k)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	157	apply-apply(rule order_trans,rule norm_triangle_sub[of "x - y" "- (e/2) *\<^sub>R basis k"])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	158	unfolding norm_scaleR norm_basis by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	159	also have "\<dots> < \<bar>e\<bar> / 2 + \<bar>e\<bar> / 2" apply(rule add_strict_left_mono) using as unfolding mem_ball vector_dist_norm using e by(auto simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	160	finally show "y\<in>ball x e" unfolding mem_ball vector_dist_norm using e by(auto simp add:field_simps) qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	161	ultimately show ?thesis apply(rule_tac x="?z" in exI) unfolding Union_insert by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	162	then guess x .. hence "x \<in> s \<inter> interior (\<Union>f)" unfolding lem1[where U="\<Union>f",THEN sym] using centre_in_ball e[THEN conjunct1] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	163	thus ?thesis apply-apply(rule lem2,rule insert(3)) using insert(4) by auto qed qed qed qed note * = this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	164	guess t using *[OF assms(1,3) goal1] .. from this(2) guess x .. then guess e ..
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	165	hence "x \<in> s" "x\<in>interior t" defer using open_subset_interior[OF open_ball, of x e t] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	166	thus False using `t\<in>f` assms(4) by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	167	subsection {* Bounds on intervals where they exist. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	168
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	169	definition "interval_upperbound (s::(real^'n) set) = (\<chi> i. Sup {a. \<exists>x\<in>s. x$i = a})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	170
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	171	definition "interval_lowerbound (s::(real^'n) set) = (\<chi> i. Inf {a. \<exists>x\<in>s. x$i = a})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	172
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	173	lemma interval_upperbound[simp]: assumes "\<forall>i. a$i \<le> b$i" shows "interval_upperbound {a..b} = b"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	174	using assms unfolding interval_upperbound_def Cart_eq Cart_lambda_beta apply-apply(rule,erule_tac x=i in allE)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	175	apply(rule Sup_unique) unfolding setle_def apply rule unfolding mem_Collect_eq apply(erule bexE) unfolding mem_interval defer
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	176	apply(rule,rule) apply(rule_tac x="b$i" in bexI) defer unfolding mem_Collect_eq apply(rule_tac x=b in bexI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	177	unfolding mem_interval using assms by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	178
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	179	lemma interval_lowerbound[simp]: assumes "\<forall>i. a$i \<le> b$i" shows "interval_lowerbound {a..b} = a"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	180	using assms unfolding interval_lowerbound_def Cart_eq Cart_lambda_beta apply-apply(rule,erule_tac x=i in allE)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	181	apply(rule Inf_unique) unfolding setge_def apply rule unfolding mem_Collect_eq apply(erule bexE) unfolding mem_interval defer
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	182	apply(rule,rule) apply(rule_tac x="a$i" in bexI) defer unfolding mem_Collect_eq apply(rule_tac x=a in bexI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	183	unfolding mem_interval using assms by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	184
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	185	lemmas interval_bounds = interval_upperbound interval_lowerbound
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	186
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	187	lemma interval_bounds'[simp]: assumes "{a..b}\<noteq>{}" shows "interval_upperbound {a..b} = b" "interval_lowerbound {a..b} = a"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	188	using assms unfolding interval_ne_empty by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	189
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	190	lemma interval_upperbound_1[simp]: "dest_vec1 a \<le> dest_vec1 b \<Longrightarrow> interval_upperbound {a..b} = (b::real^1)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	191	apply(rule interval_upperbound) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	192
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	193	lemma interval_lowerbound_1[simp]: "dest_vec1 a \<le> dest_vec1 b \<Longrightarrow> interval_lowerbound {a..b} = (a::real^1)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	194	apply(rule interval_lowerbound) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	195
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	196	lemmas interval_bound_1 = interval_upperbound_1 interval_lowerbound_1
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	197
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	198	subsection {* Content (length, area, volume...) of an interval. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	199
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	200	definition "content (s::(real^'n) set) =
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	201	(if s = {} then 0 else (\<Prod>i\<in>UNIV. (interval_upperbound s)$i - (interval_lowerbound s)$i))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	202
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	203	lemma interval_not_empty:"\<forall>i. a$i \<le> b$i \<Longrightarrow> {a..b::real^'n} \<noteq> {}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	204	unfolding interval_eq_empty unfolding not_ex not_less by assumption
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	205
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	206	lemma content_closed_interval: assumes "\<forall>i. a$i \<le> b$i"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	207	shows "content {a..b} = (\<Prod>i\<in>UNIV. b$i - a$i)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	208	using interval_not_empty[OF assms] unfolding content_def interval_upperbound[OF assms] interval_lowerbound[OF assms] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	209
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	210	lemma content_closed_interval': assumes "{a..b}\<noteq>{}" shows "content {a..b} = (\<Prod>i\<in>UNIV. b$i - a$i)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	211	apply(rule content_closed_interval) using assms unfolding interval_ne_empty .
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	212
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	213	lemma content_1:"dest_vec1 a \<le> dest_vec1 b \<Longrightarrow> content {a..b} = dest_vec1 b - dest_vec1 a"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	214	using content_closed_interval[of a b] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	215
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	216	lemma content_1':"a \<le> b \<Longrightarrow> content {vec1 a..vec1 b} = b - a" using content_1[of "vec a" "vec b"] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	217
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	218	lemma content_unit[intro]: "content{0..1::real^'n} = 1" proof-
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	219	have *:"\<forall>i. 0$i \<le> (1::real^'n::finite)$i" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	220	have "0 \<in> {0..1::real^'n::finite}" unfolding mem_interval by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	221	thus ?thesis unfolding content_def interval_bounds[OF *] using setprod_1 by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	222
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	223	lemma content_pos_le[intro]: "0 \<le> content {a..b}" proof(cases "{a..b}={}")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	224	case False hence *:"\<forall>i. a $ i \<le> b $ i" unfolding interval_ne_empty by assumption
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	225	have "(\<Prod>i\<in>UNIV. interval_upperbound {a..b} $ i - interval_lowerbound {a..b} $ i) \<ge> 0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	226	apply(rule setprod_nonneg) unfolding interval_bounds[OF ] using apply(erule_tac x=x in allE) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	227	thus ?thesis unfolding content_def by(auto simp del:interval_bounds') qed(unfold content_def, auto)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	228
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	229	lemma content_pos_lt: assumes "\<forall>i. a$i < b$i" shows "0 < content {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	230	proof- have help_lemma1: "\<forall>i. a$i < b$i \<Longrightarrow> \<forall>i. a$i \<le> ((b$i)::real)" apply(rule,erule_tac x=i in allE) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	231	show ?thesis unfolding content_closed_interval[OF help_lemma1[OF assms]] apply(rule setprod_pos)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	232	using assms apply(erule_tac x=x in allE) by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	233
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	234	lemma content_pos_lt_1: "dest_vec1 a < dest_vec1 b \<Longrightarrow> 0 < content({a..b})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	235	apply(rule content_pos_lt) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	236
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	237	lemma content_eq_0: "content({a..b::real^'n}) = 0 \<longleftrightarrow> (\<exists>i. b$i \<le> a$i)" proof(cases "{a..b} = {}")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	238	case True thus ?thesis unfolding content_def if_P[OF True] unfolding interval_eq_empty apply-
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	239	apply(rule,erule exE) apply(rule_tac x=i in exI) by auto next
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	240	guess a using UNIV_witness[where 'a='n] .. case False note as=this[unfolded interval_eq_empty not_ex not_less]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	241	show ?thesis unfolding content_def if_not_P[OF False] setprod_zero_iff[OF finite_UNIV]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	242	apply(rule) apply(erule_tac[!] exE bexE) unfolding interval_bounds[OF as] apply(rule_tac x=x in exI) defer
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	243	apply(rule_tac x=i in bexI) using as apply(erule_tac x=i in allE) by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	244
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	245	lemma cond_cases:"(P \<Longrightarrow> Q x) \<Longrightarrow> (\<not> P \<Longrightarrow> Q y) \<Longrightarrow> Q (if P then x else y)" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	246
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	247	lemma content_closed_interval_cases:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	248	"content {a..b} = (if \<forall>i. a$i \<le> b$i then setprod (\<lambda>i. b$i - a$i) UNIV else 0)" apply(rule cond_cases)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	249	apply(rule content_closed_interval) unfolding content_eq_0 not_all not_le defer apply(erule exE,rule_tac x=x in exI) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	250
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	251	lemma content_eq_0_interior: "content {a..b} = 0 \<longleftrightarrow> interior({a..b}) = {}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	252	unfolding content_eq_0 interior_closed_interval interval_eq_empty by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	253
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	254	lemma content_eq_0_1: "content {a..b::real^1} = 0 \<longleftrightarrow> dest_vec1 b \<le> dest_vec1 a"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	255	unfolding content_eq_0 by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	256
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	257	lemma content_pos_lt_eq: "0 < content {a..b} \<longleftrightarrow> (\<forall>i. a$i < b$i)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	258	apply(rule) defer apply(rule content_pos_lt,assumption) proof- assume "0 < content {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	259	hence "content {a..b} \<noteq> 0" by auto thus "\<forall>i. a$i < b$i" unfolding content_eq_0 not_ex not_le by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	260
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	261	lemma content_empty[simp]: "content {} = 0" unfolding content_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	262
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	263	lemma content_subset: assumes "{a..b} \<subseteq> {c..d}" shows "content {a..b::real^'n} \<le> content {c..d}" proof(cases "{a..b}={}")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	264	case True thus ?thesis using content_pos_le[of c d] by auto next
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	265	case False hence ab_ne:"\<forall>i. a $ i \<le> b $ i" unfolding interval_ne_empty by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	266	hence ab_ab:"a\<in>{a..b}" "b\<in>{a..b}" unfolding mem_interval by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	267	have "{c..d} \<noteq> {}" using assms False by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	268	hence cd_ne:"\<forall>i. c $ i \<le> d $ i" using assms unfolding interval_ne_empty by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	269	show ?thesis unfolding content_def unfolding interval_bounds[OF ab_ne] interval_bounds[OF cd_ne]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	270	unfolding if_not_P[OF False] if_not_P[OF `{c..d} \<noteq> {}`] apply(rule setprod_mono,rule) proof fix i::'n
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	271	show "0 \<le> b $ i - a $ i" using ab_ne[THEN spec[where x=i]] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	272	show "b $ i - a $ i \<le> d $ i - c $ i"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	273	using assms[unfolded subset_eq mem_interval,rule_format,OF ab_ab(2),of i]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	274	using assms[unfolded subset_eq mem_interval,rule_format,OF ab_ab(1),of i] by auto qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	275
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	276	lemma content_lt_nz: "0 < content {a..b} \<longleftrightarrow> content {a..b} \<noteq> 0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	277	unfolding content_pos_lt_eq content_eq_0 unfolding not_ex not_le by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	278
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	279	subsection {* The notion of a gauge --- simply an open set containing the point. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	280
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	281	definition gauge where "gauge d \<longleftrightarrow> (\<forall>x. x\<in>(d x) \<and> open(d x))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	282
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	283	lemma gaugeI:assumes "\<And>x. x\<in>g x" "\<And>x. open (g x)" shows "gauge g"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	284	using assms unfolding gauge_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	285
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	286	lemma gaugeD[dest]: assumes "gauge d" shows "x\<in>d x" "open (d x)" using assms unfolding gauge_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	287
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	288	lemma gauge_ball_dependent: "\<forall>x. 0 < e x \<Longrightarrow> gauge (\<lambda>x. ball x (e x))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	289	unfolding gauge_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	290
35751 f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	291	lemma gauge_ball[intro]: "0 < e \<Longrightarrow> gauge (\<lambda>x. ball x e)" unfolding gauge_def by auto
35172 579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	292
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	293	lemma gauge_trivial[intro]: "gauge (\<lambda>x. ball x 1)" apply(rule gauge_ball) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	294
35751 f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	295	lemma gauge_inter[intro]: "gauge d1 \<Longrightarrow> gauge d2 \<Longrightarrow> gauge (\<lambda>x. (d1 x) \<inter> (d2 x))"
35172 579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	296	unfolding gauge_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	297
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	298	lemma gauge_inters: assumes "finite s" "\<forall>d\<in>s. gauge (f d)" shows "gauge(\<lambda>x. \<Inter> {f d x \| d. d \<in> s})" proof-
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	299	have *:"\<And>x. {f d x \|d. d \<in> s} = (\<lambda>d. f d x) ` s" by auto show ?thesis
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	300	unfolding gauge_def unfolding *
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	301	using assms unfolding Ball_def Inter_iff mem_Collect_eq gauge_def by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	302
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	303	lemma gauge_existence_lemma: "(\<forall>x. \<exists>d::real. p x \<longrightarrow> 0 < d \<and> q d x) \<longleftrightarrow> (\<forall>x. \<exists>d>0. p x \<longrightarrow> q d x)" by(meson zero_less_one)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	304
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	305	subsection {* Divisions. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	306
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	307	definition division_of (infixl "division'_of" 40) where
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	308	"s division_of i \<equiv>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	309	finite s \<and>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	310	(\<forall>k\<in>s. k \<subseteq> i \<and> k \<noteq> {} \<and> (\<exists>a b. k = {a..b})) \<and>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	311	(\<forall>k1\<in>s. \<forall>k2\<in>s. k1 \<noteq> k2 \<longrightarrow> interior(k1) \<inter> interior(k2) = {}) \<and>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	312	(\<Union>s = i)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	313
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	314	lemma division_ofD[dest]: assumes "s division_of i"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	315	shows"finite s" "\<And>k. k\<in>s \<Longrightarrow> k \<subseteq> i" "\<And>k. k\<in>s \<Longrightarrow> k \<noteq> {}" "\<And>k. k\<in>s \<Longrightarrow> (\<exists>a b. k = {a..b})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	316	"\<And>k1 k2. \<lbrakk>k1\<in>s; k2\<in>s; k1 \<noteq> k2\<rbrakk> \<Longrightarrow> interior(k1) \<inter> interior(k2) = {}" "\<Union>s = i" using assms unfolding division_of_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	317
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	318	lemma division_ofI:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	319	assumes "finite s" "\<And>k. k\<in>s \<Longrightarrow> k \<subseteq> i" "\<And>k. k\<in>s \<Longrightarrow> k \<noteq> {}" "\<And>k. k\<in>s \<Longrightarrow> (\<exists>a b. k = {a..b})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	320	"\<And>k1 k2. \<lbrakk>k1\<in>s; k2\<in>s; k1 \<noteq> k2\<rbrakk> \<Longrightarrow> interior(k1) \<inter> interior(k2) = {}" "\<Union>s = i"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	321	shows "s division_of i" using assms unfolding division_of_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	322
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	323	lemma division_of_finite: "s division_of i \<Longrightarrow> finite s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	324	unfolding division_of_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	325
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	326	lemma division_of_self[intro]: "{a..b} \<noteq> {} \<Longrightarrow> {{a..b}} division_of {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	327	unfolding division_of_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	328
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	329	lemma division_of_trivial[simp]: "s division_of {} \<longleftrightarrow> s = {}" unfolding division_of_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	330
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	331	lemma division_of_sing[simp]: "s division_of {a..a::real^'n} \<longleftrightarrow> s = {{a..a}}" (is "?l = ?r") proof
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	332	assume ?r moreover { assume "s = {{a}}" moreover fix k assume "k\<in>s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	333	ultimately have"\<exists>x y. k = {x..y}" apply(rule_tac x=a in exI)+ unfolding interval_sing[THEN conjunct1] by auto }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	334	ultimately show ?l unfolding division_of_def interval_sing[THEN conjunct1] by auto next
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	335	assume ?l note as=conjunctD4[OF this[unfolded division_of_def interval_sing[THEN conjunct1]]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	336	{ fix x assume x:"x\<in>s" have "x={a}" using as(2)[rule_format,OF x] by auto }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	337	moreover have "s \<noteq> {}" using as(4) by auto ultimately show ?r unfolding interval_sing[THEN conjunct1] by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	338
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	339	lemma elementary_empty: obtains p where "p division_of {}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	340	unfolding division_of_trivial by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	341
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	342	lemma elementary_interval: obtains p where "p division_of {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	343	by(metis division_of_trivial division_of_self)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	344
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	345	lemma division_contains: "s division_of i \<Longrightarrow> \<forall>x\<in>i. \<exists>k\<in>s. x \<in> k"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	346	unfolding division_of_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	347
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	348	lemma forall_in_division:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	349	"d division_of i \<Longrightarrow> ((\<forall>x\<in>d. P x) \<longleftrightarrow> (\<forall>a b. {a..b} \<in> d \<longrightarrow> P {a..b}))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	350	unfolding division_of_def by fastsimp
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	351
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	352	lemma division_of_subset: assumes "p division_of (\<Union>p)" "q \<subseteq> p" shows "q division_of (\<Union>q)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	353	apply(rule division_ofI) proof- note as=division_ofD[OF assms(1)]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	354	show "finite q" apply(rule finite_subset) using as(1) assms(2) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	355	{ fix k assume "k \<in> q" hence kp:"k\<in>p" using assms(2) by auto show "k\<subseteq>\<Union>q" using `k \<in> q` by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	356	show "\<exists>a b. k = {a..b}" using as(4)[OF kp] by auto show "k \<noteq> {}" using as(3)[OF kp] by auto }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	357	fix k1 k2 assume "k1 \<in> q" "k2 \<in> q" "k1 \<noteq> k2" hence *:"k1\<in>p" "k2\<in>p" "k1\<noteq>k2" using assms(2) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	358	show "interior k1 \<inter> interior k2 = {}" using as(5)[OF *] by auto qed auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	359
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	360	lemma division_of_union_self[intro]: "p division_of s \<Longrightarrow> p division_of (\<Union>p)" unfolding division_of_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	361
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	362	lemma division_of_content_0: assumes "content {a..b} = 0" "d division_of {a..b}" shows "\<forall>k\<in>d. content k = 0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	363	unfolding forall_in_division[OF assms(2)] apply(rule,rule,rule) apply(drule division_ofD(2)[OF assms(2)])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	364	apply(drule content_subset) unfolding assms(1) proof- case goal1 thus ?case using content_pos_le[of a b] by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	365
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	366	lemma division_inter: assumes "p1 division_of s1" "p2 division_of (s2::(real^'a) set)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	367	shows "{k1 \<inter> k2 \| k1 k2 .k1 \<in> p1 \<and> k2 \<in> p2 \<and> k1 \<inter> k2 \<noteq> {}} division_of (s1 \<inter> s2)" (is "?A' division_of _") proof-
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	368	let ?A = "{s. s \<in> (\<lambda>(k1,k2). k1 \<inter> k2) ` (p1 \<times> p2) \<and> s \<noteq> {}}" have *:"?A' = ?A" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	369	show ?thesis unfolding * proof(rule division_ofI) have "?A \<subseteq> (\<lambda>(x, y). x \<inter> y) ` (p1 \<times> p2)" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	370	moreover have "finite (p1 \<times> p2)" using assms unfolding division_of_def by auto ultimately show "finite ?A" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	371	have :"\<And>s. \<Union>{x\<in>s. x \<noteq> {}} = \<Union>s" by auto show "\<Union>?A = s1 \<inter> s2" apply(rule set_ext) unfolding and Union_image_eq UN_iff
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	372	using division_ofD(6)[OF assms(1)] and division_ofD(6)[OF assms(2)] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	373	{ fix k assume "k\<in>?A" then obtain k1 k2 where k:"k = k1 \<inter> k2" "k1\<in>p1" "k2\<in>p2" "k\<noteq>{}" by auto thus "k \<noteq> {}" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	374	show "k \<subseteq> s1 \<inter> s2" using division_ofD(2)[OF assms(1) k(2)] and division_ofD(2)[OF assms(2) k(3)] unfolding k by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	375	guess a1 using division_ofD(4)[OF assms(1) k(2)] .. then guess b1 .. note ab1=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	376	guess a2 using division_ofD(4)[OF assms(2) k(3)] .. then guess b2 .. note ab2=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	377	show "\<exists>a b. k = {a..b}" unfolding k ab1 ab2 unfolding inter_interval by auto } fix k1 k2
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	378	assume "k1\<in>?A" then obtain x1 y1 where k1:"k1 = x1 \<inter> y1" "x1\<in>p1" "y1\<in>p2" "k1\<noteq>{}" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	379	assume "k2\<in>?A" then obtain x2 y2 where k2:"k2 = x2 \<inter> y2" "x2\<in>p1" "y2\<in>p2" "k2\<noteq>{}" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	380	assume "k1 \<noteq> k2" hence th:"x1\<noteq>x2 \<or> y1\<noteq>y2" unfolding k1 k2 by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	381	have *:"(interior x1 \<inter> interior x2 = {} \<or> interior y1 \<inter> interior y2 = {}) \<Longrightarrow>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	382	interior(x1 \<inter> y1) \<subseteq> interior(x1) \<Longrightarrow> interior(x1 \<inter> y1) \<subseteq> interior(y1) \<Longrightarrow>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	383	interior(x2 \<inter> y2) \<subseteq> interior(x2) \<Longrightarrow> interior(x2 \<inter> y2) \<subseteq> interior(y2)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	384	\<Longrightarrow> interior(x1 \<inter> y1) \<inter> interior(x2 \<inter> y2) = {}" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	385	show "interior k1 \<inter> interior k2 = {}" unfolding k1 k2 apply(rule *) defer apply(rule_tac[1-4] subset_interior)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	386	using division_ofD(5)[OF assms(1) k1(2) k2(2)]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	387	using division_ofD(5)[OF assms(2) k1(3) k2(3)] using th by auto qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	388
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	389	lemma division_inter_1: assumes "d division_of i" "{a..b::real^'n} \<subseteq> i"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	390	shows "{ {a..b} \<inter> k \|k. k \<in> d \<and> {a..b} \<inter> k \<noteq> {} } division_of {a..b}" proof(cases "{a..b} = {}")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	391	case True show ?thesis unfolding True and division_of_trivial by auto next
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	392	have *:"{a..b} \<inter> i = {a..b}" using assms(2) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	393	case False show ?thesis using division_inter[OF division_of_self[OF False] assms(1)] unfolding * by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	394
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	395	lemma elementary_inter: assumes "p1 division_of s" "p2 division_of (t::(real^'n) set)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	396	shows "\<exists>p. p division_of (s \<inter> t)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	397	by(rule,rule division_inter[OF assms])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	398
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	399	lemma elementary_inters: assumes "finite f" "f\<noteq>{}" "\<forall>s\<in>f. \<exists>p. p division_of (s::(real^'n) set)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	400	shows "\<exists>p. p division_of (\<Inter> f)" using assms apply-proof(induct f rule:finite_induct)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	401	case (insert x f) show ?case proof(cases "f={}")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	402	case True thus ?thesis unfolding True using insert by auto next
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	403	case False guess p using insert(3)[OF False insert(5)[unfolded ball_simps,THEN conjunct2]] ..
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	404	moreover guess px using insert(5)[rule_format,OF insertI1] .. ultimately
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	405	show ?thesis unfolding Inter_insert apply(rule_tac elementary_inter) by assumption+ qed qed auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	406
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	407	lemma division_disjoint_union:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	408	assumes "p1 division_of s1" "p2 division_of s2" "interior s1 \<inter> interior s2 = {}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	409	shows "(p1 \<union> p2) division_of (s1 \<union> s2)" proof(rule division_ofI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	410	note d1 = division_ofD[OF assms(1)] and d2 = division_ofD[OF assms(2)]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	411	show "finite (p1 \<union> p2)" using d1(1) d2(1) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	412	show "\<Union>(p1 \<union> p2) = s1 \<union> s2" using d1(6) d2(6) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	413	{ fix k1 k2 assume as:"k1 \<in> p1 \<union> p2" "k2 \<in> p1 \<union> p2" "k1 \<noteq> k2" moreover let ?g="interior k1 \<inter> interior k2 = {}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	414	{ assume as:"k1\<in>p1" "k2\<in>p2" have ?g using subset_interior[OF d1(2)[OF as(1)]] subset_interior[OF d2(2)[OF as(2)]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	415	using assms(3) by blast } moreover
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	416	{ assume as:"k1\<in>p2" "k2\<in>p1" have ?g using subset_interior[OF d1(2)[OF as(2)]] subset_interior[OF d2(2)[OF as(1)]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	417	using assms(3) by blast} ultimately
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	418	show ?g using d1(5)[OF _ _ as(3)] and d2(5)[OF _ _ as(3)] by auto }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	419	fix k assume k:"k \<in> p1 \<union> p2" show "k \<subseteq> s1 \<union> s2" using k d1(2) d2(2) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	420	show "k \<noteq> {}" using k d1(3) d2(3) by auto show "\<exists>a b. k = {a..b}" using k d1(4) d2(4) by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	421
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	422	lemma partial_division_extend_1:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	423	assumes "{c..d} \<subseteq> {a..b::real^'n}" "{c..d} \<noteq> {}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	424	obtains p where "p division_of {a..b}" "{c..d} \<in> p"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	425	proof- def n \<equiv> "CARD('n)" have n:"1 \<le> n" "0 < n" "n \<noteq> 0" unfolding n_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	426	guess \<pi> using ex_bij_betw_nat_finite_1[OF finite_UNIV[where 'a='n]] .. note \<pi>=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	427	def \<pi>' \<equiv> "inv_into {1..n} \<pi>"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	428	have \<pi>':"bij_betw \<pi>' UNIV {1..n}" using bij_betw_inv_into[OF \<pi>] unfolding \<pi>'_def n_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	429	hence \<pi>'i:"\<And>i. \<pi>' i \<in> {1..n}" unfolding bij_betw_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	430	have \<pi>\<pi>'[simp]:"\<And>i. \<pi> (\<pi>' i) = i" unfolding \<pi>'_def apply(rule f_inv_into_f) unfolding n_def using \<pi> unfolding bij_betw_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	431	have \<pi>'\<pi>[simp]:"\<And>i. i\<in>{1..n} \<Longrightarrow> \<pi>' (\<pi> i) = i" unfolding \<pi>'_def apply(rule inv_into_f_eq) using \<pi> unfolding n_def bij_betw_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	432	have "{c..d} \<noteq> {}" using assms by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	433	let ?p1 = "\<lambda>l. {(\<chi> i. if \<pi>' i < l then c$i else a$i) .. (\<chi> i. if \<pi>' i < l then d$i else if \<pi>' i = l then c$\<pi> l else b$i)}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	434	let ?p2 = "\<lambda>l. {(\<chi> i. if \<pi>' i < l then c$i else if \<pi>' i = l then d$\<pi> l else a$i) .. (\<chi> i. if \<pi>' i < l then d$i else b$i)}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	435	let ?p = "{?p1 l \|l. l \<in> {1..n+1}} \<union> {?p2 l \|l. l \<in> {1..n+1}}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	436	have abcd:"\<And>i. a $ i \<le> c $ i \<and> c$i \<le> d$i \<and> d $ i \<le> b $ i" using assms unfolding subset_interval interval_eq_empty by(auto simp add:not_le not_less)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	437	show ?thesis apply(rule that[of ?p]) apply(rule division_ofI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	438	proof- have "\<And>i. \<pi>' i < Suc n"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	439	proof(rule ccontr,unfold not_less) fix i assume "Suc n \<le> \<pi>' i"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	440	hence "\<pi>' i \<notin> {1..n}" by auto thus False using \<pi>' unfolding bij_betw_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	441	qed hence "c = (\<chi> i. if \<pi>' i < Suc n then c $ i else a $ i)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	442	"d = (\<chi> i. if \<pi>' i < Suc n then d $ i else if \<pi>' i = n + 1 then c $ \<pi> (n + 1) else b $ i)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	443	unfolding Cart_eq Cart_lambda_beta using \<pi>' unfolding bij_betw_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	444	thus cdp:"{c..d} \<in> ?p" apply-apply(rule UnI1) unfolding mem_Collect_eq apply(rule_tac x="n + 1" in exI) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	445	have "\<And>l. l\<in>{1..n+1} \<Longrightarrow> ?p1 l \<subseteq> {a..b}" "\<And>l. l\<in>{1..n+1} \<Longrightarrow> ?p2 l \<subseteq> {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	446	unfolding subset_eq apply(rule_tac[!] ballI,rule_tac[!] ccontr)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	447	proof- fix l assume l:"l\<in>{1..n+1}" fix x assume "x\<notin>{a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	448	then guess i unfolding mem_interval not_all .. note i=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	449	show "x \<in> ?p1 l \<Longrightarrow> False" "x \<in> ?p2 l \<Longrightarrow> False" unfolding mem_interval apply(erule_tac[!] x=i in allE)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	450	apply(case_tac[!] "\<pi>' i < l", case_tac[!] "\<pi>' i = l") using abcd[of i] i by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	451	qed moreover have "\<And>x. x \<in> {a..b} \<Longrightarrow> x \<in> \<Union>?p"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	452	proof- fix x assume x:"x\<in>{a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	453	{ presume "x\<notin>{c..d} \<Longrightarrow> x \<in> \<Union>?p" thus "x \<in> \<Union>?p" using cdp by blast }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	454	let ?M = "{i. i\<in>{1..n+1} \<and> \<not> (c $ \<pi> i \<le> x $ \<pi> i \<and> x $ \<pi> i \<le> d $ \<pi> i)}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	455	assume "x\<notin>{c..d}" then guess i0 unfolding mem_interval not_all ..
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	456	hence "\<pi>' i0 \<in> ?M" using \<pi>' unfolding bij_betw_def by(auto intro!:le_SucI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	457	hence M:"finite ?M" "?M \<noteq> {}" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	458	def l \<equiv> "Min ?M" note l = Min_less_iff[OF M,unfolded l_def[symmetric]] Min_in[OF M,unfolded mem_Collect_eq l_def[symmetric]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	459	Min_gr_iff[OF M,unfolded l_def[symmetric]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	460	have "x\<in>?p1 l \<or> x\<in>?p2 l" using l(2)[THEN conjunct2] unfolding de_Morgan_conj not_le
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	461	apply- apply(erule disjE) apply(rule disjI1) defer apply(rule disjI2)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	462	proof- assume as:"x $ \<pi> l < c $ \<pi> l"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	463	show "x \<in> ?p1 l" unfolding mem_interval Cart_lambda_beta
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	464	proof case goal1 have "\<pi>' i \<in> {1..n}" using \<pi>' unfolding bij_betw_def not_le by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	465	thus ?case using as x[unfolded mem_interval,rule_format,of i]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	466	apply auto using l(3)[of "\<pi>' i"] by(auto elim!:ballE[where x="\<pi>' i"])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	467	qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	468	next assume as:"x $ \<pi> l > d $ \<pi> l"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	469	show "x \<in> ?p2 l" unfolding mem_interval Cart_lambda_beta
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	470	proof case goal1 have "\<pi>' i \<in> {1..n}" using \<pi>' unfolding bij_betw_def not_le by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	471	thus ?case using as x[unfolded mem_interval,rule_format,of i]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	472	apply auto using l(3)[of "\<pi>' i"] by(auto elim!:ballE[where x="\<pi>' i"])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	473	qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	474	thus "x \<in> \<Union>?p" using l(2) by blast
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	475	qed ultimately show "\<Union>?p = {a..b}" apply-apply(rule) defer apply(rule) by(assumption,blast)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	476
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	477	show "finite ?p" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	478	fix k assume k:"k\<in>?p" then obtain l where l:"k = ?p1 l \<or> k = ?p2 l" "l \<in> {1..n + 1}" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	479	show "k\<subseteq>{a..b}" apply(rule,unfold mem_interval,rule,rule)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	480	proof- fix i::'n and x assume "x \<in> k" moreover have "\<pi>' i < l \<or> \<pi>' i = l \<or> \<pi>' i > l" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	481	ultimately show "a$i \<le> x$i" "x$i \<le> b$i" using abcd[of i] using l by(auto elim:disjE elim!:allE[where x=i] simp add:vector_le_def)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	482	qed have "\<And>l. ?p1 l \<noteq> {}" "\<And>l. ?p2 l \<noteq> {}" unfolding interval_eq_empty not_ex apply(rule_tac[!] allI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	483	proof- case goal1 thus ?case using abcd[of x] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	484	next case goal2 thus ?case using abcd[of x] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	485	qed thus "k \<noteq> {}" using k by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	486	show "\<exists>a b. k = {a..b}" using k by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	487	fix k' assume k':"k' \<in> ?p" "k \<noteq> k'" then obtain l' where l':"k' = ?p1 l' \<or> k' = ?p2 l'" "l' \<in> {1..n + 1}" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	488	{ fix k k' l l'
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	489	assume k:"k\<in>?p" and l:"k = ?p1 l \<or> k = ?p2 l" "l \<in> {1..n + 1}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	490	assume k':"k' \<in> ?p" "k \<noteq> k'" and l':"k' = ?p1 l' \<or> k' = ?p2 l'" "l' \<in> {1..n + 1}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	491	assume "l \<le> l'" fix x
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	492	have "x \<notin> interior k \<inter> interior k'"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	493	proof(rule,cases "l' = n+1") assume x:"x \<in> interior k \<inter> interior k'"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	494	case True hence "\<And>i. \<pi>' i < l'" using \<pi>'i by(auto simp add:less_Suc_eq_le)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	495	hence k':"k' = {c..d}" using l'(1) \<pi>'i by(auto simp add:Cart_nth_inverse)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	496	have ln:"l < n + 1"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	497	proof(rule ccontr) case goal1 hence l2:"l = n+1" using l by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	498	hence "\<And>i. \<pi>' i < l" using \<pi>'i by(auto simp add:less_Suc_eq_le)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	499	hence "k = {c..d}" using l(1) \<pi>'i by(auto simp add:Cart_nth_inverse)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	500	thus False using `k\<noteq>k'` k' by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	501	qed have **:"\<pi>' (\<pi> l) = l" using \<pi>'\<pi>[of l] using l ln by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	502	have "x $ \<pi> l < c $ \<pi> l \<or> d $ \<pi> l < x $ \<pi> l" using l(1) apply-
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	503	proof(erule disjE)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	504	assume as:"k = ?p1 l" note * = conjunct1[OF x[unfolded as Int_iff interior_closed_interval mem_interval],rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	505	show ?thesis using [of "\<pi> l"] using ln unfolding Cart_lambda_beta * by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	506	next assume as:"k = ?p2 l" note * = conjunct1[OF x[unfolded as Int_iff interior_closed_interval mem_interval],rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	507	show ?thesis using [of "\<pi> l"] using ln unfolding Cart_lambda_beta * by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	508	qed thus False using x unfolding k' unfolding Int_iff interior_closed_interval mem_interval
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	509	by(auto elim!:allE[where x="\<pi> l"])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	510	next case False hence "l < n + 1" using l'(2) using `l\<le>l'` by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	511	hence ln:"l \<in> {1..n}" "l' \<in> {1..n}" using l l' False by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	512	note \<pi>l = \<pi>'\<pi>[OF ln(1)] \<pi>'\<pi>[OF ln(2)]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	513	assume x:"x \<in> interior k \<inter> interior k'"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	514	show False using l(1) l'(1) apply-
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	515	proof(erule_tac[!] disjE)+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	516	assume as:"k = ?p1 l" "k' = ?p1 l'"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	517	note * = x[unfolded as Int_iff interior_closed_interval mem_interval]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	518	have "l \<noteq> l'" using k'(2)[unfolded as] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	519	thus False using * by(smt Cart_lambda_beta \<pi>l)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	520	next assume as:"k = ?p2 l" "k' = ?p2 l'"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	521	note * = conjunctD2[OF x[unfolded as Int_iff interior_closed_interval mem_interval],rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	522	have "l \<noteq> l'" apply(rule) using k'(2)[unfolded as] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	523	thus False using [of "\<pi> l"] [of "\<pi> l'"]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	524	unfolding Cart_lambda_beta \<pi>l using `l \<le> l'` by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	525	next assume as:"k = ?p1 l" "k' = ?p2 l'"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	526	note * = conjunctD2[OF x[unfolded as Int_iff interior_closed_interval mem_interval],rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	527	show False using [of "\<pi> l"] [of "\<pi> l'"]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	528	unfolding Cart_lambda_beta \<pi>l using `l \<le> l'` using abcd[of "\<pi> l'"] by smt
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	529	next assume as:"k = ?p2 l" "k' = ?p1 l'"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	530	note * = conjunctD2[OF x[unfolded as Int_iff interior_closed_interval mem_interval],rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	531	show False using [of "\<pi> l"] [of "\<pi> l'"]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	532	unfolding Cart_lambda_beta \<pi>l using `l \<le> l'` using abcd[of "\<pi> l'"] by smt
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	533	qed qed }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	534	from this[OF k l k' l'] this[OF k'(1) l' k _ l] have "\<And>x. x \<notin> interior k \<inter> interior k'"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	535	apply - apply(cases "l' \<le> l") using k'(2) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	536	thus "interior k \<inter> interior k' = {}" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	537	qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	538
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	539	lemma partial_division_extend_interval: assumes "p division_of (\<Union>p)" "(\<Union>p) \<subseteq> {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	540	obtains q where "p \<subseteq> q" "q division_of {a..b::real^'n}" proof(cases "p = {}")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	541	case True guess q apply(rule elementary_interval[of a b]) .
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	542	thus ?thesis apply- apply(rule that[of q]) unfolding True by auto next
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	543	case False note p = division_ofD[OF assms(1)]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	544	have *:"\<forall>k\<in>p. \<exists>q. q division_of {a..b} \<and> k\<in>q" proof case goal1
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	545	guess c using p(4)[OF goal1] .. then guess d .. note cd_ = this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	546	have *:"{c..d} \<subseteq> {a..b}" "{c..d} \<noteq> {}" using p(2,3)[OF goal1, unfolded cd_] using assms(2) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	547	guess q apply(rule partial_division_extend_1[OF *]) . thus ?case unfolding cd_ by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	548	guess q using bchoice[OF *] .. note q = conjunctD2[OF this[rule_format]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	549	have "\<And>x. x\<in>p \<Longrightarrow> \<exists>d. d division_of \<Union>(q x - {x})" apply(rule,rule_tac p="q x" in division_of_subset) proof-
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	550	fix x assume x:"x\<in>p" show "q x division_of \<Union>q x" apply-apply(rule division_ofI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	551	using division_ofD[OF q(1)[OF x]] by auto show "q x - {x} \<subseteq> q x" by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	552	hence "\<exists>d. d division_of \<Inter> ((\<lambda>i. \<Union>(q i - {i})) ` p)" apply- apply(rule elementary_inters)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	553	apply(rule finite_imageI[OF p(1)]) unfolding image_is_empty apply(rule False) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	554	then guess d .. note d = this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	555	show ?thesis apply(rule that[of "d \<union> p"]) proof-
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	556	have *:"\<And>s f t. s \<noteq> {} \<Longrightarrow> (\<forall>i\<in>s. f i \<union> i = t) \<Longrightarrow> t = \<Inter> (f ` s) \<union> (\<Union>s)" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	557	have :"{a..b} = \<Inter> (\<lambda>i. \<Union>(q i - {i})) ` p \<union> \<Union>p" apply(rule [OF False]) proof fix i assume i:"i\<in>p"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	558	show "\<Union>(q i - {i}) \<union> i = {a..b}" using division_ofD(6)[OF q(1)[OF i]] using q(2)[OF i] by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	559	show "d \<union> p division_of {a..b}" unfolding * apply(rule division_disjoint_union[OF d assms(1)])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	560	apply(rule inter_interior_unions_intervals) apply(rule p open_interior ballI)+ proof(assumption,rule)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	561	fix k assume k:"k\<in>p" have *:"\<And>u t s. u \<subseteq> s \<Longrightarrow> s \<inter> t = {} \<Longrightarrow> u \<inter> t = {}" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	562	show "interior (\<Inter>(\<lambda>i. \<Union>(q i - {i})) ` p) \<inter> interior k = {}" apply(rule *[of _ "interior (\<Union>(q k - {k}))"])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	563	defer apply(subst Int_commute) apply(rule inter_interior_unions_intervals) proof- note qk=division_ofD[OF q(1)[OF k]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	564	show "finite (q k - {k})" "open (interior k)" "\<forall>t\<in>q k - {k}. \<exists>a b. t = {a..b}" using qk by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	565	show "\<forall>t\<in>q k - {k}. interior k \<inter> interior t = {}" using qk(5) using q(2)[OF k] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	566	have *:"\<And>x s. x \<in> s \<Longrightarrow> \<Inter>s \<subseteq> x" by auto show "interior (\<Inter>(\<lambda>i. \<Union>(q i - {i})) ` p) \<subseteq> interior (\<Union>(q k - {k}))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	567	apply(rule subset_interior *)+ using k by auto qed qed qed auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	568
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	569	lemma elementary_bounded[dest]: "p division_of s \<Longrightarrow> bounded (s::(real^'n) set)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	570	unfolding division_of_def by(metis bounded_Union bounded_interval)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	571
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	572	lemma elementary_subset_interval: "p division_of s \<Longrightarrow> \<exists>a b. s \<subseteq> {a..b::real^'n}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	573	by(meson elementary_bounded bounded_subset_closed_interval)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	574
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	575	lemma division_union_intervals_exists: assumes "{a..b::real^'n} \<noteq> {}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	576	obtains p where "(insert {a..b} p) division_of ({a..b} \<union> {c..d})" proof(cases "{c..d} = {}")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	577	case True show ?thesis apply(rule that[of "{}"]) unfolding True using assms by auto next
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	578	case False note false=this show ?thesis proof(cases "{a..b} \<inter> {c..d} = {}")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	579	have *:"\<And>a b. {a,b} = {a} \<union> {b}" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	580	case True show ?thesis apply(rule that[of "{{c..d}}"]) unfolding * apply(rule division_disjoint_union)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	581	using false True assms using interior_subset by auto next
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	582	case False obtain u v where uv:"{a..b} \<inter> {c..d} = {u..v}" unfolding inter_interval by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	583	have *:"{u..v} \<subseteq> {c..d}" using uv by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	584	guess p apply(rule partial_division_extend_1[OF * False[unfolded uv]]) . note p=this division_ofD[OF this(1)]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	585	have *:"{a..b} \<union> {c..d} = {a..b} \<union> \<Union>(p - {{u..v}})" "\<And>x s. insert x s = {x} \<union> s" using p(8) unfolding uv[THEN sym] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	586	show thesis apply(rule that[of "p - {{u..v}}"]) unfolding (1) apply(subst (2)) apply(rule division_disjoint_union)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	587	apply(rule,rule assms) apply(rule division_of_subset[of p]) apply(rule division_of_union_self[OF p(1)]) defer
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	588	unfolding interior_inter[THEN sym] proof-
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	589	have *:"\<And>cd p uv ab. p \<subseteq> cd \<Longrightarrow> ab \<inter> cd = uv \<Longrightarrow> ab \<inter> p = uv \<inter> p" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	590	have "interior ({a..b} \<inter> \<Union>(p - {{u..v}})) = interior({u..v} \<inter> \<Union>(p - {{u..v}}))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	591	apply(rule arg_cong[of _ _ interior]) apply(rule *[OF _ uv]) using p(8) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	592	also have "\<dots> = {}" unfolding interior_inter apply(rule inter_interior_unions_intervals) using p(6) p(7)[OF p(2)] p(3) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	593	finally show "interior ({a..b} \<inter> \<Union>(p - {{u..v}})) = {}" by assumption qed auto qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	594
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	595	lemma division_of_unions: assumes "finite f" "\<And>p. p\<in>f \<Longrightarrow> p division_of (\<Union>p)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	596	"\<And>k1 k2. \<lbrakk>k1 \<in> \<Union>f; k2 \<in> \<Union>f; k1 \<noteq> k2\<rbrakk> \<Longrightarrow> interior k1 \<inter> interior k2 = {}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	597	shows "\<Union>f division_of \<Union>\<Union>f" apply(rule division_ofI) prefer 5 apply(rule assms(3)\|assumption)+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	598	apply(rule finite_Union assms(1))+ prefer 3 apply(erule UnionE) apply(rule_tac s=X in division_ofD(3)[OF assms(2)])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	599	using division_ofD[OF assms(2)] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	600
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	601	lemma elementary_union_interval: assumes "p division_of \<Union>p"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	602	obtains q where "q division_of ({a..b::real^'n} \<union> \<Union>p)" proof-
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	603	note assm=division_ofD[OF assms]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	604	have lem1:"\<And>f s. \<Union>\<Union> (f ` s) = \<Union>(\<lambda>x.\<Union>(f x)) ` s" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	605	have lem2:"\<And>f s. f \<noteq> {} \<Longrightarrow> \<Union>{s \<union> t \|t. t \<in> f} = s \<union> \<Union>f" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	606	{ presume "p={} \<Longrightarrow> thesis" "{a..b} = {} \<Longrightarrow> thesis" "{a..b} \<noteq> {} \<Longrightarrow> interior {a..b} = {} \<Longrightarrow> thesis"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	607	"p\<noteq>{} \<Longrightarrow> interior {a..b}\<noteq>{} \<Longrightarrow> {a..b} \<noteq> {} \<Longrightarrow> thesis"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	608	thus thesis by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	609	next assume as:"p={}" guess p apply(rule elementary_interval[of a b]) .
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	610	thus thesis apply(rule_tac that[of p]) unfolding as by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	611	next assume as:"{a..b}={}" show thesis apply(rule that) unfolding as using assms by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	612	next assume as:"interior {a..b} = {}" "{a..b} \<noteq> {}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	613	show thesis apply(rule that[of "insert {a..b} p"],rule division_ofI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	614	unfolding finite_insert apply(rule assm(1)) unfolding Union_insert
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	615	using assm(2-4) as apply- by(fastsimp dest: assm(5))+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	616	next assume as:"p \<noteq> {}" "interior {a..b} \<noteq> {}" "{a..b}\<noteq>{}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	617	have "\<forall>k\<in>p. \<exists>q. (insert {a..b} q) division_of ({a..b} \<union> k)" proof case goal1
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	618	from assm(4)[OF this] guess c .. then guess d ..
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	619	thus ?case apply-apply(rule division_union_intervals_exists[OF as(3),of c d]) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	620	qed from bchoice[OF this] guess q .. note q=division_ofD[OF this[rule_format]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	621	let ?D = "\<Union>{insert {a..b} (q k) \| k. k \<in> p}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	622	show thesis apply(rule that[of "?D"]) proof(rule division_ofI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	623	have *:"{insert {a..b} (q k) \|k. k \<in> p} = (\<lambda>k. insert {a..b} (q k)) ` p" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	624	show "finite ?D" apply(rule finite_Union) unfolding * apply(rule finite_imageI) using assm(1) q(1) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	625	show "\<Union>?D = {a..b} \<union> \<Union>p" unfolding * lem1 unfolding lem2[OF as(1), of "{a..b}",THEN sym]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	626	using q(6) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	627	fix k assume k:"k\<in>?D" thus " k \<subseteq> {a..b} \<union> \<Union>p" using q(2) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	628	show "k \<noteq> {}" using q(3) k by auto show "\<exists>a b. k = {a..b}" using q(4) k by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	629	fix k' assume k':"k'\<in>?D" "k\<noteq>k'"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	630	obtain x where x: "k \<in>insert {a..b} (q x)" "x\<in>p" using k by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	631	obtain x' where x':"k'\<in>insert {a..b} (q x')" "x'\<in>p" using k' by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	632	show "interior k \<inter> interior k' = {}" proof(cases "x=x'")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	633	case True show ?thesis apply(rule q(5)) using x x' k' unfolding True by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	634	next case False
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	635	{ presume "k = {a..b} \<Longrightarrow> ?thesis" "k' = {a..b} \<Longrightarrow> ?thesis"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	636	"k \<noteq> {a..b} \<Longrightarrow> k' \<noteq> {a..b} \<Longrightarrow> ?thesis"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	637	thus ?thesis by auto }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	638	{ assume as':"k = {a..b}" show ?thesis apply(rule q(5)) using x' k'(2) unfolding as' by auto }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	639	{ assume as':"k' = {a..b}" show ?thesis apply(rule q(5)) using x k'(2) unfolding as' by auto }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	640	assume as':"k \<noteq> {a..b}" "k' \<noteq> {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	641	guess c using q(4)[OF x(2,1)] .. then guess d .. note c_d=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	642	have "interior k \<inter> interior {a..b} = {}" apply(rule q(5)) using x k'(2) using as' by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	643	hence "interior k \<subseteq> interior x" apply-
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	644	apply(rule interior_subset_union_intervals[OF c_d _ as(2) q(2)[OF x(2,1)]]) by auto moreover
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	645	guess c using q(4)[OF x'(2,1)] .. then guess d .. note c_d=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	646	have "interior k' \<inter> interior {a..b} = {}" apply(rule q(5)) using x' k'(2) using as' by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	647	hence "interior k' \<subseteq> interior x'" apply-
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	648	apply(rule interior_subset_union_intervals[OF c_d _ as(2) q(2)[OF x'(2,1)]]) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	649	ultimately show ?thesis using assm(5)[OF x(2) x'(2) False] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	650	qed qed } qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	651
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	652	lemma elementary_unions_intervals:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	653	assumes "finite f" "\<And>s. s \<in> f \<Longrightarrow> \<exists>a b. s = {a..b::real^'n}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	654	obtains p where "p division_of (\<Union>f)" proof-
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	655	have "\<exists>p. p division_of (\<Union>f)" proof(induct_tac f rule:finite_subset_induct)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	656	show "\<exists>p. p division_of \<Union>{}" using elementary_empty by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	657	fix x F assume as:"finite F" "x \<notin> F" "\<exists>p. p division_of \<Union>F" "x\<in>f"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	658	from this(3) guess p .. note p=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	659	from assms(2)[OF as(4)] guess a .. then guess b .. note ab=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	660	have *:"\<Union>F = \<Union>p" using division_ofD[OF p] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	661	show "\<exists>p. p division_of \<Union>insert x F" using elementary_union_interval[OF p[unfolded *], of a b]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	662	unfolding Union_insert ab * by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	663	qed(insert assms,auto) thus ?thesis apply-apply(erule exE,rule that) by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	664
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	665	lemma elementary_union: assumes "ps division_of s" "pt division_of (t::(real^'n) set)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	666	obtains p where "p division_of (s \<union> t)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	667	proof- have "s \<union> t = \<Union>ps \<union> \<Union>pt" using assms unfolding division_of_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	668	hence *:"\<Union>(ps \<union> pt) = s \<union> t" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	669	show ?thesis apply-apply(rule elementary_unions_intervals[of "ps\<union>pt"])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	670	unfolding * prefer 3 apply(rule_tac p=p in that)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	671	using assms[unfolded division_of_def] by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	672
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	673	lemma partial_division_extend: fixes t::"(real^'n) set"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	674	assumes "p division_of s" "q division_of t" "s \<subseteq> t"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	675	obtains r where "p \<subseteq> r" "r division_of t" proof-
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	676	note divp = division_ofD[OF assms(1)] and divq = division_ofD[OF assms(2)]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	677	obtain a b where ab:"t\<subseteq>{a..b}" using elementary_subset_interval[OF assms(2)] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	678	guess r1 apply(rule partial_division_extend_interval) apply(rule assms(1)[unfolded divp(6)[THEN sym]])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	679	apply(rule subset_trans) by(rule ab assms[unfolded divp(6)[THEN sym]])+ note r1 = this division_ofD[OF this(2)]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	680	guess p' apply(rule elementary_unions_intervals[of "r1 - p"]) using r1(3,6) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	681	then obtain r2 where r2:"r2 division_of (\<Union>(r1 - p)) \<inter> (\<Union>q)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	682	apply- apply(drule elementary_inter[OF _ assms(2)[unfolded divq(6)[THEN sym]]]) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	683	{ fix x assume x:"x\<in>t" "x\<notin>s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	684	hence "x\<in>\<Union>r1" unfolding r1 using ab by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	685	then guess r unfolding Union_iff .. note r=this moreover
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	686	have "r \<notin> p" proof assume "r\<in>p" hence "x\<in>s" using divp(2) r by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	687	thus False using x by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	688	ultimately have "x\<in>\<Union>(r1 - p)" by auto }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	689	hence *:"t = \<Union>p \<union> (\<Union>(r1 - p) \<inter> \<Union>q)" unfolding divp divq using assms(3) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	690	show ?thesis apply(rule that[of "p \<union> r2"]) unfolding * defer apply(rule division_disjoint_union)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	691	unfolding divp(6) apply(rule assms r2)+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	692	proof- have "interior s \<inter> interior (\<Union>(r1-p)) = {}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	693	proof(rule inter_interior_unions_intervals)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	694	show "finite (r1 - p)" "open (interior s)" "\<forall>t\<in>r1-p. \<exists>a b. t = {a..b}" using r1 by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	695	have *:"\<And>s. (\<And>x. x \<in> s \<Longrightarrow> False) \<Longrightarrow> s = {}" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	696	show "\<forall>t\<in>r1-p. interior s \<inter> interior t = {}" proof(rule)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	697	fix m x assume as:"m\<in>r1-p"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	698	have "interior m \<inter> interior (\<Union>p) = {}" proof(rule inter_interior_unions_intervals)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	699	show "finite p" "open (interior m)" "\<forall>t\<in>p. \<exists>a b. t = {a..b}" using divp by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	700	show "\<forall>t\<in>p. interior m \<inter> interior t = {}" apply(rule, rule r1(7)) using as using r1 by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	701	qed thus "interior s \<inter> interior m = {}" unfolding divp by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	702	qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	703	thus "interior s \<inter> interior (\<Union>(r1-p) \<inter> (\<Union>q)) = {}" using interior_subset by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	704	qed auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	705
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	706	subsection {* Tagged (partial) divisions. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	707
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	708	definition tagged_partial_division_of (infixr "tagged'_partial'_division'_of" 40) where
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	709	"(s tagged_partial_division_of i) \<equiv>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	710	finite s \<and>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	711	(\<forall>x k. (x,k) \<in> s \<longrightarrow> x \<in> k \<and> k \<subseteq> i \<and> (\<exists>a b. k = {a..b})) \<and>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	712	(\<forall>x1 k1 x2 k2. (x1,k1) \<in> s \<and> (x2,k2) \<in> s \<and> ((x1,k1) \<noteq> (x2,k2))
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	713	\<longrightarrow> (interior(k1) \<inter> interior(k2) = {}))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	714
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	715	lemma tagged_partial_division_ofD[dest]: assumes "s tagged_partial_division_of i"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	716	shows "finite s" "\<And>x k. (x,k) \<in> s \<Longrightarrow> x \<in> k" "\<And>x k. (x,k) \<in> s \<Longrightarrow> k \<subseteq> i"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	717	"\<And>x k. (x,k) \<in> s \<Longrightarrow> \<exists>a b. k = {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	718	"\<And>x1 k1 x2 k2. (x1,k1) \<in> s \<Longrightarrow> (x2,k2) \<in> s \<Longrightarrow> (x1,k1) \<noteq> (x2,k2) \<Longrightarrow> interior(k1) \<inter> interior(k2) = {}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	719	using assms unfolding tagged_partial_division_of_def apply- by blast+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	720
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	721	definition tagged_division_of (infixr "tagged'_division'_of" 40) where
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	722	"(s tagged_division_of i) \<equiv>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	723	(s tagged_partial_division_of i) \<and> (\<Union>{k. \<exists>x. (x,k) \<in> s} = i)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	724
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	725	lemma tagged_division_of_finite[dest]: "s tagged_division_of i \<Longrightarrow> finite s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	726	unfolding tagged_division_of_def tagged_partial_division_of_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	727
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	728	lemma tagged_division_of:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	729	"(s tagged_division_of i) \<longleftrightarrow>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	730	finite s \<and>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	731	(\<forall>x k. (x,k) \<in> s
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	732	\<longrightarrow> x \<in> k \<and> k \<subseteq> i \<and> (\<exists>a b. k = {a..b})) \<and>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	733	(\<forall>x1 k1 x2 k2. (x1,k1) \<in> s \<and> (x2,k2) \<in> s \<and> ~((x1,k1) = (x2,k2))
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	734	\<longrightarrow> (interior(k1) \<inter> interior(k2) = {})) \<and>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	735	(\<Union>{k. \<exists>x. (x,k) \<in> s} = i)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	736	unfolding tagged_division_of_def tagged_partial_division_of_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	737
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	738	lemma tagged_division_ofI: assumes
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	739	"finite s" "\<And>x k. (x,k) \<in> s \<Longrightarrow> x \<in> k" "\<And>x k. (x,k) \<in> s \<Longrightarrow> k \<subseteq> i" "\<And>x k. (x,k) \<in> s \<Longrightarrow> \<exists>a b. k = {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	740	"\<And>x1 k1 x2 k2. (x1,k1) \<in> s \<Longrightarrow> (x2,k2) \<in> s \<Longrightarrow> ~((x1,k1) = (x2,k2)) \<Longrightarrow> (interior(k1) \<inter> interior(k2) = {})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	741	"(\<Union>{k. \<exists>x. (x,k) \<in> s} = i)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	742	shows "s tagged_division_of i"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	743	unfolding tagged_division_of apply(rule) defer apply rule
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	744	apply(rule allI impI conjI assms)+ apply assumption
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	745	apply(rule, rule assms, assumption) apply(rule assms, assumption)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	746	using assms(1,5-) apply- by blast+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	747
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	748	lemma tagged_division_ofD[dest]: assumes "s tagged_division_of i"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	749	shows "finite s" "\<And>x k. (x,k) \<in> s \<Longrightarrow> x \<in> k" "\<And>x k. (x,k) \<in> s \<Longrightarrow> k \<subseteq> i" "\<And>x k. (x,k) \<in> s \<Longrightarrow> \<exists>a b. k = {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	750	"\<And>x1 k1 x2 k2. (x1,k1) \<in> s \<Longrightarrow> (x2,k2) \<in> s \<Longrightarrow> ~((x1,k1) = (x2,k2)) \<Longrightarrow> (interior(k1) \<inter> interior(k2) = {})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	751	"(\<Union>{k. \<exists>x. (x,k) \<in> s} = i)" using assms unfolding tagged_division_of apply- by blast+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	752
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	753	lemma division_of_tagged_division: assumes"s tagged_division_of i" shows "(snd ` s) division_of i"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	754	proof(rule division_ofI) note assm=tagged_division_ofD[OF assms]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	755	show "\<Union>snd ` s = i" "finite (snd ` s)" using assm by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	756	fix k assume k:"k \<in> snd ` s" then obtain xk where xk:"(xk, k) \<in> s" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	757	thus "k \<subseteq> i" "k \<noteq> {}" "\<exists>a b. k = {a..b}" using assm apply- by fastsimp+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	758	fix k' assume k':"k' \<in> snd ` s" "k \<noteq> k'" from this(1) obtain xk' where xk':"(xk', k') \<in> s" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	759	thus "interior k \<inter> interior k' = {}" apply-apply(rule assm(5)) apply(rule xk xk')+ using k' by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	760	qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	761
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	762	lemma partial_division_of_tagged_division: assumes "s tagged_partial_division_of i"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	763	shows "(snd ` s) division_of \<Union>(snd ` s)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	764	proof(rule division_ofI) note assm=tagged_partial_division_ofD[OF assms]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	765	show "finite (snd ` s)" "\<Union>snd ` s = \<Union>snd ` s" using assm by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	766	fix k assume k:"k \<in> snd ` s" then obtain xk where xk:"(xk, k) \<in> s" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	767	thus "k\<noteq>{}" "\<exists>a b. k = {a..b}" "k \<subseteq> \<Union>snd ` s" using assm by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	768	fix k' assume k':"k' \<in> snd ` s" "k \<noteq> k'" from this(1) obtain xk' where xk':"(xk', k') \<in> s" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	769	thus "interior k \<inter> interior k' = {}" apply-apply(rule assm(5)) apply(rule xk xk')+ using k' by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	770	qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	771
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	772	lemma tagged_partial_division_subset: assumes "s tagged_partial_division_of i" "t \<subseteq> s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	773	shows "t tagged_partial_division_of i"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	774	using assms unfolding tagged_partial_division_of_def using finite_subset[OF assms(2)] by blast
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	775
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	776	lemma setsum_over_tagged_division_lemma: fixes d::"(real^'m) set \<Rightarrow> 'a::real_normed_vector"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	777	assumes "p tagged_division_of i" "\<And>u v. {u..v} \<noteq> {} \<Longrightarrow> content {u..v} = 0 \<Longrightarrow> d {u..v} = 0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	778	shows "setsum (\<lambda>(x,k). d k) p = setsum d (snd ` p)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	779	proof- note assm=tagged_division_ofD[OF assms(1)]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	780	have *:"(\<lambda>(x,k). d k) = d \<circ> snd" unfolding o_def apply(rule ext) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	781	show ?thesis unfolding * apply(subst eq_commute) proof(rule setsum_reindex_nonzero)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	782	show "finite p" using assm by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	783	fix x y assume as:"x\<in>p" "y\<in>p" "x\<noteq>y" "snd x = snd y"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	784	obtain a b where ab:"snd x = {a..b}" using assm(4)[of "fst x" "snd x"] as(1) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	785	have "(fst x, snd y) \<in> p" "(fst x, snd y) \<noteq> y" unfolding as(4)[THEN sym] using as(1-3) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	786	hence "interior (snd x) \<inter> interior (snd y) = {}" apply-apply(rule assm(5)[of "fst x" _ "fst y"]) using as by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	787	hence "content {a..b} = 0" unfolding as(4)[THEN sym] ab content_eq_0_interior by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	788	hence "d {a..b} = 0" apply-apply(rule assms(2)) using assm(2)[of "fst x" "snd x"] as(1) unfolding ab[THEN sym] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	789	thus "d (snd x) = 0" unfolding ab by auto qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	790
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	791	lemma tag_in_interval: "p tagged_division_of i \<Longrightarrow> (x,k) \<in> p \<Longrightarrow> x \<in> i" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	792
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	793	lemma tagged_division_of_empty: "{} tagged_division_of {}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	794	unfolding tagged_division_of by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	795
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	796	lemma tagged_partial_division_of_trivial[simp]:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	797	"p tagged_partial_division_of {} \<longleftrightarrow> p = {}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	798	unfolding tagged_partial_division_of_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	799
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	800	lemma tagged_division_of_trivial[simp]:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	801	"p tagged_division_of {} \<longleftrightarrow> p = {}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	802	unfolding tagged_division_of by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	803
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	804	lemma tagged_division_of_self:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	805	"x \<in> {a..b} \<Longrightarrow> {(x,{a..b})} tagged_division_of {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	806	apply(rule tagged_division_ofI) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	807
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	808	lemma tagged_division_union:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	809	assumes "p1 tagged_division_of s1" "p2 tagged_division_of s2" "interior s1 \<inter> interior s2 = {}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	810	shows "(p1 \<union> p2) tagged_division_of (s1 \<union> s2)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	811	proof(rule tagged_division_ofI) note p1=tagged_division_ofD[OF assms(1)] and p2=tagged_division_ofD[OF assms(2)]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	812	show "finite (p1 \<union> p2)" using p1(1) p2(1) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	813	show "\<Union>{k. \<exists>x. (x, k) \<in> p1 \<union> p2} = s1 \<union> s2" using p1(6) p2(6) by blast
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	814	fix x k assume xk:"(x,k)\<in>p1\<union>p2" show "x\<in>k" "\<exists>a b. k = {a..b}" using xk p1(2,4) p2(2,4) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	815	show "k\<subseteq>s1\<union>s2" using xk p1(3) p2(3) by blast
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	816	fix x' k' assume xk':"(x',k')\<in>p1\<union>p2" "(x,k) \<noteq> (x',k')"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	817	have *:"\<And>a b. a\<subseteq> s1 \<Longrightarrow> b\<subseteq> s2 \<Longrightarrow> interior a \<inter> interior b = {}" using assms(3) subset_interior by blast
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	818	show "interior k \<inter> interior k' = {}" apply(cases "(x,k)\<in>p1", case_tac[!] "(x',k')\<in>p1")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	819	apply(rule p1(5)) prefer 4 apply(rule ) prefer 6 apply(subst Int_commute,rule ) prefer 8 apply(rule p2(5))
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	820	using p1(3) p2(3) using xk xk' by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	821
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	822	lemma tagged_division_unions:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	823	assumes "finite iset" "\<forall>i\<in>iset. (pfn(i) tagged_division_of i)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	824	"\<forall>i1 \<in> iset. \<forall>i2 \<in> iset. ~(i1 = i2) \<longrightarrow> (interior(i1) \<inter> interior(i2) = {})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	825	shows "\<Union>(pfn ` iset) tagged_division_of (\<Union>iset)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	826	proof(rule tagged_division_ofI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	827	note assm = tagged_division_ofD[OF assms(2)[rule_format]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	828	show "finite (\<Union>pfn ` iset)" apply(rule finite_Union) using assms by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	829	have "\<Union>{k. \<exists>x. (x, k) \<in> \<Union>pfn ` iset} = \<Union>(\<lambda>i. \<Union>{k. \<exists>x. (x, k) \<in> pfn i}) ` iset" by blast
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	830	also have "\<dots> = \<Union>iset" using assm(6) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	831	finally show "\<Union>{k. \<exists>x. (x, k) \<in> \<Union>pfn ` iset} = \<Union>iset" .
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	832	fix x k assume xk:"(x,k)\<in>\<Union>pfn ` iset" then obtain i where i:"i \<in> iset" "(x, k) \<in> pfn i" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	833	show "x\<in>k" "\<exists>a b. k = {a..b}" "k \<subseteq> \<Union>iset" using assm(2-4)[OF i] using i(1) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	834	fix x' k' assume xk':"(x',k')\<in>\<Union>pfn ` iset" "(x, k) \<noteq> (x', k')" then obtain i' where i':"i' \<in> iset" "(x', k') \<in> pfn i'" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	835	have *:"\<And>a b. i\<noteq>i' \<Longrightarrow> a\<subseteq> i \<Longrightarrow> b\<subseteq> i' \<Longrightarrow> interior a \<inter> interior b = {}" using i(1) i'(1)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	836	using assms(3)[rule_format] subset_interior by blast
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	837	show "interior k \<inter> interior k' = {}" apply(cases "i=i'")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	838	using assm(5)[OF i _ xk'(2)] i'(2) using assm(3)[OF i] assm(3)[OF i'] defer apply-apply(rule *) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	839	qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	840
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	841	lemma tagged_partial_division_of_union_self:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	842	assumes "p tagged_partial_division_of s" shows "p tagged_division_of (\<Union>(snd ` p))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	843	apply(rule tagged_division_ofI) using tagged_partial_division_ofD[OF assms] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	844
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	845	lemma tagged_division_of_union_self: assumes "p tagged_division_of s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	846	shows "p tagged_division_of (\<Union>(snd ` p))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	847	apply(rule tagged_division_ofI) using tagged_division_ofD[OF assms] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	848
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	849	subsection {* Fine-ness of a partition w.r.t. a gauge. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	850
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	851	definition fine (infixr "fine" 46) where
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	852	"d fine s \<longleftrightarrow> (\<forall>(x,k) \<in> s. k \<subseteq> d(x))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	853
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	854	lemma fineI: assumes "\<And>x k. (x,k) \<in> s \<Longrightarrow> k \<subseteq> d x"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	855	shows "d fine s" using assms unfolding fine_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	856
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	857	lemma fineD[dest]: assumes "d fine s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	858	shows "\<And>x k. (x,k) \<in> s \<Longrightarrow> k \<subseteq> d x" using assms unfolding fine_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	859
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	860	lemma fine_inter: "(\<lambda>x. d1 x \<inter> d2 x) fine p \<longleftrightarrow> d1 fine p \<and> d2 fine p"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	861	unfolding fine_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	862
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	863	lemma fine_inters:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	864	"(\<lambda>x. \<Inter> {f d x \| d. d \<in> s}) fine p \<longleftrightarrow> (\<forall>d\<in>s. (f d) fine p)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	865	unfolding fine_def by blast
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	866
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	867	lemma fine_union:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	868	"d fine p1 \<Longrightarrow> d fine p2 \<Longrightarrow> d fine (p1 \<union> p2)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	869	unfolding fine_def by blast
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	870
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	871	lemma fine_unions:"(\<And>p. p \<in> ps \<Longrightarrow> d fine p) \<Longrightarrow> d fine (\<Union>ps)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	872	unfolding fine_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	873
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	874	lemma fine_subset: "p \<subseteq> q \<Longrightarrow> d fine q \<Longrightarrow> d fine p"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	875	unfolding fine_def by blast
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	876
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	877	subsection {* Gauge integral. Define on compact intervals first, then use a limit. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	878
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	879	definition has_integral_compact_interval (infixr "has'_integral'_compact'_interval" 46) where
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	880	"(f has_integral_compact_interval y) i \<equiv>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	881	(\<forall>e>0. \<exists>d. gauge d \<and>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	882	(\<forall>p. p tagged_division_of i \<and> d fine p
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	883	\<longrightarrow> norm(setsum (\<lambda>(x,k). content k *\<^sub>R f x) p - y) < e))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	884
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	885	definition has_integral (infixr "has'_integral" 46) where
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	886	"((f::(real^'n \<Rightarrow> 'b::real_normed_vector)) has_integral y) i \<equiv>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	887	if (\<exists>a b. i = {a..b}) then (f has_integral_compact_interval y) i
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	888	else (\<forall>e>0. \<exists>B>0. \<forall>a b. ball 0 B \<subseteq> {a..b}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	889	\<longrightarrow> (\<exists>z. ((\<lambda>x. if x \<in> i then f x else 0) has_integral_compact_interval z) {a..b} \<and>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	890	norm(z - y) < e))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	891
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	892	lemma has_integral:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	893	"(f has_integral y) ({a..b}) \<longleftrightarrow>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	894	(\<forall>e>0. \<exists>d. gauge d \<and> (\<forall>p. p tagged_division_of {a..b} \<and> d fine p
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	895	\<longrightarrow> norm(setsum (\<lambda>(x,k). content(k) *\<^sub>R f x) p - y) < e))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	896	unfolding has_integral_def has_integral_compact_interval_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	897
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	898	lemma has_integralD[dest]: assumes
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	899	"(f has_integral y) ({a..b})" "e>0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	900	obtains d where "gauge d" "\<And>p. p tagged_division_of {a..b} \<Longrightarrow> d fine p
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	901	\<Longrightarrow> norm(setsum (\<lambda>(x,k). content(k) *\<^sub>R f(x)) p - y) < e"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	902	using assms unfolding has_integral by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	903
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	904	lemma has_integral_alt:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	905	"(f has_integral y) i \<longleftrightarrow>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	906	(if (\<exists>a b. i = {a..b}) then (f has_integral y) i
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	907	else (\<forall>e>0. \<exists>B>0. \<forall>a b. ball 0 B \<subseteq> {a..b}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	908	\<longrightarrow> (\<exists>z. ((\<lambda>x. if x \<in> i then f(x) else 0)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	909	has_integral z) ({a..b}) \<and>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	910	norm(z - y) < e)))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	911	unfolding has_integral unfolding has_integral_compact_interval_def has_integral_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	912
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	913	lemma has_integral_altD:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	914	assumes "(f has_integral y) i" "\<not> (\<exists>a b. i = {a..b})" "e>0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	915	obtains B where "B>0" "\<forall>a b. ball 0 B \<subseteq> {a..b}\<longrightarrow> (\<exists>z. ((\<lambda>x. if x \<in> i then f(x) else 0) has_integral z) ({a..b}) \<and> norm(z - y) < e)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	916	using assms unfolding has_integral unfolding has_integral_compact_interval_def has_integral_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	917
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	918	definition integrable_on (infixr "integrable'_on" 46) where
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	919	"(f integrable_on i) \<equiv> \<exists>y. (f has_integral y) i"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	920
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	921	definition "integral i f \<equiv> SOME y. (f has_integral y) i"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	922
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	923	lemma integrable_integral[dest]:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	924	"f integrable_on i \<Longrightarrow> (f has_integral (integral i f)) i"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	925	unfolding integrable_on_def integral_def by(rule someI_ex)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	926
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	927	lemma has_integral_integrable[intro]: "(f has_integral i) s \<Longrightarrow> f integrable_on s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	928	unfolding integrable_on_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	929
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	930	lemma has_integral_integral:"f integrable_on s \<longleftrightarrow> (f has_integral (integral s f)) s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	931	by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	932
35291 ead7bfc30b26 Support for one-dimensional integration in Multivariate-Analysis himmelma parents: 35173 diff changeset	933	lemma has_integral_vec1: assumes "(f has_integral k) {a..b}"
ead7bfc30b26 Support for one-dimensional integration in Multivariate-Analysis himmelma parents: 35173 diff changeset	934	shows "((\<lambda>x. vec1 (f x)) has_integral (vec1 k)) {a..b}"
ead7bfc30b26 Support for one-dimensional integration in Multivariate-Analysis himmelma parents: 35173 diff changeset	935	proof- have :"\<And>p. (\<Sum>(x, k)\<in>p. content k \<^sub>R vec1 (f x)) - vec1 k = vec1 ((\<Sum>(x, k)\<in>p. content k *\<^sub>R f x) - k)"
ead7bfc30b26 Support for one-dimensional integration in Multivariate-Analysis himmelma parents: 35173 diff changeset	936	unfolding vec_sub Cart_eq by(auto simp add:vec1_dest_vec1_simps split_beta)
ead7bfc30b26 Support for one-dimensional integration in Multivariate-Analysis himmelma parents: 35173 diff changeset	937	show ?thesis using assms unfolding has_integral apply safe
ead7bfc30b26 Support for one-dimensional integration in Multivariate-Analysis himmelma parents: 35173 diff changeset	938	apply(erule_tac x=e in allE,safe) apply(rule_tac x=d in exI,safe)
ead7bfc30b26 Support for one-dimensional integration in Multivariate-Analysis himmelma parents: 35173 diff changeset	939	apply(erule_tac x=p in allE,safe) unfolding * norm_vector_1 by auto qed
ead7bfc30b26 Support for one-dimensional integration in Multivariate-Analysis himmelma parents: 35173 diff changeset	940
35172 579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	941	lemma setsum_content_null:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	942	assumes "content({a..b}) = 0" "p tagged_division_of {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	943	shows "setsum (\<lambda>(x,k). content k *\<^sub>R f x) p = (0::'a::real_normed_vector)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	944	proof(rule setsum_0',rule) fix y assume y:"y\<in>p"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	945	obtain x k where xk:"y = (x,k)" using surj_pair[of y] by blast
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	946	note assm = tagged_division_ofD(3-4)[OF assms(2) y[unfolded xk]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	947	from this(2) guess c .. then guess d .. note c_d=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	948	have "(\<lambda>(x, k). content k \<^sub>R f x) y = content k \<^sub>R f x" unfolding xk by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	949	also have "\<dots> = 0" using content_subset[OF assm(1)[unfolded c_d]] content_pos_le[of c d]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	950	unfolding assms(1) c_d by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	951	finally show "(\<lambda>(x, k). content k *\<^sub>R f x) y = 0" .
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	952	qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	953
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	954	subsection {* Some basic combining lemmas. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	955
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	956	lemma tagged_division_unions_exists:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	957	assumes "finite iset" "\<forall>i \<in> iset. \<exists>p. p tagged_division_of i \<and> d fine p"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	958	"\<forall>i1\<in>iset. \<forall>i2\<in>iset. ~(i1 = i2) \<longrightarrow> (interior(i1) \<inter> interior(i2) = {})" "(\<Union>iset = i)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	959	obtains p where "p tagged_division_of i" "d fine p"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	960	proof- guess pfn using bchoice[OF assms(2)] .. note pfn = conjunctD2[OF this[rule_format]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	961	show thesis apply(rule_tac p="\<Union>(pfn ` iset)" in that) unfolding assms(4)[THEN sym]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	962	apply(rule tagged_division_unions[OF assms(1) _ assms(3)]) defer
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	963	apply(rule fine_unions) using pfn by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	964	qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	965
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	966	subsection {* The set we're concerned with must be closed. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	967
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	968	lemma division_of_closed: "s division_of i \<Longrightarrow> closed (i::(real^'n) set)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	969	unfolding division_of_def by(fastsimp intro!: closed_Union closed_interval)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	970
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	971	subsection {* General bisection principle for intervals; might be useful elsewhere. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	972
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	973	lemma interval_bisection_step:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	974	assumes "P {}" "(\<forall>s t. P s \<and> P t \<and> interior(s) \<inter> interior(t) = {} \<longrightarrow> P(s \<union> t))" "~(P {a..b::real^'n})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	975	obtains c d where "~(P{c..d})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	976	"\<forall>i. a$i \<le> c$i \<and> c$i \<le> d$i \<and> d$i \<le> b$i \<and> 2 * (d$i - c$i) \<le> b$i - a$i"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	977	proof- have "{a..b} \<noteq> {}" using assms(1,3) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	978	note ab=this[unfolded interval_eq_empty not_ex not_less]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	979	{ fix f have "finite f \<Longrightarrow>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	980	(\<forall>s\<in>f. P s) \<Longrightarrow>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	981	(\<forall>s\<in>f. \<exists>a b. s = {a..b}) \<Longrightarrow>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	982	(\<forall>s\<in>f.\<forall>t\<in>f. ~(s = t) \<longrightarrow> interior(s) \<inter> interior(t) = {}) \<Longrightarrow> P(\<Union>f)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	983	proof(induct f rule:finite_induct)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	984	case empty show ?case using assms(1) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	985	next case (insert x f) show ?case unfolding Union_insert apply(rule assms(2)[rule_format])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	986	apply rule defer apply rule defer apply(rule inter_interior_unions_intervals)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	987	using insert by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	988	qed } note * = this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	989	let ?A = "{{c..d} \| c d. \<forall>i. (c$i = a$i) \<and> (d$i = (a$i + b$i) / 2) \<or> (c$i = (a$i + b$i) / 2) \<and> (d$i = b$i)}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	990	let ?PP = "\<lambda>c d. \<forall>i. a$i \<le> c$i \<and> c$i \<le> d$i \<and> d$i \<le> b$i \<and> 2 * (d$i - c$i) \<le> b$i - a$i"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	991	{ presume "\<forall>c d. ?PP c d \<longrightarrow> P {c..d} \<Longrightarrow> False"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	992	thus thesis unfolding atomize_not not_all apply-apply(erule exE)+ apply(rule_tac c=x and d=xa in that) by auto }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	993	assume as:"\<forall>c d. ?PP c d \<longrightarrow> P {c..d}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	994	have "P (\<Union> ?A)" proof(rule *, rule_tac[2-] ballI, rule_tac[4] ballI, rule_tac[4] impI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	995	let ?B = "(\<lambda>s.{(\<chi> i. if i \<in> s then a$i else (a$i + b$i) / 2) ..
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	996	(\<chi> i. if i \<in> s then (a$i + b$i) / 2 else b$i)}) ` {s. s \<subseteq> UNIV}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	997	have "?A \<subseteq> ?B" proof case goal1
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	998	then guess c unfolding mem_Collect_eq .. then guess d apply- by(erule exE,(erule conjE)+) note c_d=this[rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	999	have *:"\<And>a b c d. a = c \<Longrightarrow> b = d \<Longrightarrow> {a..b} = {c..d}" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1000	show "x\<in>?B" unfolding image_iff apply(rule_tac x="{i. c$i = a$i}" in bexI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1001	unfolding c_d apply(rule * ) unfolding Cart_eq cond_component Cart_lambda_beta
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1002	proof(rule_tac[1-2] allI) fix i show "c $ i = (if i \<in> {i. c $ i = a $ i} then a $ i else (a $ i + b $ i) / 2)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1003	"d $ i = (if i \<in> {i. c $ i = a $ i} then (a $ i + b $ i) / 2 else b $ i)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1004	using c_d(2)[of i] ab[THEN spec[where x=i]] by(auto simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1005	qed auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1006	thus "finite ?A" apply(rule finite_subset[of _ ?B]) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1007	fix s assume "s\<in>?A" then guess c unfolding mem_Collect_eq .. then guess d apply- by(erule exE,(erule conjE)+)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1008	note c_d=this[rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1009	show "P s" unfolding c_d apply(rule as[rule_format]) proof- case goal1 show ?case
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1010	using c_d(2)[of i] using ab[THEN spec[where x=i]] by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1011	show "\<exists>a b. s = {a..b}" unfolding c_d by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1012	fix t assume "t\<in>?A" then guess e unfolding mem_Collect_eq .. then guess f apply- by(erule exE,(erule conjE)+)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1013	note e_f=this[rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1014	assume "s \<noteq> t" hence "\<not> (c = e \<and> d = f)" unfolding c_d e_f by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1015	then obtain i where "c$i \<noteq> e$i \<or> d$i \<noteq> f$i" unfolding de_Morgan_conj Cart_eq by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1016	hence i:"c$i \<noteq> e$i" "d$i \<noteq> f$i" apply- apply(erule_tac[!] disjE)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1017	proof- assume "c$i \<noteq> e$i" thus "d$i \<noteq> f$i" using c_d(2)[of i] e_f(2)[of i] by fastsimp
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1018	next assume "d$i \<noteq> f$i" thus "c$i \<noteq> e$i" using c_d(2)[of i] e_f(2)[of i] by fastsimp
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1019	qed have *:"\<And>s t. (\<And>a. a\<in>s \<Longrightarrow> a\<in>t \<Longrightarrow> False) \<Longrightarrow> s \<inter> t = {}" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1020	show "interior s \<inter> interior t = {}" unfolding e_f c_d interior_closed_interval proof(rule *)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1021	fix x assume "x\<in>{c<..<d}" "x\<in>{e<..<f}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1022	hence x:"c$i < d$i" "e$i < f$i" "c$i < f$i" "e$i < d$i" unfolding mem_interval apply-apply(erule_tac[!] x=i in allE)+ by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1023	show False using c_d(2)[of i] apply- apply(erule_tac disjE)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1024	proof(erule_tac[!] conjE) assume as:"c $ i = a $ i" "d $ i = (a $ i + b $ i) / 2"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1025	show False using e_f(2)[of i] and i x unfolding as by(fastsimp simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1026	next assume as:"c $ i = (a $ i + b $ i) / 2" "d $ i = b $ i"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1027	show False using e_f(2)[of i] and i x unfolding as by(fastsimp simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1028	qed qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1029	also have "\<Union> ?A = {a..b}" proof(rule set_ext,rule)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1030	fix x assume "x\<in>\<Union>?A" then guess Y unfolding Union_iff ..
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1031	from this(1) guess c unfolding mem_Collect_eq .. then guess d ..
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1032	note c_d = this[THEN conjunct2,rule_format] `x\<in>Y`[unfolded this[THEN conjunct1]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1033	show "x\<in>{a..b}" unfolding mem_interval proof
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1034	fix i show "a $ i \<le> x $ i \<and> x $ i \<le> b $ i"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1035	using c_d(1)[of i] c_d(2)[unfolded mem_interval,THEN spec[where x=i]] by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1036	next fix x assume x:"x\<in>{a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1037	have "\<forall>i. \<exists>c d. (c = a$i \<and> d = (a$i + b$i) / 2 \<or> c = (a$i + b$i) / 2 \<and> d = b$i) \<and> c\<le>x$i \<and> x$i \<le> d"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1038	(is "\<forall>i. \<exists>c d. ?P i c d") unfolding mem_interval proof fix i
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1039	have "?P i (a$i) ((a $ i + b $ i) / 2) \<or> ?P i ((a $ i + b $ i) / 2) (b$i)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1040	using x[unfolded mem_interval,THEN spec[where x=i]] by auto thus "\<exists>c d. ?P i c d" by blast
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1041	qed thus "x\<in>\<Union>?A" unfolding Union_iff lambda_skolem unfolding Bex_def mem_Collect_eq
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1042	apply-apply(erule exE)+ apply(rule_tac x="{xa..xaa}" in exI) unfolding mem_interval by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1043	qed finally show False using assms by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1044
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1045	lemma interval_bisection:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1046	assumes "P {}" "(\<forall>s t. P s \<and> P t \<and> interior(s) \<inter> interior(t) = {} \<longrightarrow> P(s \<union> t))" "\<not> P {a..b::real^'n}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1047	obtains x where "x \<in> {a..b}" "\<forall>e>0. \<exists>c d. x \<in> {c..d} \<and> {c..d} \<subseteq> ball x e \<and> {c..d} \<subseteq> {a..b} \<and> ~P({c..d})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1048	proof-
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1049	have "\<forall>x. \<exists>y. \<not> P {fst x..snd x} \<longrightarrow> (\<not> P {fst y..snd y} \<and> (\<forall>i. fst x$i \<le> fst y$i \<and> fst y$i \<le> snd y$i \<and> snd y$i \<le> snd x$i \<and>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1050	2 * (snd y$i - fst y$i) \<le> snd x$i - fst x$i))" proof case goal1 thus ?case proof-
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1051	presume "\<not> P {fst x..snd x} \<Longrightarrow> ?thesis"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1052	thus ?thesis apply(cases "P {fst x..snd x}") by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1053	next assume as:"\<not> P {fst x..snd x}" from interval_bisection_step[of P, OF assms(1-2) as] guess c d .
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1054	thus ?thesis apply- apply(rule_tac x="(c,d)" in exI) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1055	qed qed then guess f apply-apply(drule choice) by(erule exE) note f=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1056	def AB \<equiv> "\<lambda>n. (f ^^ n) (a,b)" def A \<equiv> "\<lambda>n. fst(AB n)" and B \<equiv> "\<lambda>n. snd(AB n)" note ab_def = this AB_def
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1057	have "A 0 = a" "B 0 = b" "\<And>n. \<not> P {A(Suc n)..B(Suc n)} \<and>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1058	(\<forall>i. A(n)$i \<le> A(Suc n)$i \<and> A(Suc n)$i \<le> B(Suc n)$i \<and> B(Suc n)$i \<le> B(n)$i \<and>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1059	2 * (B(Suc n)$i - A(Suc n)$i) \<le> B(n)$i - A(n)$i)" (is "\<And>n. ?P n")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1060	proof- show "A 0 = a" "B 0 = b" unfolding ab_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1061	case goal3 note S = ab_def funpow.simps o_def id_apply show ?case
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1062	proof(induct n) case 0 thus ?case unfolding S apply(rule f[rule_format]) using assms(3) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1063	next case (Suc n) show ?case unfolding S apply(rule f[rule_format]) using Suc unfolding S by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1064	qed qed note AB = this(1-2) conjunctD2[OF this(3),rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1065
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1066	have interv:"\<And>e. 0 < e \<Longrightarrow> \<exists>n. \<forall>x\<in>{A n..B n}. \<forall>y\<in>{A n..B n}. dist x y < e"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1067	proof- case goal1 guess n using real_arch_pow2[of "(setsum (\<lambda>i. b$i - a$i) UNIV) / e"] .. note n=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1068	show ?case apply(rule_tac x=n in exI) proof(rule,rule)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1069	fix x y assume xy:"x\<in>{A n..B n}" "y\<in>{A n..B n}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1070	have "dist x y \<le> setsum (\<lambda>i. abs((x - y)$i)) UNIV" unfolding vector_dist_norm by(rule norm_le_l1)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1071	also have "\<dots> \<le> setsum (\<lambda>i. B n$i - A n$i) UNIV"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1072	proof(rule setsum_mono) fix i show "\<bar>(x - y) $ i\<bar> \<le> B n $ i - A n $ i"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1073	using xy[unfolded mem_interval,THEN spec[where x=i]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1074	unfolding vector_minus_component by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1075	also have "\<dots> \<le> setsum (\<lambda>i. b$i - a$i) UNIV / 2^n" unfolding setsum_divide_distrib
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1076	proof(rule setsum_mono) case goal1 thus ?case
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1077	proof(induct n) case 0 thus ?case unfolding AB by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1078	next case (Suc n) have "B (Suc n) $ i - A (Suc n) $ i \<le> (B n $ i - A n $ i) / 2" using AB(4)[of n i] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1079	also have "\<dots> \<le> (b $ i - a $ i) / 2 ^ Suc n" using Suc by(auto simp add:field_simps) finally show ?case .
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1080	qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1081	also have "\<dots> < e" using n using goal1 by(auto simp add:field_simps) finally show "dist x y < e" .
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1082	qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1083	{ fix n m ::nat assume "m \<le> n" then guess d unfolding le_Suc_ex_iff .. note d=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1084	have "{A n..B n} \<subseteq> {A m..B m}" unfolding d
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1085	proof(induct d) case 0 thus ?case by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1086	next case (Suc d) show ?case apply(rule subset_trans[OF _ Suc])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1087	apply(rule) unfolding mem_interval apply(rule,erule_tac x=i in allE)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1088	proof- case goal1 thus ?case using AB(4)[of "m + d" i] by(auto simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1089	qed qed } note ABsubset = this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1090	have "\<exists>a. \<forall>n. a\<in>{A n..B n}" apply(rule decreasing_closed_nest[rule_format,OF closed_interval _ ABsubset interv])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1091	proof- fix n show "{A n..B n} \<noteq> {}" apply(cases "0<n") using AB(3)[of "n - 1"] assms(1,3) AB(1-2) by auto qed auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1092	then guess x0 .. note x0=this[rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1093	show thesis proof(rule that[rule_format,of x0])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1094	show "x0\<in>{a..b}" using x0[of 0] unfolding AB .
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1095	fix e assume "0 < (e::real)" from interv[OF this] guess n .. note n=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1096	show "\<exists>c d. x0 \<in> {c..d} \<and> {c..d} \<subseteq> ball x0 e \<and> {c..d} \<subseteq> {a..b} \<and> \<not> P {c..d}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1097	apply(rule_tac x="A n" in exI,rule_tac x="B n" in exI) apply(rule,rule x0) apply rule defer
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1098	proof show "\<not> P {A n..B n}" apply(cases "0<n") using AB(3)[of "n - 1"] assms(3) AB(1-2) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1099	show "{A n..B n} \<subseteq> ball x0 e" using n using x0[of n] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1100	show "{A n..B n} \<subseteq> {a..b}" unfolding AB(1-2)[symmetric] apply(rule ABsubset) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1101	qed qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1102
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1103	subsection {* Cousin's lemma. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1104
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1105	lemma fine_division_exists: assumes "gauge g"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1106	obtains p where "p tagged_division_of {a..b::real^'n}" "g fine p"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1107	proof- presume "\<not> (\<exists>p. p tagged_division_of {a..b} \<and> g fine p) \<Longrightarrow> False"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1108	then guess p unfolding atomize_not not_not .. thus thesis apply-apply(rule that[of p]) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1109	next assume as:"\<not> (\<exists>p. p tagged_division_of {a..b} \<and> g fine p)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1110	guess x apply(rule interval_bisection[of "\<lambda>s. \<exists>p. p tagged_division_of s \<and> g fine p",rule_format,OF _ _ as])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1111	apply(rule_tac x="{}" in exI) defer apply(erule conjE exE)+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1112	proof- show "{} tagged_division_of {} \<and> g fine {}" unfolding fine_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1113	fix s t p p' assume "p tagged_division_of s" "g fine p" "p' tagged_division_of t" "g fine p'" "interior s \<inter> interior t = {}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1114	thus "\<exists>p. p tagged_division_of s \<union> t \<and> g fine p" apply-apply(rule_tac x="p \<union> p'" in exI) apply rule
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1115	apply(rule tagged_division_union) prefer 4 apply(rule fine_union) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1116	qed note x=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1117	obtain e where e:"e>0" "ball x e \<subseteq> g x" using gaugeD[OF assms, of x] unfolding open_contains_ball by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1118	from x(2)[OF e(1)] guess c d apply-apply(erule exE conjE)+ . note c_d = this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1119	have "g fine {(x, {c..d})}" unfolding fine_def using e using c_d(2) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1120	thus False using tagged_division_of_self[OF c_d(1)] using c_d by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1121
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1122	subsection {* Basic theorems about integrals. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1123
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1124	lemma has_integral_unique: fixes f::"real^'n \<Rightarrow> 'a::real_normed_vector"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1125	assumes "(f has_integral k1) i" "(f has_integral k2) i" shows "k1 = k2"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1126	proof(rule ccontr) let ?e = "norm(k1 - k2) / 2" assume as:"k1 \<noteq> k2" hence e:"?e > 0" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1127	have lem:"\<And>f::real^'n \<Rightarrow> 'a. \<And> a b k1 k2.
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1128	(f has_integral k1) ({a..b}) \<Longrightarrow> (f has_integral k2) ({a..b}) \<Longrightarrow> k1 \<noteq> k2 \<Longrightarrow> False"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1129	proof- case goal1 let ?e = "norm(k1 - k2) / 2" from goal1(3) have e:"?e > 0" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1130	guess d1 by(rule has_integralD[OF goal1(1) e]) note d1=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1131	guess d2 by(rule has_integralD[OF goal1(2) e]) note d2=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1132	guess p by(rule fine_division_exists[OF gauge_inter[OF d1(1) d2(1)],of a b]) note p=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1133	let ?c = "(\<Sum>(x, k)\<in>p. content k *\<^sub>R f x)" have "norm (k1 - k2) \<le> norm (?c - k2) + norm (?c - k1)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1134	using norm_triangle_ineq4[of "k1 - ?c" "k2 - ?c"] by(auto simp add:group_simps norm_minus_commute)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1135	also have "\<dots> < norm (k1 - k2) / 2 + norm (k1 - k2) / 2"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1136	apply(rule add_strict_mono) apply(rule_tac[!] d2(2) d1(2)) using p unfolding fine_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1137	finally show False by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1138	qed { presume "\<not> (\<exists>a b. i = {a..b}) \<Longrightarrow> False"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1139	thus False apply-apply(cases "\<exists>a b. i = {a..b}")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1140	using assms by(auto simp add:has_integral intro:lem[OF _ _ as]) }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1141	assume as:"\<not> (\<exists>a b. i = {a..b})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1142	guess B1 by(rule has_integral_altD[OF assms(1) as,OF e]) note B1=this[rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1143	guess B2 by(rule has_integral_altD[OF assms(2) as,OF e]) note B2=this[rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1144	have "\<exists>a b::real^'n. ball 0 B1 \<union> ball 0 B2 \<subseteq> {a..b}" apply(rule bounded_subset_closed_interval)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1145	using bounded_Un bounded_ball by auto then guess a b apply-by(erule exE)+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1146	note ab=conjunctD2[OF this[unfolded Un_subset_iff]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1147	guess w using B1(2)[OF ab(1)] .. note w=conjunctD2[OF this]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1148	guess z using B2(2)[OF ab(2)] .. note z=conjunctD2[OF this]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1149	have "z = w" using lem[OF w(1) z(1)] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1150	hence "norm (k1 - k2) \<le> norm (z - k2) + norm (w - k1)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1151	using norm_triangle_ineq4[of "k1 - w" "k2 - z"] by(auto simp add: norm_minus_commute)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1152	also have "\<dots> < norm (k1 - k2) / 2 + norm (k1 - k2) / 2" apply(rule add_strict_mono) by(rule_tac[!] z(2) w(2))
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1153	finally show False by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1154
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1155	lemma integral_unique[intro]:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1156	"(f has_integral y) k \<Longrightarrow> integral k f = y"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1157	unfolding integral_def apply(rule some_equality) by(auto intro: has_integral_unique)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1158
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1159	lemma has_integral_is_0: fixes f::"real^'n \<Rightarrow> 'a::real_normed_vector"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1160	assumes "\<forall>x\<in>s. f x = 0" shows "(f has_integral 0) s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1161	proof- have lem:"\<And>a b. \<And>f::real^'n \<Rightarrow> 'a.
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1162	(\<forall>x\<in>{a..b}. f(x) = 0) \<Longrightarrow> (f has_integral 0) ({a..b})" unfolding has_integral
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1163	proof(rule,rule) fix a b e and f::"real^'n \<Rightarrow> 'a"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1164	assume as:"\<forall>x\<in>{a..b}. f x = 0" "0 < (e::real)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1165	show "\<exists>d. gauge d \<and> (\<forall>p. p tagged_division_of {a..b} \<and> d fine p \<longrightarrow> norm ((\<Sum>(x, k)\<in>p. content k *\<^sub>R f x) - 0) < e)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1166	apply(rule_tac x="\<lambda>x. ball x 1" in exI) apply(rule,rule gaugeI) unfolding centre_in_ball defer apply(rule open_ball)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1167	proof(rule,rule,erule conjE) case goal1
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1168	have "(\<Sum>(x, k)\<in>p. content k *\<^sub>R f x) = 0" proof(rule setsum_0',rule)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1169	fix x assume x:"x\<in>p" have "f (fst x) = 0" using tagged_division_ofD(2-3)[OF goal1(1), of "fst x" "snd x"] using as x by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1170	thus "(\<lambda>(x, k). content k *\<^sub>R f x) x = 0" apply(subst surjective_pairing[of x]) unfolding split_conv by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1171	qed thus ?case using as by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1172	qed auto qed { presume "\<not> (\<exists>a b. s = {a..b}) \<Longrightarrow> ?thesis"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1173	thus ?thesis apply-apply(cases "\<exists>a b. s = {a..b}")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1174	using assms by(auto simp add:has_integral intro:lem) }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1175	have *:"(\<lambda>x. if x \<in> s then f x else 0) = (\<lambda>x. 0)" apply(rule ext) using assms by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1176	assume "\<not> (\<exists>a b. s = {a..b})" thus ?thesis apply(subst has_integral_alt) unfolding if_not_P *
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1177	apply(rule,rule,rule_tac x=1 in exI,rule) defer apply(rule,rule,rule)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1178	proof- fix e::real and a b assume "e>0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1179	thus "\<exists>z. ((\<lambda>x::real^'n. 0::'a) has_integral z) {a..b} \<and> norm (z - 0) < e"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1180	apply(rule_tac x=0 in exI) apply(rule,rule lem) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1181	qed auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1182
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1183	lemma has_integral_0[simp]: "((\<lambda>x::real^'n. 0) has_integral 0) s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1184	apply(rule has_integral_is_0) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1185
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1186	lemma has_integral_0_eq[simp]: "((\<lambda>x. 0) has_integral i) s \<longleftrightarrow> i = 0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1187	using has_integral_unique[OF has_integral_0] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1188
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1189	lemma has_integral_linear: fixes f::"real^'n \<Rightarrow> 'a::real_normed_vector"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1190	assumes "(f has_integral y) s" "bounded_linear h" shows "((h o f) has_integral ((h y))) s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1191	proof- interpret bounded_linear h using assms(2) . from pos_bounded guess B .. note B=conjunctD2[OF this,rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1192	have lem:"\<And>f::real^'n \<Rightarrow> 'a. \<And> y a b.
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1193	(f has_integral y) ({a..b}) \<Longrightarrow> ((h o f) has_integral h(y)) ({a..b})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1194	proof(subst has_integral,rule,rule) case goal1
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1195	from pos_bounded guess B .. note B=conjunctD2[OF this,rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1196	have *:"e / B > 0" apply(rule divide_pos_pos) using goal1(2) B by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1197	guess g using has_integralD[OF goal1(1) *] . note g=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1198	show ?case apply(rule_tac x=g in exI) apply(rule,rule g(1))
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1199	proof(rule,rule,erule conjE) fix p assume as:"p tagged_division_of {a..b}" "g fine p"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1200	have :"\<And>x k. h ((\<lambda>(x, k). content k \<^sub>R f x) x) = (\<lambda>(x, k). h (content k *\<^sub>R f x)) x" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1201	have "(\<Sum>(x, k)\<in>p. content k \<^sub>R (h \<circ> f) x) = setsum (h \<circ> (\<lambda>(x, k). content k \<^sub>R f x)) p"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1202	unfolding o_def unfolding scaleR[THEN sym] * by simp
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1203	also have "\<dots> = h (\<Sum>(x, k)\<in>p. content k \<^sub>R f x)" using setsum[of "\<lambda>(x,k). content k \<^sub>R f x" p] using as by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1204	finally have :"(\<Sum>(x, k)\<in>p. content k \<^sub>R (h \<circ> f) x) = h (\<Sum>(x, k)\<in>p. content k *\<^sub>R f x)" .
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1205	show "norm ((\<Sum>(x, k)\<in>p. content k \<^sub>R (h \<circ> f) x) - h y) < e" unfolding diff[THEN sym]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1206	apply(rule le_less_trans[OF B(2)]) using g(2)[OF as] B(1) by(auto simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1207	qed qed { presume "\<not> (\<exists>a b. s = {a..b}) \<Longrightarrow> ?thesis"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1208	thus ?thesis apply-apply(cases "\<exists>a b. s = {a..b}") using assms by(auto simp add:has_integral intro!:lem) }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1209	assume as:"\<not> (\<exists>a b. s = {a..b})" thus ?thesis apply(subst has_integral_alt) unfolding if_not_P
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1210	proof(rule,rule) fix e::real assume e:"0<e"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1211	have *:"0 < e/B" by(rule divide_pos_pos,rule e,rule B(1))
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1212	guess M using has_integral_altD[OF assms(1) as *,rule_format] . note M=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1213	show "\<exists>B>0. \<forall>a b. ball 0 B \<subseteq> {a..b} \<longrightarrow> (\<exists>z. ((\<lambda>x. if x \<in> s then (h \<circ> f) x else 0) has_integral z) {a..b} \<and> norm (z - h y) < e)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1214	apply(rule_tac x=M in exI) apply(rule,rule M(1))
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1215	proof(rule,rule,rule) case goal1 guess z using M(2)[OF goal1(1)] .. note z=conjunctD2[OF this]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1216	have *:"(\<lambda>x. if x \<in> s then (h \<circ> f) x else 0) = h \<circ> (\<lambda>x. if x \<in> s then f x else 0)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1217	unfolding o_def apply(rule ext) using zero by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1218	show ?case apply(rule_tac x="h z" in exI,rule) unfolding * apply(rule lem[OF z(1)]) unfolding diff[THEN sym]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1219	apply(rule le_less_trans[OF B(2)]) using B(1) z(2) by(auto simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1220	qed qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1221
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1222	lemma has_integral_cmul:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1223	shows "(f has_integral k) s \<Longrightarrow> ((\<lambda>x. c \<^sub>R f x) has_integral (c \<^sub>R k)) s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1224	unfolding o_def[THEN sym] apply(rule has_integral_linear,assumption)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1225	by(rule scaleR.bounded_linear_right)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1226
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1227	lemma has_integral_neg:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1228	shows "(f has_integral k) s \<Longrightarrow> ((\<lambda>x. -(f x)) has_integral (-k)) s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1229	apply(drule_tac c="-1" in has_integral_cmul) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1230
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1231	lemma has_integral_add: fixes f::"real^'n \<Rightarrow> 'a::real_normed_vector"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1232	assumes "(f has_integral k) s" "(g has_integral l) s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1233	shows "((\<lambda>x. f x + g x) has_integral (k + l)) s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1234	proof- have lem:"\<And>f g::real^'n \<Rightarrow> 'a. \<And>a b k l.
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1235	(f has_integral k) ({a..b}) \<Longrightarrow> (g has_integral l) ({a..b}) \<Longrightarrow>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1236	((\<lambda>x. f(x) + g(x)) has_integral (k + l)) ({a..b})" proof- case goal1
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1237	show ?case unfolding has_integral proof(rule,rule) fix e::real assume e:"e>0" hence *:"e/2>0" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1238	guess d1 using has_integralD[OF goal1(1) *] . note d1=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1239	guess d2 using has_integralD[OF goal1(2) *] . note d2=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1240	show "\<exists>d. gauge d \<and> (\<forall>p. p tagged_division_of {a..b} \<and> d fine p \<longrightarrow> norm ((\<Sum>(x, k)\<in>p. content k *\<^sub>R (f x + g x)) - (k + l)) < e)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1241	apply(rule_tac x="\<lambda>x. (d1 x) \<inter> (d2 x)" in exI) apply(rule,rule gauge_inter[OF d1(1) d2(1)])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1242	proof(rule,rule,erule conjE) fix p assume as:"p tagged_division_of {a..b}" "(\<lambda>x. d1 x \<inter> d2 x) fine p"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1243	have :"(\<Sum>(x, k)\<in>p. content k \<^sub>R (f x + g x)) = (\<Sum>(x, k)\<in>p. content k \<^sub>R f x) + (\<Sum>(x, k)\<in>p. content k \<^sub>R g x)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1244	unfolding scaleR_right_distrib setsum_addf[of "\<lambda>(x,k). content k \<^sub>R f x" "\<lambda>(x,k). content k \<^sub>R g x" p,THEN sym]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1245	by(rule setsum_cong2,auto)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1246	have "norm ((\<Sum>(x, k)\<in>p. content k \<^sub>R (f x + g x)) - (k + l)) = norm (((\<Sum>(x, k)\<in>p. content k \<^sub>R f x) - k) + ((\<Sum>(x, k)\<in>p. content k *\<^sub>R g x) - l))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1247	unfolding * by(auto simp add:group_simps) also let ?res = "\<dots>"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1248	from as have *:"d1 fine p" "d2 fine p" unfolding fine_inter by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1249	have "?res < e/2 + e/2" apply(rule le_less_trans[OF norm_triangle_ineq])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1250	apply(rule add_strict_mono) using d1(2)[OF as(1) (1)] and d2(2)[OF as(1) (2)] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1251	finally show "norm ((\<Sum>(x, k)\<in>p. content k *\<^sub>R (f x + g x)) - (k + l)) < e" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1252	qed qed qed { presume "\<not> (\<exists>a b. s = {a..b}) \<Longrightarrow> ?thesis"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1253	thus ?thesis apply-apply(cases "\<exists>a b. s = {a..b}") using assms by(auto simp add:has_integral intro!:lem) }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1254	assume as:"\<not> (\<exists>a b. s = {a..b})" thus ?thesis apply(subst has_integral_alt) unfolding if_not_P
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1255	proof(rule,rule) case goal1 hence *:"e/2 > 0" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1256	from has_integral_altD[OF assms(1) as *] guess B1 . note B1=this[rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1257	from has_integral_altD[OF assms(2) as *] guess B2 . note B2=this[rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1258	show ?case apply(rule_tac x="max B1 B2" in exI) apply(rule,rule min_max.less_supI1,rule B1)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1259	proof(rule,rule,rule) fix a b assume "ball 0 (max B1 B2) \<subseteq> {a..b::real^'n}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1260	hence *:"ball 0 B1 \<subseteq> {a..b::real^'n}" "ball 0 B2 \<subseteq> {a..b::real^'n}" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1261	guess w using B1(2)[OF *(1)] .. note w=conjunctD2[OF this]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1262	guess z using B2(2)[OF *(2)] .. note z=conjunctD2[OF this]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1263	have *:"\<And>x. (if x \<in> s then f x + g x else 0) = (if x \<in> s then f x else 0) + (if x \<in> s then g x else 0)" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1264	show "\<exists>z. ((\<lambda>x. if x \<in> s then f x + g x else 0) has_integral z) {a..b} \<and> norm (z - (k + l)) < e"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1265	apply(rule_tac x="w + z" in exI) apply(rule,rule lem[OF w(1) z(1), unfolded *[THEN sym]])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1266	using norm_triangle_ineq[of "w - k" "z - l"] w(2) z(2) by(auto simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1267	qed qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1268
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1269	lemma has_integral_sub:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1270	shows "(f has_integral k) s \<Longrightarrow> (g has_integral l) s \<Longrightarrow> ((\<lambda>x. f(x) - g(x)) has_integral (k - l)) s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1271	using has_integral_add[OF _ has_integral_neg,of f k s g l] unfolding group_simps by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1272
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1273	lemma integral_0: "integral s (\<lambda>x::real^'n. 0::real^'m) = 0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1274	by(rule integral_unique has_integral_0)+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1275
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1276	lemma integral_add:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1277	shows "f integrable_on s \<Longrightarrow> g integrable_on s \<Longrightarrow>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1278	integral s (\<lambda>x. f x + g x) = integral s f + integral s g"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1279	apply(rule integral_unique) apply(drule integrable_integral)+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1280	apply(rule has_integral_add) by assumption+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1281
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1282	lemma integral_cmul:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1283	shows "f integrable_on s \<Longrightarrow> integral s (\<lambda>x. c \<^sub>R f x) = c \<^sub>R integral s f"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1284	apply(rule integral_unique) apply(drule integrable_integral)+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1285	apply(rule has_integral_cmul) by assumption+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1286
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1287	lemma integral_neg:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1288	shows "f integrable_on s \<Longrightarrow> integral s (\<lambda>x. - f x) = - integral s f"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1289	apply(rule integral_unique) apply(drule integrable_integral)+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1290	apply(rule has_integral_neg) by assumption+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1291
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1292	lemma integral_sub:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1293	shows "f integrable_on s \<Longrightarrow> g integrable_on s \<Longrightarrow> integral s (\<lambda>x. f x - g x) = integral s f - integral s g"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1294	apply(rule integral_unique) apply(drule integrable_integral)+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1295	apply(rule has_integral_sub) by assumption+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1296
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1297	lemma integrable_0: "(\<lambda>x. 0) integrable_on s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1298	unfolding integrable_on_def using has_integral_0 by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1299
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1300	lemma integrable_add:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1301	shows "f integrable_on s \<Longrightarrow> g integrable_on s \<Longrightarrow> (\<lambda>x. f x + g x) integrable_on s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1302	unfolding integrable_on_def by(auto intro: has_integral_add)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1303
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1304	lemma integrable_cmul:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1305	shows "f integrable_on s \<Longrightarrow> (\<lambda>x. c *\<^sub>R f(x)) integrable_on s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1306	unfolding integrable_on_def by(auto intro: has_integral_cmul)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1307
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1308	lemma integrable_neg:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1309	shows "f integrable_on s \<Longrightarrow> (\<lambda>x. -f(x)) integrable_on s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1310	unfolding integrable_on_def by(auto intro: has_integral_neg)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1311
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1312	lemma integrable_sub:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1313	shows "f integrable_on s \<Longrightarrow> g integrable_on s \<Longrightarrow> (\<lambda>x. f x - g x) integrable_on s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1314	unfolding integrable_on_def by(auto intro: has_integral_sub)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1315
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1316	lemma integrable_linear:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1317	shows "f integrable_on s \<Longrightarrow> bounded_linear h \<Longrightarrow> (h o f) integrable_on s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1318	unfolding integrable_on_def by(auto intro: has_integral_linear)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1319
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1320	lemma integral_linear:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1321	shows "f integrable_on s \<Longrightarrow> bounded_linear h \<Longrightarrow> integral s (h o f) = h(integral s f)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1322	apply(rule has_integral_unique) defer unfolding has_integral_integral
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1323	apply(drule has_integral_linear,assumption,assumption) unfolding has_integral_integral[THEN sym]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1324	apply(rule integrable_linear) by assumption+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1325
36243 027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	1326	lemma integral_component_eq[simp]: fixes f::"real^'n \<Rightarrow> real^'m"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	1327	assumes "f integrable_on s" shows "integral s (\<lambda>x. f x $ k) = integral s f $ k"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	1328	using integral_linear[OF assms(1) bounded_linear_component,unfolded o_def] .
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	1329
35172 579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1330	lemma has_integral_setsum:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1331	assumes "finite t" "\<forall>a\<in>t. ((f a) has_integral (i a)) s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1332	shows "((\<lambda>x. setsum (\<lambda>a. f a x) t) has_integral (setsum i t)) s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1333	proof(insert assms(1) subset_refl[of t],induct rule:finite_subset_induct)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1334	case (insert x F) show ?case unfolding setsum_insert[OF insert(1,3)]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1335	apply(rule has_integral_add) using insert assms by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1336	qed auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1337
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1338	lemma integral_setsum:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1339	shows "finite t \<Longrightarrow> \<forall>a\<in>t. (f a) integrable_on s \<Longrightarrow>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1340	integral s (\<lambda>x. setsum (\<lambda>a. f a x) t) = setsum (\<lambda>a. integral s (f a)) t"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1341	apply(rule integral_unique) apply(rule has_integral_setsum)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1342	using integrable_integral by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1343
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1344	lemma integrable_setsum:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1345	shows "finite t \<Longrightarrow> \<forall>a \<in> t.(f a) integrable_on s \<Longrightarrow> (\<lambda>x. setsum (\<lambda>a. f a x) t) integrable_on s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1346	unfolding integrable_on_def apply(drule bchoice) using has_integral_setsum[of t] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1347
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1348	lemma has_integral_eq:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1349	assumes "\<forall>x\<in>s. f x = g x" "(f has_integral k) s" shows "(g has_integral k) s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1350	using has_integral_sub[OF assms(2), of "\<lambda>x. f x - g x" 0]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1351	using has_integral_is_0[of s "\<lambda>x. f x - g x"] using assms(1) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1352
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1353	lemma integrable_eq:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1354	shows "\<forall>x\<in>s. f x = g x \<Longrightarrow> f integrable_on s \<Longrightarrow> g integrable_on s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1355	unfolding integrable_on_def using has_integral_eq[of s f g] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1356
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1357	lemma has_integral_eq_eq:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1358	shows "\<forall>x\<in>s. f x = g x \<Longrightarrow> ((f has_integral k) s \<longleftrightarrow> (g has_integral k) s)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1359	using has_integral_eq[of s f g] has_integral_eq[of s g f] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1360
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1361	lemma has_integral_null[dest]:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1362	assumes "content({a..b}) = 0" shows "(f has_integral 0) ({a..b})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1363	unfolding has_integral apply(rule,rule,rule_tac x="\<lambda>x. ball x 1" in exI,rule) defer
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1364	proof(rule,rule,erule conjE) fix e::real assume e:"e>0" thus "gauge (\<lambda>x. ball x 1)" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1365	fix p assume p:"p tagged_division_of {a..b}" ("(\<lambda>x. ball x 1) fine p")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1366	have "norm ((\<Sum>(x, k)\<in>p. content k *\<^sub>R f x) - 0) = 0" unfolding norm_eq_zero diff_0_right
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1367	using setsum_content_null[OF assms(1) p, of f] .
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1368	thus "norm ((\<Sum>(x, k)\<in>p. content k *\<^sub>R f x) - 0) < e" using e by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1369
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1370	lemma has_integral_null_eq[simp]:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1371	shows "content({a..b}) = 0 \<Longrightarrow> ((f has_integral i) ({a..b}) \<longleftrightarrow> i = 0)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1372	apply rule apply(rule has_integral_unique,assumption)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1373	apply(drule has_integral_null,assumption)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1374	apply(drule has_integral_null) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1375
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1376	lemma integral_null[dest]: shows "content({a..b}) = 0 \<Longrightarrow> integral({a..b}) f = 0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1377	by(rule integral_unique,drule has_integral_null)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1378
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1379	lemma integrable_on_null[dest]: shows "content({a..b}) = 0 \<Longrightarrow> f integrable_on {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1380	unfolding integrable_on_def apply(drule has_integral_null) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1381
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1382	lemma has_integral_empty[intro]: shows "(f has_integral 0) {}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1383	unfolding empty_as_interval apply(rule has_integral_null)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1384	using content_empty unfolding empty_as_interval .
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1385
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1386	lemma has_integral_empty_eq[simp]: shows "(f has_integral i) {} \<longleftrightarrow> i = 0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1387	apply(rule,rule has_integral_unique,assumption) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1388
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1389	lemma integrable_on_empty[intro]: shows "f integrable_on {}" unfolding integrable_on_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1390
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1391	lemma integral_empty[simp]: shows "integral {} f = 0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1392	apply(rule integral_unique) using has_integral_empty .
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1393
35540 3d073a3e1c61 the ordering on real^1 is linear himmelma parents: 35292 diff changeset	1394	lemma has_integral_refl[intro]: shows "(f has_integral 0) {a..a}" "(f has_integral 0) {a}"
3d073a3e1c61 the ordering on real^1 is linear himmelma parents: 35292 diff changeset	1395	proof- have *:"{a} = {a..a}" apply(rule set_ext) unfolding mem_interval singleton_iff Cart_eq
3d073a3e1c61 the ordering on real^1 is linear himmelma parents: 35292 diff changeset	1396	apply safe prefer 3 apply(erule_tac x=i in allE) by(auto simp add: field_simps)
3d073a3e1c61 the ordering on real^1 is linear himmelma parents: 35292 diff changeset	1397	show "(f has_integral 0) {a..a}" "(f has_integral 0) {a}" unfolding *
3d073a3e1c61 the ordering on real^1 is linear himmelma parents: 35292 diff changeset	1398	apply(rule_tac[!] has_integral_null) unfolding content_eq_0_interior
3d073a3e1c61 the ordering on real^1 is linear himmelma parents: 35292 diff changeset	1399	unfolding interior_closed_interval using interval_sing by auto qed
35172 579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1400
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1401	lemma integrable_on_refl[intro]: shows "f integrable_on {a..a}" unfolding integrable_on_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1402
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1403	lemma integral_refl: shows "integral {a..a} f = 0" apply(rule integral_unique) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1404
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1405	subsection {* Cauchy-type criterion for integrability. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1406
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1407	lemma integrable_cauchy: fixes f::"real^'n \<Rightarrow> 'a::{real_normed_vector,complete_space}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1408	shows "f integrable_on {a..b} \<longleftrightarrow>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1409	(\<forall>e>0.\<exists>d. gauge d \<and> (\<forall>p1 p2. p1 tagged_division_of {a..b} \<and> d fine p1 \<and>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1410	p2 tagged_division_of {a..b} \<and> d fine p2
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1411	\<longrightarrow> norm(setsum (\<lambda>(x,k). content k *\<^sub>R f x) p1 -
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1412	setsum (\<lambda>(x,k). content k *\<^sub>R f x) p2) < e))" (is "?l = (\<forall>e>0. \<exists>d. ?P e d)")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1413	proof assume ?l
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1414	then guess y unfolding integrable_on_def has_integral .. note y=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1415	show "\<forall>e>0. \<exists>d. ?P e d" proof(rule,rule) case goal1 hence "e/2 > 0" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1416	then guess d apply- apply(drule y[rule_format]) by(erule exE,erule conjE) note d=this[rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1417	show ?case apply(rule_tac x=d in exI,rule,rule d) apply(rule,rule,rule,(erule conjE)+)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1418	proof- fix p1 p2 assume as:"p1 tagged_division_of {a..b}" "d fine p1" "p2 tagged_division_of {a..b}" "d fine p2"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1419	show "norm ((\<Sum>(x, k)\<in>p1. content k \<^sub>R f x) - (\<Sum>(x, k)\<in>p2. content k \<^sub>R f x)) < e"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1420	apply(rule dist_triangle_half_l[where y=y,unfolded vector_dist_norm])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1421	using d(2)[OF conjI[OF as(1-2)]] d(2)[OF conjI[OF as(3-4)]] .
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1422	qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1423	next assume "\<forall>e>0. \<exists>d. ?P e d" hence "\<forall>n::nat. \<exists>d. ?P (inverse(real (n + 1))) d" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1424	from choice[OF this] guess d .. note d=conjunctD2[OF this[rule_format],rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1425	have "\<And>n. gauge (\<lambda>x. \<Inter>{d i x \|i. i \<in> {0..n}})" apply(rule gauge_inters) using d(1) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1426	hence "\<forall>n. \<exists>p. p tagged_division_of {a..b} \<and> (\<lambda>x. \<Inter>{d i x \|i. i \<in> {0..n}}) fine p" apply-
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1427	proof case goal1 from this[of n] show ?case apply(drule_tac fine_division_exists) by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1428	from choice[OF this] guess p .. note p = conjunctD2[OF this[rule_format]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1429	have dp:"\<And>i n. i\<le>n \<Longrightarrow> d i fine p n" using p(2) unfolding fine_inters by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1430	have "Cauchy (\<lambda>n. setsum (\<lambda>(x,k). content k *\<^sub>R (f x)) (p n))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1431	proof(rule CauchyI) case goal1 then guess N unfolding real_arch_inv[of e] .. note N=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1432	show ?case apply(rule_tac x=N in exI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1433	proof(rule,rule,rule,rule) fix m n assume mn:"N \<le> m" "N \<le> n" have *:"N = (N - 1) + 1" using N by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1434	show "norm ((\<Sum>(x, k)\<in>p m. content k \<^sub>R f x) - (\<Sum>(x, k)\<in>p n. content k \<^sub>R f x)) < e"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1435	apply(rule less_trans[OF _ N[THEN conjunct2,THEN conjunct2]]) apply(subst *) apply(rule d(2))
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1436	using dp p(1) using mn by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1437	qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1438	then guess y unfolding convergent_eq_cauchy[THEN sym] .. note y=this[unfolded Lim_sequentially,rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1439	show ?l unfolding integrable_on_def has_integral apply(rule_tac x=y in exI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1440	proof(rule,rule) fix e::real assume "e>0" hence *:"e/2 > 0" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1441	then guess N1 unfolding real_arch_inv[of "e/2"] .. note N1=this hence N1':"N1 = N1 - 1 + 1" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1442	guess N2 using y[OF *] .. note N2=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1443	show "\<exists>d. gauge d \<and> (\<forall>p. p tagged_division_of {a..b} \<and> d fine p \<longrightarrow> norm ((\<Sum>(x, k)\<in>p. content k *\<^sub>R f x) - y) < e)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1444	apply(rule_tac x="d (N1 + N2)" in exI) apply rule defer
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1445	proof(rule,rule,erule conjE) show "gauge (d (N1 + N2))" using d by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1446	fix q assume as:"q tagged_division_of {a..b}" "d (N1 + N2) fine q"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1447	have *:"inverse (real (N1 + N2 + 1)) < e / 2" apply(rule less_trans) using N1 by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1448	show "norm ((\<Sum>(x, k)\<in>q. content k *\<^sub>R f x) - y) < e" apply(rule norm_triangle_half_r)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1449	apply(rule less_trans[OF _ *]) apply(subst N1', rule d(2)[of "p (N1+N2)"]) defer
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1450	using N2[rule_format,unfolded vector_dist_norm,of "N1+N2"]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1451	using as dp[of "N1 - 1 + 1 + N2" "N1 + N2"] using p(1)[of "N1 + N2"] using N1 by auto qed qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1452
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1453	subsection {* Additivity of integral on abutting intervals. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1454
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1455	lemma interval_split:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1456	"{a..b::real^'n} \<inter> {x. x$k \<le> c} = {a .. (\<chi> i. if i = k then min (b$k) c else b$i)}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1457	"{a..b} \<inter> {x. x$k \<ge> c} = {(\<chi> i. if i = k then max (a$k) c else a$i) .. b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1458	apply(rule_tac[!] set_ext) unfolding Int_iff mem_interval mem_Collect_eq
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1459	unfolding Cart_lambda_beta by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1460
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1461	lemma content_split:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1462	"content {a..b::real^'n} = content({a..b} \<inter> {x. x$k \<le> c}) + content({a..b} \<inter> {x. x$k >= c})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1463	proof- note simps = interval_split content_closed_interval_cases Cart_lambda_beta vector_le_def
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1464	{ presume "a\<le>b \<Longrightarrow> ?thesis" thus ?thesis apply(cases "a\<le>b") unfolding simps by auto }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1465	have *:"UNIV = insert k (UNIV - {k})" "\<And>x. finite (UNIV-{x::'n})" "\<And>x. x\<notin>UNIV-{x}" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1466	have :"\<And>X Y Z. (\<Prod>i\<in>UNIV. Z i (if i = k then X else Y i)) = Z k X (\<Prod>i\<in>UNIV-{k}. Z i (Y i))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1467	"(\<Prod>i\<in>UNIV. b$i - a$i) = (\<Prod>i\<in>UNIV-{k}. b$i - a$i) * (b$k - a$k)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1468	apply(subst (1)) defer apply(subst (1)) unfolding setprod_insert[OF *(2-)] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1469	assume as:"a\<le>b" moreover have "\<And>x. min (b $ k) c = max (a $ k) c
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1470	\<Longrightarrow> x* (b$k - a$k) = x(max (a $ k) c - a $ k) + x(b $ k - max (a $ k) c)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1471	by (auto simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1472	moreover have "\<not> a $ k \<le> c \<Longrightarrow> \<not> c \<le> b $ k \<Longrightarrow> False"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1473	unfolding not_le using as[unfolded vector_le_def,rule_format,of k] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1474	ultimately show ?thesis
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1475	unfolding simps unfolding (1)[of "\<lambda>i x. b$i - x"] (1)[of "\<lambda>i x. x - a$i"] *(2) by(auto)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1476	qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1477
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1478	lemma division_split_left_inj:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1479	assumes "d division_of i" "k1 \<in> d" "k2 \<in> d" "k1 \<noteq> k2"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1480	"k1 \<inter> {x::real^'n. x$k \<le> c} = k2 \<inter> {x. x$k \<le> c}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1481	shows "content(k1 \<inter> {x. x$k \<le> c}) = 0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1482	proof- note d=division_ofD[OF assms(1)]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1483	have *:"\<And>a b::real^'n. \<And> c k. (content({a..b} \<inter> {x. x$k \<le> c}) = 0 \<longleftrightarrow> interior({a..b} \<inter> {x. x$k \<le> c}) = {})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1484	unfolding interval_split content_eq_0_interior by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1485	guess u1 v1 using d(4)[OF assms(2)] apply-by(erule exE)+ note uv1=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1486	guess u2 v2 using d(4)[OF assms(3)] apply-by(erule exE)+ note uv2=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1487	have **:"\<And>s t u. s \<inter> t = {} \<Longrightarrow> u \<subseteq> s \<Longrightarrow> u \<subseteq> t \<Longrightarrow> u = {}" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1488	show ?thesis unfolding uv1 uv2 * apply(rule **[OF d(5)[OF assms(2-4)]])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1489	defer apply(subst assms(5)[unfolded uv1 uv2]) unfolding uv1 uv2 by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1490
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1491	lemma division_split_right_inj:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1492	assumes "d division_of i" "k1 \<in> d" "k2 \<in> d" "k1 \<noteq> k2"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1493	"k1 \<inter> {x::real^'n. x$k \<ge> c} = k2 \<inter> {x. x$k \<ge> c}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1494	shows "content(k1 \<inter> {x. x$k \<ge> c}) = 0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1495	proof- note d=division_ofD[OF assms(1)]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1496	have *:"\<And>a b::real^'n. \<And> c k. (content({a..b} \<inter> {x. x$k >= c}) = 0 \<longleftrightarrow> interior({a..b} \<inter> {x. x$k >= c}) = {})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1497	unfolding interval_split content_eq_0_interior by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1498	guess u1 v1 using d(4)[OF assms(2)] apply-by(erule exE)+ note uv1=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1499	guess u2 v2 using d(4)[OF assms(3)] apply-by(erule exE)+ note uv2=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1500	have **:"\<And>s t u. s \<inter> t = {} \<Longrightarrow> u \<subseteq> s \<Longrightarrow> u \<subseteq> t \<Longrightarrow> u = {}" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1501	show ?thesis unfolding uv1 uv2 * apply(rule **[OF d(5)[OF assms(2-4)]])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1502	defer apply(subst assms(5)[unfolded uv1 uv2]) unfolding uv1 uv2 by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1503
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1504	lemma tagged_division_split_left_inj:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1505	assumes "d tagged_division_of i" "(x1,k1) \<in> d" "(x2,k2) \<in> d" "k1 \<noteq> k2" "k1 \<inter> {x. x$k \<le> c} = k2 \<inter> {x. x$k \<le> c}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1506	shows "content(k1 \<inter> {x. x$k \<le> c}) = 0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1507	proof- have *:"\<And>a b c. (a,b) \<in> c \<Longrightarrow> b \<in> snd ` c" unfolding image_iff apply(rule_tac x="(a,b)" in bexI) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1508	show ?thesis apply(rule division_split_left_inj[OF division_of_tagged_division[OF assms(1)]])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1509	apply(rule_tac[1-2] *) using assms(2-) by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1510
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1511	lemma tagged_division_split_right_inj:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1512	assumes "d tagged_division_of i" "(x1,k1) \<in> d" "(x2,k2) \<in> d" "k1 \<noteq> k2" "k1 \<inter> {x. x$k \<ge> c} = k2 \<inter> {x. x$k \<ge> c}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1513	shows "content(k1 \<inter> {x. x$k \<ge> c}) = 0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1514	proof- have *:"\<And>a b c. (a,b) \<in> c \<Longrightarrow> b \<in> snd ` c" unfolding image_iff apply(rule_tac x="(a,b)" in bexI) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1515	show ?thesis apply(rule division_split_right_inj[OF division_of_tagged_division[OF assms(1)]])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1516	apply(rule_tac[1-2] *) using assms(2-) by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1517
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1518	lemma division_split:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1519	assumes "p division_of {a..b::real^'n}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1520	shows "{l \<inter> {x. x$k \<le> c} \| l. l \<in> p \<and> ~(l \<inter> {x. x$k \<le> c} = {})} division_of ({a..b} \<inter> {x. x$k \<le> c})" (is "?p1 division_of ?I1") and
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1521	"{l \<inter> {x. x$k \<ge> c} \| l. l \<in> p \<and> ~(l \<inter> {x. x$k \<ge> c} = {})} division_of ({a..b} \<inter> {x. x$k \<ge> c})" (is "?p2 division_of ?I2")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1522	proof(rule_tac[!] division_ofI) note p=division_ofD[OF assms]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1523	show "finite ?p1" "finite ?p2" using p(1) by auto show "\<Union>?p1 = ?I1" "\<Union>?p2 = ?I2" unfolding p(6)[THEN sym] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1524	{ fix k assume "k\<in>?p1" then guess l unfolding mem_Collect_eq apply-by(erule exE,(erule conjE)+) note l=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1525	guess u v using p(4)[OF l(2)] apply-by(erule exE)+ note uv=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1526	show "k\<subseteq>?I1" "k \<noteq> {}" "\<exists>a b. k = {a..b}" unfolding l
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1527	using p(2-3)[OF l(2)] l(3) unfolding uv apply- prefer 3 apply(subst interval_split) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1528	fix k' assume "k'\<in>?p1" then guess l' unfolding mem_Collect_eq apply-by(erule exE,(erule conjE)+) note l'=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1529	assume "k\<noteq>k'" thus "interior k \<inter> interior k' = {}" unfolding l l' using p(5)[OF l(2) l'(2)] by auto }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1530	{ fix k assume "k\<in>?p2" then guess l unfolding mem_Collect_eq apply-by(erule exE,(erule conjE)+) note l=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1531	guess u v using p(4)[OF l(2)] apply-by(erule exE)+ note uv=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1532	show "k\<subseteq>?I2" "k \<noteq> {}" "\<exists>a b. k = {a..b}" unfolding l
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1533	using p(2-3)[OF l(2)] l(3) unfolding uv apply- prefer 3 apply(subst interval_split) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1534	fix k' assume "k'\<in>?p2" then guess l' unfolding mem_Collect_eq apply-by(erule exE,(erule conjE)+) note l'=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1535	assume "k\<noteq>k'" thus "interior k \<inter> interior k' = {}" unfolding l l' using p(5)[OF l(2) l'(2)] by auto }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1536	qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1537
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1538	lemma has_integral_split: fixes f::"real^'n \<Rightarrow> 'a::real_normed_vector"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1539	assumes "(f has_integral i) ({a..b} \<inter> {x. x$k \<le> c})" "(f has_integral j) ({a..b} \<inter> {x. x$k \<ge> c})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1540	shows "(f has_integral (i + j)) ({a..b})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1541	proof(unfold has_integral,rule,rule) case goal1 hence e:"e/2>0" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1542	guess d1 using has_integralD[OF assms(1)[unfolded interval_split] e] . note d1=this[unfolded interval_split[THEN sym]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1543	guess d2 using has_integralD[OF assms(2)[unfolded interval_split] e] . note d2=this[unfolded interval_split[THEN sym]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1544	let ?d = "\<lambda>x. if x$k = c then (d1 x \<inter> d2 x) else ball x (abs(x$k - c)) \<inter> d1 x \<inter> d2 x"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1545	show ?case apply(rule_tac x="?d" in exI,rule) defer apply(rule,rule,(erule conjE)+)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1546	proof- show "gauge ?d" using d1(1) d2(1) unfolding gauge_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1547	fix p assume "p tagged_division_of {a..b}" "?d fine p" note p = this tagged_division_ofD[OF this(1)]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1548	have lem0:"\<And>x kk. (x,kk) \<in> p \<Longrightarrow> ~(kk \<inter> {x. x$k \<le> c} = {}) \<Longrightarrow> x$k \<le> c"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1549	"\<And>x kk. (x,kk) \<in> p \<Longrightarrow> ~(kk \<inter> {x. x$k \<ge> c} = {}) \<Longrightarrow> x$k \<ge> c"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1550	proof- fix x kk assume as:"(x,kk)\<in>p"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1551	show "~(kk \<inter> {x. x$k \<le> c} = {}) \<Longrightarrow> x$k \<le> c"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1552	proof(rule ccontr) case goal1
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1553	from this(2)[unfolded not_le] have "kk \<subseteq> ball x \<bar>x $ k - c\<bar>"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1554	using p(2)[unfolded fine_def,rule_format,OF as,unfolded split_conv] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1555	hence "\<exists>y. y \<in> ball x \<bar>x $ k - c\<bar> \<inter> {x. x $ k \<le> c}" using goal1(1) by blast
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1556	then guess y .. hence "\<bar>x $ k - y $ k\<bar> < \<bar>x $ k - c\<bar>" "y$k \<le> c" apply-apply(rule le_less_trans)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1557	using component_le_norm[of "x - y" k,unfolded vector_minus_component] by(auto simp add:vector_dist_norm)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1558	thus False using goal1(2)[unfolded not_le] by(auto simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1559	qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1560	show "~(kk \<inter> {x. x$k \<ge> c} = {}) \<Longrightarrow> x$k \<ge> c"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1561	proof(rule ccontr) case goal1
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1562	from this(2)[unfolded not_le] have "kk \<subseteq> ball x \<bar>x $ k - c\<bar>"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1563	using p(2)[unfolded fine_def,rule_format,OF as,unfolded split_conv] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1564	hence "\<exists>y. y \<in> ball x \<bar>x $ k - c\<bar> \<inter> {x. x $ k \<ge> c}" using goal1(1) by blast
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1565	then guess y .. hence "\<bar>x $ k - y $ k\<bar> < \<bar>x $ k - c\<bar>" "y$k \<ge> c" apply-apply(rule le_less_trans)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1566	using component_le_norm[of "x - y" k,unfolded vector_minus_component] by(auto simp add:vector_dist_norm)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1567	thus False using goal1(2)[unfolded not_le] by(auto simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1568	qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1569	qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1570
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1571	have lem1: "\<And>f P Q. (\<forall>x k. (x,k) \<in> {(x,f k) \| x k. P x k} \<longrightarrow> Q x k) \<longleftrightarrow> (\<forall>x k. P x k \<longrightarrow> Q x (f k))" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1572	have lem2: "\<And>f s P f. finite s \<Longrightarrow> finite {(x,f k) \| x k. (x,k) \<in> s \<and> P x k}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1573	proof- case goal1 thus ?case apply-apply(rule finite_subset[of _ "(\<lambda>(x,k). (x,f k)) ` s"]) by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1574	have lem3: "\<And>g::(real ^ 'n \<Rightarrow> bool) \<Rightarrow> real ^ 'n \<Rightarrow> bool. finite p \<Longrightarrow>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1575	setsum (\<lambda>(x,k). content k *\<^sub>R f x) {(x,g k) \|x k. (x,k) \<in> p \<and> ~(g k = {})}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1576	= setsum (\<lambda>(x,k). content k *\<^sub>R f x) ((\<lambda>(x,k). (x,g k)) ` p)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1577	apply(rule setsum_mono_zero_left) prefer 3
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1578	proof fix g::"(real ^ 'n \<Rightarrow> bool) \<Rightarrow> real ^ 'n \<Rightarrow> bool" and i::"(real^'n) \<times> ((real^'n) set)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1579	assume "i \<in> (\<lambda>(x, k). (x, g k)) ` p - {(x, g k) \|x k. (x, k) \<in> p \<and> g k \<noteq> {}}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1580	then obtain x k where xk:"i=(x,g k)" "(x,k)\<in>p" "(x,g k) \<notin> {(x, g k) \|x k. (x, k) \<in> p \<and> g k \<noteq> {}}" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1581	have "content (g k) = 0" using xk using content_empty by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1582	thus "(\<lambda>(x, k). content k *\<^sub>R f x) i = 0" unfolding xk split_conv by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1583	qed auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1584	have lem4:"\<And>g. (\<lambda>(x,l). content (g l) \<^sub>R f x) = (\<lambda>(x,l). content l \<^sub>R f x) o (\<lambda>(x,l). (x,g l))" apply(rule ext) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1585
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1586	let ?M1 = "{(x,kk \<inter> {x. x$k \<le> c}) \|x kk. (x,kk) \<in> p \<and> kk \<inter> {x. x$k \<le> c} \<noteq> {}}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1587	have "norm ((\<Sum>(x, k)\<in>?M1. content k *\<^sub>R f x) - i) < e/2" apply(rule d1(2),rule tagged_division_ofI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1588	apply(rule lem2 p(3))+ prefer 6 apply(rule fineI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1589	proof- show "\<Union>{k. \<exists>x. (x, k) \<in> ?M1} = {a..b} \<inter> {x. x$k \<le> c}" unfolding p(8)[THEN sym] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1590	fix x l assume xl:"(x,l)\<in>?M1"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1591	then guess x' l' unfolding mem_Collect_eq apply- unfolding Pair_eq apply((erule exE)+,(erule conjE)+) . note xl'=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1592	have "l' \<subseteq> d1 x'" apply(rule order_trans[OF fineD[OF p(2) xl'(3)]]) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1593	thus "l \<subseteq> d1 x" unfolding xl' by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1594	show "x\<in>l" "l \<subseteq> {a..b} \<inter> {x. x $ k \<le> c}" unfolding xl' using p(4-6)[OF xl'(3)] using xl'(4)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1595	using lem0(1)[OF xl'(3-4)] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1596	show "\<exists>a b. l = {a..b}" unfolding xl' using p(6)[OF xl'(3)] by(fastsimp simp add: interval_split[where c=c and k=k])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1597	fix y r let ?goal = "interior l \<inter> interior r = {}" assume yr:"(y,r)\<in>?M1"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1598	then guess y' r' unfolding mem_Collect_eq apply- unfolding Pair_eq apply((erule exE)+,(erule conjE)+) . note yr'=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1599	assume as:"(x,l) \<noteq> (y,r)" show "interior l \<inter> interior r = {}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1600	proof(cases "l' = r' \<longrightarrow> x' = y'")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1601	case False thus ?thesis using p(7)[OF xl'(3) yr'(3)] using as unfolding xl' yr' by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1602	next case True hence "l' \<noteq> r'" using as unfolding xl' yr' by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1603	thus ?thesis using p(7)[OF xl'(3) yr'(3)] using as unfolding xl' yr' by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1604	qed qed moreover
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1605
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1606	let ?M2 = "{(x,kk \<inter> {x. x$k \<ge> c}) \|x kk. (x,kk) \<in> p \<and> kk \<inter> {x. x$k \<ge> c} \<noteq> {}}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1607	have "norm ((\<Sum>(x, k)\<in>?M2. content k *\<^sub>R f x) - j) < e/2" apply(rule d2(2),rule tagged_division_ofI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1608	apply(rule lem2 p(3))+ prefer 6 apply(rule fineI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1609	proof- show "\<Union>{k. \<exists>x. (x, k) \<in> ?M2} = {a..b} \<inter> {x. x$k \<ge> c}" unfolding p(8)[THEN sym] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1610	fix x l assume xl:"(x,l)\<in>?M2"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1611	then guess x' l' unfolding mem_Collect_eq apply- unfolding Pair_eq apply((erule exE)+,(erule conjE)+) . note xl'=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1612	have "l' \<subseteq> d2 x'" apply(rule order_trans[OF fineD[OF p(2) xl'(3)]]) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1613	thus "l \<subseteq> d2 x" unfolding xl' by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1614	show "x\<in>l" "l \<subseteq> {a..b} \<inter> {x. x $ k \<ge> c}" unfolding xl' using p(4-6)[OF xl'(3)] using xl'(4)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1615	using lem0(2)[OF xl'(3-4)] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1616	show "\<exists>a b. l = {a..b}" unfolding xl' using p(6)[OF xl'(3)] by(fastsimp simp add: interval_split[where c=c and k=k])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1617	fix y r let ?goal = "interior l \<inter> interior r = {}" assume yr:"(y,r)\<in>?M2"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1618	then guess y' r' unfolding mem_Collect_eq apply- unfolding Pair_eq apply((erule exE)+,(erule conjE)+) . note yr'=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1619	assume as:"(x,l) \<noteq> (y,r)" show "interior l \<inter> interior r = {}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1620	proof(cases "l' = r' \<longrightarrow> x' = y'")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1621	case False thus ?thesis using p(7)[OF xl'(3) yr'(3)] using as unfolding xl' yr' by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1622	next case True hence "l' \<noteq> r'" using as unfolding xl' yr' by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1623	thus ?thesis using p(7)[OF xl'(3) yr'(3)] using as unfolding xl' yr' by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1624	qed qed ultimately
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1625
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1626	have "norm (((\<Sum>(x, k)\<in>?M1. content k \<^sub>R f x) - i) + ((\<Sum>(x, k)\<in>?M2. content k \<^sub>R f x) - j)) < e/2 + e/2"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1627	apply- apply(rule norm_triangle_lt) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1628	also { have :"\<And>x y. x = (0::real) \<Longrightarrow> x \<^sub>R (y::'a) = 0" using scaleR_zero_left by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1629	have "((\<Sum>(x, k)\<in>?M1. content k \<^sub>R f x) - i) + ((\<Sum>(x, k)\<in>?M2. content k \<^sub>R f x) - j)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1630	= (\<Sum>(x, k)\<in>?M1. content k \<^sub>R f x) + (\<Sum>(x, k)\<in>?M2. content k \<^sub>R f x) - (i + j)" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1631	also have "\<dots> = (\<Sum>(x, ka)\<in>p. content (ka \<inter> {x. x $ k \<le> c}) \<^sub>R f x) + (\<Sum>(x, ka)\<in>p. content (ka \<inter> {x. c \<le> x $ k}) \<^sub>R f x) - (i + j)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1632	unfolding lem3[OF p(3)] apply(subst setsum_reindex_nonzero[OF p(3)]) defer apply(subst setsum_reindex_nonzero[OF p(3)])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1633	defer unfolding lem4[THEN sym] apply(rule refl) unfolding split_paired_all split_conv apply(rule_tac[!] *)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1634	proof- case goal1 thus ?case apply- apply(rule tagged_division_split_left_inj [OF p(1), of a b aa ba]) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1635	next case goal2 thus ?case apply- apply(rule tagged_division_split_right_inj[OF p(1), of a b aa ba]) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1636	qed also note setsum_addf[THEN sym]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1637	also have :"\<And>x. x\<in>p \<Longrightarrow> (\<lambda>(x, ka). content (ka \<inter> {x. x $ k \<le> c}) \<^sub>R f x) x + (\<lambda>(x, ka). content (ka \<inter> {x. c \<le> x $ k}) *\<^sub>R f x) x
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1638	= (\<lambda>(x,ka). content ka *\<^sub>R f x) x" unfolding split_paired_all split_conv
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1639	proof- fix a b assume "(a,b) \<in> p" from p(6)[OF this] guess u v apply-by(erule exE)+ note uv=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1640	thus "content (b \<inter> {x. x $ k \<le> c}) \<^sub>R f a + content (b \<inter> {x. c \<le> x $ k}) \<^sub>R f a = content b *\<^sub>R f a"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1641	unfolding scaleR_left_distrib[THEN sym] unfolding uv content_split[of u v k c] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1642	qed note setsum_cong2[OF this]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1643	finally have "(\<Sum>(x, k)\<in>{(x, kk \<inter> {x. x $ k \<le> c}) \|x kk. (x, kk) \<in> p \<and> kk \<inter> {x. x $ k \<le> c} \<noteq> {}}. content k *\<^sub>R f x) - i +
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1644	((\<Sum>(x, k)\<in>{(x, kk \<inter> {x. c \<le> x $ k}) \|x kk. (x, kk) \<in> p \<and> kk \<inter> {x. c \<le> x $ k} \<noteq> {}}. content k *\<^sub>R f x) - j) =
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1645	(\<Sum>(x, ka)\<in>p. content ka *\<^sub>R f x) - (i + j)" by auto }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1646	finally show "norm ((\<Sum>(x, k)\<in>p. content k *\<^sub>R f x) - (i + j)) < e" by auto qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1647
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1648	subsection {* A sort of converse, integrability on subintervals. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1649
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1650	lemma tagged_division_union_interval:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1651	assumes "p1 tagged_division_of ({a..b} \<inter> {x::real^'n. x$k \<le> (c::real)})" "p2 tagged_division_of ({a..b} \<inter> {x. x$k \<ge> c})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1652	shows "(p1 \<union> p2) tagged_division_of ({a..b})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1653	proof- have *:"{a..b} = ({a..b} \<inter> {x. x$k \<le> c}) \<union> ({a..b} \<inter> {x. x$k \<ge> c})" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1654	show ?thesis apply(subst *) apply(rule tagged_division_union[OF assms])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1655	unfolding interval_split interior_closed_interval
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1656	by(auto simp add: vector_less_def Cart_lambda_beta elim!:allE[where x=k]) qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1657
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1658	lemma has_integral_separate_sides: fixes f::"real^'m \<Rightarrow> 'a::real_normed_vector"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1659	assumes "(f has_integral i) ({a..b})" "e>0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1660	obtains d where "gauge d" "(\<forall>p1 p2. p1 tagged_division_of ({a..b} \<inter> {x. x$k \<le> c}) \<and> d fine p1 \<and>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1661	p2 tagged_division_of ({a..b} \<inter> {x. x$k \<ge> c}) \<and> d fine p2
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1662	\<longrightarrow> norm((setsum (\<lambda>(x,k). content k *\<^sub>R f x) p1 +
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1663	setsum (\<lambda>(x,k). content k *\<^sub>R f x) p2) - i) < e)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1664	proof- guess d using has_integralD[OF assms] . note d=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1665	show ?thesis apply(rule that[of d]) apply(rule d) apply(rule,rule,rule,(erule conjE)+)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1666	proof- fix p1 p2 assume "p1 tagged_division_of {a..b} \<inter> {x. x $ k \<le> c}" "d fine p1" note p1=tagged_division_ofD[OF this(1)] this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1667	assume "p2 tagged_division_of {a..b} \<inter> {x. c \<le> x $ k}" "d fine p2" note p2=tagged_division_ofD[OF this(1)] this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1668	note tagged_division_union_interval[OF p1(7) p2(7)] note p12 = tagged_division_ofD[OF this] this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1669	have "norm ((\<Sum>(x, k)\<in>p1. content k \<^sub>R f x) + (\<Sum>(x, k)\<in>p2. content k \<^sub>R f x) - i) = norm ((\<Sum>(x, k)\<in>p1 \<union> p2. content k *\<^sub>R f x) - i)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1670	apply(subst setsum_Un_zero) apply(rule p1 p2)+ apply(rule) unfolding split_paired_all split_conv
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1671	proof- fix a b assume ab:"(a,b) \<in> p1 \<inter> p2"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1672	have "(a,b) \<in> p1" using ab by auto from p1(4)[OF this] guess u v apply-by(erule exE)+ note uv =this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1673	have "b \<subseteq> {x. x$k = c}" using ab p1(3)[of a b] p2(3)[of a b] by fastsimp
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1674	moreover have "interior {x. x $ k = c} = {}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1675	proof(rule ccontr) case goal1 then obtain x where x:"x\<in>interior {x. x$k = c}" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1676	then guess e unfolding mem_interior .. note e=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1677	have x:"x$k = c" using x interior_subset by fastsimp
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1678	have *:"\<And>i. \<bar>(x - (x + (\<chi> i. if i = k then e / 2 else 0))) $ i\<bar> = (if i = k then e/2 else 0)" using e by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1679	have "x + (\<chi> i. if i = k then e/2 else 0) \<in> ball x e" unfolding mem_ball vector_dist_norm
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1680	apply(rule le_less_trans[OF norm_le_l1]) unfolding *
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1681	unfolding setsum_delta[OF finite_UNIV] using e by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1682	hence "x + (\<chi> i. if i = k then e/2 else 0) \<in> {x. x$k = c}" using e by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1683	thus False unfolding mem_Collect_eq using e x by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1684	qed ultimately have "content b = 0" unfolding uv content_eq_0_interior apply-apply(drule subset_interior) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1685	thus "content b *\<^sub>R f a = 0" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1686	qed auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1687	also have "\<dots> < e" by(rule d(2) p12 fine_union p1 p2)+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1688	finally show "norm ((\<Sum>(x, k)\<in>p1. content k \<^sub>R f x) + (\<Sum>(x, k)\<in>p2. content k \<^sub>R f x) - i) < e" . qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1689
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1690	lemma integrable_split[intro]: fixes f::"real^'n \<Rightarrow> 'a::{real_normed_vector,complete_space}" assumes "f integrable_on {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1691	shows "f integrable_on ({a..b} \<inter> {x. x$k \<le> c})" (is ?t1) and "f integrable_on ({a..b} \<inter> {x. x$k \<ge> c})" (is ?t2)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1692	proof- guess y using assms unfolding integrable_on_def .. note y=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1693	def b' \<equiv> "(\<chi> i. if i = k then min (b$k) c else b$i)::real^'n"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1694	and a' \<equiv> "(\<chi> i. if i = k then max (a$k) c else a$i)::real^'n"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1695	show ?t1 ?t2 unfolding interval_split integrable_cauchy unfolding interval_split[THEN sym]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1696	proof(rule_tac[!] allI impI)+ fix e::real assume "e>0" hence "e/2>0" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1697	from has_integral_separate_sides[OF y this,of k c] guess d . note d=this[rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1698	let ?P = "\<lambda>A. \<exists>d. gauge d \<and> (\<forall>p1 p2. p1 tagged_division_of {a..b} \<inter> A \<and> d fine p1 \<and> p2 tagged_division_of {a..b} \<inter> A \<and> d fine p2 \<longrightarrow>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1699	norm ((\<Sum>(x, k)\<in>p1. content k \<^sub>R f x) - (\<Sum>(x, k)\<in>p2. content k \<^sub>R f x)) < e)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1700	show "?P {x. x $ k \<le> c}" apply(rule_tac x=d in exI) apply(rule,rule d) apply(rule,rule,rule)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1701	proof- fix p1 p2 assume as:"p1 tagged_division_of {a..b} \<inter> {x. x $ k \<le> c} \<and> d fine p1 \<and> p2 tagged_division_of {a..b} \<inter> {x. x $ k \<le> c} \<and> d fine p2"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1702	show "norm ((\<Sum>(x, k)\<in>p1. content k \<^sub>R f x) - (\<Sum>(x, k)\<in>p2. content k \<^sub>R f x)) < e"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1703	proof- guess p using fine_division_exists[OF d(1), of a' b] . note p=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1704	show ?thesis using norm_triangle_half_l[OF d(2)[of p1 p] d(2)[of p2 p]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1705	using as unfolding interval_split b'_def[symmetric] a'_def[symmetric]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1706	using p using assms by(auto simp add:group_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1707	qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1708	show "?P {x. x $ k \<ge> c}" apply(rule_tac x=d in exI) apply(rule,rule d) apply(rule,rule,rule)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1709	proof- fix p1 p2 assume as:"p1 tagged_division_of {a..b} \<inter> {x. x $ k \<ge> c} \<and> d fine p1 \<and> p2 tagged_division_of {a..b} \<inter> {x. x $ k \<ge> c} \<and> d fine p2"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1710	show "norm ((\<Sum>(x, k)\<in>p1. content k \<^sub>R f x) - (\<Sum>(x, k)\<in>p2. content k \<^sub>R f x)) < e"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1711	proof- guess p using fine_division_exists[OF d(1), of a b'] . note p=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1712	show ?thesis using norm_triangle_half_l[OF d(2)[of p p1] d(2)[of p p2]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1713	using as unfolding interval_split b'_def[symmetric] a'_def[symmetric]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1714	using p using assms by(auto simp add:group_simps) qed qed qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1715
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1716	subsection {* Generalized notion of additivity. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1717
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1718	definition "neutral opp = (SOME x. \<forall>y. opp x y = y \<and> opp y x = y)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1719
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1720	definition operative :: "('a \<Rightarrow> 'a \<Rightarrow> 'a) \<Rightarrow> ((real^'n) set \<Rightarrow> 'a) \<Rightarrow> bool" where
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1721	"operative opp f \<equiv>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1722	(\<forall>a b. content {a..b} = 0 \<longrightarrow> f {a..b} = neutral(opp)) \<and>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1723	(\<forall>a b c k. f({a..b}) =
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1724	opp (f({a..b} \<inter> {x. x$k \<le> c}))
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1725	(f({a..b} \<inter> {x. x$k \<ge> c})))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1726
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1727	lemma operativeD[dest]: assumes "operative opp f"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1728	shows "\<And>a b. content {a..b} = 0 \<Longrightarrow> f {a..b} = neutral(opp)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1729	"\<And>a b c k. f({a..b}) = opp (f({a..b} \<inter> {x. x$k \<le> c})) (f({a..b} \<inter> {x. x$k \<ge> c}))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1730	using assms unfolding operative_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1731
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1732	lemma operative_trivial:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1733	"operative opp f \<Longrightarrow> content({a..b}) = 0 \<Longrightarrow> f({a..b}) = neutral opp"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1734	unfolding operative_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1735
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1736	lemma property_empty_interval:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1737	"(\<forall>a b. content({a..b}) = 0 \<longrightarrow> P({a..b})) \<Longrightarrow> P {}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1738	using content_empty unfolding empty_as_interval by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1739
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1740	lemma operative_empty: "operative opp f \<Longrightarrow> f {} = neutral opp"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1741	unfolding operative_def apply(rule property_empty_interval) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1742
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1743	subsection {* Using additivity of lifted function to encode definedness. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1744
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1745	lemma forall_option: "(\<forall>x. P x) \<longleftrightarrow> P None \<and> (\<forall>x. P(Some x))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1746	by (metis map_of.simps option.nchotomy)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1747
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1748	lemma exists_option:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1749	"(\<exists>x. P x) \<longleftrightarrow> P None \<or> (\<exists>x. P(Some x))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1750	by (metis map_of.simps option.nchotomy)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1751
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1752	fun lifted where
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1753	"lifted (opp::'a\<Rightarrow>'a\<Rightarrow>'b) (Some x) (Some y) = Some(opp x y)" \|
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1754	"lifted opp None _ = (None::'b option)" \|
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1755	"lifted opp _ None = None"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1756
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1757	lemma lifted_simp_1[simp]: "lifted opp v None = None"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1758	apply(induct v) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1759
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1760	definition "monoidal opp \<equiv> (\<forall>x y. opp x y = opp y x) \<and>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1761	(\<forall>x y z. opp x (opp y z) = opp (opp x y) z) \<and>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1762	(\<forall>x. opp (neutral opp) x = x)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1763
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1764	lemma monoidalI: assumes "\<And>x y. opp x y = opp y x"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1765	"\<And>x y z. opp x (opp y z) = opp (opp x y) z"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1766	"\<And>x. opp (neutral opp) x = x" shows "monoidal opp"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1767	unfolding monoidal_def using assms by fastsimp
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1768
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1769	lemma monoidal_ac: assumes "monoidal opp"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1770	shows "opp (neutral opp) a = a" "opp a (neutral opp) = a" "opp a b = opp b a"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1771	"opp (opp a b) c = opp a (opp b c)" "opp a (opp b c) = opp b (opp a c)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1772	using assms unfolding monoidal_def apply- by metis+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1773
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1774	lemma monoidal_simps[simp]: assumes "monoidal opp"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1775	shows "opp (neutral opp) a = a" "opp a (neutral opp) = a"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1776	using monoidal_ac[OF assms] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1777
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1778	lemma neutral_lifted[cong]: assumes "monoidal opp"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1779	shows "neutral (lifted opp) = Some(neutral opp)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1780	apply(subst neutral_def) apply(rule some_equality) apply(rule,induct_tac y) prefer 3
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1781	proof- fix x assume "\<forall>y. lifted opp x y = y \<and> lifted opp y x = y"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1782	thus "x = Some (neutral opp)" apply(induct x) defer
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1783	apply rule apply(subst neutral_def) apply(subst eq_commute,rule some_equality)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1784	apply(rule,erule_tac x="Some y" in allE) defer apply(erule_tac x="Some x" in allE) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1785	qed(auto simp add:monoidal_ac[OF assms])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1786
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1787	lemma monoidal_lifted[intro]: assumes "monoidal opp" shows "monoidal(lifted opp)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1788	unfolding monoidal_def forall_option neutral_lifted[OF assms] using monoidal_ac[OF assms] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1789
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1790	definition "support opp f s = {x. x\<in>s \<and> f x \<noteq> neutral opp}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1791	definition "fold' opp e s \<equiv> (if finite s then fold opp e s else e)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1792	definition "iterate opp s f \<equiv> fold' (\<lambda>x a. opp (f x) a) (neutral opp) (support opp f s)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1793
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1794	lemma support_subset[intro]:"support opp f s \<subseteq> s" unfolding support_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1795	lemma support_empty[simp]:"support opp f {} = {}" using support_subset[of opp f "{}"] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1796
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1797	lemma fun_left_comm_monoidal[intro]: assumes "monoidal opp" shows "fun_left_comm opp"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1798	unfolding fun_left_comm_def using monoidal_ac[OF assms] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1799
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1800	lemma support_clauses:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1801	"\<And>f g s. support opp f {} = {}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1802	"\<And>f g s. support opp f (insert x s) = (if f(x) = neutral opp then support opp f s else insert x (support opp f s))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1803	"\<And>f g s. support opp f (s - {x}) = (support opp f s) - {x}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1804	"\<And>f g s. support opp f (s \<union> t) = (support opp f s) \<union> (support opp f t)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1805	"\<And>f g s. support opp f (s \<inter> t) = (support opp f s) \<inter> (support opp f t)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1806	"\<And>f g s. support opp f (s - t) = (support opp f s) - (support opp f t)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1807	"\<And>f g s. support opp g (f ` s) = f ` (support opp (g o f) s)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1808	unfolding support_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1809
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1810	lemma finite_support[intro]:"finite s \<Longrightarrow> finite (support opp f s)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1811	unfolding support_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1812
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1813	lemma iterate_empty[simp]:"iterate opp {} f = neutral opp"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1814	unfolding iterate_def fold'_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1815
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1816	lemma iterate_insert[simp]: assumes "monoidal opp" "finite s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1817	shows "iterate opp (insert x s) f = (if x \<in> s then iterate opp s f else opp (f x) (iterate opp s f))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1818	proof(cases "x\<in>s") case True hence *:"insert x s = s" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1819	show ?thesis unfolding iterate_def if_P[OF True] * by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1820	next case False note x=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1821	note * = fun_left_comm.fun_left_comm_apply[OF fun_left_comm_monoidal[OF assms(1)]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1822	show ?thesis proof(cases "f x = neutral opp")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1823	case True show ?thesis unfolding iterate_def if_not_P[OF x] support_clauses if_P[OF True]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1824	unfolding True monoidal_simps[OF assms(1)] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1825	next case False show ?thesis unfolding iterate_def fold'_def if_not_P[OF x] support_clauses if_not_P[OF False]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1826	apply(subst fun_left_comm.fold_insert[OF * finite_support])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1827	using `finite s` unfolding support_def using False x by auto qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1828
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1829	lemma iterate_some:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1830	assumes "monoidal opp" "finite s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1831	shows "iterate (lifted opp) s (\<lambda>x. Some(f x)) = Some (iterate opp s f)" using assms(2)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1832	proof(induct s) case empty thus ?case using assms by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1833	next case (insert x F) show ?case apply(subst iterate_insert) prefer 3 apply(subst if_not_P)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1834	defer unfolding insert(3) lifted.simps apply rule using assms insert by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1835
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1836	subsection {* Two key instances of additivity. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1837
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1838	lemma neutral_add[simp]:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1839	"neutral op + = (0::_::comm_monoid_add)" unfolding neutral_def
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1840	apply(rule some_equality) defer apply(erule_tac x=0 in allE) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1841
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1842	lemma operative_content[intro]: "operative (op +) content"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1843	unfolding operative_def content_split[THEN sym] neutral_add by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1844
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1845	lemma neutral_monoid[simp]: "neutral ((op +)::('a::comm_monoid_add) \<Rightarrow> 'a \<Rightarrow> 'a) = 0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1846	unfolding neutral_def apply(rule some_equality) defer
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1847	apply(erule_tac x=0 in allE) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1848
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1849	lemma monoidal_monoid[intro]:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1850	shows "monoidal ((op +)::('a::comm_monoid_add) \<Rightarrow> 'a \<Rightarrow> 'a)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1851	unfolding monoidal_def neutral_monoid by(auto simp add: group_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1852
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1853	lemma operative_integral: fixes f::"real^'n \<Rightarrow> 'a::banach"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1854	shows "operative (lifted(op +)) (\<lambda>i. if f integrable_on i then Some(integral i f) else None)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1855	unfolding operative_def unfolding neutral_lifted[OF monoidal_monoid] neutral_add
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1856	apply(rule,rule,rule,rule) defer apply(rule allI)+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1857	proof- fix a b c k show "(if f integrable_on {a..b} then Some (integral {a..b} f) else None) =
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1858	lifted op + (if f integrable_on {a..b} \<inter> {x. x $ k \<le> c} then Some (integral ({a..b} \<inter> {x. x $ k \<le> c}) f) else None)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1859	(if f integrable_on {a..b} \<inter> {x. c \<le> x $ k} then Some (integral ({a..b} \<inter> {x. c \<le> x $ k}) f) else None)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1860	proof(cases "f integrable_on {a..b}")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1861	case True show ?thesis unfolding if_P[OF True]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1862	unfolding if_P[OF integrable_split(1)[OF True]] if_P[OF integrable_split(2)[OF True]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1863	unfolding lifted.simps option.inject apply(rule integral_unique) apply(rule has_integral_split)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1864	apply(rule_tac[!] integrable_integral integrable_split)+ using True by assumption+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1865	next case False have "(\<not> (f integrable_on {a..b} \<inter> {x. x $ k \<le> c})) \<or> (\<not> ( f integrable_on {a..b} \<inter> {x. c \<le> x $ k}))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1866	proof(rule ccontr) case goal1 hence "f integrable_on {a..b}" apply- unfolding integrable_on_def
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1867	apply(rule_tac x="integral ({a..b} \<inter> {x. x $ k \<le> c}) f + integral ({a..b} \<inter> {x. x $ k \<ge> c}) f" in exI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1868	apply(rule has_integral_split) apply(rule_tac[!] integrable_integral) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1869	thus False using False by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1870	qed thus ?thesis using False by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1871	qed next
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1872	fix a b assume as:"content {a..b::real^'n} = 0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1873	thus "(if f integrable_on {a..b} then Some (integral {a..b} f) else None) = Some 0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1874	unfolding if_P[OF integrable_on_null[OF as]] using has_integral_null_eq[OF as] by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1875
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1876	subsection {* Points of division of a partition. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1877
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1878	definition "division_points (k::(real^'n) set) d =
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1879	{(j,x). (interval_lowerbound k)$j < x \<and> x < (interval_upperbound k)$j \<and>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1880	(\<exists>i\<in>d. (interval_lowerbound i)$j = x \<or> (interval_upperbound i)$j = x)}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1881
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1882	lemma division_points_finite: assumes "d division_of i"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1883	shows "finite (division_points i d)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1884	proof- note assm = division_ofD[OF assms]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1885	let ?M = "\<lambda>j. {(j,x)\|x. (interval_lowerbound i)$j < x \<and> x < (interval_upperbound i)$j \<and>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1886	(\<exists>i\<in>d. (interval_lowerbound i)$j = x \<or> (interval_upperbound i)$j = x)}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1887	have *:"division_points i d = \<Union>(?M ` UNIV)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1888	unfolding division_points_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1889	show ?thesis unfolding * using assm by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1890
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1891	lemma division_points_subset:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1892	assumes "d division_of {a..b}" "\<forall>i. a$i < b$i" "a$k < c" "c < b$k"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1893	shows "division_points ({a..b} \<inter> {x. x$k \<le> c}) {l \<inter> {x. x$k \<le> c} \| l . l \<in> d \<and> ~(l \<inter> {x. x$k \<le> c} = {})}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1894	\<subseteq> division_points ({a..b}) d" (is ?t1) and
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1895	"division_points ({a..b} \<inter> {x. x$k \<ge> c}) {l \<inter> {x. x$k \<ge> c} \| l . l \<in> d \<and> ~(l \<inter> {x. x$k \<ge> c} = {})}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1896	\<subseteq> division_points ({a..b}) d" (is ?t2)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1897	proof- note assm = division_ofD[OF assms(1)]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1898	have *:"\<forall>i. a$i \<le> b$i" "\<forall>i. a$i \<le> (\<chi> i. if i = k then min (b $ k) c else b $ i) $ i"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1899	"\<forall>i. (\<chi> i. if i = k then max (a $ k) c else a $ i) $ i \<le> b$i" "min (b $ k) c = c" "max (a $ k) c = c"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1900	using assms using less_imp_le by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1901	show ?t1 unfolding division_points_def interval_split[of a b]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1902	unfolding interval_bounds[OF (1)] interval_bounds[OF (2)] interval_bounds[OF (3)] Cart_lambda_beta unfolding
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1903	unfolding subset_eq apply(rule) unfolding mem_Collect_eq split_beta apply(erule bexE conjE)+ unfolding mem_Collect_eq apply(erule exE conjE)+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1904	proof- fix i l x assume as:"a $ fst x < snd x" "snd x < (if fst x = k then c else b $ fst x)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1905	"interval_lowerbound i $ fst x = snd x \<or> interval_upperbound i $ fst x = snd x" "i = l \<inter> {x. x $ k \<le> c}" "l \<in> d" "l \<inter> {x. x $ k \<le> c} \<noteq> {}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1906	from assm(4)[OF this(5)] guess u v apply-by(erule exE)+ note l=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1907	have *:"\<forall>i. u $ i \<le> (\<chi> i. if i = k then min (v $ k) c else v $ i) $ i" using as(6) unfolding l interval_split interval_ne_empty as .
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1908	have **:"\<forall>i. u$i \<le> v$i" using l using as(6) unfolding interval_ne_empty[THEN sym] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1909	show "a $ fst x < snd x \<and> snd x < b $ fst x \<and> (\<exists>i\<in>d. interval_lowerbound i $ fst x = snd x \<or> interval_upperbound i $ fst x = snd x)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1910	using as(1-3,5) unfolding l interval_split interval_ne_empty as interval_bounds[OF *] Cart_lambda_beta apply-
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1911	apply(rule,assumption,rule) defer apply(rule_tac x="{u..v}" in bexI) unfolding interval_bounds[OF **]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1912	apply(case_tac[!] "fst x = k") using assms by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1913	qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1914	show ?t2 unfolding division_points_def interval_split[of a b]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1915	unfolding interval_bounds[OF (1)] interval_bounds[OF (2)] interval_bounds[OF (3)] Cart_lambda_beta unfolding
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1916	unfolding subset_eq apply(rule) unfolding mem_Collect_eq split_beta apply(erule bexE conjE)+ unfolding mem_Collect_eq apply(erule exE conjE)+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1917	proof- fix i l x assume as:"(if fst x = k then c else a $ fst x) < snd x" "snd x < b $ fst x" "interval_lowerbound i $ fst x = snd x \<or> interval_upperbound i $ fst x = snd x"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1918	"i = l \<inter> {x. c \<le> x $ k}" "l \<in> d" "l \<inter> {x. c \<le> x $ k} \<noteq> {}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1919	from assm(4)[OF this(5)] guess u v apply-by(erule exE)+ note l=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1920	have *:"\<forall>i. (\<chi> i. if i = k then max (u $ k) c else u $ i) $ i \<le> v $ i" using as(6) unfolding l interval_split interval_ne_empty as .
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1921	have **:"\<forall>i. u$i \<le> v$i" using l using as(6) unfolding interval_ne_empty[THEN sym] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1922	show "a $ fst x < snd x \<and> snd x < b $ fst x \<and> (\<exists>i\<in>d. interval_lowerbound i $ fst x = snd x \<or> interval_upperbound i $ fst x = snd x)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1923	using as(1-3,5) unfolding l interval_split interval_ne_empty as interval_bounds[OF *] Cart_lambda_beta apply-
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1924	apply rule defer apply(rule,assumption) apply(rule_tac x="{u..v}" in bexI) unfolding interval_bounds[OF **]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1925	apply(case_tac[!] "fst x = k") using assms by auto qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1926
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1927	lemma division_points_psubset:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1928	assumes "d division_of {a..b}" "\<forall>i. a$i < b$i" "a$k < c" "c < b$k"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1929	"l \<in> d" "interval_lowerbound l$k = c \<or> interval_upperbound l$k = c"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1930	shows "division_points ({a..b} \<inter> {x. x$k \<le> c}) {l \<inter> {x. x$k \<le> c} \| l. l\<in>d \<and> l \<inter> {x. x$k \<le> c} \<noteq> {}} \<subset> division_points ({a..b}) d" (is "?D1 \<subset> ?D")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1931	"division_points ({a..b} \<inter> {x. x$k \<ge> c}) {l \<inter> {x. x$k \<ge> c} \| l. l\<in>d \<and> l \<inter> {x. x$k \<ge> c} \<noteq> {}} \<subset> division_points ({a..b}) d" (is "?D2 \<subset> ?D")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1932	proof- have ab:"\<forall>i. a$i \<le> b$i" using assms(2) by(auto intro!:less_imp_le)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1933	guess u v using division_ofD(4)[OF assms(1,5)] apply-by(erule exE)+ note l=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1934	have uv:"\<forall>i. u$i \<le> v$i" "\<forall>i. a$i \<le> u$i \<and> v$i \<le> b$i" using division_ofD(2,2,3)[OF assms(1,5)] unfolding l interval_ne_empty
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1935	unfolding subset_eq apply- defer apply(erule_tac x=u in ballE, erule_tac x=v in ballE) unfolding mem_interval by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1936	have *:"interval_upperbound ({a..b} \<inter> {x. x $ k \<le> interval_upperbound l $ k}) $ k = interval_upperbound l $ k"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1937	"interval_upperbound ({a..b} \<inter> {x. x $ k \<le> interval_lowerbound l $ k}) $ k = interval_lowerbound l $ k"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1938	unfolding interval_split apply(subst interval_bounds) prefer 3 apply(subst interval_bounds)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1939	unfolding l interval_bounds[OF uv(1)] using uv[rule_format,of k] ab by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1940	have "\<exists>x. x \<in> ?D - ?D1" using assms(2-) apply-apply(erule disjE)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1941	apply(rule_tac x="(k,(interval_lowerbound l)$k)" in exI) defer
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1942	apply(rule_tac x="(k,(interval_upperbound l)$k)" in exI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1943	unfolding division_points_def unfolding interval_bounds[OF ab]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1944	apply (auto simp add:interval_bounds) unfolding * by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1945	thus "?D1 \<subset> ?D" apply-apply(rule,rule division_points_subset[OF assms(1-4)]) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1946
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1947	have *:"interval_lowerbound ({a..b} \<inter> {x. x $ k \<ge> interval_lowerbound l $ k}) $ k = interval_lowerbound l $ k"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1948	"interval_lowerbound ({a..b} \<inter> {x. x $ k \<ge> interval_upperbound l $ k}) $ k = interval_upperbound l $ k"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1949	unfolding interval_split apply(subst interval_bounds) prefer 3 apply(subst interval_bounds)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1950	unfolding l interval_bounds[OF uv(1)] using uv[rule_format,of k] ab by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1951	have "\<exists>x. x \<in> ?D - ?D2" using assms(2-) apply-apply(erule disjE)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1952	apply(rule_tac x="(k,(interval_lowerbound l)$k)" in exI) defer
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1953	apply(rule_tac x="(k,(interval_upperbound l)$k)" in exI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1954	unfolding division_points_def unfolding interval_bounds[OF ab]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1955	apply (auto simp add:interval_bounds) unfolding * by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1956	thus "?D2 \<subset> ?D" apply-apply(rule,rule division_points_subset[OF assms(1-4)]) by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1957
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1958	subsection {* Preservation by divisions and tagged divisions. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1959
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1960	lemma support_support[simp]:"support opp f (support opp f s) = support opp f s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1961	unfolding support_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1962
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1963	lemma iterate_support[simp]: "iterate opp (support opp f s) f = iterate opp s f"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1964	unfolding iterate_def support_support by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1965
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1966	lemma iterate_expand_cases:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1967	"iterate opp s f = (if finite(support opp f s) then iterate opp (support opp f s) f else neutral opp)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1968	apply(cases) apply(subst if_P,assumption) unfolding iterate_def support_support fold'_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1969
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1970	lemma iterate_image: assumes "monoidal opp" "inj_on f s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1971	shows "iterate opp (f ` s) g = iterate opp s (g \<circ> f)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1972	proof- have *:"\<And>s. finite s \<Longrightarrow> \<forall>x\<in>s. \<forall>y\<in>s. f x = f y \<longrightarrow> x = y \<Longrightarrow>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1973	iterate opp (f ` s) g = iterate opp s (g \<circ> f)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1974	proof- case goal1 show ?case using goal1
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1975	proof(induct s) case empty thus ?case using assms(1) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1976	next case (insert x s) show ?case unfolding iterate_insert[OF assms(1) insert(1)]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1977	unfolding if_not_P[OF insert(2)] apply(subst insert(3)[THEN sym])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1978	unfolding image_insert defer apply(subst iterate_insert[OF assms(1)])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1979	apply(rule finite_imageI insert)+ apply(subst if_not_P)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1980	unfolding image_iff o_def using insert(2,4) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1981	qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1982	show ?thesis
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1983	apply(cases "finite (support opp g (f ` s))")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1984	apply(subst (1) iterate_support[THEN sym],subst (2) iterate_support[THEN sym])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1985	unfolding support_clauses apply(rule *)apply(rule finite_imageD,assumption) unfolding inj_on_def[symmetric]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1986	apply(rule subset_inj_on[OF assms(2) support_subset])+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1987	apply(subst iterate_expand_cases) unfolding support_clauses apply(simp only: if_False)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1988	apply(subst iterate_expand_cases) apply(subst if_not_P) by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1989
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1990
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1991	(* This lemma about iterations comes up in a few places. *)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1992	lemma iterate_nonzero_image_lemma:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1993	assumes "monoidal opp" "finite s" "g(a) = neutral opp"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1994	"\<forall>x\<in>s. \<forall>y\<in>s. f x = f y \<and> x \<noteq> y \<longrightarrow> g(f x) = neutral opp"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1995	shows "iterate opp {f x \| x. x \<in> s \<and> f x \<noteq> a} g = iterate opp s (g \<circ> f)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1996	proof- have *:"{f x \|x. x \<in> s \<and> ~(f x = a)} = f ` {x. x \<in> s \<and> ~(f x = a)}" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1997	have **:"support opp (g \<circ> f) {x \<in> s. f x \<noteq> a} = support opp (g \<circ> f) s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1998	unfolding support_def using assms(3) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	1999	show ?thesis unfolding *
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2000	apply(subst iterate_support[THEN sym]) unfolding support_clauses
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2001	apply(subst iterate_image[OF assms(1)]) defer
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2002	apply(subst(2) iterate_support[THEN sym]) apply(subst **)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2003	unfolding inj_on_def using assms(3,4) unfolding support_def by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2004
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2005	lemma iterate_eq_neutral:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2006	assumes "monoidal opp" "\<forall>x \<in> s. (f(x) = neutral opp)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2007	shows "(iterate opp s f = neutral opp)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2008	proof- have *:"support opp f s = {}" unfolding support_def using assms(2) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2009	show ?thesis apply(subst iterate_support[THEN sym])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2010	unfolding * using assms(1) by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2011
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2012	lemma iterate_op: assumes "monoidal opp" "finite s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2013	shows "iterate opp s (\<lambda>x. opp (f x) (g x)) = opp (iterate opp s f) (iterate opp s g)" using assms(2)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2014	proof(induct s) case empty thus ?case unfolding iterate_insert[OF assms(1)] using assms(1) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2015	next case (insert x F) show ?case unfolding iterate_insert[OF assms(1) insert(1)] if_not_P[OF insert(2)] insert(3)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2016	unfolding monoidal_ac[OF assms(1)] by(rule refl) qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2017
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2018	lemma iterate_eq: assumes "monoidal opp" "\<And>x. x \<in> s \<Longrightarrow> f x = g x"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2019	shows "iterate opp s f = iterate opp s g"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2020	proof- have *:"support opp g s = support opp f s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2021	unfolding support_def using assms(2) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2022	show ?thesis
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2023	proof(cases "finite (support opp f s)")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2024	case False thus ?thesis apply(subst iterate_expand_cases,subst(2) iterate_expand_cases)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2025	unfolding * by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2026	next def su \<equiv> "support opp f s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2027	case True note support_subset[of opp f s]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2028	thus ?thesis apply- apply(subst iterate_support[THEN sym],subst(2) iterate_support[THEN sym]) unfolding * using True
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2029	unfolding su_def[symmetric]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2030	proof(induct su) case empty show ?case by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2031	next case (insert x s) show ?case unfolding iterate_insert[OF assms(1) insert(1)]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2032	unfolding if_not_P[OF insert(2)] apply(subst insert(3))
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2033	defer apply(subst assms(2)[of x]) using insert by auto qed qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2034
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2035	lemma nonempty_witness: assumes "s \<noteq> {}" obtains x where "x \<in> s" using assms by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2036
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2037	lemma operative_division: fixes f::"(real^'n) set \<Rightarrow> 'a"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2038	assumes "monoidal opp" "operative opp f" "d division_of {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2039	shows "iterate opp d f = f {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2040	proof- def C \<equiv> "card (division_points {a..b} d)" thus ?thesis using assms
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2041	proof(induct C arbitrary:a b d rule:full_nat_induct)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2042	case goal1
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2043	{ presume *:"content {a..b} \<noteq> 0 \<Longrightarrow> ?case"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2044	thus ?case apply-apply(cases) defer apply assumption
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2045	proof- assume as:"content {a..b} = 0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2046	show ?case unfolding operativeD(1)[OF assms(2) as] apply(rule iterate_eq_neutral[OF goal1(2)])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2047	proof fix x assume x:"x\<in>d"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2048	then guess u v apply(drule_tac division_ofD(4)[OF goal1(4)]) by(erule exE)+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2049	thus "f x = neutral opp" using division_of_content_0[OF as goal1(4)]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2050	using operativeD(1)[OF assms(2)] x by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2051	qed qed }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2052	assume "content {a..b} \<noteq> 0" note ab = this[unfolded content_lt_nz[THEN sym] content_pos_lt_eq]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2053	hence ab':"\<forall>i. a$i \<le> b$i" by (auto intro!: less_imp_le) show ?case
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2054	proof(cases "division_points {a..b} d = {}")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2055	case True have d':"\<forall>i\<in>d. \<exists>u v. i = {u..v} \<and>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2056	(\<forall>j. u$j = a$j \<and> v$j = a$j \<or> u$j = b$j \<and> v$j = b$j \<or> u$j = a$j \<and> v$j = b$j)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2057	unfolding forall_in_division[OF goal1(4)] apply(rule,rule,rule)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2058	apply(rule_tac x=a in exI,rule_tac x=b in exI) apply(rule,rule refl) apply(rule)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2059	proof- fix u v j assume as:"{u..v} \<in> d" note division_ofD(3)[OF goal1(4) this]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2060	hence uv:"\<forall>i. u$i \<le> v$i" "u$j \<le> v$j" unfolding interval_ne_empty by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2061	have *:"\<And>p r Q. p \<or> r \<or> (\<forall>x\<in>d. Q x) \<Longrightarrow> p \<or> r \<or> (Q {u..v})" using as by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2062	have "(j, u$j) \<notin> division_points {a..b} d"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2063	"(j, v$j) \<notin> division_points {a..b} d" using True by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2064	note this[unfolded de_Morgan_conj division_points_def mem_Collect_eq split_conv interval_bounds[OF ab'] bex_simps]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2065	note [OF this(1)] [OF this(2)] note this[unfolded interval_bounds[OF uv(1)]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2066	moreover have "a$j \<le> u$j" "v$j \<le> b$j" using division_ofD(2,2,3)[OF goal1(4) as]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2067	unfolding subset_eq apply- apply(erule_tac x=u in ballE,erule_tac[3] x=v in ballE)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2068	unfolding interval_ne_empty mem_interval by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2069	ultimately show "u$j = a$j \<and> v$j = a$j \<or> u$j = b$j \<and> v$j = b$j \<or> u$j = a$j \<and> v$j = b$j"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2070	unfolding not_less de_Morgan_disj using ab[rule_format,of j] uv(2) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2071	qed have "(1/2) *\<^sub>R (a+b) \<in> {a..b}" unfolding mem_interval using ab by(auto intro!:less_imp_le)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2072	note this[unfolded division_ofD(6)[OF goal1(4),THEN sym] Union_iff]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2073	then guess i .. note i=this guess u v using d'[rule_format,OF i(1)] apply-by(erule exE conjE)+ note uv=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2074	have "{a..b} \<in> d"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2075	proof- { presume "i = {a..b}" thus ?thesis using i by auto }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2076	{ presume "u = a" "v = b" thus "i = {a..b}" using uv by auto }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2077	show "u = a" "v = b" unfolding Cart_eq
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2078	proof(rule_tac[!] allI) fix j note i(2)[unfolded uv mem_interval,rule_format,of j]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2079	thus "u $ j = a $ j" "v $ j = b $ j" using uv(2)[rule_format,of j] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2080	qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2081	hence *:"d = insert {a..b} (d - {{a..b}})" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2082	have "iterate opp (d - {{a..b}}) f = neutral opp" apply(rule iterate_eq_neutral[OF goal1(2)])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2083	proof fix x assume x:"x \<in> d - {{a..b}}" hence "x\<in>d" by auto note d'[rule_format,OF this]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2084	then guess u v apply-by(erule exE conjE)+ note uv=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2085	have "u\<noteq>a \<or> v\<noteq>b" using x[unfolded uv] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2086	then obtain j where "u$j \<noteq> a$j \<or> v$j \<noteq> b$j" unfolding Cart_eq by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2087	hence "u$j = v$j" using uv(2)[rule_format,of j] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2088	hence "content {u..v} = 0" unfolding content_eq_0 apply(rule_tac x=j in exI) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2089	thus "f x = neutral opp" unfolding uv(1) by(rule operativeD(1)[OF goal1(3)])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2090	qed thus "iterate opp d f = f {a..b}" apply-apply(subst *)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2091	apply(subst iterate_insert[OF goal1(2)]) using goal1(2,4) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2092	next case False hence "\<exists>x. x\<in>division_points {a..b} d" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2093	then guess k c unfolding split_paired_Ex apply- unfolding division_points_def mem_Collect_eq split_conv
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2094	by(erule exE conjE)+ note kc=this[unfolded interval_bounds[OF ab']]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2095	from this(3) guess j .. note j=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2096	def d1 \<equiv> "{l \<inter> {x. x$k \<le> c} \| l. l \<in> d \<and> l \<inter> {x. x$k \<le> c} \<noteq> {}}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2097	def d2 \<equiv> "{l \<inter> {x. x$k \<ge> c} \| l. l \<in> d \<and> l \<inter> {x. x$k \<ge> c} \<noteq> {}}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2098	def cb \<equiv> "(\<chi> i. if i = k then c else b$i)" and ca \<equiv> "(\<chi> i. if i = k then c else a$i)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2099	note division_points_psubset[OF goal1(4) ab kc(1-2) j]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2100	note psubset_card_mono[OF _ this(1)] psubset_card_mono[OF _ this(2)]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2101	hence *:"(iterate opp d1 f) = f ({a..b} \<inter> {x. x$k \<le> c})" "(iterate opp d2 f) = f ({a..b} \<inter> {x. x$k \<ge> c})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2102	apply- unfolding interval_split apply(rule_tac[!] goal1(1)[rule_format])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2103	using division_split[OF goal1(4), where k=k and c=c]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2104	unfolding interval_split d1_def[symmetric] d2_def[symmetric] unfolding goal1(2) Suc_le_mono
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2105	using goal1(2-3) using division_points_finite[OF goal1(4)] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2106	have "f {a..b} = opp (iterate opp d1 f) (iterate opp d2 f)" (is "_ = ?prev")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2107	unfolding * apply(rule operativeD(2)) using goal1(3) .
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2108	also have "iterate opp d1 f = iterate opp d (\<lambda>l. f(l \<inter> {x. x$k \<le> c}))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2109	unfolding d1_def apply(rule iterate_nonzero_image_lemma[unfolded o_def])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2110	unfolding empty_as_interval apply(rule goal1 division_of_finite operativeD[OF goal1(3)])+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2111	unfolding empty_as_interval[THEN sym] apply(rule content_empty)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2112	proof(rule,rule,rule,erule conjE) fix l y assume as:"l \<in> d" "y \<in> d" "l \<inter> {x. x $ k \<le> c} = y \<inter> {x. x $ k \<le> c}" "l \<noteq> y"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2113	from division_ofD(4)[OF goal1(4) this(1)] guess u v apply-by(erule exE)+ note l=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2114	show "f (l \<inter> {x. x $ k \<le> c}) = neutral opp" unfolding l interval_split
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2115	apply(rule operativeD(1) goal1)+ unfolding interval_split[THEN sym] apply(rule division_split_left_inj)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2116	apply(rule goal1) unfolding l[THEN sym] apply(rule as(1),rule as(2)) by(rule as)+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2117	qed also have "iterate opp d2 f = iterate opp d (\<lambda>l. f(l \<inter> {x. x$k \<ge> c}))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2118	unfolding d2_def apply(rule iterate_nonzero_image_lemma[unfolded o_def])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2119	unfolding empty_as_interval apply(rule goal1 division_of_finite operativeD[OF goal1(3)])+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2120	unfolding empty_as_interval[THEN sym] apply(rule content_empty)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2121	proof(rule,rule,rule,erule conjE) fix l y assume as:"l \<in> d" "y \<in> d" "l \<inter> {x. c \<le> x $ k} = y \<inter> {x. c \<le> x $ k}" "l \<noteq> y"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2122	from division_ofD(4)[OF goal1(4) this(1)] guess u v apply-by(erule exE)+ note l=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2123	show "f (l \<inter> {x. x $ k \<ge> c}) = neutral opp" unfolding l interval_split
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2124	apply(rule operativeD(1) goal1)+ unfolding interval_split[THEN sym] apply(rule division_split_right_inj)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2125	apply(rule goal1) unfolding l[THEN sym] apply(rule as(1),rule as(2)) by(rule as)+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2126	qed also have *:"\<forall>x\<in>d. f x = opp (f (x \<inter> {x. x $ k \<le> c})) (f (x \<inter> {x. c \<le> x $ k}))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2127	unfolding forall_in_division[OF goal1(4)] apply(rule,rule,rule,rule operativeD(2)) using goal1(3) .
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2128	have "opp (iterate opp d (\<lambda>l. f (l \<inter> {x. x $ k \<le> c}))) (iterate opp d (\<lambda>l. f (l \<inter> {x. c \<le> x $ k})))
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2129	= iterate opp d f" apply(subst(3) iterate_eq[OF _ *[rule_format]]) prefer 3
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2130	apply(rule iterate_op[THEN sym]) using goal1 by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2131	finally show ?thesis by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2132	qed qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2133
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2134	lemma iterate_image_nonzero: assumes "monoidal opp"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2135	"finite s" "\<forall>x\<in>s. \<forall>y\<in>s. ~(x = y) \<and> f x = f y \<longrightarrow> g(f x) = neutral opp"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2136	shows "iterate opp (f ` s) g = iterate opp s (g \<circ> f)" using assms
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2137	proof(induct rule:finite_subset_induct[OF assms(2) subset_refl])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2138	case goal1 show ?case using assms(1) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2139	next case goal2 have *:"\<And>x y. y = neutral opp \<Longrightarrow> x = opp y x" using assms(1) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2140	show ?case unfolding image_insert apply(subst iterate_insert[OF assms(1)])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2141	apply(rule finite_imageI goal2)+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2142	apply(cases "f a \<in> f ` F") unfolding if_P if_not_P apply(subst goal2(4)[OF assms(1) goal2(1)]) defer
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2143	apply(subst iterate_insert[OF assms(1) goal2(1)]) defer
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2144	apply(subst iterate_insert[OF assms(1) goal2(1)])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2145	unfolding if_not_P[OF goal2(3)] defer unfolding image_iff defer apply(erule bexE)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2146	apply(rule *) unfolding o_def apply(rule_tac y=x in goal2(7)[rule_format])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2147	using goal2 unfolding o_def by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2148
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2149	lemma operative_tagged_division: assumes "monoidal opp" "operative opp f" "d tagged_division_of {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2150	shows "iterate(opp) d (\<lambda>(x,l). f l) = f {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2151	proof- have *:"(\<lambda>(x,l). f l) = (f o snd)" unfolding o_def by(rule,auto) note assm = tagged_division_ofD[OF assms(3)]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2152	have "iterate(opp) d (\<lambda>(x,l). f l) = iterate opp (snd ` d) f" unfolding *
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2153	apply(rule iterate_image_nonzero[THEN sym,OF assms(1)]) apply(rule tagged_division_of_finite assms)+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2154	unfolding Ball_def split_paired_All snd_conv apply(rule,rule,rule,rule,rule,rule,rule,erule conjE)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2155	proof- fix a b aa ba assume as:"(a, b) \<in> d" "(aa, ba) \<in> d" "(a, b) \<noteq> (aa, ba)" "b = ba"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2156	guess u v using assm(4)[OF as(1)] apply-by(erule exE)+ note uv=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2157	show "f b = neutral opp" unfolding uv apply(rule operativeD(1)[OF assms(2)])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2158	unfolding content_eq_0_interior using tagged_division_ofD(5)[OF assms(3) as(1-3)]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2159	unfolding as(4)[THEN sym] uv by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2160	qed also have "\<dots> = f {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2161	using operative_division[OF assms(1-2) division_of_tagged_division[OF assms(3)]] .
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2162	finally show ?thesis . qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2163
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2164	subsection {* Additivity of content. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2165
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2166	lemma setsum_iterate:assumes "finite s" shows "setsum f s = iterate op + s f"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2167	proof- have *:"setsum f s = setsum f (support op + f s)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2168	apply(rule setsum_mono_zero_right)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2169	unfolding support_def neutral_monoid using assms by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2170	thus ?thesis unfolding * setsum_def iterate_def fold_image_def fold'_def
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2171	unfolding neutral_monoid . qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2172
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2173	lemma additive_content_division: assumes "d division_of {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2174	shows "setsum content d = content({a..b})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2175	unfolding operative_division[OF monoidal_monoid operative_content assms,THEN sym]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2176	apply(subst setsum_iterate) using assms by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2177
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2178	lemma additive_content_tagged_division:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2179	assumes "d tagged_division_of {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2180	shows "setsum (\<lambda>(x,l). content l) d = content({a..b})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2181	unfolding operative_tagged_division[OF monoidal_monoid operative_content assms,THEN sym]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2182	apply(subst setsum_iterate) using assms by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2183
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2184	subsection {* Finally, the integral of a constant\<forall> *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2185
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2186	lemma has_integral_const[intro]:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2187	"((\<lambda>x. c) has_integral (content({a..b::real^'n}) *\<^sub>R c)) ({a..b})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2188	unfolding has_integral apply(rule,rule,rule_tac x="\<lambda>x. ball x 1" in exI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2189	apply(rule,rule gauge_trivial)apply(rule,rule,erule conjE)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2190	unfolding split_def apply(subst scaleR_left.setsum[THEN sym, unfolded o_def])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2191	defer apply(subst additive_content_tagged_division[unfolded split_def]) apply assumption by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2192
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2193	subsection {* Bounds on the norm of Riemann sums and the integral itself. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2194
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2195	lemma dsum_bound: assumes "p division_of {a..b}" "norm(c) \<le> e"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2196	shows "norm(setsum (\<lambda>l. content l \<^sub>R c) p) \<le> e content({a..b})" (is "?l \<le> ?r")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2197	apply(rule order_trans,rule setsum_norm) defer unfolding norm_scaleR setsum_left_distrib[THEN sym]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2198	apply(rule order_trans[OF mult_left_mono],rule assms,rule setsum_abs_ge_zero)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2199	apply(subst real_mult_commute) apply(rule mult_left_mono)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2200	apply(rule order_trans[of _ "setsum content p"]) apply(rule eq_refl,rule setsum_cong2)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2201	apply(subst abs_of_nonneg) unfolding additive_content_division[OF assms(1)]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2202	proof- from order_trans[OF norm_ge_zero[of c] assms(2)] show "0 \<le> e" .
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2203	fix x assume "x\<in>p" from division_ofD(4)[OF assms(1) this] guess u v apply-by(erule exE)+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2204	thus "0 \<le> content x" using content_pos_le by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2205	qed(insert assms,auto)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2206
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2207	lemma rsum_bound: assumes "p tagged_division_of {a..b}" "\<forall>x\<in>{a..b}. norm(f x) \<le> e"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2208	shows "norm(setsum (\<lambda>(x,k). content k \<^sub>R f x) p) \<le> e content({a..b})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2209	proof(cases "{a..b} = {}") case True
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2210	show ?thesis using assms(1) unfolding True tagged_division_of_trivial by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2211	next case False show ?thesis
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2212	apply(rule order_trans,rule setsum_norm) defer unfolding split_def norm_scaleR
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2213	apply(rule order_trans[OF setsum_mono]) apply(rule mult_left_mono[OF _ abs_ge_zero, of _ e]) defer
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2214	unfolding setsum_left_distrib[THEN sym] apply(subst real_mult_commute) apply(rule mult_left_mono)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2215	apply(rule order_trans[of _ "setsum (content \<circ> snd) p"]) apply(rule eq_refl,rule setsum_cong2)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2216	apply(subst o_def, rule abs_of_nonneg)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2217	proof- show "setsum (content \<circ> snd) p \<le> content {a..b}" apply(rule eq_refl)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2218	unfolding additive_content_tagged_division[OF assms(1),THEN sym] split_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2219	guess w using nonempty_witness[OF False] .
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2220	thus "e\<ge>0" apply-apply(rule order_trans) defer apply(rule assms(2)[rule_format],assumption) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2221	fix xk assume :"xk\<in>p" guess x k using surj_pair[of xk] apply-by(erule exE)+ note xk = this [unfolded this]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2222	from tagged_division_ofD(4)[OF assms(1) xk(2)] guess u v apply-by(erule exE)+ note uv=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2223	show "0\<le> content (snd xk)" unfolding xk snd_conv uv by(rule content_pos_le)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2224	show "norm (f (fst xk)) \<le> e" unfolding xk fst_conv using tagged_division_ofD(2,3)[OF assms(1) xk(2)] assms(2) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2225	qed(insert assms,auto) qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2226
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2227	lemma rsum_diff_bound:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2228	assumes "p tagged_division_of {a..b}" "\<forall>x\<in>{a..b}. norm(f x - g x) \<le> e"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2229	shows "norm(setsum (\<lambda>(x,k). content k \<^sub>R f x) p - setsum (\<lambda>(x,k). content k \<^sub>R g x) p) \<le> e * content({a..b})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2230	apply(rule order_trans[OF _ rsum_bound[OF assms]]) apply(rule eq_refl) apply(rule arg_cong[where f=norm])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2231	unfolding setsum_subtractf[THEN sym] apply(rule setsum_cong2) unfolding scaleR.diff_right by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2232
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2233	lemma has_integral_bound: fixes f::"real^'n \<Rightarrow> 'a::real_normed_vector"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2234	assumes "0 \<le> B" "(f has_integral i) ({a..b})" "\<forall>x\<in>{a..b}. norm(f x) \<le> B"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2235	shows "norm i \<le> B * content {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2236	proof- let ?P = "content {a..b} > 0" { presume "?P \<Longrightarrow> ?thesis"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2237	thus ?thesis proof(cases ?P) case False
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2238	hence *:"content {a..b} = 0" using content_lt_nz by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2239	hence **:"i = 0" using assms(2) apply(subst has_integral_null_eq[THEN sym]) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2240	show ?thesis unfolding * ** using assms(1) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2241	qed auto } assume ab:?P
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2242	{ presume "\<not> ?thesis \<Longrightarrow> False" thus ?thesis by auto }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2243	assume "\<not> ?thesis" hence :"norm i - B content {a..b} > 0" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2244	from assms(2)[unfolded has_integral,rule_format,OF *] guess d apply-by(erule exE conjE)+ note d=this[rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2245	from fine_division_exists[OF this(1), of a b] guess p . note p=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2246	have *:"\<And>s B. norm s \<le> B \<Longrightarrow> \<not> (norm (s - i) < norm i - B)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2247	proof- case goal1 thus ?case unfolding not_less
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2248	using norm_triangle_sub[of i s] unfolding norm_minus_commute by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2249	qed show False using d(2)[OF conjI[OF p]] *[OF rsum_bound[OF p(1) assms(3)]] by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2250
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2251	subsection {* Similar theorems about relationship among components. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2252
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2253	lemma rsum_component_le: fixes f::"real^'n \<Rightarrow> real^'m"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2254	assumes "p tagged_division_of {a..b}" "\<forall>x\<in>{a..b}. (f x)$i \<le> (g x)$i"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2255	shows "(setsum (\<lambda>(x,k). content k \<^sub>R f x) p)$i \<le> (setsum (\<lambda>(x,k). content k \<^sub>R g x) p)$i"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2256	unfolding setsum_component apply(rule setsum_mono)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2257	apply(rule mp) defer apply assumption apply(induct_tac x,rule) unfolding split_conv
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2258	proof- fix a b assume ab:"(a,b) \<in> p" note assm = tagged_division_ofD(2-4)[OF assms(1) ab]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2259	from this(3) guess u v apply-by(erule exE)+ note b=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2260	show "(content b \<^sub>R f a) $ i \<le> (content b \<^sub>R g a) $ i" unfolding b
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2261	unfolding Cart_nth.scaleR real_scaleR_def apply(rule mult_left_mono)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2262	defer apply(rule content_pos_le,rule assms(2)[rule_format]) using assm by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2263
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2264	lemma has_integral_component_le: fixes f::"real^'n \<Rightarrow> real^'m"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2265	assumes "(f has_integral i) s" "(g has_integral j) s" "\<forall>x\<in>s. (f x)$k \<le> (g x)$k"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2266	shows "i$k \<le> j$k"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2267	proof- have lem:"\<And>a b g i j. \<And>f::real^'n \<Rightarrow> real^'m. (f has_integral i) ({a..b}) \<Longrightarrow>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2268	(g has_integral j) ({a..b}) \<Longrightarrow> \<forall>x\<in>{a..b}. (f x)$k \<le> (g x)$k \<Longrightarrow> i$k \<le> j$k"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2269	proof(rule ccontr) case goal1 hence *:"0 < (i$k - j$k) / 3" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2270	guess d1 using goal1(1)[unfolded has_integral,rule_format,OF *] apply-by(erule exE conjE)+ note d1=this[rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2271	guess d2 using goal1(2)[unfolded has_integral,rule_format,OF *] apply-by(erule exE conjE)+ note d2=this[rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2272	guess p using fine_division_exists[OF gauge_inter[OF d1(1) d2(1)], of a b] unfolding fine_inter .
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2273	note p = this(1) conjunctD2[OF this(2)] note le_less_trans[OF component_le_norm, of _ _ k]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2274	note this[OF d1(2)[OF conjI[OF p(1,2)]]] this[OF d2(2)[OF conjI[OF p(1,3)]]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2275	thus False unfolding Cart_nth.diff using rsum_component_le[OF p(1) goal1(3)] by smt
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2276	qed let ?P = "\<exists>a b. s = {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2277	{ presume "\<not> ?P \<Longrightarrow> ?thesis" thus ?thesis proof(cases ?P)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2278	case True then guess a b apply-by(erule exE)+ note s=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2279	show ?thesis apply(rule lem) using assms[unfolded s] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2280	qed auto } assume as:"\<not> ?P"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2281	{ presume "\<not> ?thesis \<Longrightarrow> False" thus ?thesis by auto }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2282	assume "\<not> i$k \<le> j$k" hence ij:"(i$k - j$k) / 3 > 0" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2283	note has_integral_altD[OF _ as this] from this[OF assms(1)] this[OF assms(2)] guess B1 B2 . note B=this[rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2284	have "bounded (ball 0 B1 \<union> ball (0::real^'n) B2)" unfolding bounded_Un by(rule conjI bounded_ball)+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2285	from bounded_subset_closed_interval[OF this] guess a b apply- by(erule exE)+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2286	note ab = conjunctD2[OF this[unfolded Un_subset_iff]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2287	guess w1 using B(2)[OF ab(1)] .. note w1=conjunctD2[OF this]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2288	guess w2 using B(4)[OF ab(2)] .. note w2=conjunctD2[OF this]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2289	have :"\<And>w1 w2 j i::real .\<bar>w1 - i\<bar> < (i - j) / 3 \<Longrightarrow> \<bar>w2 - j\<bar> < (i - j) / 3 \<Longrightarrow> w1 \<le> w2 \<Longrightarrow> False" by smt(SMTSMT*)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2290	note le_less_trans[OF component_le_norm[of _ k]] note this[OF w1(2)] this[OF w2(2)] moreover
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2291	have "w1$k \<le> w2$k" apply(rule lem[OF w1(1) w2(1)]) using assms by auto ultimately
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2292	show False unfolding Cart_nth.diff by(rule *) qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2293
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2294	lemma integral_component_le: fixes f::"real^'n \<Rightarrow> real^'m"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2295	assumes "f integrable_on s" "g integrable_on s" "\<forall>x\<in>s. (f x)$k \<le> (g x)$k"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2296	shows "(integral s f)$k \<le> (integral s g)$k"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2297	apply(rule has_integral_component_le) using integrable_integral assms by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2298
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2299	lemma has_integral_dest_vec1_le: fixes f::"real^'n \<Rightarrow> real^1"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2300	assumes "(f has_integral i) s" "(g has_integral j) s" "\<forall>x\<in>s. f x \<le> g x"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2301	shows "dest_vec1 i \<le> dest_vec1 j" apply(rule has_integral_component_le[OF assms(1-2)])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2302	using assms(3) unfolding vector_le_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2303
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2304	lemma integral_dest_vec1_le: fixes f::"real^'n \<Rightarrow> real^1"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2305	assumes "f integrable_on s" "g integrable_on s" "\<forall>x\<in>s. f x \<le> g x"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2306	shows "dest_vec1(integral s f) \<le> dest_vec1(integral s g)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2307	apply(rule has_integral_dest_vec1_le) apply(rule_tac[1-2] integrable_integral) using assms by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2308
36243 027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	2309	lemma has_integral_component_nonneg: fixes f::"real^'n \<Rightarrow> real^'m"
35172 579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2310	assumes "(f has_integral i) s" "\<forall>x\<in>s. 0 \<le> (f x)$k" shows "0 \<le> i$k"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2311	using has_integral_component_le[OF has_integral_0 assms(1)] using assms(2) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2312
36243 027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	2313	lemma integral_component_nonneg: fixes f::"real^'n \<Rightarrow> real^'m"
35172 579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2314	assumes "f integrable_on s" "\<forall>x\<in>s. 0 \<le> (f x)$k" shows "0 \<le> (integral s f)$k"
36243 027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	2315	apply(rule has_integral_component_nonneg) using assms by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	2316
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	2317	lemma has_integral_dest_vec1_nonneg: fixes f::"real^'n \<Rightarrow> real^1"
35172 579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2318	assumes "(f has_integral i) s" "\<forall>x\<in>s. 0 \<le> f x" shows "0 \<le> i"
36243 027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	2319	using has_integral_component_nonneg[OF assms(1), of 1]
35172 579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2320	using assms(2) unfolding vector_le_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2321
36243 027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	2322	lemma integral_dest_vec1_nonneg: fixes f::"real^'n \<Rightarrow> real^1"
35172 579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2323	assumes "f integrable_on s" "\<forall>x\<in>s. 0 \<le> f x" shows "0 \<le> integral s f"
36243 027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	2324	apply(rule has_integral_dest_vec1_nonneg) using assms by auto
35172 579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2325
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2326	lemma has_integral_component_neg: fixes f::"real^'n \<Rightarrow> real^'m"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2327	assumes "(f has_integral i) s" "\<forall>x\<in>s. (f x)$k \<le> 0" shows "i$k \<le> 0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2328	using has_integral_component_le[OF assms(1) has_integral_0] assms(2) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2329
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2330	lemma has_integral_dest_vec1_neg: fixes f::"real^'n \<Rightarrow> real^1"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2331	assumes "(f has_integral i) s" "\<forall>x\<in>s. f x \<le> 0" shows "i \<le> 0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2332	using has_integral_component_neg[OF assms(1),of 1] using assms(2) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2333
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2334	lemma has_integral_component_lbound:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2335	assumes "(f has_integral i) {a..b}" "\<forall>x\<in>{a..b}. B \<le> f(x)$k" shows "B * content {a..b} \<le> i$k"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2336	using has_integral_component_le[OF has_integral_const assms(1),of "(\<chi> i. B)" k] assms(2)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2337	unfolding Cart_lambda_beta vector_scaleR_component by(auto simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2338
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2339	lemma has_integral_component_ubound:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2340	assumes "(f has_integral i) {a..b}" "\<forall>x\<in>{a..b}. f x$k \<le> B"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2341	shows "i$k \<le> B * content({a..b})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2342	using has_integral_component_le[OF assms(1) has_integral_const, of k "vec B"]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2343	unfolding vec_component Cart_nth.scaleR using assms(2) by(auto simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2344
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2345	lemma integral_component_lbound:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2346	assumes "f integrable_on {a..b}" "\<forall>x\<in>{a..b}. B \<le> f(x)$k"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2347	shows "B * content({a..b}) \<le> (integral({a..b}) f)$k"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2348	apply(rule has_integral_component_lbound) using assms unfolding has_integral_integral by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2349
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2350	lemma integral_component_ubound:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2351	assumes "f integrable_on {a..b}" "\<forall>x\<in>{a..b}. f(x)$k \<le> B"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2352	shows "(integral({a..b}) f)$k \<le> B * content({a..b})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2353	apply(rule has_integral_component_ubound) using assms unfolding has_integral_integral by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2354
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2355	subsection {* Uniform limit of integrable functions is integrable. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2356
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2357	lemma real_arch_invD:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2358	"0 < (e::real) \<Longrightarrow> (\<exists>n::nat. n \<noteq> 0 \<and> 0 < inverse (real n) \<and> inverse (real n) < e)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2359	by(subst(asm) real_arch_inv)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2360
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2361	lemma integrable_uniform_limit: fixes f::"real^'n \<Rightarrow> 'a::banach"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2362	assumes "\<forall>e>0. \<exists>g. (\<forall>x\<in>{a..b}. norm(f x - g x) \<le> e) \<and> g integrable_on {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2363	shows "f integrable_on {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2364	proof- { presume *:"content {a..b} > 0 \<Longrightarrow> ?thesis"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2365	show ?thesis apply cases apply(rule *,assumption)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2366	unfolding content_lt_nz integrable_on_def using has_integral_null by auto }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2367	assume as:"content {a..b} > 0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2368	have *:"\<And>P. \<forall>e>(0::real). P e \<Longrightarrow> \<forall>n::nat. P (inverse (real n+1))" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2369	from choice[OF *[OF assms]] guess g .. note g=conjunctD2[OF this[rule_format],rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2370	from choice[OF allI[OF g(2)[unfolded integrable_on_def], of "\<lambda>x. x"]] guess i .. note i=this[rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2371
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2372	have "Cauchy i" unfolding Cauchy_def
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2373	proof(rule,rule) fix e::real assume "e>0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2374	hence "e / 4 / content {a..b} > 0" using as by(auto simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2375	then guess M apply-apply(subst(asm) real_arch_inv) by(erule exE conjE)+ note M=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2376	show "\<exists>M. \<forall>m\<ge>M. \<forall>n\<ge>M. dist (i m) (i n) < e" apply(rule_tac x=M in exI,rule,rule,rule,rule)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2377	proof- case goal1 have "e/4>0" using `e>0` by auto note * = i[unfolded has_integral,rule_format,OF this]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2378	from *[of m] guess gm apply-by(erule conjE exE)+ note gm=this[rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2379	from *[of n] guess gn apply-by(erule conjE exE)+ note gn=this[rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2380	from fine_division_exists[OF gauge_inter[OF gm(1) gn(1)], of a b] guess p . note p=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2381	have lem2:"\<And>s1 s2 i1 i2. norm(s2 - s1) \<le> e/2 \<Longrightarrow> norm(s1 - i1) < e / 4 \<Longrightarrow> norm(s2 - i2) < e / 4 \<Longrightarrow>norm(i1 - i2) < e"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2382	proof- case goal1 have "norm (i1 - i2) \<le> norm (i1 - s1) + norm (s1 - s2) + norm (s2 - i2)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2383	using norm_triangle_ineq[of "i1 - s1" "s1 - i2"]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2384	using norm_triangle_ineq[of "s1 - s2" "s2 - i2"] by(auto simp add:group_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2385	also have "\<dots> < e" using goal1 unfolding norm_minus_commute by(auto simp add:group_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2386	finally show ?case .
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2387	qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2388	show ?case unfolding vector_dist_norm apply(rule lem2) defer
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2389	apply(rule gm(2)[OF conjI[OF p(1)]],rule_tac[2] gn(2)[OF conjI[OF p(1)]])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2390	using conjunctD2[OF p(2)[unfolded fine_inter]] apply- apply assumption+ apply(rule order_trans)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2391	apply(rule rsum_diff_bound[OF p(1), where e="2 / real M"])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2392	proof show "2 / real M * content {a..b} \<le> e / 2" unfolding divide_inverse
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2393	using M as by(auto simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2394	fix x assume x:"x \<in> {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2395	have "norm (f x - g n x) + norm (f x - g m x) \<le> inverse (real n + 1) + inverse (real m + 1)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2396	using g(1)[OF x, of n] g(1)[OF x, of m] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2397	also have "\<dots> \<le> inverse (real M) + inverse (real M)" apply(rule add_mono)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2398	apply(rule_tac[!] le_imp_inverse_le) using goal1 M by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2399	also have "\<dots> = 2 / real M" unfolding real_divide_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2400	finally show "norm (g n x - g m x) \<le> 2 / real M"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2401	using norm_triangle_le[of "g n x - f x" "f x - g m x" "2 / real M"]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2402	by(auto simp add:group_simps simp add:norm_minus_commute)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2403	qed qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2404	from this[unfolded convergent_eq_cauchy[THEN sym]] guess s .. note s=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2405
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2406	show ?thesis unfolding integrable_on_def apply(rule_tac x=s in exI) unfolding has_integral
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2407	proof(rule,rule)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2408	case goal1 hence *:"e/3 > 0" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2409	from s[unfolded Lim_sequentially,rule_format,OF this] guess N1 .. note N1=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2410	from goal1 as have "e / 3 / content {a..b} > 0" by(auto simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2411	from real_arch_invD[OF this] guess N2 apply-by(erule exE conjE)+ note N2=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2412	from i[of "N1 + N2",unfolded has_integral,rule_format,OF *] guess g' .. note g'=conjunctD2[OF this,rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2413	have lem:"\<And>sf sg i. norm(sf - sg) \<le> e / 3 \<Longrightarrow> norm(i - s) < e / 3 \<Longrightarrow> norm(sg - i) < e / 3 \<Longrightarrow> norm(sf - s) < e"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2414	proof- case goal1 have "norm (sf - s) \<le> norm (sf - sg) + norm (sg - i) + norm (i - s)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2415	using norm_triangle_ineq[of "sf - sg" "sg - s"]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2416	using norm_triangle_ineq[of "sg - i" " i - s"] by(auto simp add:group_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2417	also have "\<dots> < e" using goal1 unfolding norm_minus_commute by(auto simp add:group_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2418	finally show ?case .
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2419	qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2420	show ?case apply(rule_tac x=g' in exI) apply(rule,rule g')
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2421	proof(rule,rule) fix p assume p:"p tagged_division_of {a..b} \<and> g' fine p" note * = g'(2)[OF this]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2422	show "norm ((\<Sum>(x, k)\<in>p. content k \<^sub>R f x) - s) < e" apply-apply(rule lem[OF _ _ ])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2423	apply(rule order_trans,rule rsum_diff_bound[OF p[THEN conjunct1]]) apply(rule,rule g,assumption)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2424	proof- have "content {a..b} < e / 3 * (real N2)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2425	using N2 unfolding inverse_eq_divide using as by(auto simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2426	hence "content {a..b} < e / 3 * (real (N1 + N2) + 1)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2427	apply-apply(rule less_le_trans,assumption) using `e>0` by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2428	thus "inverse (real (N1 + N2) + 1) * content {a..b} \<le> e / 3"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2429	unfolding inverse_eq_divide by(auto simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2430	show "norm (i (N1 + N2) - s) < e / 3" by(rule N1[rule_format,unfolded vector_dist_norm],auto)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2431	qed qed qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2432
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2433	subsection {* Negligible sets. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2434
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2435	definition "indicator s \<equiv> (\<lambda>x. if x \<in> s then 1 else (0::real))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2436
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2437	lemma dest_vec1_indicator:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2438	"indicator s x = (if x \<in> s then 1 else 0)" unfolding indicator_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2439
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2440	lemma indicator_pos_le[intro]: "0 \<le> (indicator s x)" unfolding indicator_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2441
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2442	lemma indicator_le_1[intro]: "(indicator s x) \<le> 1" unfolding indicator_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2443
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2444	lemma dest_vec1_indicator_abs_le_1: "abs(indicator s x) \<le> 1"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2445	unfolding indicator_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2446
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2447	definition "negligible (s::(real^'n) set) \<equiv> (\<forall>a b. ((indicator s) has_integral 0) {a..b})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2448
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2449	lemma indicator_simps[simp]:"x\<in>s \<Longrightarrow> indicator s x = 1" "x\<notin>s \<Longrightarrow> indicator s x = 0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2450	unfolding indicator_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2451
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2452	subsection {* Negligibility of hyperplane. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2453
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2454	lemma vsum_nonzero_image_lemma:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2455	assumes "finite s" "g(a) = 0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2456	"\<forall>x\<in>s. \<forall>y\<in>s. f x = f y \<and> x \<noteq> y \<longrightarrow> g(f x) = 0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2457	shows "setsum g {f x \|x. x \<in> s \<and> f x \<noteq> a} = setsum (g o f) s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2458	unfolding setsum_iterate[OF assms(1)] apply(subst setsum_iterate) defer
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2459	apply(rule iterate_nonzero_image_lemma) apply(rule assms monoidal_monoid)+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2460	unfolding assms using neutral_add unfolding neutral_add using assms by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2461
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2462	lemma interval_doublesplit: shows "{a..b} \<inter> {x . abs(x$k - c) \<le> (e::real)} =
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2463	{(\<chi> i. if i = k then max (a$k) (c - e) else a$i) .. (\<chi> i. if i = k then min (b$k) (c + e) else b$i)}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2464	proof- have *:"\<And>x c e::real. abs(x - c) \<le> e \<longleftrightarrow> x \<ge> c - e \<and> x \<le> c + e" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2465	have **:"\<And>s P Q. s \<inter> {x. P x \<and> Q x} = (s \<inter> {x. Q x}) \<inter> {x. P x}" by blast
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2466	show ?thesis unfolding * ** interval_split by(rule refl) qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2467
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2468	lemma division_doublesplit: assumes "p division_of {a..b::real^'n}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2469	shows "{l \<inter> {x. abs(x$k - c) \<le> e} \|l. l \<in> p \<and> l \<inter> {x. abs(x$k - c) \<le> e} \<noteq> {}} division_of ({a..b} \<inter> {x. abs(x$k - c) \<le> e})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2470	proof- have *:"\<And>x c. abs(x - c) \<le> e \<longleftrightarrow> x \<ge> c - e \<and> x \<le> c + e" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2471	have **:"\<And>p q p' q'. p division_of q \<Longrightarrow> p = p' \<Longrightarrow> q = q' \<Longrightarrow> p' division_of q'" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2472	note division_split(1)[OF assms, where c="c+e" and k=k,unfolded interval_split]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2473	note division_split(2)[OF this, where c="c-e" and k=k]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2474	thus ?thesis apply(rule *) unfolding interval_doublesplit unfolding unfolding interval_split interval_doublesplit
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2475	apply(rule set_ext) unfolding mem_Collect_eq apply rule apply(erule conjE exE)+ apply(rule_tac x=la in exI) defer
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2476	apply(erule conjE exE)+ apply(rule_tac x="l \<inter> {x. c + e \<ge> x $ k}" in exI) apply rule defer apply rule
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2477	apply(rule_tac x=l in exI) by blast+ qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2478
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2479	lemma content_doublesplit: assumes "0 < e"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2480	obtains d where "0 < d" "content({a..b} \<inter> {x. abs(x$k - c) \<le> d}) < e"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2481	proof(cases "content {a..b} = 0")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2482	case True show ?thesis apply(rule that[of 1]) defer unfolding interval_doublesplit
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2483	apply(rule le_less_trans[OF content_subset]) defer apply(subst True)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2484	unfolding interval_doublesplit[THEN sym] using assms by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2485	next case False def d \<equiv> "e / 3 / setprod (\<lambda>i. b$i - a$i) (UNIV - {k})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2486	note False[unfolded content_eq_0 not_ex not_le, rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2487	hence prod0:"0 < setprod (\<lambda>i. b$i - a$i) (UNIV - {k})" apply-apply(rule setprod_pos) by smt
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2488	hence "d > 0" unfolding d_def using assms by(auto simp add:field_simps) thus ?thesis
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2489	proof(rule that[of d]) have *:"UNIV = insert k (UNIV - {k})" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2490	have **:"{a..b} \<inter> {x. \<bar>x $ k - c\<bar> \<le> d} \<noteq> {} \<Longrightarrow>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2491	(\<Prod>i\<in>UNIV - {k}. interval_upperbound ({a..b} \<inter> {x. \<bar>x $ k - c\<bar> \<le> d}) $ i - interval_lowerbound ({a..b} \<inter> {x. \<bar>x $ k - c\<bar> \<le> d}) $ i)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2492	= (\<Prod>i\<in>UNIV - {k}. b$i - a$i)" apply(rule setprod_cong,rule refl)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2493	unfolding interval_doublesplit interval_eq_empty not_ex not_less unfolding interval_bounds by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2494	show "content ({a..b} \<inter> {x. \<bar>x $ k - c\<bar> \<le> d}) < e" apply(cases) unfolding content_def apply(subst if_P,assumption,rule assms)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2495	unfolding if_not_P apply(subst ) apply(subst setprod_insert) unfolding *
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2496	unfolding interval_doublesplit interval_eq_empty not_ex not_less unfolding interval_bounds unfolding Cart_lambda_beta if_P[OF refl]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2497	proof- have "(min (b $ k) (c + d) - max (a $ k) (c - d)) \<le> 2 * d" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2498	also have "... < e / (\<Prod>i\<in>UNIV - {k}. b $ i - a $ i)" unfolding d_def using assms prod0 by(auto simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2499	finally show "(min (b $ k) (c + d) - max (a $ k) (c - d)) * (\<Prod>i\<in>UNIV - {k}. b $ i - a $ i) < e"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2500	unfolding pos_less_divide_eq[OF prod0] . qed auto qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2501
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2502	lemma negligible_standard_hyperplane[intro]: "negligible {x. x$k = (c::real)}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2503	unfolding negligible_def has_integral apply(rule,rule,rule,rule)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2504	proof- case goal1 from content_doublesplit[OF this,of a b k c] guess d . note d=this let ?i = "indicator {x. x$k = c}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2505	show ?case apply(rule_tac x="\<lambda>x. ball x d" in exI) apply(rule,rule gauge_ball,rule d)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2506	proof(rule,rule) fix p assume p:"p tagged_division_of {a..b} \<and> (\<lambda>x. ball x d) fine p"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2507	have :"(\<Sum>(x, ka)\<in>p. content ka \<^sub>R ?i x) = (\<Sum>(x, ka)\<in>p. content (ka \<inter> {x. abs(x$k - c) \<le> d}) *\<^sub>R ?i x)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2508	apply(rule setsum_cong2) unfolding split_paired_all real_scaleR_def mult_cancel_right split_conv
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2509	apply(cases,rule disjI1,assumption,rule disjI2)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2510	proof- fix x l assume as:"(x,l)\<in>p" "?i x \<noteq> 0" hence xk:"x$k = c" unfolding indicator_def apply-by(rule ccontr,auto)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2511	show "content l = content (l \<inter> {x. \<bar>x $ k - c\<bar> \<le> d})" apply(rule arg_cong[where f=content])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2512	apply(rule set_ext,rule,rule) unfolding mem_Collect_eq
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2513	proof- fix y assume y:"y\<in>l" note p[THEN conjunct2,unfolded fine_def,rule_format,OF as(1),unfolded split_conv]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2514	note this[unfolded subset_eq mem_ball vector_dist_norm,rule_format,OF y] note le_less_trans[OF component_le_norm[of _ k] this]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2515	thus "\<bar>y $ k - c\<bar> \<le> d" unfolding Cart_nth.diff xk by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2516	qed auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2517	note p'= tagged_division_ofD[OF p[THEN conjunct1]] and p''=division_of_tagged_division[OF p[THEN conjunct1]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2518	show "norm ((\<Sum>(x, ka)\<in>p. content ka \<^sub>R ?i x) - 0) < e" unfolding diff_0_right unfolding real_scaleR_def real_norm_def
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2519	apply(subst abs_of_nonneg) apply(rule setsum_nonneg,rule) unfolding split_paired_all split_conv
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2520	apply(rule mult_nonneg_nonneg) apply(drule p'(4)) apply(erule exE)+ apply(rule_tac b=b in back_subst)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2521	prefer 2 apply(subst(asm) eq_commute) apply assumption
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2522	apply(subst interval_doublesplit) apply(rule content_pos_le) apply(rule indicator_pos_le)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2523	proof- have "(\<Sum>(x, ka)\<in>p. content (ka \<inter> {x. \<bar>x $ k - c\<bar> \<le> d}) * ?i x) \<le> (\<Sum>(x, ka)\<in>p. content (ka \<inter> {x. \<bar>x $ k - c\<bar> \<le> d}))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2524	apply(rule setsum_mono) unfolding split_paired_all split_conv
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2525	apply(rule mult_right_le_one_le) apply(drule p'(4)) by(auto simp add:interval_doublesplit intro!:content_pos_le)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2526	also have "... < e" apply(subst setsum_over_tagged_division_lemma[OF p[THEN conjunct1]])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2527	proof- case goal1 have "content ({u..v} \<inter> {x. \<bar>x $ k - c\<bar> \<le> d}) \<le> content {u..v}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2528	unfolding interval_doublesplit apply(rule content_subset) unfolding interval_doublesplit[THEN sym] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2529	thus ?case unfolding goal1 unfolding interval_doublesplit using content_pos_le by smt
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2530	next have *:"setsum content {l \<inter> {x. \<bar>x $ k - c\<bar> \<le> d} \|l. l \<in> snd ` p \<and> l \<inter> {x. \<bar>x $ k - c\<bar> \<le> d} \<noteq> {}} \<ge> 0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2531	apply(rule setsum_nonneg,rule) unfolding mem_Collect_eq image_iff apply(erule exE bexE conjE)+ unfolding split_paired_all
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2532	proof- fix x l a b assume as:"x = l \<inter> {x. \<bar>x $ k - c\<bar> \<le> d}" "(a, b) \<in> p" "l = snd (a, b)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2533	guess u v using p'(4)[OF as(2)] apply-by(erule exE)+ note * = this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2534	show "content x \<ge> 0" unfolding as snd_conv * interval_doublesplit by(rule content_pos_le)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2535	qed have **:"norm (1::real) \<le> 1" by auto note division_doublesplit[OF p'',unfolded interval_doublesplit]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2536	note dsum_bound[OF this **,unfolded interval_doublesplit[THEN sym]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2537	note this[unfolded real_scaleR_def real_norm_def class_semiring.semiring_rules, of k c d] note le_less_trans[OF this d(2)]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2538	from this[unfolded abs_of_nonneg[OF *]] show "(\<Sum>ka\<in>snd ` p. content (ka \<inter> {x. \<bar>x $ k - c\<bar> \<le> d})) < e"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2539	apply(subst vsum_nonzero_image_lemma[of "snd ` p" content "{}", unfolded o_def,THEN sym])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2540	apply(rule finite_imageI p' content_empty)+ unfolding forall_in_division[OF p'']
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2541	proof(rule,rule,rule,rule,rule,rule,rule,erule conjE) fix m n u v
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2542	assume as:"{m..n} \<in> snd ` p" "{u..v} \<in> snd ` p" "{m..n} \<noteq> {u..v}" "{m..n} \<inter> {x. \<bar>x $ k - c\<bar> \<le> d} = {u..v} \<inter> {x. \<bar>x $ k - c\<bar> \<le> d}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2543	have "({m..n} \<inter> {x. \<bar>x $ k - c\<bar> \<le> d}) \<inter> ({u..v} \<inter> {x. \<bar>x $ k - c\<bar> \<le> d}) \<subseteq> {m..n} \<inter> {u..v}" by blast
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2544	note subset_interior[OF this, unfolded division_ofD(5)[OF p'' as(1-3)] interior_inter[of "{m..n}"]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2545	hence "interior ({m..n} \<inter> {x. \<bar>x $ k - c\<bar> \<le> d}) = {}" unfolding as Int_absorb by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2546	thus "content ({m..n} \<inter> {x. \<bar>x $ k - c\<bar> \<le> d}) = 0" unfolding interval_doublesplit content_eq_0_interior[THEN sym] .
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2547	qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2548	finally show "(\<Sum>(x, ka)\<in>p. content (ka \<inter> {x. \<bar>x $ k - c\<bar> \<le> d}) * ?i x) < e" .
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2549	qed qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2550
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2551	subsection {* A technical lemma about "refinement" of division. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2552
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2553	lemma tagged_division_finer: fixes p::"((real^'n) \<times> ((real^'n) set)) set"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2554	assumes "p tagged_division_of {a..b}" "gauge d"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2555	obtains q where "q tagged_division_of {a..b}" "d fine q" "\<forall>(x,k) \<in> p. k \<subseteq> d(x) \<longrightarrow> (x,k) \<in> q"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2556	proof-
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2557	let ?P = "\<lambda>p. p tagged_partial_division_of {a..b} \<longrightarrow> gauge d \<longrightarrow>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2558	(\<exists>q. q tagged_division_of (\<Union>{k. \<exists>x. (x,k) \<in> p}) \<and> d fine q \<and>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2559	(\<forall>(x,k) \<in> p. k \<subseteq> d(x) \<longrightarrow> (x,k) \<in> q))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2560	{ have *:"finite p" "p tagged_partial_division_of {a..b}" using assms(1) unfolding tagged_division_of_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2561	presume "\<And>p. finite p \<Longrightarrow> ?P p" from this[rule_format,OF * assms(2)] guess q .. note q=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2562	thus ?thesis apply-apply(rule that[of q]) unfolding tagged_division_ofD[OF assms(1)] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2563	} fix p::"((real^'n) \<times> ((real^'n) set)) set" assume as:"finite p"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2564	show "?P p" apply(rule,rule) using as proof(induct p)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2565	case empty show ?case apply(rule_tac x="{}" in exI) unfolding fine_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2566	next case (insert xk p) guess x k using surj_pair[of xk] apply- by(erule exE)+ note xk=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2567	note tagged_partial_division_subset[OF insert(4) subset_insertI]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2568	from insert(3)[OF this insert(5)] guess q1 .. note q1 = conjunctD3[OF this]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2569	have *:"\<Union>{l. \<exists>y. (y,l) \<in> insert xk p} = k \<union> \<Union>{l. \<exists>y. (y,l) \<in> p}" unfolding xk by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2570	note p = tagged_partial_division_ofD[OF insert(4)]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2571	from p(4)[unfolded xk, OF insertI1] guess u v apply-by(erule exE)+ note uv=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2572
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2573	have "finite {k. \<exists>x. (x, k) \<in> p}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2574	apply(rule finite_subset[of _ "snd ` p"],rule) unfolding subset_eq image_iff mem_Collect_eq
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2575	apply(erule exE,rule_tac x="(xa,x)" in bexI) using p by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2576	hence int:"interior {u..v} \<inter> interior (\<Union>{k. \<exists>x. (x, k) \<in> p}) = {}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2577	apply(rule inter_interior_unions_intervals) apply(rule open_interior) apply(rule_tac[!] ballI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2578	unfolding mem_Collect_eq apply(erule_tac[!] exE) apply(drule p(4)[OF insertI2],assumption)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2579	apply(rule p(5)) unfolding uv xk apply(rule insertI1,rule insertI2) apply assumption
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2580	using insert(2) unfolding uv xk by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2581
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2582	show ?case proof(cases "{u..v} \<subseteq> d x")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2583	case True thus ?thesis apply(rule_tac x="{(x,{u..v})} \<union> q1" in exI) apply rule
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2584	unfolding * uv apply(rule tagged_division_union,rule tagged_division_of_self)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2585	apply(rule p[unfolded xk uv] insertI1)+ apply(rule q1,rule int)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2586	apply(rule,rule fine_union,subst fine_def) defer apply(rule q1)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2587	unfolding Ball_def split_paired_All split_conv apply(rule,rule,rule,rule)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2588	apply(erule insertE) defer apply(rule UnI2) apply(drule q1(3)[rule_format]) unfolding xk uv by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2589	next case False from fine_division_exists[OF assms(2), of u v] guess q2 . note q2=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2590	show ?thesis apply(rule_tac x="q2 \<union> q1" in exI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2591	apply rule unfolding * uv apply(rule tagged_division_union q2 q1 int fine_union)+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2592	unfolding Ball_def split_paired_All split_conv apply rule apply(rule fine_union)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2593	apply(rule q1 q2)+ apply(rule,rule,rule,rule) apply(erule insertE)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2594	apply(rule UnI2) defer apply(drule q1(3)[rule_format])using False unfolding xk uv by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2595	qed qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2596
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2597	subsection {* Hence the main theorem about negligible sets. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2598
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2599	lemma finite_product_dependent: assumes "finite s" "\<And>x. x\<in>s\<Longrightarrow> finite (t x)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2600	shows "finite {(i, j) \|i j. i \<in> s \<and> j \<in> t i}" using assms
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2601	proof(induct) case (insert x s)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2602	have *:"{(i, j) \|i j. i \<in> insert x s \<and> j \<in> t i} = (\<lambda>y. (x,y)) ` (t x) \<union> {(i, j) \|i j. i \<in> s \<and> j \<in> t i}" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2603	show ?case unfolding * apply(rule finite_UnI) using insert by auto qed auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2604
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2605	lemma sum_sum_product: assumes "finite s" "\<forall>i\<in>s. finite (t i)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2606	shows "setsum (\<lambda>i. setsum (x i) (t i)::real) s = setsum (\<lambda>(i,j). x i j) {(i,j) \| i j. i \<in> s \<and> j \<in> t i}" using assms
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2607	proof(induct) case (insert a s)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2608	have *:"{(i, j) \|i j. i \<in> insert a s \<and> j \<in> t i} = (\<lambda>y. (a,y)) ` (t a) \<union> {(i, j) \|i j. i \<in> s \<and> j \<in> t i}" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2609	show ?case unfolding * apply(subst setsum_Un_disjoint) unfolding setsum_insert[OF insert(1-2)]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2610	prefer 4 apply(subst insert(3)) unfolding add_right_cancel
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2611	proof- show "setsum (x a) (t a) = (\<Sum>(xa, y)\<in>Pair a ` t a. x xa y)" apply(subst setsum_reindex) unfolding inj_on_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2612	show "finite {(i, j) \|i j. i \<in> s \<and> j \<in> t i}" apply(rule finite_product_dependent) using insert by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2613	qed(insert insert, auto) qed auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2614
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2615	lemma has_integral_negligible: fixes f::"real^'n \<Rightarrow> 'a::real_normed_vector"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2616	assumes "negligible s" "\<forall>x\<in>(t - s). f x = 0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2617	shows "(f has_integral 0) t"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2618	proof- presume P:"\<And>f::real^'n \<Rightarrow> 'a. \<And>a b. (\<forall>x. ~(x \<in> s) \<longrightarrow> f x = 0) \<Longrightarrow> (f has_integral 0) ({a..b})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2619	let ?f = "(\<lambda>x. if x \<in> t then f x else 0)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2620	show ?thesis apply(rule_tac f="?f" in has_integral_eq) apply(rule) unfolding if_P apply(rule refl)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2621	apply(subst has_integral_alt) apply(cases,subst if_P,assumption) unfolding if_not_P
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2622	proof- assume "\<exists>a b. t = {a..b}" then guess a b apply-by(erule exE)+ note t = this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2623	show "(?f has_integral 0) t" unfolding t apply(rule P) using assms(2) unfolding t by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2624	next show "\<forall>e>0. \<exists>B>0. \<forall>a b. ball 0 B \<subseteq> {a..b} \<longrightarrow> (\<exists>z. ((\<lambda>x. if x \<in> t then ?f x else 0) has_integral z) {a..b} \<and> norm (z - 0) < e)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2625	apply(safe,rule_tac x=1 in exI,rule) apply(rule zero_less_one,safe) apply(rule_tac x=0 in exI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2626	apply(rule,rule P) using assms(2) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2627	qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2628	next fix f::"real^'n \<Rightarrow> 'a" and a b::"real^'n" assume assm:"\<forall>x. x \<notin> s \<longrightarrow> f x = 0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2629	show "(f has_integral 0) {a..b}" unfolding has_integral
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2630	proof(safe) case goal1
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2631	hence "\<And>n. e / 2 / ((real n+1) * (2 ^ n)) > 0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2632	apply-apply(rule divide_pos_pos) defer apply(rule mult_pos_pos) by(auto simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2633	note assms(1)[unfolded negligible_def has_integral,rule_format,OF this,of a b] note allI[OF this,of "\<lambda>x. x"]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2634	from choice[OF this] guess d .. note d=conjunctD2[OF this[rule_format]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2635	show ?case apply(rule_tac x="\<lambda>x. d (nat \<lfloor>norm (f x)\<rfloor>) x" in exI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2636	proof safe show "gauge (\<lambda>x. d (nat \<lfloor>norm (f x)\<rfloor>) x)" using d(1) unfolding gauge_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2637	fix p assume as:"p tagged_division_of {a..b}" "(\<lambda>x. d (nat \<lfloor>norm (f x)\<rfloor>) x) fine p"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2638	let ?goal = "norm ((\<Sum>(x, k)\<in>p. content k *\<^sub>R f x) - 0) < e"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2639	{ presume "p\<noteq>{} \<Longrightarrow> ?goal" thus ?goal apply(cases "p={}") using goal1 by auto }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2640	assume as':"p \<noteq> {}" from real_arch_simple[of "Sup((\<lambda>(x,k). norm(f x)) ` p)"] guess N ..
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2641	hence N:"\<forall>x\<in>(\<lambda>(x, k). norm (f x)) ` p. x \<le> real N" apply(subst(asm) Sup_finite_le_iff) using as as' by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2642	have "\<forall>i. \<exists>q. q tagged_division_of {a..b} \<and> (d i) fine q \<and> (\<forall>(x, k)\<in>p. k \<subseteq> (d i) x \<longrightarrow> (x, k) \<in> q)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2643	apply(rule,rule tagged_division_finer[OF as(1) d(1)]) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2644	from choice[OF this] guess q .. note q=conjunctD3[OF this[rule_format]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2645	have :"\<And>i. (\<Sum>(x, k)\<in>q i. content k \<^sub>R indicator s x) \<ge> 0" apply(rule setsum_nonneg,safe)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2646	unfolding real_scaleR_def apply(rule mult_nonneg_nonneg) apply(drule tagged_division_ofD(4)[OF q(1)]) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2647	have **:"\<And>f g s t. finite s \<Longrightarrow> finite t \<Longrightarrow> (\<forall>(x,y) \<in> t. (0::real) \<le> g(x,y)) \<Longrightarrow> (\<forall>y\<in>s. \<exists>x. (x,y) \<in> t \<and> f(y) \<le> g(x,y)) \<Longrightarrow> setsum f s \<le> setsum g t"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2648	proof- case goal1 thus ?case apply-apply(rule setsum_le_included[of s t g snd f]) prefer 4
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2649	apply safe apply(erule_tac x=x in ballE) apply(erule exE) apply(rule_tac x="(xa,x)" in bexI) by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2650	have "norm ((\<Sum>(x, k)\<in>p. content k \<^sub>R f x) - 0) \<le> setsum (\<lambda>i. (real i + 1)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2651	norm(setsum (\<lambda>(x,k). content k *\<^sub>R indicator s x) (q i))) {0..N+1}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2652	unfolding real_norm_def setsum_right_distrib abs_of_nonneg[OF *] diff_0_right
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2653	apply(rule order_trans,rule setsum_norm) defer apply(subst sum_sum_product) prefer 3
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2654	proof(rule **,safe) show "finite {(i, j) \|i j. i \<in> {0..N + 1} \<and> j \<in> q i}" apply(rule finite_product_dependent) using q by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2655	fix i a b assume as'':"(a,b) \<in> q i" show "0 \<le> (real i + 1) * (content b *\<^sub>R indicator s a)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2656	unfolding real_scaleR_def apply(rule mult_nonneg_nonneg) defer apply(rule mult_nonneg_nonneg)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2657	using tagged_division_ofD(4)[OF q(1) as''] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2658	next fix i::nat show "finite (q i)" using q by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2659	next fix x k assume xk:"(x,k) \<in> p" def n \<equiv> "nat \<lfloor>norm (f x)\<rfloor>"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2660	have *:"norm (f x) \<in> (\<lambda>(x, k). norm (f x)) ` p" using xk by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2661	have nfx:"real n \<le> norm(f x)" "norm(f x) \<le> real n + 1" unfolding n_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2662	hence "n \<in> {0..N + 1}" using N[rule_format,OF *] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2663	moreover note as(2)[unfolded fine_def,rule_format,OF xk,unfolded split_conv]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2664	note q(3)[rule_format,OF xk,unfolded split_conv,rule_format,OF this] note this[unfolded n_def[symmetric]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2665	moreover have "norm (content k \<^sub>R f x) \<le> (real n + 1) (content k * indicator s x)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2666	proof(cases "x\<in>s") case False thus ?thesis using assm by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2667	next case True have *:"content k \<ge> 0" using tagged_division_ofD(4)[OF as(1) xk] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2668	moreover have "content k * norm (f x) \<le> content k * (real n + 1)" apply(rule mult_mono) using nfx * by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2669	ultimately show ?thesis unfolding abs_mult using nfx True by(auto simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2670	qed ultimately show "\<exists>y. (y, x, k) \<in> {(i, j) \|i j. i \<in> {0..N + 1} \<and> j \<in> q i} \<and> norm (content k \<^sub>R f x) \<le> (real y + 1) (content k *\<^sub>R indicator s x)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2671	apply(rule_tac x=n in exI,safe) apply(rule_tac x=n in exI,rule_tac x="(x,k)" in exI,safe) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2672	qed(insert as, auto)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2673	also have "... \<le> setsum (\<lambda>i. e / 2 / 2 ^ i) {0..N+1}" apply(rule setsum_mono)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2674	proof- case goal1 thus ?case apply(subst mult_commute, subst pos_le_divide_eq[THEN sym])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2675	using d(2)[rule_format,of "q i" i] using q[rule_format] by(auto simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2676	qed also have "... < e * inverse 2 * 2" unfolding real_divide_def setsum_right_distrib[THEN sym]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2677	apply(rule mult_strict_left_mono) unfolding power_inverse atLeastLessThanSuc_atLeastAtMost[THEN sym]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2678	apply(subst sumr_geometric) using goal1 by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2679	finally show "?goal" by auto qed qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2680
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2681	lemma has_integral_spike: fixes f::"real^'n \<Rightarrow> 'a::real_normed_vector"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2682	assumes "negligible s" "(\<forall>x\<in>(t - s). g x = f x)" "(f has_integral y) t"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2683	shows "(g has_integral y) t"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2684	proof- { fix a b::"real^'n" and f g ::"real^'n \<Rightarrow> 'a" and y::'a
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2685	assume as:"\<forall>x \<in> {a..b} - s. g x = f x" "(f has_integral y) {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2686	have "((\<lambda>x. f x + (g x - f x)) has_integral (y + 0)) {a..b}" apply(rule has_integral_add[OF as(2)])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2687	apply(rule has_integral_negligible[OF assms(1)]) using as by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2688	hence "(g has_integral y) {a..b}" by auto } note * = this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2689	show ?thesis apply(subst has_integral_alt) using assms(2-) apply-apply(rule cond_cases,safe)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2690	apply(rule *, assumption+) apply(subst(asm) has_integral_alt) unfolding if_not_P
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2691	apply(erule_tac x=e in allE,safe,rule_tac x=B in exI,safe) apply(erule_tac x=a in allE,erule_tac x=b in allE,safe)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2692	apply(rule_tac x=z in exI,safe) apply(rule *[where fa2="\<lambda>x. if x\<in>t then f x else 0"]) by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2693
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2694	lemma has_integral_spike_eq:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2695	assumes "negligible s" "\<forall>x\<in>(t - s). g x = f x"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2696	shows "((f has_integral y) t \<longleftrightarrow> (g has_integral y) t)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2697	apply rule apply(rule_tac[!] has_integral_spike[OF assms(1)]) using assms(2) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2698
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2699	lemma integrable_spike: assumes "negligible s" "\<forall>x\<in>(t - s). g x = f x" "f integrable_on t"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2700	shows "g integrable_on t"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2701	using assms unfolding integrable_on_def apply-apply(erule exE)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2702	apply(rule,rule has_integral_spike) by fastsimp+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2703
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2704	lemma integral_spike: assumes "negligible s" "\<forall>x\<in>(t - s). g x = f x"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2705	shows "integral t f = integral t g"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2706	unfolding integral_def using has_integral_spike_eq[OF assms] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2707
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2708	subsection {* Some other trivialities about negligible sets. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2709
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2710	lemma negligible_subset[intro]: assumes "negligible s" "t \<subseteq> s" shows "negligible t" unfolding negligible_def
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2711	proof(safe) case goal1 show ?case using assms(1)[unfolded negligible_def,rule_format,of a b]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2712	apply-apply(rule has_integral_spike[OF assms(1)]) defer apply assumption
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2713	using assms(2) unfolding indicator_def by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2714
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2715	lemma negligible_diff[intro?]: assumes "negligible s" shows "negligible(s - t)" using assms by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2716
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2717	lemma negligible_inter: assumes "negligible s \<or> negligible t" shows "negligible(s \<inter> t)" using assms by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2718
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2719	lemma negligible_union: assumes "negligible s" "negligible t" shows "negligible (s \<union> t)" unfolding negligible_def
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2720	proof safe case goal1 note assm = assms[unfolded negligible_def,rule_format,of a b]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2721	thus ?case apply(subst has_integral_spike_eq[OF assms(2)])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2722	defer apply assumption unfolding indicator_def by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2723
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2724	lemma negligible_union_eq[simp]: "negligible (s \<union> t) \<longleftrightarrow> (negligible s \<and> negligible t)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2725	using negligible_union by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2726
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2727	lemma negligible_sing[intro]: "negligible {a::real^'n}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2728	proof- guess x using UNIV_witness[where 'a='n] ..
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2729	show ?thesis using negligible_standard_hyperplane[of x "a$x"] by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2730
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2731	lemma negligible_insert[simp]: "negligible(insert a s) \<longleftrightarrow> negligible s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2732	apply(subst insert_is_Un) unfolding negligible_union_eq by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2733
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2734	lemma negligible_empty[intro]: "negligible {}" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2735
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2736	lemma negligible_finite[intro]: assumes "finite s" shows "negligible s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2737	using assms apply(induct s) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2738
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2739	lemma negligible_unions[intro]: assumes "finite s" "\<forall>t\<in>s. negligible t" shows "negligible(\<Union>s)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2740	using assms by(induct,auto)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2741
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2742	lemma negligible: "negligible s \<longleftrightarrow> (\<forall>t::(real^'n) set. (indicator s has_integral 0) t)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2743	apply safe defer apply(subst negligible_def)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2744	proof- fix t::"(real^'n) set" assume as:"negligible s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2745	have *:"(\<lambda>x. if x \<in> s \<inter> t then 1 else 0) = (\<lambda>x. if x\<in>t then if x\<in>s then 1 else 0 else 0)" by(rule ext,auto)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2746	show "(indicator s has_integral 0) t" apply(subst has_integral_alt)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2747	apply(cases,subst if_P,assumption) unfolding if_not_P apply(safe,rule as[unfolded negligible_def,rule_format])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2748	apply(rule_tac x=1 in exI) apply(safe,rule zero_less_one) apply(rule_tac x=0 in exI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2749	using negligible_subset[OF as,of "s \<inter> t"] unfolding negligible_def indicator_def unfolding * by auto qed auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2750
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2751	subsection {* Finite case of the spike theorem is quite commonly needed. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2752
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2753	lemma has_integral_spike_finite: assumes "finite s" "\<forall>x\<in>t-s. g x = f x"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2754	"(f has_integral y) t" shows "(g has_integral y) t"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2755	apply(rule has_integral_spike) using assms by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2756
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2757	lemma has_integral_spike_finite_eq: assumes "finite s" "\<forall>x\<in>t-s. g x = f x"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2758	shows "((f has_integral y) t \<longleftrightarrow> (g has_integral y) t)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2759	apply rule apply(rule_tac[!] has_integral_spike_finite) using assms by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2760
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2761	lemma integrable_spike_finite:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2762	assumes "finite s" "\<forall>x\<in>t-s. g x = f x" "f integrable_on t" shows "g integrable_on t"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2763	using assms unfolding integrable_on_def apply safe apply(rule_tac x=y in exI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2764	apply(rule has_integral_spike_finite) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2765
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2766	subsection {* In particular, the boundary of an interval is negligible. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2767
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2768	lemma negligible_frontier_interval: "negligible({a..b} - {a<..<b})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2769	proof- let ?A = "\<Union>((\<lambda>k. {x. x$k = a$k} \<union> {x. x$k = b$k}) ` UNIV)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2770	have "{a..b} - {a<..<b} \<subseteq> ?A" apply rule unfolding Diff_iff mem_interval not_all
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2771	apply(erule conjE exE)+ apply(rule_tac X="{x. x $ xa = a $ xa} \<union> {x. x $ xa = b $ xa}" in UnionI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2772	apply(erule_tac[!] x=xa in allE) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2773	thus ?thesis apply-apply(rule negligible_subset[of ?A]) apply(rule negligible_unions[OF finite_imageI]) by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2774
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2775	lemma has_integral_spike_interior:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2776	assumes "\<forall>x\<in>{a<..<b}. g x = f x" "(f has_integral y) ({a..b})" shows "(g has_integral y) ({a..b})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2777	apply(rule has_integral_spike[OF negligible_frontier_interval _ assms(2)]) using assms(1) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2778
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2779	lemma has_integral_spike_interior_eq:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2780	assumes "\<forall>x\<in>{a<..<b}. g x = f x" shows "((f has_integral y) ({a..b}) \<longleftrightarrow> (g has_integral y) ({a..b}))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2781	apply rule apply(rule_tac[!] has_integral_spike_interior) using assms by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2782
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2783	lemma integrable_spike_interior: assumes "\<forall>x\<in>{a<..<b}. g x = f x" "f integrable_on {a..b}" shows "g integrable_on {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2784	using assms unfolding integrable_on_def using has_integral_spike_interior[OF assms(1)] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2785
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2786	subsection {* Integrability of continuous functions. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2787
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2788	lemma neutral_and[simp]: "neutral op \<and> = True"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2789	unfolding neutral_def apply(rule some_equality) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2790
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2791	lemma monoidal_and[intro]: "monoidal op \<and>" unfolding monoidal_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2792
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2793	lemma iterate_and[simp]: assumes "finite s" shows "(iterate op \<and>) s p \<longleftrightarrow> (\<forall>x\<in>s. p x)" using assms
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2794	apply induct unfolding iterate_insert[OF monoidal_and] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2795
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2796	lemma operative_division_and: assumes "operative op \<and> P" "d division_of {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2797	shows "(\<forall>i\<in>d. P i) \<longleftrightarrow> P {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2798	using operative_division[OF monoidal_and assms] division_of_finite[OF assms(2)] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2799
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2800	lemma operative_approximable: assumes "0 \<le> e" fixes f::"real^'n \<Rightarrow> 'a::banach"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2801	shows "operative op \<and> (\<lambda>i. \<exists>g. (\<forall>x\<in>i. norm (f x - g (x::real^'n)) \<le> e) \<and> g integrable_on i)" unfolding operative_def neutral_and
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2802	proof safe fix a b::"real^'n" { assume "content {a..b} = 0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2803	thus "\<exists>g. (\<forall>x\<in>{a..b}. norm (f x - g x) \<le> e) \<and> g integrable_on {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2804	apply(rule_tac x=f in exI) using assms by(auto intro!:integrable_on_null) }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2805	{ fix c k g assume as:"\<forall>x\<in>{a..b}. norm (f x - g x) \<le> e" "g integrable_on {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2806	show "\<exists>g. (\<forall>x\<in>{a..b} \<inter> {x. x $ k \<le> c}. norm (f x - g x) \<le> e) \<and> g integrable_on {a..b} \<inter> {x. x $ k \<le> c}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2807	"\<exists>g. (\<forall>x\<in>{a..b} \<inter> {x. c \<le> x $ k}. norm (f x - g x) \<le> e) \<and> g integrable_on {a..b} \<inter> {x. c \<le> x $ k}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2808	apply(rule_tac[!] x=g in exI) using as(1) integrable_split[OF as(2)] by auto }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2809	fix c k g1 g2 assume as:"\<forall>x\<in>{a..b} \<inter> {x. x $ k \<le> c}. norm (f x - g1 x) \<le> e" "g1 integrable_on {a..b} \<inter> {x. x $ k \<le> c}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2810	"\<forall>x\<in>{a..b} \<inter> {x. c \<le> x $ k}. norm (f x - g2 x) \<le> e" "g2 integrable_on {a..b} \<inter> {x. c \<le> x $ k}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2811	let ?g = "\<lambda>x. if x$k = c then f x else if x$k \<le> c then g1 x else g2 x"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2812	show "\<exists>g. (\<forall>x\<in>{a..b}. norm (f x - g x) \<le> e) \<and> g integrable_on {a..b}" apply(rule_tac x="?g" in exI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2813	proof safe case goal1 thus ?case apply- apply(cases "x$k=c", case_tac "x$k < c") using as assms by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2814	next case goal2 presume "?g integrable_on {a..b} \<inter> {x. x $ k \<le> c}" "?g integrable_on {a..b} \<inter> {x. x $ k \<ge> c}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2815	then guess h1 h2 unfolding integrable_on_def by auto from has_integral_split[OF this]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2816	show ?case unfolding integrable_on_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2817	next show "?g integrable_on {a..b} \<inter> {x. x $ k \<le> c}" "?g integrable_on {a..b} \<inter> {x. x $ k \<ge> c}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2818	apply(rule_tac[!] integrable_spike[OF negligible_standard_hyperplane[of k c]]) using as(2,4) by auto qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2819
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2820	lemma approximable_on_division: fixes f::"real^'n \<Rightarrow> 'a::banach"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2821	assumes "0 \<le> e" "d division_of {a..b}" "\<forall>i\<in>d. \<exists>g. (\<forall>x\<in>i. norm (f x - g x) \<le> e) \<and> g integrable_on i"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2822	obtains g where "\<forall>x\<in>{a..b}. norm (f x - g x) \<le> e" "g integrable_on {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2823	proof- note * = operative_division[OF monoidal_and operative_approximable[OF assms(1)] assms(2)]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2824	note this[unfolded iterate_and[OF division_of_finite[OF assms(2)]]] from assms(3)[unfolded this[of f]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2825	guess g .. thus thesis apply-apply(rule that[of g]) by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2826
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2827	lemma integrable_continuous: fixes f::"real^'n \<Rightarrow> 'a::banach"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2828	assumes "continuous_on {a..b} f" shows "f integrable_on {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2829	proof(rule integrable_uniform_limit,safe) fix e::real assume e:"0 < e"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2830	from compact_uniformly_continuous[OF assms compact_interval,unfolded uniformly_continuous_on_def,rule_format,OF e] guess d ..
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2831	note d=conjunctD2[OF this,rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2832	from fine_division_exists[OF gauge_ball[OF d(1)], of a b] guess p . note p=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2833	note p' = tagged_division_ofD[OF p(1)]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2834	have *:"\<forall>i\<in>snd ` p. \<exists>g. (\<forall>x\<in>i. norm (f x - g x) \<le> e) \<and> g integrable_on i"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2835	proof(safe,unfold snd_conv) fix x l assume as:"(x,l) \<in> p"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2836	from p'(4)[OF this] guess a b apply-by(erule exE)+ note l=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2837	show "\<exists>g. (\<forall>x\<in>l. norm (f x - g x) \<le> e) \<and> g integrable_on l" apply(rule_tac x="\<lambda>y. f x" in exI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2838	proof safe show "(\<lambda>y. f x) integrable_on l" unfolding integrable_on_def l by(rule,rule has_integral_const)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2839	fix y assume y:"y\<in>l" note fineD[OF p(2) as,unfolded subset_eq,rule_format,OF this]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2840	note d(2)[OF _ _ this[unfolded mem_ball]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2841	thus "norm (f y - f x) \<le> e" using y p'(2-3)[OF as] unfolding vector_dist_norm l norm_minus_commute by fastsimp qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2842	from e have "0 \<le> e" by auto from approximable_on_division[OF this division_of_tagged_division[OF p(1)] *] guess g .
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2843	thus "\<exists>g. (\<forall>x\<in>{a..b}. norm (f x - g x) \<le> e) \<and> g integrable_on {a..b}" by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2844
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2845	subsection {* Specialization of additivity to one dimension. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2846
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2847	lemma operative_1_lt: assumes "monoidal opp"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2848	shows "operative opp f \<longleftrightarrow> ((\<forall>a b. b \<le> a \<longrightarrow> f {a..b::real^1} = neutral opp) \<and>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2849	(\<forall>a b c. a < c \<and> c < b \<longrightarrow> opp (f{a..c})(f{c..b}) = f {a..b}))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2850	unfolding operative_def content_eq_0_1 forall_1 vector_le_def vector_less_def
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2851	proof safe fix a b c::"real^1" assume as:"\<forall>a b c. f {a..b} = opp (f ({a..b} \<inter> {x. x $ 1 \<le> c})) (f ({a..b} \<inter> {x. c \<le> x $ 1}))" "a $ 1 < c $ 1" "c $ 1 < b $ 1"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2852	from this(2-) have "{a..b} \<inter> {x. x $ 1 \<le> c $ 1} = {a..c}" "{a..b} \<inter> {x. x $ 1 \<ge> c $ 1} = {c..b}" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2853	thus "opp (f {a..c}) (f {c..b}) = f {a..b}" unfolding as(1)[rule_format,of a b "c$1"] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2854	next fix a b::"real^1" and c::real
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2855	assume as:"\<forall>a b. b $ 1 \<le> a $ 1 \<longrightarrow> f {a..b} = neutral opp" "\<forall>a b c. a $ 1 < c $ 1 \<and> c $ 1 < b $ 1 \<longrightarrow> opp (f {a..c}) (f {c..b}) = f {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2856	show "f {a..b} = opp (f ({a..b} \<inter> {x. x $ 1 \<le> c})) (f ({a..b} \<inter> {x. c \<le> x $ 1}))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2857	proof(cases "c \<in> {a$1 .. b$1}")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2858	case False hence "c<a$1 \<or> c>b$1" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2859	thus ?thesis apply-apply(erule disjE)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2860	proof- assume "c<a$1" hence *:"{a..b} \<inter> {x. x $ 1 \<le> c} = {1..0}" "{a..b} \<inter> {x. c \<le> x $ 1} = {a..b}" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2861	show ?thesis unfolding * apply(subst as(1)[rule_format,of 0 1]) using assms by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2862	next assume "b$1<c" hence *:"{a..b} \<inter> {x. x $ 1 \<le> c} = {a..b}" "{a..b} \<inter> {x. c \<le> x $ 1} = {1..0}" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2863	show ?thesis unfolding * apply(subst as(1)[rule_format,of 0 1]) using assms by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2864	qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2865	next case True hence *:"min (b $ 1) c = c" "max (a $ 1) c = c" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2866	show ?thesis unfolding interval_split num1_eq_iff if_True * vec_def[THEN sym]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2867	proof(cases "c = a$1 \<or> c = b$1")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2868	case False thus "f {a..b} = opp (f {a..vec1 c}) (f {vec1 c..b})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2869	apply-apply(subst as(2)[rule_format]) using True by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2870	next case True thus "f {a..b} = opp (f {a..vec1 c}) (f {vec1 c..b})" apply-
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2871	proof(erule disjE) assume "c=a$1" hence *:"a = vec1 c" unfolding Cart_eq by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2872	hence "f {a..vec1 c} = neutral opp" apply-apply(rule as(1)[rule_format]) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2873	thus ?thesis using assms unfolding * by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2874	next assume "c=b$1" hence *:"b = vec1 c" unfolding Cart_eq by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2875	hence "f {vec1 c..b} = neutral opp" apply-apply(rule as(1)[rule_format]) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2876	thus ?thesis using assms unfolding * by auto qed qed qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2877
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2878	lemma operative_1_le: assumes "monoidal opp"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2879	shows "operative opp f \<longleftrightarrow> ((\<forall>a b. b \<le> a \<longrightarrow> f {a..b::real^1} = neutral opp) \<and>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2880	(\<forall>a b c. a \<le> c \<and> c \<le> b \<longrightarrow> opp (f{a..c})(f{c..b}) = f {a..b}))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2881	unfolding operative_1_lt[OF assms]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2882	proof safe fix a b c::"real^1" assume as:"\<forall>a b c. a \<le> c \<and> c \<le> b \<longrightarrow> opp (f {a..c}) (f {c..b}) = f {a..b}" "a < c" "c < b"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2883	show "opp (f {a..c}) (f {c..b}) = f {a..b}" apply(rule as(1)[rule_format]) using as(2-) unfolding vector_le_def vector_less_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2884	next fix a b c ::"real^1"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2885	assume "\<forall>a b. b \<le> a \<longrightarrow> f {a..b} = neutral opp" "\<forall>a b c. a < c \<and> c < b \<longrightarrow> opp (f {a..c}) (f {c..b}) = f {a..b}" "a \<le> c" "c \<le> b"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2886	note as = this[rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2887	show "opp (f {a..c}) (f {c..b}) = f {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2888	proof(cases "c = a \<or> c = b")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2889	case False thus ?thesis apply-apply(subst as(2)) using as(3-) unfolding vector_le_def vector_less_def Cart_eq by(auto simp del:dest_vec1_eq)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2890	next case True thus ?thesis apply-
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2891	proof(erule disjE) assume *:"c=a" hence "f {a..c} = neutral opp" apply-apply(rule as(1)[rule_format]) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2892	thus ?thesis using assms unfolding * by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2893	next assume *:"c=b" hence "f {c..b} = neutral opp" apply-apply(rule as(1)[rule_format]) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2894	thus ?thesis using assms unfolding * by auto qed qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2895
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2896	subsection {* Special case of additivity we need for the FCT. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2897
35540 3d073a3e1c61 the ordering on real^1 is linear himmelma parents: 35292 diff changeset	2898	lemma interval_bound_sing[simp]: "interval_upperbound {a} = a" "interval_lowerbound {a} = a"
3d073a3e1c61 the ordering on real^1 is linear himmelma parents: 35292 diff changeset	2899	unfolding interval_upperbound_def interval_lowerbound_def unfolding Cart_eq by auto
3d073a3e1c61 the ordering on real^1 is linear himmelma parents: 35292 diff changeset	2900
35172 579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2901	lemma additive_tagged_division_1: fixes f::"real^1 \<Rightarrow> 'a::real_normed_vector"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2902	assumes "dest_vec1 a \<le> dest_vec1 b" "p tagged_division_of {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2903	shows "setsum (\<lambda>(x,k). f(interval_upperbound k) - f(interval_lowerbound k)) p = f b - f a"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2904	proof- let ?f = "(\<lambda>k::(real^1) set. if k = {} then 0 else f(interval_upperbound k) - f(interval_lowerbound k))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2905	have *:"operative op + ?f" unfolding operative_1_lt[OF monoidal_monoid] interval_eq_empty_1
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2906	by(auto simp add:not_less interval_bound_1 vector_less_def)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2907	have *:"{a..b} \<noteq> {}" using assms(1) by auto note operative_tagged_division[OF monoidal_monoid assms(2)]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2908	note * = this[unfolded if_not_P[OF **] interval_bound_1[OF assms(1)],THEN sym ]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2909	show ?thesis unfolding * apply(subst setsum_iterate[THEN sym]) defer
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2910	apply(rule setsum_cong2) unfolding split_paired_all split_conv using assms(2) by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2911
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2912	subsection {* A useful lemma allowing us to factor out the content size. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2913
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2914	lemma has_integral_factor_content:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2915	"(f has_integral i) {a..b} \<longleftrightarrow> (\<forall>e>0. \<exists>d. gauge d \<and> (\<forall>p. p tagged_division_of {a..b} \<and> d fine p
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2916	\<longrightarrow> norm (setsum (\<lambda>(x,k). content k \<^sub>R f x) p - i) \<le> e content {a..b}))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2917	proof(cases "content {a..b} = 0")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2918	case True show ?thesis unfolding has_integral_null_eq[OF True] apply safe
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2919	apply(rule,rule,rule gauge_trivial,safe) unfolding setsum_content_null[OF True] True defer
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2920	apply(erule_tac x=1 in allE,safe) defer apply(rule fine_division_exists[of _ a b],assumption)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2921	apply(erule_tac x=p in allE) unfolding setsum_content_null[OF True] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2922	next case False note F = this[unfolded content_lt_nz[THEN sym]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2923	let ?P = "\<lambda>e opp. \<exists>d. gauge d \<and> (\<forall>p. p tagged_division_of {a..b} \<and> d fine p \<longrightarrow> opp (norm ((\<Sum>(x, k)\<in>p. content k *\<^sub>R f x) - i)) e)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2924	show ?thesis apply(subst has_integral)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2925	proof safe fix e::real assume e:"e>0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2926	{ assume "\<forall>e>0. ?P e op <" thus "?P (e * content {a..b}) op \<le>" apply(erule_tac x="e * content {a..b}" in allE)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2927	apply(erule impE) defer apply(erule exE,rule_tac x=d in exI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2928	using F e by(auto simp add:field_simps intro:mult_pos_pos) }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2929	{ assume "\<forall>e>0. ?P (e * content {a..b}) op \<le>" thus "?P e op <" apply(erule_tac x="e / 2 / content {a..b}" in allE)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2930	apply(erule impE) defer apply(erule exE,rule_tac x=d in exI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2931	using F e by(auto simp add:field_simps intro:mult_pos_pos) } qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2932
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2933	subsection {* Fundamental theorem of calculus. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2934
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2935	lemma fundamental_theorem_of_calculus: fixes f::"real^1 \<Rightarrow> 'a::banach"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2936	assumes "a \<le> b" "\<forall>x\<in>{a..b}. ((f o vec1) has_vector_derivative f'(vec1 x)) (at x within {a..b})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2937	shows "(f' has_integral (f(vec1 b) - f(vec1 a))) ({vec1 a..vec1 b})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2938	unfolding has_integral_factor_content
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2939	proof safe fix e::real assume e:"e>0" have ab:"dest_vec1 (vec1 a) \<le> dest_vec1 (vec1 b)" using assms(1) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2940	note assm = assms(2)[unfolded has_vector_derivative_def has_derivative_within_alt]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2941	have *:"\<And>P Q. \<forall>x\<in>{a..b}. P x \<and> (\<forall>e>0. \<exists>d>0. Q x e d) \<Longrightarrow> \<forall>x. \<exists>(d::real)>0. x\<in>{a..b} \<longrightarrow> Q x e d" using e by blast
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2942	note this[OF assm,unfolded gauge_existence_lemma] from choice[OF this,unfolded Ball_def[symmetric]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2943	guess d .. note d=conjunctD2[OF this[rule_format],rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2944	show "\<exists>d. gauge d \<and> (\<forall>p. p tagged_division_of {vec1 a..vec1 b} \<and> d fine p \<longrightarrow>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2945	norm ((\<Sum>(x, k)\<in>p. content k \<^sub>R f' x) - (f (vec1 b) - f (vec1 a))) \<le> e content {vec1 a..vec1 b})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2946	apply(rule_tac x="\<lambda>x. ball x (d (dest_vec1 x))" in exI,safe)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2947	apply(rule gauge_ball_dependent,rule,rule d(1))
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2948	proof- fix p assume as:"p tagged_division_of {vec1 a..vec1 b}" "(\<lambda>x. ball x (d (dest_vec1 x))) fine p"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2949	show "norm ((\<Sum>(x, k)\<in>p. content k \<^sub>R f' x) - (f (vec1 b) - f (vec1 a))) \<le> e content {vec1 a..vec1 b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2950	unfolding content_1[OF ab] additive_tagged_division_1[OF ab as(1),of f,THEN sym]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2951	unfolding vector_minus_component[THEN sym] additive_tagged_division_1[OF ab as(1),of "\<lambda>x. x",THEN sym]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2952	apply(subst dest_vec1_setsum) unfolding setsum_right_distrib defer unfolding setsum_subtractf[THEN sym]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2953	proof(rule setsum_norm_le,safe) fix x k assume "(x,k)\<in>p"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2954	note xk = tagged_division_ofD(2-4)[OF as(1) this] from this(3) guess u v apply-by(erule exE)+ note k=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2955	have *:"dest_vec1 u \<le> dest_vec1 v" using xk unfolding k by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2956	have ball:"\<forall>xa\<in>k. xa \<in> ball x (d (dest_vec1 x))" using as(2)[unfolded fine_def,rule_format,OF `(x,k)\<in>p`,unfolded split_conv subset_eq] .
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2957	have "norm ((v$1 - u$1) \<^sub>R f' x - (f v - f u)) \<le> norm (f u - f x - (u$1 - x$1) \<^sub>R f' x) + norm (f v - f x - (v$1 - x$1) *\<^sub>R f' x)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2958	apply(rule order_trans[OF _ norm_triangle_ineq4]) apply(rule eq_refl) apply(rule arg_cong[where f=norm])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2959	unfolding scaleR.diff_left by(auto simp add:group_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2960	also have "... \<le> e * norm (dest_vec1 u - dest_vec1 x) + e * norm (dest_vec1 v - dest_vec1 x)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2961	apply(rule add_mono) apply(rule d(2)[of "x$1" "u$1",unfolded o_def vec1_dest_vec1]) prefer 4
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2962	apply(rule d(2)[of "x$1" "v$1",unfolded o_def vec1_dest_vec1])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2963	using ball[rule_format,of u] ball[rule_format,of v]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2964	using xk(1-2) unfolding k subset_eq by(auto simp add:vector_dist_norm norm_real)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2965	also have "... \<le> e * dest_vec1 (interval_upperbound k - interval_lowerbound k)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2966	unfolding k interval_bound_1[OF *] using xk(1) unfolding k by(auto simp add:vector_dist_norm norm_real field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2967	finally show "norm (content k *\<^sub>R f' x - (f (interval_upperbound k) - f (interval_lowerbound k))) \<le>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2968	e * dest_vec1 (interval_upperbound k - interval_lowerbound k)" unfolding k interval_bound_1[OF ] content_1[OF ] .
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2969	qed(insert as, auto) qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2970
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2971	subsection {* Attempt a systematic general set of "offset" results for components. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2972
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2973	lemma gauge_modify:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2974	assumes "(\<forall>s. open s \<longrightarrow> open {x. f(x) \<in> s})" "gauge d"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2975	shows "gauge (\<lambda>x y. d (f x) (f y))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2976	using assms unfolding gauge_def apply safe defer apply(erule_tac x="f x" in allE)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2977	apply(erule_tac x="d (f x)" in allE) unfolding mem_def Collect_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2978
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2979	subsection {* Only need trivial subintervals if the interval itself is trivial. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2980
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2981	lemma division_of_nontrivial: fixes s::"(real^'n) set set"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2982	assumes "s division_of {a..b}" "content({a..b}) \<noteq> 0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2983	shows "{k. k \<in> s \<and> content k \<noteq> 0} division_of {a..b}" using assms(1) apply-
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2984	proof(induct "card s" arbitrary:s rule:nat_less_induct)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2985	fix s::"(real^'n) set set" assume assm:"s division_of {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2986	"\<forall>m<card s. \<forall>x. m = card x \<longrightarrow> x division_of {a..b} \<longrightarrow> {k \<in> x. content k \<noteq> 0} division_of {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2987	note s = division_ofD[OF assm(1)] let ?thesis = "{k \<in> s. content k \<noteq> 0} division_of {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2988	{ presume *:"{k \<in> s. content k \<noteq> 0} \<noteq> s \<Longrightarrow> ?thesis"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2989	show ?thesis apply cases defer apply(rule *,assumption) using assm(1) by auto }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2990	assume noteq:"{k \<in> s. content k \<noteq> 0} \<noteq> s"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2991	then obtain k where k:"k\<in>s" "content k = 0" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2992	from s(4)[OF k(1)] guess c d apply-by(erule exE)+ note k=k this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2993	from k have "card s > 0" unfolding card_gt_0_iff using assm(1) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2994	hence card:"card (s - {k}) < card s" using assm(1) k(1) apply(subst card_Diff_singleton_if) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2995	have *:"closed (\<Union>(s - {k}))" apply(rule closed_Union) defer apply rule apply(drule DiffD1,drule s(4))
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2996	apply safe apply(rule closed_interval) using assm(1) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2997	have "k \<subseteq> \<Union>(s - {k})" apply safe apply(rule *[unfolded closed_limpt,rule_format]) unfolding islimpt_approachable
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2998	proof safe fix x and e::real assume as:"x\<in>k" "e>0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	2999	from k(2)[unfolded k content_eq_0] guess i ..
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3000	hence i:"c$i = d$i" using s(3)[OF k(1),unfolded k] unfolding interval_ne_empty by smt
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3001	hence xi:"x$i = d$i" using as unfolding k mem_interval by smt
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3002	def y \<equiv> "(\<chi> j. if j = i then if c$i \<le> (a$i + b$i) / 2 then c$i + min e (b$i - c$i) / 2 else c$i - min e (c$i - a$i) / 2 else x$j)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3003	show "\<exists>x'\<in>\<Union>(s - {k}). x' \<noteq> x \<and> dist x' x < e" apply(rule_tac x=y in bexI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3004	proof have "d \<in> {c..d}" using s(3)[OF k(1)] unfolding k interval_eq_empty mem_interval by(fastsimp simp add: not_less)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3005	hence "d \<in> {a..b}" using s(2)[OF k(1)] unfolding k by auto note di = this[unfolded mem_interval,THEN spec[where x=i]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3006	hence xyi:"y$i \<noteq> x$i" unfolding y_def unfolding i xi Cart_lambda_beta if_P[OF refl]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3007	apply(cases) apply(subst if_P,assumption) unfolding if_not_P not_le using as(2) using assms(2)[unfolded content_eq_0] by smt+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3008	thus "y \<noteq> x" unfolding Cart_eq by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3009	have *:"UNIV = insert i (UNIV - {i})" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3010	have "norm (y - x) < e + setsum (\<lambda>i. 0) (UNIV::'n set)" apply(rule le_less_trans[OF norm_le_l1])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3011	apply(subst *,subst setsum_insert) prefer 3 apply(rule add_less_le_mono)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3012	proof- show "\<bar>(y - x) $ i\<bar> < e" unfolding y_def Cart_lambda_beta vector_minus_component if_P[OF refl]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3013	apply(cases) apply(subst if_P,assumption) unfolding if_not_P unfolding i xi using di as(2) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3014	show "(\<Sum>i\<in>UNIV - {i}. \<bar>(y - x) $ i\<bar>) \<le> (\<Sum>i\<in>UNIV. 0)" unfolding y_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3015	qed auto thus "dist y x < e" unfolding vector_dist_norm by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3016	have "y\<notin>k" unfolding k mem_interval apply rule apply(erule_tac x=i in allE) using xyi unfolding k i xi by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3017	moreover have "y \<in> \<Union>s" unfolding s mem_interval
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3018	proof note simps = y_def Cart_lambda_beta if_not_P
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3019	fix j::'n show "a $ j \<le> y $ j \<and> y $ j \<le> b $ j"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3020	proof(cases "j = i") case False have "x \<in> {a..b}" using s(2)[OF k(1)] as(1) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3021	thus ?thesis unfolding simps if_not_P[OF False] unfolding mem_interval by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3022	next case True note T = this show ?thesis
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3023	proof(cases "c $ i \<le> (a $ i + b $ i) / 2")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3024	case True show ?thesis unfolding simps if_P[OF T] if_P[OF True] unfolding i
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3025	using True as(2) di apply-apply rule unfolding T by (auto simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3026	next case False thus ?thesis unfolding simps if_P[OF T] if_not_P[OF False] unfolding i
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3027	using True as(2) di apply-apply rule unfolding T by (auto simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3028	qed qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3029	ultimately show "y \<in> \<Union>(s - {k})" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3030	qed qed hence "\<Union>(s - {k}) = {a..b}" unfolding s(6)[THEN sym] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3031	hence "{ka \<in> s - {k}. content ka \<noteq> 0} division_of {a..b}" apply-apply(rule assm(2)[rule_format,OF card refl])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3032	apply(rule division_ofI) defer apply(rule_tac[1-4] s) using assm(1) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3033	moreover have "{ka \<in> s - {k}. content ka \<noteq> 0} = {k \<in> s. content k \<noteq> 0}" using k by auto ultimately show ?thesis by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3034
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3035	subsection {* Integrabibility on subintervals. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3036
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3037	lemma operative_integrable: fixes f::"real^'n \<Rightarrow> 'a::banach" shows
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3038	"operative op \<and> (\<lambda>i. f integrable_on i)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3039	unfolding operative_def neutral_and apply safe apply(subst integrable_on_def)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3040	unfolding has_integral_null_eq apply(rule,rule refl) apply(rule,assumption)+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3041	unfolding integrable_on_def by(auto intro: has_integral_split)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3042
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3043	lemma integrable_subinterval: fixes f::"real^'n \<Rightarrow> 'a::banach"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3044	assumes "f integrable_on {a..b}" "{c..d} \<subseteq> {a..b}" shows "f integrable_on {c..d}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3045	apply(cases "{c..d} = {}") defer apply(rule partial_division_extend_1[OF assms(2)],assumption)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3046	using operative_division_and[OF operative_integrable,THEN sym,of _ _ _ f] assms(1) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3047
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3048	subsection {* Combining adjacent intervals in 1 dimension. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3049
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3050	lemma has_integral_combine: assumes "(a::real^1) \<le> c" "c \<le> b"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3051	"(f has_integral i) {a..c}" "(f has_integral (j::'a::banach)) {c..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3052	shows "(f has_integral (i + j)) {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3053	proof- note operative_integral[of f, unfolded operative_1_le[OF monoidal_lifted[OF monoidal_monoid]]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3054	note conjunctD2[OF this,rule_format] note * = this(2)[OF conjI[OF assms(1-2)],unfolded if_P[OF assms(3)]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3055	hence "f integrable_on {a..b}" apply- apply(rule ccontr) apply(subst(asm) if_P) defer
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3056	apply(subst(asm) if_P) using assms(3-) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3057	with * show ?thesis apply-apply(subst(asm) if_P) defer apply(subst(asm) if_P) defer apply(subst(asm) if_P)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3058	unfolding lifted.simps using assms(3-) by(auto simp add: integrable_on_def integral_unique) qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3059
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3060	lemma integral_combine: fixes f::"real^1 \<Rightarrow> 'a::banach"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3061	assumes "a \<le> c" "c \<le> b" "f integrable_on ({a..b})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3062	shows "integral {a..c} f + integral {c..b} f = integral({a..b}) f"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3063	apply(rule integral_unique[THEN sym]) apply(rule has_integral_combine[OF assms(1-2)])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3064	apply(rule_tac[!] integrable_integral integrable_subinterval[OF assms(3)])+ using assms(1-2) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3065
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3066	lemma integrable_combine: fixes f::"real^1 \<Rightarrow> 'a::banach"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3067	assumes "a \<le> c" "c \<le> b" "f integrable_on {a..c}" "f integrable_on {c..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3068	shows "f integrable_on {a..b}" using assms unfolding integrable_on_def by(fastsimp intro!:has_integral_combine)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3069
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3070	subsection {* Reduce integrability to "local" integrability. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3071
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3072	lemma integrable_on_little_subintervals: fixes f::"real^'n \<Rightarrow> 'a::banach"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3073	assumes "\<forall>x\<in>{a..b}. \<exists>d>0. \<forall>u v. x \<in> {u..v} \<and> {u..v} \<subseteq> ball x d \<and> {u..v} \<subseteq> {a..b} \<longrightarrow> f integrable_on {u..v}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3074	shows "f integrable_on {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3075	proof- have "\<forall>x. \<exists>d. x\<in>{a..b} \<longrightarrow> d>0 \<and> (\<forall>u v. x \<in> {u..v} \<and> {u..v} \<subseteq> ball x d \<and> {u..v} \<subseteq> {a..b} \<longrightarrow> f integrable_on {u..v})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3076	using assms by auto note this[unfolded gauge_existence_lemma] from choice[OF this] guess d .. note d=this[rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3077	guess p apply(rule fine_division_exists[OF gauge_ball_dependent,of d a b]) using d by auto note p=this(1-2)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3078	note division_of_tagged_division[OF this(1)] note * = operative_division_and[OF operative_integrable,OF this,THEN sym,of f]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3079	show ?thesis unfolding * apply safe unfolding snd_conv
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3080	proof- fix x k assume "(x,k) \<in> p" note tagged_division_ofD(2-4)[OF p(1) this] fineD[OF p(2) this]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3081	thus "f integrable_on k" apply safe apply(rule d[THEN conjunct2,rule_format,of x]) by auto qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3082
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3083	subsection {* Second FCT or existence of antiderivative. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3084
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3085	lemma integrable_const[intro]:"(\<lambda>x. c) integrable_on {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3086	unfolding integrable_on_def by(rule,rule has_integral_const)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3087
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3088	lemma integral_has_vector_derivative: fixes f::"real \<Rightarrow> 'a::banach"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3089	assumes "continuous_on {a..b} f" "x \<in> {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3090	shows "((\<lambda>u. integral {vec a..vec u} (f o dest_vec1)) has_vector_derivative f(x)) (at x within {a..b})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3091	unfolding has_vector_derivative_def has_derivative_within_alt
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3092	apply safe apply(rule scaleR.bounded_linear_left)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3093	proof- fix e::real assume e:"e>0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3094	note compact_uniformly_continuous[OF assms(1) compact_real_interval,unfolded uniformly_continuous_on_def]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3095	from this[rule_format,OF e] guess d apply-by(erule conjE exE)+ note d=this[rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3096	let ?I = "\<lambda>a b. integral {vec1 a..vec1 b} (f \<circ> dest_vec1)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3097	show "\<exists>d>0. \<forall>y\<in>{a..b}. norm (y - x) < d \<longrightarrow> norm (?I a y - ?I a x - (y - x) \<^sub>R f x) \<le> e norm (y - x)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3098	proof(rule,rule,rule d,safe) case goal1 show ?case proof(cases "y < x")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3099	case False have "f \<circ> dest_vec1 integrable_on {vec1 a..vec1 y}" apply(rule integrable_subinterval,rule integrable_continuous)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3100	apply(rule continuous_on_o_dest_vec1 assms)+ unfolding not_less using assms(2) goal1 by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3101	hence *:"?I a y - ?I a x = ?I x y" unfolding group_simps apply(subst eq_commute) apply(rule integral_combine)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3102	using False unfolding not_less using assms(2) goal1 by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3103	have **:"norm (y - x) = content {vec1 x..vec1 y}" apply(subst content_1) using False unfolding not_less by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3104	show ?thesis unfolding ** apply(rule has_integral_bound[where f="(\<lambda>u. f u - f x) o dest_vec1"]) unfolding * unfolding o_def
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3105	defer apply(rule has_integral_sub) apply(rule integrable_integral)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3106	apply(rule integrable_subinterval,rule integrable_continuous) apply(rule continuous_on_o_dest_vec1[unfolded o_def] assms)+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3107	proof- show "{vec1 x..vec1 y} \<subseteq> {vec1 a..vec1 b}" using goal1 assms(2) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3108	have *:"y - x = norm(y - x)" using False by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3109	show "((\<lambda>xa. f x) has_integral (y - x) \<^sub>R f x) {vec1 x..vec1 y}" apply(subst ) unfolding ** by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3110	show "\<forall>xa\<in>{vec1 x..vec1 y}. norm (f (dest_vec1 xa) - f x) \<le> e" apply safe apply(rule less_imp_le)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3111	apply(rule d(2)[unfolded vector_dist_norm]) using assms(2) using goal1 by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3112	qed(insert e,auto)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3113	next case True have "f \<circ> dest_vec1 integrable_on {vec1 a..vec1 x}" apply(rule integrable_subinterval,rule integrable_continuous)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3114	apply(rule continuous_on_o_dest_vec1 assms)+ unfolding not_less using assms(2) goal1 by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3115	hence *:"?I a x - ?I a y = ?I y x" unfolding group_simps apply(subst eq_commute) apply(rule integral_combine)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3116	using True using assms(2) goal1 by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3117	have **:"norm (y - x) = content {vec1 y..vec1 x}" apply(subst content_1) using True unfolding not_less by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3118	have **:"\<And>fy fx c::'a. fx - fy - (y - x) \<^sub>R c = -(fy - fx - (x - y) *\<^sub>R c)" unfolding scaleR_left.diff by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3119	show ?thesis apply(subst *) unfolding norm_minus_cancel
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3120	apply(rule has_integral_bound[where f="(\<lambda>u. f u - f x) o dest_vec1"]) unfolding * unfolding o_def
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3121	defer apply(rule has_integral_sub) apply(subst minus_minus[THEN sym]) unfolding minus_minus
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3122	apply(rule integrable_integral) apply(rule integrable_subinterval,rule integrable_continuous)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3123	apply(rule continuous_on_o_dest_vec1[unfolded o_def] assms)+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3124	proof- show "{vec1 y..vec1 x} \<subseteq> {vec1 a..vec1 b}" using goal1 assms(2) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3125	have *:"x - y = norm(y - x)" using True by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3126	show "((\<lambda>xa. f x) has_integral (x - y) \<^sub>R f x) {vec1 y..vec1 x}" apply(subst ) unfolding ** by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3127	show "\<forall>xa\<in>{vec1 y..vec1 x}. norm (f (dest_vec1 xa) - f x) \<le> e" apply safe apply(rule less_imp_le)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3128	apply(rule d(2)[unfolded vector_dist_norm]) using assms(2) using goal1 by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3129	qed(insert e,auto) qed qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3130
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3131	lemma integral_has_vector_derivative': fixes f::"real^1 \<Rightarrow> 'a::banach"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3132	assumes "continuous_on {a..b} f" "x \<in> {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3133	shows "((\<lambda>u. (integral {a..vec u} f)) has_vector_derivative f x) (at (x$1) within {a$1..b$1})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3134	using integral_has_vector_derivative[OF continuous_on_o_vec1[OF assms(1)], of "x$1"]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3135	unfolding o_def vec1_dest_vec1 using assms(2) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3136
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3137	lemma antiderivative_continuous: assumes "continuous_on {a..b::real} f"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3138	obtains g where "\<forall>x\<in> {a..b}. (g has_vector_derivative (f(x)::_::banach)) (at x within {a..b})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3139	apply(rule that,rule) using integral_has_vector_derivative[OF assms] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3140
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3141	subsection {* Combined fundamental theorem of calculus. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3142
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3143	lemma antiderivative_integral_continuous: fixes f::"real \<Rightarrow> 'a::banach" assumes "continuous_on {a..b} f"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3144	obtains g where "\<forall>u\<in>{a..b}. \<forall>v \<in> {a..b}. u \<le> v \<longrightarrow> ((f o dest_vec1) has_integral (g v - g u)) {vec u..vec v}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3145	proof- from antiderivative_continuous[OF assms] guess g . note g=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3146	show ?thesis apply(rule that[of g])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3147	proof safe case goal1 have "\<forall>x\<in>{u..v}. (g has_vector_derivative f x) (at x within {u..v})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3148	apply(rule,rule has_vector_derivative_within_subset) apply(rule g[rule_format]) using goal1(1-2) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3149	thus ?case using fundamental_theorem_of_calculus[OF goal1(3),of "g o dest_vec1" "f o dest_vec1"]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3150	unfolding o_def vec1_dest_vec1 by auto qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3151
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3152	subsection {* General "twiddling" for interval-to-interval function image. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3153
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3154	lemma has_integral_twiddle:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3155	assumes "0 < r" "\<forall>x. h(g x) = x" "\<forall>x. g(h x) = x" "\<forall>x. continuous (at x) g"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3156	"\<forall>u v. \<exists>w z. g ` {u..v} = {w..z}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3157	"\<forall>u v. \<exists>w z. h ` {u..v} = {w..z}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3158	"\<forall>u v. content(g ` {u..v}) = r * content {u..v}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3159	"(f has_integral i) {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3160	shows "((\<lambda>x. f(g x)) has_integral (1 / r) *\<^sub>R i) (h ` {a..b})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3161	proof- { presume *:"{a..b} \<noteq> {} \<Longrightarrow> ?thesis"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3162	show ?thesis apply cases defer apply(rule *,assumption)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3163	proof- case goal1 thus ?thesis unfolding goal1 assms(8)[unfolded goal1 has_integral_empty_eq] by auto qed }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3164	assume "{a..b} \<noteq> {}" from assms(6)[rule_format,of a b] guess w z apply-by(erule exE)+ note wz=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3165	have inj:"inj g" "inj h" unfolding inj_on_def apply safe apply(rule_tac[!] ccontr)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3166	using assms(2) apply(erule_tac x=x in allE) using assms(2) apply(erule_tac x=y in allE) defer
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3167	using assms(3) apply(erule_tac x=x in allE) using assms(3) apply(erule_tac x=y in allE) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3168	show ?thesis unfolding has_integral_def has_integral_compact_interval_def apply(subst if_P) apply(rule,rule,rule wz)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3169	proof safe fix e::real assume e:"e>0" hence "e * r > 0" using assms(1) by(rule mult_pos_pos)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3170	from assms(8)[unfolded has_integral,rule_format,OF this] guess d apply-by(erule exE conjE)+ note d=this[rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3171	def d' \<equiv> "\<lambda>x y. d (g x) (g y)" have d':"\<And>x. d' x = {y. g y \<in> (d (g x))}" unfolding d'_def by(auto simp add:mem_def)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3172	show "\<exists>d. gauge d \<and> (\<forall>p. p tagged_division_of h ` {a..b} \<and> d fine p \<longrightarrow> norm ((\<Sum>(x, k)\<in>p. content k \<^sub>R f (g x)) - (1 / r) \<^sub>R i) < e)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3173	proof(rule_tac x=d' in exI,safe) show "gauge d'" using d(1) unfolding gauge_def d' using continuous_open_preimage_univ[OF assms(4)] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3174	fix p assume as:"p tagged_division_of h ` {a..b}" "d' fine p" note p = tagged_division_ofD[OF as(1)]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3175	have "(\<lambda>(x, k). (g x, g ` k)) ` p tagged_division_of {a..b} \<and> d fine (\<lambda>(x, k). (g x, g ` k)) ` p" unfolding tagged_division_of
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3176	proof safe show "finite ((\<lambda>(x, k). (g x, g ` k)) ` p)" using as by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3177	show "d fine (\<lambda>(x, k). (g x, g ` k)) ` p" using as(2) unfolding fine_def d' by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3178	fix x k assume xk[intro]:"(x,k) \<in> p" show "g x \<in> g ` k" using p(2)[OF xk] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3179	show "\<exists>u v. g ` k = {u..v}" using p(4)[OF xk] using assms(5-6) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3180	{ fix y assume "y \<in> k" thus "g y \<in> {a..b}" "g y \<in> {a..b}" using p(3)[OF xk,unfolded subset_eq,rule_format,of "h (g y)"]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3181	using assms(2)[rule_format,of y] unfolding inj_image_mem_iff[OF inj(2)] by auto }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3182	fix x' k' assume xk':"(x',k') \<in> p" fix z assume "z \<in> interior (g ` k)" "z \<in> interior (g ` k')"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3183	hence *:"interior (g ` k) \<inter> interior (g ` k') \<noteq> {}" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3184	have same:"(x, k) = (x', k')" apply-apply(rule ccontr,drule p(5)[OF xk xk'])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3185	proof- assume as:"interior k \<inter> interior k' = {}" from nonempty_witness[OF *] guess z .
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3186	hence "z \<in> g ` (interior k \<inter> interior k')" using interior_image_subset[OF assms(4) inj(1)]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3187	unfolding image_Int[OF inj(1)] by auto thus False using as by blast
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3188	qed thus "g x = g x'" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3189	{ fix z assume "z \<in> k" thus "g z \<in> g ` k'" using same by auto }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3190	{ fix z assume "z \<in> k'" thus "g z \<in> g ` k" using same by auto }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3191	next fix x assume "x \<in> {a..b}" hence "h x \<in> \<Union>{k. \<exists>x. (x, k) \<in> p}" using p(6) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3192	then guess X unfolding Union_iff .. note X=this from this(1) guess y unfolding mem_Collect_eq ..
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3193	thus "x \<in> \<Union>{k. \<exists>x. (x, k) \<in> (\<lambda>(x, k). (g x, g ` k)) ` p}" apply-
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3194	apply(rule_tac X="g ` X" in UnionI) defer apply(rule_tac x="h x" in image_eqI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3195	using X(2) assms(3)[rule_format,of x] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3196	qed note ** = d(2)[OF this] have *:"inj_on (\<lambda>(x, k). (g x, g ` k)) p" using inj(1) unfolding inj_on_def by fastsimp
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3197	have "(\<Sum>(x, k)\<in>(\<lambda>(x, k). (g x, g ` k)) ` p. content k \<^sub>R f x) - i = r \<^sub>R (\<Sum>(x, k)\<in>p. content k *\<^sub>R f (g x)) - i" (is "?l = _") unfolding group_simps add_left_cancel
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3198	unfolding setsum_reindex[OF *] apply(subst scaleR_right.setsum) defer apply(rule setsum_cong2) unfolding o_def split_paired_all split_conv
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3199	apply(drule p(4)) apply safe unfolding assms(7)[rule_format] using p by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3200	also have "... = r \<^sub>R ((\<Sum>(x, k)\<in>p. content k \<^sub>R f (g x)) - (1 / r) *\<^sub>R i)" (is "_ = ?r") unfolding scaleR.diff_right scaleR.scaleR_left[THEN sym]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3201	unfolding real_scaleR_def using assms(1) by auto finally have *:"?l = ?r" .
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3202	show "norm ((\<Sum>(x, k)\<in>p. content k \<^sub>R f (g x)) - (1 / r) \<^sub>R i) < e" using ** unfolding * unfolding norm_scaleR
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3203	using assms(1) by(auto simp add:field_simps) qed qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3204
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3205	subsection {* Special case of a basic affine transformation. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3206
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3207	lemma interval_image_affinity_interval: shows "\<exists>u v. (\<lambda>x. m *\<^sub>R (x::real^'n) + c) ` {a..b} = {u..v}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3208	unfolding image_affinity_interval by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3209
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3210	lemmas Cart_simps = Cart_nth.add Cart_nth.minus Cart_nth.zero Cart_nth.diff Cart_nth.scaleR real_scaleR_def Cart_lambda_beta
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3211	Cart_eq vector_le_def vector_less_def
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3212
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3213	lemma setprod_cong2: assumes "\<And>x. x \<in> A \<Longrightarrow> f x = g x" shows "setprod f A = setprod g A"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3214	apply(rule setprod_cong) using assms by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3215
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3216	lemma content_image_affinity_interval:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3217	"content((\<lambda>x::real^'n. m \<^sub>R x + c) ` {a..b}) = (abs m) ^ CARD('n) content {a..b}" (is "?l = ?r")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3218	proof- { presume :"{a..b}\<noteq>{} \<Longrightarrow> ?thesis" show ?thesis apply(cases,rule ,assumption)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3219	unfolding not_not using content_empty by auto }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3220	assume as:"{a..b}\<noteq>{}" show ?thesis proof(cases "m \<ge> 0")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3221	case True show ?thesis unfolding image_affinity_interval if_not_P[OF as] if_P[OF True]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3222	unfolding content_closed_interval'[OF as] apply(subst content_closed_interval')
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3223	defer apply(subst setprod_constant[THEN sym]) apply(rule finite_UNIV) unfolding setprod_timesf[THEN sym]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3224	apply(rule setprod_cong2) using True as unfolding interval_ne_empty Cart_simps not_le
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3225	by(auto simp add:field_simps intro:mult_left_mono)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3226	next case False show ?thesis unfolding image_affinity_interval if_not_P[OF as] if_not_P[OF False]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3227	unfolding content_closed_interval'[OF as] apply(subst content_closed_interval')
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3228	defer apply(subst setprod_constant[THEN sym]) apply(rule finite_UNIV) unfolding setprod_timesf[THEN sym]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3229	apply(rule setprod_cong2) using False as unfolding interval_ne_empty Cart_simps not_le
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3230	by(auto simp add:field_simps mult_le_cancel_left_neg) qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3231
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3232	lemma has_integral_affinity: assumes "(f has_integral i) {a..b::real^'n}" "m \<noteq> 0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3233	shows "((\<lambda>x. f(m \<^sub>R x + c)) has_integral ((1 / (abs(m) ^ CARD('n::finite))) \<^sub>R i)) ((\<lambda>x. (1 / m) \<^sub>R x + -((1 / m) \<^sub>R c)) ` {a..b})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3234	apply(rule has_integral_twiddle,safe) unfolding Cart_eq Cart_simps apply(rule zero_less_power)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3235	defer apply(insert assms(2), simp add:field_simps) apply(insert assms(2), simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3236	apply(rule continuous_intros)+ apply(rule interval_image_affinity_interval)+ apply(rule content_image_affinity_interval) using assms by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3237
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3238	lemma integrable_affinity: assumes "f integrable_on {a..b}" "m \<noteq> 0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3239	shows "(\<lambda>x. f(m \<^sub>R x + c)) integrable_on ((\<lambda>x. (1 / m) \<^sub>R x + -((1/m) *\<^sub>R c)) ` {a..b})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3240	using assms unfolding integrable_on_def apply safe apply(drule has_integral_affinity) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3241
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3242	subsection {* Special case of stretching coordinate axes separately. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3243
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3244	lemma image_stretch_interval:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3245	"(\<lambda>x. \<chi> k. m k * x$k) ` {a..b::real^'n} =
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3246	(if {a..b} = {} then {} else {(\<chi> k. min (m(k) * a$k) (m(k) * b$k)) .. (\<chi> k. max (m(k) * a$k) (m(k) * b$k))})" (is "?l = ?r")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3247	proof(cases "{a..b}={}") case True thus ?thesis unfolding True by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3248	next have *:"\<And>P Q. (\<forall>i. P i) \<and> (\<forall>i. Q i) \<longleftrightarrow> (\<forall>i. P i \<and> Q i)" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3249	case False note ab = this[unfolded interval_ne_empty]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3250	show ?thesis apply-apply(rule set_ext)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3251	proof- fix x::"real^'n" have **:"\<And>P Q. (\<forall>i. P i = Q i) \<Longrightarrow> (\<forall>i. P i) = (\<forall>i. Q i)" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3252	show "x \<in> ?l \<longleftrightarrow> x \<in> ?r" unfolding if_not_P[OF False]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3253	unfolding image_iff mem_interval Bex_def Cart_simps Cart_eq *
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3254	unfolding lambda_skolem[THEN sym,of "\<lambda> i xa. (a $ i \<le> xa \<and> xa \<le> b $ i) \<and> x $ i = m i * xa"]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3255	proof(rule *,rule) fix i::'n show "(\<exists>xa. (a $ i \<le> xa \<and> xa \<le> b $ i) \<and> x $ i = m i xa) =
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3256	(min (m i * a $ i) (m i * b $ i) \<le> x $ i \<and> x $ i \<le> max (m i * a $ i) (m i * b $ i))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3257	proof(cases "m i = 0") case True thus ?thesis using ab by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3258	next case False hence "0 < m i \<or> 0 > m i" by auto thus ?thesis apply-
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3259	proof(erule disjE) assume as:"0 < m i" hence :"min (m i a $ i) (m i * b $ i) = m i * a $ i"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3260	"max (m i * a $ i) (m i * b $ i) = m i * b $ i" using ab unfolding min_def max_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3261	show ?thesis unfolding * apply rule defer apply(rule_tac x="1 / m i * x$i" in exI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3262	using as by(auto simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3263	next assume as:"0 > m i" hence :"max (m i a $ i) (m i * b $ i) = m i * a $ i"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3264	"min (m i * a $ i) (m i * b $ i) = m i * b $ i" using ab as unfolding min_def max_def
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3265	by(auto simp add:field_simps mult_le_cancel_left_neg intro:real_le_antisym)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3266	show ?thesis unfolding * apply rule defer apply(rule_tac x="1 / m i * x$i" in exI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3267	using as by(auto simp add:field_simps) qed qed qed qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3268
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3269	lemma interval_image_stretch_interval: "\<exists>u v. (\<lambda>x. \<chi> k. m k * x$k) ` {a..b::real^'n} = {u..v}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3270	unfolding image_stretch_interval by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3271
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3272	lemma content_image_stretch_interval:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3273	"content((\<lambda>x::real^'n. \<chi> k. m k * x$k) ` {a..b}) = abs(setprod m UNIV) * content({a..b})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3274	proof(cases "{a..b} = {}") case True thus ?thesis
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3275	unfolding content_def image_is_empty image_stretch_interval if_P[OF True] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3276	next case False hence "(\<lambda>x. \<chi> k. m k * x $ k) ` {a..b} \<noteq> {}" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3277	thus ?thesis using False unfolding content_def image_stretch_interval apply- unfolding interval_bounds' if_not_P
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3278	unfolding abs_setprod setprod_timesf[THEN sym] apply(rule setprod_cong2) unfolding Cart_lambda_beta
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3279	proof- fix i::'n have "(m i < 0 \<or> m i > 0) \<or> m i = 0" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3280	thus "max (m i * a $ i) (m i * b $ i) - min (m i * a $ i) (m i * b $ i) = \<bar>m i\<bar> * (b $ i - a $ i)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3281	apply-apply(erule disjE)+ unfolding min_def max_def using False[unfolded interval_ne_empty,rule_format,of i]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3282	by(auto simp add:field_simps not_le mult_le_cancel_left_neg mult_le_cancel_left_pos) qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3283
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3284	lemma has_integral_stretch: assumes "(f has_integral i) {a..b}" "\<forall>k. ~(m k = 0)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3285	shows "((\<lambda>x. f(\<chi> k. m k * x$k)) has_integral
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3286	((1/(abs(setprod m UNIV))) \<^sub>R i)) ((\<lambda>x. \<chi> k. 1/(m k) x$k) ` {a..b})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3287	apply(rule has_integral_twiddle) unfolding zero_less_abs_iff content_image_stretch_interval
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3288	unfolding image_stretch_interval empty_as_interval Cart_eq using assms
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3289	proof- show "\<forall>x. continuous (at x) (\<lambda>x. \<chi> k. m k * x $ k)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3290	apply(rule,rule linear_continuous_at) unfolding linear_linear
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3291	unfolding linear_def Cart_simps Cart_eq by(auto simp add:field_simps) qed auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3292
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3293	lemma integrable_stretch:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3294	assumes "f integrable_on {a..b}" "\<forall>k. ~(m k = 0)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3295	shows "(\<lambda>x. f(\<chi> k. m k * x$k)) integrable_on ((\<lambda>x. \<chi> k. 1/(m k) * x$k) ` {a..b})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3296	using assms unfolding integrable_on_def apply-apply(erule exE) apply(drule has_integral_stretch) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3297
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3298	subsection {* even more special cases. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3299
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3300	lemma uminus_interval_vector[simp]:"uminus ` {a..b} = {-b .. -a::real^'n}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3301	apply(rule set_ext,rule) defer unfolding image_iff
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3302	apply(rule_tac x="-x" in bexI) by(auto simp add:vector_le_def minus_le_iff le_minus_iff)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3303
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3304	lemma has_integral_reflect_lemma[intro]: assumes "(f has_integral i) {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3305	shows "((\<lambda>x. f(-x)) has_integral i) {-b .. -a}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3306	using has_integral_affinity[OF assms, of "-1" 0] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3307
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3308	lemma has_integral_reflect[simp]: "((\<lambda>x. f(-x)) has_integral i) {-b..-a} \<longleftrightarrow> (f has_integral i) ({a..b})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3309	apply rule apply(drule_tac[!] has_integral_reflect_lemma) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3310
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3311	lemma integrable_reflect[simp]: "(\<lambda>x. f(-x)) integrable_on {-b..-a} \<longleftrightarrow> f integrable_on {a..b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3312	unfolding integrable_on_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3313
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3314	lemma integral_reflect[simp]: "integral {-b..-a} (\<lambda>x. f(-x)) = integral ({a..b}) f"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3315	unfolding integral_def by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3316
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3317	subsection {* Stronger form of FCT; quite a tedious proof. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3318
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3319	( move this )
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3320	declare norm_triangle_ineq4[intro]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3321
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3322	lemma bgauge_existence_lemma: "(\<forall>x\<in>s. \<exists>d::real. 0 < d \<and> q d x) \<longleftrightarrow> (\<forall>x. \<exists>d>0. x\<in>s \<longrightarrow> q d x)" by(meson zero_less_one)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3323
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3324	lemma additive_tagged_division_1': fixes f::"real \<Rightarrow> 'a::real_normed_vector"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3325	assumes "a \<le> b" "p tagged_division_of {vec1 a..vec1 b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3326	shows "setsum (\<lambda>(x,k). f (dest_vec1 (interval_upperbound k)) - f(dest_vec1 (interval_lowerbound k))) p = f b - f a"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3327	using additive_tagged_division_1[OF _ assms(2), of "f o dest_vec1"]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3328	unfolding o_def vec1_dest_vec1 using assms(1) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3329
36318 3567d0571932 eliminated spurious schematic statements; wenzelm parents: 36244 diff changeset	3330	lemma split_minus[simp]:"(\<lambda>(x, k). f x k) x - (\<lambda>(x, k). g x k) x = (\<lambda>(x, k). f x k - g x k) x"
35172 579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3331	unfolding split_def by(rule refl)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3332
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3333	lemma norm_triangle_le_sub: "norm x + norm y \<le> e \<Longrightarrow> norm (x - y) \<le> e"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3334	apply(subst(asm)(2) norm_minus_cancel[THEN sym])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3335	apply(drule norm_triangle_le) by(auto simp add:group_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3336
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3337	lemma fundamental_theorem_of_calculus_interior:
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3338	assumes"a \<le> b" "continuous_on {a..b} f" "\<forall>x\<in>{a<..<b}. (f has_vector_derivative f'(x)) (at x)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3339	shows "((f' o dest_vec1) has_integral (f b - f a)) {vec a..vec b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3340	proof- { presume *:"a < b \<Longrightarrow> ?thesis"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3341	show ?thesis proof(cases,rule *,assumption)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3342	assume "\<not> a < b" hence "a = b" using assms(1) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3343	hence *:"{vec a .. vec b} = {vec b}" "f b - f a = 0" apply(auto simp add: Cart_simps) by smt
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3344	show ?thesis unfolding (2) apply(rule has_integral_null) unfolding content_eq_0_1 using `a=b` by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3345	qed } assume ab:"a < b"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3346	let ?P = "\<lambda>e. \<exists>d. gauge d \<and> (\<forall>p. p tagged_division_of {vec1 a..vec1 b} \<and> d fine p \<longrightarrow>
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3347	norm ((\<Sum>(x, k)\<in>p. content k \<^sub>R (f' \<circ> dest_vec1) x) - (f b - f a)) \<le> e content {vec1 a..vec1 b})"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3348	{ presume "\<And>e. e>0 \<Longrightarrow> ?P e" thus ?thesis unfolding has_integral_factor_content by auto }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3349	fix e::real assume e:"e>0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3350	note assms(3)[unfolded has_vector_derivative_def has_derivative_at_alt ball_conj_distrib]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3351	note conjunctD2[OF this] note bounded=this(1) and this(2)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3352	from this(2) have "\<forall>x\<in>{a<..<b}. \<exists>d>0. \<forall>y. norm (y - x) < d \<longrightarrow> norm (f y - f x - (y - x) \<^sub>R f' x) \<le> e/2 norm (y - x)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3353	apply-apply safe apply(erule_tac x=x in ballE,erule_tac x="e/2" in allE) using e by auto note this[unfolded bgauge_existence_lemma]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3354	from choice[OF this] guess d .. note conjunctD2[OF this[rule_format]] note d = this[rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3355	have "bounded (f ` {a..b})" apply(rule compact_imp_bounded compact_continuous_image)+ using compact_real_interval assms by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3356	from this[unfolded bounded_pos] guess B .. note B = this[rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3357
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3358	have "\<exists>da. 0 < da \<and> (\<forall>c. a \<le> c \<and> {a..c} \<subseteq> {a..b} \<and> {a..c} \<subseteq> ball a da
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3359	\<longrightarrow> norm(content {vec1 a..vec1 c} \<^sub>R f' a - (f c - f a)) \<le> (e (b - a)) / 4)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3360	proof- have "a\<in>{a..b}" using ab by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3361	note assms(2)[unfolded continuous_on_eq_continuous_within,rule_format,OF this]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3362	note * = this[unfolded continuous_within Lim_within,rule_format] have "(e * (b - a)) / 8 > 0" using e ab by(auto simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3363	from *[OF this] guess k .. note k = conjunctD2[OF this,rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3364	have "\<exists>l. 0 < l \<and> norm(l \<^sub>R f' a) \<le> (e (b - a)) / 8"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3365	proof(cases "f' a = 0") case True
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3366	thus ?thesis apply(rule_tac x=1 in exI) using ab e by(auto intro!:mult_nonneg_nonneg)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3367	next case False thus ?thesis
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3368	apply(rule_tac x="(e * (b - a)) / 8 / norm (f' a)" in exI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3369	using ab e by(auto simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3370	qed then guess l .. note l = conjunctD2[OF this]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3371	show ?thesis apply(rule_tac x="min k l" in exI) apply safe unfolding min_less_iff_conj apply(rule,(rule l k)+)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3372	proof- fix c assume as:"a \<le> c" "{a..c} \<subseteq> {a..b}" "{a..c} \<subseteq> ball a (min k l)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3373	note as' = this[unfolded subset_eq Ball_def mem_ball dist_real_def mem_interval]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3374	have "norm ((c - a) \<^sub>R f' a - (f c - f a)) \<le> norm ((c - a) \<^sub>R f' a) + norm (f c - f a)" by(rule norm_triangle_ineq4)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3375	also have "... \<le> e * (b - a) / 8 + e * (b - a) / 8"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3376	proof(rule add_mono) case goal1 have "\<bar>c - a\<bar> \<le> \<bar>l\<bar>" using as' by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3377	thus ?case apply-apply(rule order_trans[OF _ l(2)]) unfolding norm_scaleR apply(rule mult_right_mono) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3378	next case goal2 show ?case apply(rule less_imp_le) apply(cases "a = c") defer
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3379	apply(rule k(2)[unfolded vector_dist_norm]) using as' e ab by(auto simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3380	qed finally show "norm (content {vec1 a..vec1 c} \<^sub>R f' a - (f c - f a)) \<le> e (b - a) / 4" unfolding content_1'[OF as(1)] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3381	qed qed then guess da .. note da=conjunctD2[OF this,rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3382
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3383	have "\<exists>db>0. \<forall>c\<le>b. {c..b} \<subseteq> {a..b} \<and> {c..b} \<subseteq> ball b db \<longrightarrow> norm(content {vec1 c..vec1 b} \<^sub>R f' b - (f b - f c)) \<le> (e (b - a)) / 4"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3384	proof- have "b\<in>{a..b}" using ab by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3385	note assms(2)[unfolded continuous_on_eq_continuous_within,rule_format,OF this]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3386	note * = this[unfolded continuous_within Lim_within,rule_format] have "(e * (b - a)) / 8 > 0" using e ab by(auto simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3387	from *[OF this] guess k .. note k = conjunctD2[OF this,rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3388	have "\<exists>l. 0 < l \<and> norm(l \<^sub>R f' b) \<le> (e (b - a)) / 8"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3389	proof(cases "f' b = 0") case True
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3390	thus ?thesis apply(rule_tac x=1 in exI) using ab e by(auto intro!:mult_nonneg_nonneg)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3391	next case False thus ?thesis
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3392	apply(rule_tac x="(e * (b - a)) / 8 / norm (f' b)" in exI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3393	using ab e by(auto simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3394	qed then guess l .. note l = conjunctD2[OF this]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3395	show ?thesis apply(rule_tac x="min k l" in exI) apply safe unfolding min_less_iff_conj apply(rule,(rule l k)+)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3396	proof- fix c assume as:"c \<le> b" "{c..b} \<subseteq> {a..b}" "{c..b} \<subseteq> ball b (min k l)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3397	note as' = this[unfolded subset_eq Ball_def mem_ball dist_real_def mem_interval]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3398	have "norm ((b - c) \<^sub>R f' b - (f b - f c)) \<le> norm ((b - c) \<^sub>R f' b) + norm (f b - f c)" by(rule norm_triangle_ineq4)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3399	also have "... \<le> e * (b - a) / 8 + e * (b - a) / 8"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3400	proof(rule add_mono) case goal1 have "\<bar>c - b\<bar> \<le> \<bar>l\<bar>" using as' by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3401	thus ?case apply-apply(rule order_trans[OF _ l(2)]) unfolding norm_scaleR apply(rule mult_right_mono) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3402	next case goal2 show ?case apply(rule less_imp_le) apply(cases "b = c") defer apply(subst norm_minus_commute)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3403	apply(rule k(2)[unfolded vector_dist_norm]) using as' e ab by(auto simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3404	qed finally show "norm (content {vec1 c..vec1 b} \<^sub>R f' b - (f b - f c)) \<le> e (b - a) / 4" unfolding content_1'[OF as(1)] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3405	qed qed then guess db .. note db=conjunctD2[OF this,rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3406
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3407	let ?d = "(\<lambda>x. ball x (if x=vec1 a then da else if x=vec b then db else d (dest_vec1 x)))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3408	show "?P e" apply(rule_tac x="?d" in exI)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3409	proof safe case goal1 show ?case apply(rule gauge_ball_dependent) using ab db(1) da(1) d(1) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3410	next case goal2 note as=this let ?A = "{t. fst t \<in> {vec1 a, vec1 b}}" note p = tagged_division_ofD[OF goal2(1)]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3411	have pA:"p = (p \<inter> ?A) \<union> (p - ?A)" "finite (p \<inter> ?A)" "finite (p - ?A)" "(p \<inter> ?A) \<inter> (p - ?A) = {}" using goal2 by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3412	note * = additive_tagged_division_1'[OF assms(1) goal2(1), THEN sym]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3413	have **:"\<And>n1 s1 n2 s2::real. n2 \<le> s2 / 2 \<Longrightarrow> n1 - s1 \<le> s2 / 2 \<Longrightarrow> n1 + n2 \<le> s1 + s2" by arith
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3414	show ?case unfolding content_1'[OF assms(1)] and [of "\<lambda>x. x"] [of f] setsum_subtractf[THEN sym] split_minus
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3415	unfolding setsum_right_distrib apply(subst(2) pA,subst pA) unfolding setsum_Un_disjoint[OF pA(2-)]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3416	proof(rule norm_triangle_le,rule **)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3417	case goal1 show ?case apply(rule order_trans,rule setsum_norm_le) apply(rule pA) defer apply(subst divide.setsum)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3418	proof(rule order_refl,safe,unfold not_le o_def split_conv fst_conv,rule ccontr) fix x k assume as:"(x,k) \<in> p"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3419	"e * (dest_vec1 (interval_upperbound k) - dest_vec1 (interval_lowerbound k)) / 2
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3420	< norm (content k *\<^sub>R f' (dest_vec1 x) - (f (dest_vec1 (interval_upperbound k)) - f (dest_vec1 (interval_lowerbound k))))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3421	from p(4)[OF this(1)] guess u v apply-by(erule exE)+ note k=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3422	hence "\<forall>i. u$i \<le> v$i" and uv:"{u,v}\<subseteq>{u..v}" using p(2)[OF as(1)] by auto note this(1) this(1)[unfolded forall_1]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3423	note result = as(2)[unfolded k interval_bounds[OF this(1)] content_1[OF this(2)]]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3424
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3425	assume as':"x \<noteq> vec1 a" "x \<noteq> vec1 b" hence "x$1 \<in> {a<..<b}" using p(2-3)[OF as(1)] by(auto simp add:Cart_simps) note * = d(2)[OF this]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3426	have "norm ((v$1 - u$1) *\<^sub>R f' (x$1) - (f (v$1) - f (u$1))) =
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3427	norm ((f (u$1) - f (x$1) - (u$1 - x$1) \<^sub>R f' (x$1)) - (f (v$1) - f (x$1) - (v$1 - x$1) \<^sub>R f' (x$1)))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3428	apply(rule arg_cong[of _ _ norm]) unfolding scaleR_left.diff by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3429	also have "... \<le> e / 2 * norm (u$1 - x$1) + e / 2 * norm (v$1 - x$1)" apply(rule norm_triangle_le_sub)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3430	apply(rule add_mono) apply(rule_tac[!] *) using fineD[OF goal2(2) as(1)] as' unfolding k subset_eq
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3431	apply- apply(erule_tac x=u in ballE,erule_tac[3] x=v in ballE) using uv by(auto simp add:dist_real)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3432	also have "... \<le> e / 2 * norm (v$1 - u$1)" using p(2)[OF as(1)] unfolding k by(auto simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3433	finally have "e * (dest_vec1 v - dest_vec1 u) / 2 < e * (dest_vec1 v - dest_vec1 u) / 2"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3434	apply- apply(rule less_le_trans[OF result]) using uv by auto thus False by auto qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3435
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3436	next have *:"\<And>x s1 s2::real. 0 \<le> s1 \<Longrightarrow> x \<le> (s1 + s2) / 2 \<Longrightarrow> x - s1 \<le> s2 / 2" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3437	case goal2 show ?case apply(rule *) apply(rule setsum_nonneg) apply(rule,unfold split_paired_all split_conv)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3438	defer unfolding setsum_Un_disjoint[OF pA(2-),THEN sym] pA(1)[THEN sym] unfolding setsum_right_distrib[THEN sym]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3439	apply(subst additive_tagged_division_1[OF _ as(1)]) unfolding vec1_dest_vec1 apply(rule assms)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3440	proof- fix x k assume "(x,k) \<in> p \<inter> {t. fst t \<in> {vec1 a, vec1 b}}" note xk=IntD1[OF this]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3441	from p(4)[OF this] guess u v apply-by(erule exE)+ note uv=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3442	with p(2)[OF xk] have "{u..v} \<noteq> {}" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3443	thus "0 \<le> e * ((interval_upperbound k)$1 - (interval_lowerbound k)$1)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3444	unfolding uv using e by(auto simp add:field_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3445	next have *:"\<And>s f t e. setsum f s = setsum f t \<Longrightarrow> norm(setsum f t) \<le> e \<Longrightarrow> norm(setsum f s) \<le> e" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3446	show "norm (\<Sum>(x, k)\<in>p \<inter> ?A. content k *\<^sub>R (f' \<circ> dest_vec1) x -
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3447	(f ((interval_upperbound k)$1) - f ((interval_lowerbound k)$1))) \<le> e * (b - a) / 2"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3448	apply(rule *[where t="p \<inter> {t. fst t \<in> {vec1 a, vec1 b} \<and> content(snd t) \<noteq> 0}"])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3449	apply(rule setsum_mono_zero_right[OF pA(2)]) defer apply(rule) unfolding split_paired_all split_conv o_def
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3450	proof- fix x k assume "(x,k) \<in> p \<inter> {t. fst t \<in> {vec1 a, vec1 b}} - p \<inter> {t. fst t \<in> {vec1 a, vec1 b} \<and> content (snd t) \<noteq> 0}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3451	hence xk:"(x,k)\<in>p" "content k = 0" by auto from p(4)[OF xk(1)] guess u v apply-by(erule exE)+ note uv=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3452	have "k\<noteq>{}" using p(2)[OF xk(1)] by auto hence *:"u = v" using xk unfolding uv content_eq_0_1 interval_eq_empty by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3453	thus "content k *\<^sub>R (f' (x$1)) - (f ((interval_upperbound k)$1) - f ((interval_lowerbound k)$1)) = 0" using xk unfolding uv by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3454	next have *:"p \<inter> {t. fst t \<in> {vec1 a, vec1 b} \<and> content(snd t) \<noteq> 0} =
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3455	{t. t\<in>p \<and> fst t = vec1 a \<and> content(snd t) \<noteq> 0} \<union> {t. t\<in>p \<and> fst t = vec1 b \<and> content(snd t) \<noteq> 0}" by blast
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3456	have **:"\<And>s f. \<And>e::real. (\<forall>x y. x \<in> s \<and> y \<in> s \<longrightarrow> x = y) \<Longrightarrow> (\<forall>x. x \<in> s \<longrightarrow> norm(f x) \<le> e) \<Longrightarrow> e>0 \<Longrightarrow> norm(setsum f s) \<le> e"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3457	proof(case_tac "s={}") case goal2 then obtain x where "x\<in>s" by auto hence *:"s = {x}" using goal2(1) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3458	thus ?case using `x\<in>s` goal2(2) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3459	qed auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3460	case goal2 show ?case apply(subst , subst setsum_Un_disjoint) prefer 4 apply(rule order_trans[of _ "e (b - a)/4 + e * (b - a)/4"])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3461	apply(rule norm_triangle_le,rule add_mono) apply(rule_tac[1-2] **)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3462	proof- let ?B = "\<lambda>x. {t \<in> p. fst t = vec1 x \<and> content (snd t) \<noteq> 0}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3463	have pa:"\<And>k. (vec1 a, k) \<in> p \<Longrightarrow> \<exists>v. k = {vec1 a .. v} \<and> vec1 a \<le> v"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3464	proof- case goal1 guess u v using p(4)[OF goal1] apply-by(erule exE)+ note uv=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3465	have *:"u \<le> v" using p(2)[OF goal1] unfolding uv by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3466	have u:"u = vec1 a" proof(rule ccontr) have "u \<in> {u..v}" using p(2-3)[OF goal1(1)] unfolding uv by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3467	have "u \<ge> vec1 a" using p(2-3)[OF goal1(1)] unfolding uv subset_eq by auto moreover assume "u\<noteq>vec1 a" ultimately
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3468	have "u > vec1 a" unfolding Cart_simps by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3469	thus False using p(2)[OF goal1(1)] unfolding uv by(auto simp add:Cart_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3470	qed thus ?case apply(rule_tac x=v in exI) unfolding uv using * by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3471	qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3472	have pb:"\<And>k. (vec1 b, k) \<in> p \<Longrightarrow> \<exists>v. k = {v .. vec1 b} \<and> vec1 b \<ge> v"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3473	proof- case goal1 guess u v using p(4)[OF goal1] apply-by(erule exE)+ note uv=this
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3474	have *:"u \<le> v" using p(2)[OF goal1] unfolding uv by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3475	have u:"v = vec1 b" proof(rule ccontr) have "u \<in> {u..v}" using p(2-3)[OF goal1(1)] unfolding uv by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3476	have "v \<le> vec1 b" using p(2-3)[OF goal1(1)] unfolding uv subset_eq by auto moreover assume "v\<noteq>vec1 b" ultimately
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3477	have "v < vec1 b" unfolding Cart_simps by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3478	thus False using p(2)[OF goal1(1)] unfolding uv by(auto simp add:Cart_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3479	qed thus ?case apply(rule_tac x=u in exI) unfolding uv using * by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3480	qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3481
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3482	show "\<forall>x y. x \<in> ?B a \<and> y \<in> ?B a \<longrightarrow> x = y" apply(rule,rule,rule,unfold split_paired_all)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3483	unfolding mem_Collect_eq fst_conv snd_conv apply safe
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3484	proof- fix x k k' assume k:"(vec1 a, k) \<in> p" "(vec1 a, k') \<in> p" "content k \<noteq> 0" "content k' \<noteq> 0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3485	guess v using pa[OF k(1)] .. note v = conjunctD2[OF this]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3486	guess v' using pa[OF k(2)] .. note v' = conjunctD2[OF this] let ?v = "vec1 (min (v$1) (v'$1))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3487	have "{vec1 a <..< ?v} \<subseteq> k \<inter> k'" unfolding v v' by(auto simp add:Cart_simps) note subset_interior[OF this,unfolded interior_inter]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3488	moreover have "vec1 ((a + ?v$1)/2) \<in> {vec1 a <..< ?v}" using k(3-) unfolding v v' content_eq_0_1 not_le by(auto simp add:Cart_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3489	ultimately have "vec1 ((a + ?v$1)/2) \<in> interior k \<inter> interior k'" unfolding interior_open[OF open_interval] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3490	hence *:"k = k'" apply- apply(rule ccontr) using p(5)[OF k(1-2)] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3491	{ assume "x\<in>k" thus "x\<in>k'" unfolding * . } { assume "x\<in>k'" thus "x\<in>k" unfolding * . }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3492	qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3493	show "\<forall>x y. x \<in> ?B b \<and> y \<in> ?B b \<longrightarrow> x = y" apply(rule,rule,rule,unfold split_paired_all)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3494	unfolding mem_Collect_eq fst_conv snd_conv apply safe
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3495	proof- fix x k k' assume k:"(vec1 b, k) \<in> p" "(vec1 b, k') \<in> p" "content k \<noteq> 0" "content k' \<noteq> 0"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3496	guess v using pb[OF k(1)] .. note v = conjunctD2[OF this]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3497	guess v' using pb[OF k(2)] .. note v' = conjunctD2[OF this] let ?v = "vec1 (max (v$1) (v'$1))"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3498	have "{?v <..< vec1 b} \<subseteq> k \<inter> k'" unfolding v v' by(auto simp add:Cart_simps) note subset_interior[OF this,unfolded interior_inter]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3499	moreover have "vec1 ((b + ?v$1)/2) \<in> {?v <..< vec1 b}" using k(3-) unfolding v v' content_eq_0_1 not_le by(auto simp add:Cart_simps)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3500	ultimately have "vec1 ((b + ?v$1)/2) \<in> interior k \<inter> interior k'" unfolding interior_open[OF open_interval] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3501	hence *:"k = k'" apply- apply(rule ccontr) using p(5)[OF k(1-2)] by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3502	{ assume "x\<in>k" thus "x\<in>k'" unfolding * . } { assume "x\<in>k'" thus "x\<in>k" unfolding * . }
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3503	qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3504
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3505	let ?a = a and ?b = b (* a is something else while proofing the next theorem. *)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3506	show "\<forall>x. x \<in> ?B a \<longrightarrow> norm ((\<lambda>(x, k). content k *\<^sub>R f' (x$1) - (f ((interval_upperbound k)$1) - f ((interval_lowerbound k)$1))) x)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3507	\<le> e * (b - a) / 4" apply safe unfolding fst_conv snd_conv apply safe unfolding vec1_dest_vec1
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3508	proof- case goal1 guess v using pa[OF goal1(1)] .. note v = conjunctD2[OF this]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3509	have "vec1 ?a\<in>{vec1 ?a..v}" using v(2) by auto hence "dest_vec1 v \<le> ?b" using p(3)[OF goal1(1)] unfolding subset_eq v by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3510	moreover have "{?a..dest_vec1 v} \<subseteq> ball ?a da" using fineD[OF as(2) goal1(1)]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3511	apply-apply(subst(asm) if_P,rule refl) unfolding subset_eq apply safe apply(erule_tac x="vec1 x" in ballE)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3512	by(auto simp add:Cart_simps subset_eq dist_real v dist_real_def) ultimately
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3513	show ?case unfolding v unfolding interval_bounds[OF v(2)[unfolded v vector_le_def]] vec1_dest_vec1 apply-
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3514	apply(rule da(2)[of "v$1",unfolded vec1_dest_vec1])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3515	using goal1 fineD[OF as(2) goal1(1)] unfolding v content_eq_0_1 by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3516	qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3517	show "\<forall>x. x \<in> ?B b \<longrightarrow> norm ((\<lambda>(x, k). content k *\<^sub>R f' (x$1) - (f ((interval_upperbound k)$1) - f ((interval_lowerbound k)$1))) x)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3518	\<le> e * (b - a) / 4" apply safe unfolding fst_conv snd_conv apply safe unfolding vec1_dest_vec1
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3519	proof- case goal1 guess v using pb[OF goal1(1)] .. note v = conjunctD2[OF this]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3520	have "vec1 ?b\<in>{v..vec1 ?b}" using v(2) by auto hence "dest_vec1 v \<ge> ?a" using p(3)[OF goal1(1)] unfolding subset_eq v by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3521	moreover have "{dest_vec1 v..?b} \<subseteq> ball ?b db" using fineD[OF as(2) goal1(1)]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3522	apply-apply(subst(asm) if_P,rule refl) unfolding subset_eq apply safe apply(erule_tac x="vec1 x" in ballE) using ab
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3523	by(auto simp add:Cart_simps subset_eq dist_real v dist_real_def) ultimately
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3524	show ?case unfolding v unfolding interval_bounds[OF v(2)[unfolded v vector_le_def]] vec1_dest_vec1 apply-
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3525	apply(rule db(2)[of "v$1",unfolded vec1_dest_vec1])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3526	using goal1 fineD[OF as(2) goal1(1)] unfolding v content_eq_0_1 by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3527	qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3528	qed(insert p(1) ab e, auto simp add:field_simps) qed auto qed qed qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3529
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3530	subsection {* Stronger form with finite number of exceptional points. *}
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3531
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3532	lemma fundamental_theorem_of_calculus_interior_strong: fixes f::"real \<Rightarrow> 'a::banach"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3533	assumes"finite s" "a \<le> b" "continuous_on {a..b} f"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3534	"\<forall>x\<in>{a<..<b} - s. (f has_vector_derivative f'(x)) (at x)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3535	shows "((f' o dest_vec1) has_integral (f b - f a)) {vec a..vec b}" using assms apply-
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3536	proof(induct "card s" arbitrary:s a b)
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3537	case 0 show ?case apply(rule fundamental_theorem_of_calculus_interior) using 0 by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3538	next case (Suc n) from this(2) guess c s' apply-apply(subst(asm) eq_commute) unfolding card_Suc_eq
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3539	apply(subst(asm)(2) eq_commute) by(erule exE conjE)+ note cs = this[rule_format]
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3540	show ?case proof(cases "c\<in>{a<..<b}")
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3541	case False thus ?thesis apply- apply(rule Suc(1)[OF cs(3) _ Suc(4,5)]) apply safe defer
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3542	apply(rule Suc(6)[rule_format]) using Suc(3) unfolding cs by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3543	next have *:"f b - f a = (f c - f a) + (f b - f c)" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3544	case True hence "vec1 a \<le> vec1 c" "vec1 c \<le> vec1 b" by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3545	thus ?thesis apply(subst *) apply(rule has_integral_combine) apply assumption+
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3546	apply(rule_tac[!] Suc(1)[OF cs(3)]) using Suc(3) unfolding cs
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3547	proof- show "continuous_on {a..c} f" "continuous_on {c..b} f"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3548	apply(rule_tac[!] continuous_on_subset[OF Suc(5)]) using True by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3549	let ?P = "\<lambda>i j. \<forall>x\<in>{i<..<j} - s'. (f has_vector_derivative f' x) (at x)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3550	show "?P a c" "?P c b" apply safe apply(rule_tac[!] Suc(6)[rule_format]) using True unfolding cs by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3551	qed auto qed qed
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3552
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3553	lemma fundamental_theorem_of_calculus_strong: fixes f::"real \<Rightarrow> 'a::banach"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3554	assumes "finite s" "a \<le> b" "continuous_on {a..b} f"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3555	"\<forall>x\<in>{a..b} - s. (f has_vector_derivative f'(x)) (at x)"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3556	shows "((f' o dest_vec1) has_integral (f(b) - f(a))) {vec1 a..vec1 b}"
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3557	apply(rule fundamental_theorem_of_calculus_interior_strong[OF assms(1-3), of f'])
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3558	using assms(4) by auto
579dd5570f96 Added integration to Multivariate-Analysis (upto FTC) himmelma parents: diff changeset	3559
35751 f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3560	lemma indefinite_integral_continuous_left: fixes f::"real^1 \<Rightarrow> 'a::banach"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3561	assumes "f integrable_on {a..b}" "a < c" "c \<le> b" "0 < e"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3562	obtains d where "0 < d" "\<forall>t. c$1 - d < t$1 \<and> t \<le> c \<longrightarrow> norm(integral {a..c} f - integral {a..t} f) < e"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3563	proof- have "\<exists>w>0. \<forall>t. c$1 - w < t$1 \<and> t < c \<longrightarrow> norm(f c) * norm(c - t) < e / 3"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3564	proof(cases "f c = 0") case False hence "0 < e / 3 / norm (f c)"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3565	apply-apply(rule divide_pos_pos) using `e>0` by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3566	thus ?thesis apply-apply(rule,rule,assumption,safe)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3567	proof- fix t assume as:"t < c" and "c$1 - e / 3 / norm (f c) < t$(1::1)"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3568	hence "c$1 - t$1 < e / 3 / norm (f c)" by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3569	hence "norm (c - t) < e / 3 / norm (f c)" using as unfolding norm_vector_1 vector_less_def by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3570	thus "norm (f c) * norm (c - t) < e / 3" using False apply-
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3571	apply(subst real_mult_commute) apply(subst pos_less_divide_eq[THEN sym]) by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3572	qed next case True show ?thesis apply(rule_tac x=1 in exI) unfolding True using `e>0` by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3573	qed then guess w .. note w = conjunctD2[OF this,rule_format]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3574
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3575	have *:"e / 3 > 0" using assms by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3576	have "f integrable_on {a..c}" apply(rule integrable_subinterval[OF assms(1)]) using assms(2-3) by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3577	from integrable_integral[OF this,unfolded has_integral,rule_format,OF *] guess d1 ..
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3578	note d1 = conjunctD2[OF this,rule_format] def d \<equiv> "\<lambda>x. ball x w \<inter> d1 x"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3579	have "gauge d" unfolding d_def using w(1) d1 by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3580	note this[unfolded gauge_def,rule_format,of c] note conjunctD2[OF this]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3581	from this(2)[unfolded open_contains_ball,rule_format,OF this(1)] guess k .. note k=conjunctD2[OF this]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3582
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3583	let ?d = "min k (c$1 - a$1)/2" show ?thesis apply(rule that[of ?d])
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3584	proof safe show "?d > 0" using k(1) using assms(2) unfolding vector_less_def by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3585	fix t assume as:"c$1 - ?d < t$1" "t \<le> c" let ?thesis = "norm (integral {a..c} f - integral {a..t} f) < e"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3586	{ presume *:"t < c \<Longrightarrow> ?thesis"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3587	show ?thesis apply(cases "t = c") defer apply(rule *)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3588	unfolding vector_less_def apply(subst less_le) using `e>0` as(2) by auto } assume "t < c"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3589
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3590	have "f integrable_on {a..t}" apply(rule integrable_subinterval[OF assms(1)]) using assms(2-3) as(2) by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3591	from integrable_integral[OF this,unfolded has_integral,rule_format,OF *] guess d2 ..
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3592	note d2 = conjunctD2[OF this,rule_format]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3593	def d3 \<equiv> "\<lambda>x. if x \<le> t then d1 x \<inter> d2 x else d1 x"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3594	have "gauge d3" using d2(1) d1(1) unfolding d3_def gauge_def by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3595	from fine_division_exists[OF this, of a t] guess p . note p=this
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3596	note p'=tagged_division_ofD[OF this(1)]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3597	have pt:"\<forall>(x,k)\<in>p. x$1 \<le> t$1" proof safe case goal1 from p'(2,3)[OF this] show ?case by auto qed
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3598	with p(2) have "d2 fine p" unfolding fine_def d3_def apply safe apply(erule_tac x="(a,b)" in ballE)+ by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3599	note d2_fin = d2(2)[OF conjI[OF p(1) this]]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3600
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3601	have *:"{a..c} \<inter> {x. x$1 \<le> t$1} = {a..t}" "{a..c} \<inter> {x. x$1 \<ge> t$1} = {t..c}"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3602	using assms(2-3) as by(auto simp add:field_simps)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3603	have "p \<union> {(c, {t..c})} tagged_division_of {a..c} \<and> d1 fine p \<union> {(c, {t..c})}" apply rule
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3604	apply(rule tagged_division_union_interval[of _ _ _ 1 "t$1"]) unfolding * apply(rule p)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3605	apply(rule tagged_division_of_self) unfolding fine_def
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3606	proof safe fix x k y assume "(x,k)\<in>p" "y\<in>k" thus "y\<in>d1 x"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3607	using p(2) pt unfolding fine_def d3_def apply- apply(erule_tac x="(x,k)" in ballE)+ by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3608	next fix x assume "x\<in>{t..c}" hence "dist c x < k" unfolding dist_real
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3609	using as(1) by(auto simp add:field_simps)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3610	thus "x \<in> d1 c" using k(2) unfolding d_def by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3611	qed(insert as(2), auto) note d1_fin = d1(2)[OF this]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3612
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3613	have :"integral{a..c} f - integral {a..t} f = -(((c$1 - t$1) \<^sub>R f c + (\<Sum>(x, k)\<in>p. content k *\<^sub>R f x)) -
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3614	integral {a..c} f) + ((\<Sum>(x, k)\<in>p. content k \<^sub>R f x) - integral {a..t} f) + (c$1 - t$1) \<^sub>R f c"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3615	"e = (e/3 + e/3) + e/3" by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3616	have *:"(\<Sum>(x, k)\<in>p \<union> {(c, {t..c})}. content k \<^sub>R f x) = (c$1 - t$1) \<^sub>R f c + (\<Sum>(x, k)\<in>p. content k \<^sub>R f x)"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3617	proof- have **:"\<And>x F. F \<union> {x} = insert x F" by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3618	have "(c, {t..c}) \<notin> p" proof safe case goal1 from p'(2-3)[OF this]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3619	have "c \<in> {a..t}" by auto thus False using `t<c` unfolding vector_less_def by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3620	qed thus ?thesis unfolding ** apply- apply(subst setsum_insert) apply(rule p')
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3621	unfolding split_conv defer apply(subst content_1) using as(2) by auto qed
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3622
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3623	have ***:"c$1 - w < t$1 \<and> t < c"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3624	proof- have "c$1 - k < t$1" using `k>0` as(1) by(auto simp add:field_simps)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3625	moreover have "k \<le> w" apply(rule ccontr) using k(2)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3626	unfolding subset_eq apply(erule_tac x="c + vec ((k + w)/2)" in ballE)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3627	unfolding d_def using `k>0` `w>0` by(auto simp add:field_simps not_le not_less dist_real)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3628	ultimately show ?thesis using `t<c` by(auto simp add:field_simps) qed
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3629
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3630	show ?thesis unfolding (1) apply(subst (2)) apply(rule norm_triangle_lt add_strict_mono)+
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3631	unfolding norm_minus_cancel apply(rule d1_fin[unfolded **]) apply(rule d2_fin)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3632	using w(2)[OF ***] unfolding norm_scaleR norm_real by(auto simp add:field_simps) qed qed
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3633
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3634	lemma indefinite_integral_continuous_right: fixes f::"real^1 \<Rightarrow> 'a::banach"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3635	assumes "f integrable_on {a..b}" "a \<le> c" "c < b" "0 < e"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3636	obtains d where "0 < d" "\<forall>t. c \<le> t \<and> t$1 < c$1 + d \<longrightarrow> norm(integral{a..c} f - integral{a..t} f) < e"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3637	proof- have *:"(\<lambda>x. f (- x)) integrable_on {- b..- a}" "- b < - c" "- c \<le> - a"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3638	using assms unfolding Cart_simps by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3639	from indefinite_integral_continuous_left[OF * `e>0`] guess d . note d = this let ?d = "min d (b$1 - c$1)"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3640	show ?thesis apply(rule that[of "?d"])
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3641	proof safe show "0 < ?d" using d(1) assms(3) unfolding Cart_simps by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3642	fix t::"_^1" assume as:"c \<le> t" "t$1 < c$1 + ?d"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3643	have *:"integral{a..c} f = integral{a..b} f - integral{c..b} f"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3644	"integral{a..t} f = integral{a..b} f - integral{t..b} f" unfolding group_simps
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3645	apply(rule_tac[!] integral_combine) using assms as unfolding Cart_simps by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3646	have "(- c)$1 - d < (- t)$1 \<and> - t \<le> - c" using as by auto note d(2)[rule_format,OF this]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3647	thus "norm (integral {a..c} f - integral {a..t} f) < e" unfolding *
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3648	unfolding integral_reflect apply-apply(subst norm_minus_commute) by(auto simp add:group_simps) qed qed
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3649
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3650	declare dest_vec1_eq[simp del] not_less[simp] not_le[simp]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3651
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3652	lemma indefinite_integral_continuous: fixes f::"real^1 \<Rightarrow> 'a::banach"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3653	assumes "f integrable_on {a..b}" shows "continuous_on {a..b} (\<lambda>x. integral {a..x} f)"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3654	proof(unfold continuous_on_def, safe) fix x e assume as:"x\<in>{a..b}" "0<(e::real)"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3655	let ?thesis = "\<exists>d>0. \<forall>x'\<in>{a..b}. dist x' x < d \<longrightarrow> dist (integral {a..x'} f) (integral {a..x} f) < e"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3656	{ presume *:"a<b \<Longrightarrow> ?thesis"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3657	show ?thesis apply(cases,rule *,assumption)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3658	proof- case goal1 hence "{a..b} = {x}" using as(1) unfolding Cart_simps
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3659	by(auto simp only:field_simps not_less Cart_eq forall_1 mem_interval)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3660	thus ?case using `e>0` by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3661	qed } assume "a<b"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3662	have "(x=a \<or> x=b) \<or> (a<x \<and> x<b)" using as(1) by (auto simp add: Cart_simps)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3663	thus ?thesis apply-apply(erule disjE)+
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3664	proof- assume "x=a" have "a \<le> a" by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3665	from indefinite_integral_continuous_right[OF assms(1) this `a<b` `e>0`] guess d . note d=this
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3666	show ?thesis apply(rule,rule,rule d,safe) apply(subst dist_commute)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3667	unfolding `x=a` vector_dist_norm apply(rule d(2)[rule_format]) unfolding norm_real by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3668	next assume "x=b" have "b \<le> b" by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3669	from indefinite_integral_continuous_left[OF assms(1) `a<b` this `e>0`] guess d . note d=this
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3670	show ?thesis apply(rule,rule,rule d,safe) apply(subst dist_commute)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3671	unfolding `x=b` vector_dist_norm apply(rule d(2)[rule_format]) unfolding norm_real by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3672	next assume "a<x \<and> x<b" hence xl:"a<x" "x\<le>b" and xr:"a\<le>x" "x<b" by(auto simp add:Cart_simps)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3673	from indefinite_integral_continuous_left [OF assms(1) xl `e>0`] guess d1 . note d1=this
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3674	from indefinite_integral_continuous_right[OF assms(1) xr `e>0`] guess d2 . note d2=this
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3675	show ?thesis apply(rule_tac x="min d1 d2" in exI)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3676	proof safe show "0 < min d1 d2" using d1 d2 by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3677	fix y assume "y\<in>{a..b}" "dist y x < min d1 d2"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3678	thus "dist (integral {a..y} f) (integral {a..x} f) < e" apply-apply(subst dist_commute)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3679	apply(cases "y < x") unfolding vector_dist_norm apply(rule d1(2)[rule_format]) defer
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3680	apply(rule d2(2)[rule_format]) unfolding Cart_simps not_less norm_real by(auto simp add:field_simps)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3681	qed qed qed
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3682
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3683	subsection {* This doesn't directly involve integration, but that gives an easy proof. *}
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3684
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3685	lemma has_derivative_zero_unique_strong_interval: fixes f::"real \<Rightarrow> 'a::banach"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3686	assumes "finite k" "continuous_on {a..b} f" "f a = y"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3687	"\<forall>x\<in>({a..b} - k). (f has_derivative (\<lambda>h. 0)) (at x within {a..b})" "x \<in> {a..b}"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3688	shows "f x = y"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3689	proof- have ab:"a\<le>b" using assms by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3690	have :"(\<lambda>x. 0\<Colon>'a) \<circ> dest_vec1 = (\<lambda>x. 0)" unfolding o_def by auto have *:"a \<le> x" using assms by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3691	have "((\<lambda>x. 0\<Colon>'a) \<circ> dest_vec1 has_integral f x - f a) {vec1 a..vec1 x}"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3692	apply(rule fundamental_theorem_of_calculus_interior_strong[OF assms(1) ** ])
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3693	apply(rule continuous_on_subset[OF assms(2)]) defer
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3694	apply safe unfolding has_vector_derivative_def apply(subst has_derivative_within_open[THEN sym])
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3695	apply assumption apply(rule open_interval_real) apply(rule has_derivative_within_subset[where s="{a..b}"])
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3696	using assms(4) assms(5) by auto note this[unfolded *]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3697	note has_integral_unique[OF has_integral_0 this]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3698	thus ?thesis unfolding assms by auto qed
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3699
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3700	subsection {* Generalize a bit to any convex set. *}
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3701
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3702	lemmas scaleR_simps = scaleR_zero_left scaleR_minus_left scaleR_left_diff_distrib
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3703	scaleR_zero_right scaleR_minus_right scaleR_right_diff_distrib scaleR_eq_0_iff
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3704	scaleR_cancel_left scaleR_cancel_right scaleR.add_right scaleR.add_left real_vector_class.scaleR_one
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3705
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3706	lemma has_derivative_zero_unique_strong_convex: fixes f::"real^'n \<Rightarrow> 'a::banach"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3707	assumes "convex s" "finite k" "continuous_on s f" "c \<in> s" "f c = y"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3708	"\<forall>x\<in>(s - k). (f has_derivative (\<lambda>h. 0)) (at x within s)" "x \<in> s"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3709	shows "f x = y"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3710	proof- { presume :"x \<noteq> c \<Longrightarrow> ?thesis" show ?thesis apply(cases,rule ,assumption)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3711	unfolding assms(5)[THEN sym] by auto } assume "x\<noteq>c"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3712	note conv = assms(1)[unfolded convex_alt,rule_format]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3713	have as1:"continuous_on {0..1} (f \<circ> (\<lambda>t. (1 - t) \<^sub>R c + t \<^sub>R x))"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3714	apply(rule continuous_on_intros)+ apply(rule continuous_on_subset[OF assms(3)])
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3715	apply safe apply(rule conv) using assms(4,7) by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3716	have :"\<And>t xa. (1 - t) \<^sub>R c + t \<^sub>R x = (1 - xa) \<^sub>R c + xa *\<^sub>R x \<Longrightarrow> t = xa"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3717	proof- case goal1 hence "(t - xa) \<^sub>R x = (t - xa) \<^sub>R c"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3718	unfolding scaleR_simps by(auto simp add:group_simps)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3719	thus ?case using `x\<noteq>c` by auto qed
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3720	have as2:"finite {t. ((1 - t) \<^sub>R c + t \<^sub>R x) \<in> k}" using assms(2)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3721	apply(rule finite_surj[where f="\<lambda>z. SOME t. (1-t) \<^sub>R c + t \<^sub>R x = z"])
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3722	apply safe unfolding image_iff apply rule defer apply assumption
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3723	apply(rule sym) apply(rule some_equality) defer apply(drule *) by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3724	have "(f \<circ> (\<lambda>t. (1 - t) \<^sub>R c + t \<^sub>R x)) 1 = y"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3725	apply(rule has_derivative_zero_unique_strong_interval[OF as2 as1, of ])
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3726	unfolding o_def using assms(5) defer apply-apply(rule)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3727	proof- fix t assume as:"t\<in>{0..1} - {t. (1 - t) \<^sub>R c + t \<^sub>R x \<in> k}"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3728	have :"c - t \<^sub>R c + t *\<^sub>R x \<in> s - k" apply safe apply(rule conv[unfolded scaleR_simps])
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3729	using `x\<in>s` `c\<in>s` as by(auto simp add:scaleR_simps)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3730	have "(f \<circ> (\<lambda>t. (1 - t) \<^sub>R c + t \<^sub>R x) has_derivative (\<lambda>x. 0) \<circ> (\<lambda>z. (0 - z \<^sub>R c) + z \<^sub>R x)) (at t within {0..1})"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3731	apply(rule diff_chain_within) apply(rule has_derivative_add)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3732	unfolding scaleR_simps apply(rule has_derivative_sub) apply(rule has_derivative_const)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3733	apply(rule has_derivative_vmul_within,rule has_derivative_id)+
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3734	apply(rule has_derivative_within_subset,rule assms(6)[rule_format])
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3735	apply(rule *) apply safe apply(rule conv[unfolded scaleR_simps]) using `x\<in>s` `c\<in>s` by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3736	thus "((\<lambda>xa. f ((1 - xa) \<^sub>R c + xa \<^sub>R x)) has_derivative (\<lambda>h. 0)) (at t within {0..1})" unfolding o_def .
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3737	qed auto thus ?thesis by auto qed
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3738
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3739	subsection {* Also to any open connected set with finite set of exceptions. Could
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3740	generalize to locally convex set with limpt-free set of exceptions. *}
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3741
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3742	lemma has_derivative_zero_unique_strong_connected: fixes f::"real^'n \<Rightarrow> 'a::banach"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3743	assumes "connected s" "open s" "finite k" "continuous_on s f" "c \<in> s" "f c = y"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3744	"\<forall>x\<in>(s - k). (f has_derivative (\<lambda>h. 0)) (at x within s)" "x\<in>s"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3745	shows "f x = y"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3746	proof- have "{x \<in> s. f x \<in> {y}} = {} \<or> {x \<in> s. f x \<in> {y}} = s"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3747	apply(rule assms(1)[unfolded connected_clopen,rule_format]) apply rule defer
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3748	apply(rule continuous_closed_in_preimage[OF assms(4) closed_sing])
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3749	apply(rule open_openin_trans[OF assms(2)]) unfolding open_contains_ball
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3750	proof safe fix x assume "x\<in>s"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3751	from assms(2)[unfolded open_contains_ball,rule_format,OF this] guess e .. note e=conjunctD2[OF this]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3752	show "\<exists>e>0. ball x e \<subseteq> {xa \<in> s. f xa \<in> {f x}}" apply(rule,rule,rule e)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3753	proof safe fix y assume y:"y \<in> ball x e" thus "y\<in>s" using e by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3754	show "f y = f x" apply(rule has_derivative_zero_unique_strong_convex[OF convex_ball])
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3755	apply(rule assms) apply(rule continuous_on_subset,rule assms) apply(rule e)+
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3756	apply(subst centre_in_ball,rule e,rule) apply safe
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3757	apply(rule has_derivative_within_subset) apply(rule assms(7)[rule_format])
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3758	using y e by auto qed qed
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3759	thus ?thesis using `x\<in>s` `f c = y` `c\<in>s` by auto qed
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3760
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3761	subsection {* Integrating characteristic function of an interval. *}
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3762
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3763	lemma has_integral_restrict_open_subinterval: fixes f::"real^'n \<Rightarrow> 'a::banach"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3764	assumes "(f has_integral i) {c..d}" "{c..d} \<subseteq> {a..b}"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3765	shows "((\<lambda>x. if x \<in> {c<..<d} then f x else 0) has_integral i) {a..b}"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3766	proof- def g \<equiv> "\<lambda>x. if x \<in>{c<..<d} then f x else 0"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3767	{ presume *:"{c..d}\<noteq>{} \<Longrightarrow> ?thesis"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3768	show ?thesis apply(cases,rule *,assumption)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3769	proof- case goal1 hence *:"{c<..<d} = {}" using interval_open_subset_closed by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3770	show ?thesis using assms(1) unfolding * using goal1 by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3771	qed } assume "{c..d}\<noteq>{}"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3772	from partial_division_extend_1[OF assms(2) this] guess p . note p=this
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3773	note mon = monoidal_lifted[OF monoidal_monoid]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3774	note operat = operative_division[OF this operative_integral p(1), THEN sym]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3775	let ?P = "(if g integrable_on {a..b} then Some (integral {a..b} g) else None) = Some i"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3776	{ presume "?P" hence "g integrable_on {a..b} \<and> integral {a..b} g = i"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3777	apply- apply(cases,subst(asm) if_P,assumption) by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3778	thus ?thesis using integrable_integral unfolding g_def by auto }
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3779
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3780	note iterate_eq_neutral[OF mon,unfolded neutral_lifted[OF monoidal_monoid]]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3781	note * = this[unfolded neutral_monoid]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3782	have iterate:"iterate (lifted op +) (p - {{c..d}})
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3783	(\<lambda>i. if g integrable_on i then Some (integral i g) else None) = Some 0"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3784	proof(rule *,rule) case goal1 hence "x\<in>p" by auto note div = division_ofD(2-5)[OF p(1) this]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3785	from div(3) guess u v apply-by(erule exE)+ note uv=this
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3786	have "interior x \<inter> interior {c..d} = {}" using div(4)[OF p(2)] goal1 by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3787	hence "(g has_integral 0) x" unfolding uv apply-apply(rule has_integral_spike_interior[where f="\<lambda>x. 0"])
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3788	unfolding g_def interior_closed_interval by auto thus ?case by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3789	qed
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3790
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3791	have *:"p = insert {c..d} (p - {{c..d}})" using p by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3792	have **:"g integrable_on {c..d}" apply(rule integrable_spike_interior[where f=f])
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3793	unfolding g_def defer apply(rule has_integral_integrable) using assms(1) by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3794	moreover have "integral {c..d} g = i" apply(rule has_integral_unique[OF _ assms(1)])
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3795	apply(rule has_integral_spike_interior[where f=g]) defer
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3796	apply(rule integrable_integral[OF **]) unfolding g_def by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3797	ultimately show ?P unfolding operat apply- apply(subst *) apply(subst iterate_insert) apply rule+
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3798	unfolding iterate defer apply(subst if_not_P) defer using p by auto qed
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3799
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3800	lemma has_integral_restrict_closed_subinterval: fixes f::"real^'n \<Rightarrow> 'a::banach"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3801	assumes "(f has_integral i) ({c..d})" "{c..d} \<subseteq> {a..b}"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3802	shows "((\<lambda>x. if x \<in> {c..d} then f x else 0) has_integral i) {a..b}"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3803	proof- note has_integral_restrict_open_subinterval[OF assms]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3804	note * = has_integral_spike[OF negligible_frontier_interval _ this]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3805	show ?thesis apply(rule *[of c d]) using interval_open_subset_closed[of c d] by auto qed
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3806
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3807	lemma has_integral_restrict_closed_subintervals_eq: fixes f::"real^'n \<Rightarrow> 'a::banach" assumes "{c..d} \<subseteq> {a..b}"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3808	shows "((\<lambda>x. if x \<in> {c..d} then f x else 0) has_integral i) {a..b} \<longleftrightarrow> (f has_integral i) {c..d}" (is "?l = ?r")
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3809	proof(cases "{c..d} = {}") case False let ?g = "\<lambda>x. if x \<in> {c..d} then f x else 0"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3810	show ?thesis apply rule defer apply(rule has_integral_restrict_closed_subinterval[OF _ assms])
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3811	proof assumption assume ?l hence "?g integrable_on {c..d}"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3812	apply-apply(rule integrable_subinterval[OF _ assms]) by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3813	hence *:"f integrable_on {c..d}"apply-apply(rule integrable_eq) by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3814	hence "i = integral {c..d} f" apply-apply(rule has_integral_unique)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3815	apply(rule `?l`) apply(rule has_integral_restrict_closed_subinterval[OF _ assms]) by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3816	thus ?r using * by auto qed qed auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3817
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3818	subsection {* Hence we can apply the limit process uniformly to all integrals. *}
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3819
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3820	lemma has_integral': fixes f::"real^'n \<Rightarrow> 'a::banach" shows
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3821	"(f has_integral i) s \<longleftrightarrow> (\<forall>e>0. \<exists>B>0. \<forall>a b. ball 0 B \<subseteq> {a..b}
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3822	\<longrightarrow> (\<exists>z. ((\<lambda>x. if x \<in> s then f(x) else 0) has_integral z) {a..b} \<and> norm(z - i) < e))" (is "?l \<longleftrightarrow> (\<forall>e>0. ?r e)")
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3823	proof- { presume *:"\<exists>a b. s = {a..b} \<Longrightarrow> ?thesis"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3824	show ?thesis apply(cases,rule *,assumption)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3825	apply(subst has_integral_alt) by auto }
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3826	assume "\<exists>a b. s = {a..b}" then guess a b apply-by(erule exE)+ note s=this
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3827	from bounded_interval[of a b, THEN conjunct1, unfolded bounded_pos] guess B ..
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3828	note B = conjunctD2[OF this,rule_format] show ?thesis apply safe
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3829	proof- fix e assume ?l "e>(0::real)"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3830	show "?r e" apply(rule_tac x="B+1" in exI) apply safe defer apply(rule_tac x=i in exI)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3831	proof fix c d assume as:"ball 0 (B+1) \<subseteq> {c..d::real^'n}"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3832	thus "((\<lambda>x. if x \<in> s then f x else 0) has_integral i) {c..d}" unfolding s
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3833	apply-apply(rule has_integral_restrict_closed_subinterval) apply(rule `?l`[unfolded s])
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3834	apply safe apply(drule B(2)[rule_format]) unfolding subset_eq apply(erule_tac x=x in ballE)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3835	by(auto simp add:vector_dist_norm)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3836	qed(insert B `e>0`, auto)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3837	next assume as:"\<forall>e>0. ?r e"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3838	from this[rule_format,OF zero_less_one] guess C .. note C=conjunctD2[OF this,rule_format]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3839	def c \<equiv> "(\<chi> i. - max B C)::real^'n" and d \<equiv> "(\<chi> i. max B C)::real^'n"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3840	have c_d:"{a..b} \<subseteq> {c..d}" apply safe apply(drule B(2)) unfolding mem_interval
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3841	proof case goal1 thus ?case using component_le_norm[of x i] unfolding c_def d_def
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3842	by(auto simp add:field_simps) qed
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3843	have "ball 0 C \<subseteq> {c..d}" apply safe unfolding mem_interval mem_ball vector_dist_norm
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3844	proof case goal1 thus ?case using component_le_norm[of x i] unfolding c_def d_def by auto qed
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3845	from C(2)[OF this] have "\<exists>y. (f has_integral y) {a..b}"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3846	unfolding has_integral_restrict_closed_subintervals_eq[OF c_d,THEN sym] unfolding s by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3847	then guess y .. note y=this
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3848
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3849	have "y = i" proof(rule ccontr) assume "y\<noteq>i" hence "0 < norm (y - i)" by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3850	from as[rule_format,OF this] guess C .. note C=conjunctD2[OF this,rule_format]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3851	def c \<equiv> "(\<chi> i. - max B C)::real^'n" and d \<equiv> "(\<chi> i. max B C)::real^'n"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3852	have c_d:"{a..b} \<subseteq> {c..d}" apply safe apply(drule B(2)) unfolding mem_interval
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3853	proof case goal1 thus ?case using component_le_norm[of x i] unfolding c_def d_def
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3854	by(auto simp add:field_simps) qed
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3855	have "ball 0 C \<subseteq> {c..d}" apply safe unfolding mem_interval mem_ball vector_dist_norm
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3856	proof case goal1 thus ?case using component_le_norm[of x i] unfolding c_def d_def by auto qed
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3857	note C(2)[OF this] then guess z .. note z = conjunctD2[OF this, unfolded s]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3858	note this[unfolded has_integral_restrict_closed_subintervals_eq[OF c_d]]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3859	hence "z = y" "norm (z - i) < norm (y - i)" apply- apply(rule has_integral_unique[OF _ y(1)]) .
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3860	thus False by auto qed
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3861	thus ?l using y unfolding s by auto qed qed
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3862
36243 027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3863	lemma has_integral_trans[simp]: fixes f::"real^'n \<Rightarrow> real" shows
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3864	"((\<lambda>x. vec1 (f x)) has_integral vec1 i) s \<longleftrightarrow> (f has_integral i) s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3865	unfolding has_integral'[unfolded has_integral]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3866	proof case goal1 thus ?case apply safe
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3867	apply(erule_tac x=e in allE,safe) apply(rule_tac x=B in exI,safe)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3868	apply(erule_tac x=a in allE, erule_tac x=b in allE,safe)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3869	apply(rule_tac x="dest_vec1 z" in exI,safe) apply(erule_tac x=ea in allE,safe)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3870	apply(rule_tac x=d in exI,safe) apply(erule_tac x=p in allE,safe)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3871	apply(subst(asm)(2) norm_vector_1) unfolding split_def
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3872	unfolding setsum_component Cart_nth.diff cond_value_iff[of dest_vec1]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3873	Cart_nth.scaleR vec1_dest_vec1 zero_index apply assumption
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3874	apply(subst(asm)(2) norm_vector_1) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3875	next case goal2 thus ?case apply safe
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3876	apply(erule_tac x=e in allE,safe) apply(rule_tac x=B in exI,safe)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3877	apply(erule_tac x=a in allE, erule_tac x=b in allE,safe)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3878	apply(rule_tac x="vec1 z" in exI,safe) apply(erule_tac x=ea in allE,safe)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3879	apply(rule_tac x=d in exI,safe) apply(erule_tac x=p in allE,safe)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3880	apply(subst norm_vector_1) unfolding split_def
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3881	unfolding setsum_component Cart_nth.diff cond_value_iff[of dest_vec1]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3882	Cart_nth.scaleR vec1_dest_vec1 zero_index apply assumption
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3883	apply(subst norm_vector_1) by auto qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3884
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3885	lemma integral_trans[simp]: assumes "(f::real^'n \<Rightarrow> real) integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3886	shows "integral s (\<lambda>x. vec1 (f x)) = vec1 (integral s f)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3887	apply(rule integral_unique) using assms by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3888
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3889	lemma integrable_on_trans[simp]: fixes f::"real^'n \<Rightarrow> real" shows
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3890	"(\<lambda>x. vec1 (f x)) integrable_on s \<longleftrightarrow> (f integrable_on s)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3891	unfolding integrable_on_def
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3892	apply(subst(2) vec1_dest_vec1(1)[THEN sym]) unfolding has_integral_trans
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3893	apply safe defer apply(rule_tac x="vec1 y" in exI) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3894
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3895	lemma has_integral_le: fixes f::"real^'n \<Rightarrow> real"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3896	assumes "(f has_integral i) s" "(g has_integral j) s" "\<forall>x\<in>s. (f x) \<le> (g x)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3897	shows "i \<le> j" using has_integral_component_le[of "vec1 o f" "vec1 i" s "vec1 o g" "vec1 j" 1]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3898	unfolding o_def using assms by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3899
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3900	lemma integral_le: fixes f::"real^'n \<Rightarrow> real"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3901	assumes "f integrable_on s" "g integrable_on s" "\<forall>x\<in>s. f x \<le> g x"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3902	shows "integral s f \<le> integral s g"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3903	using has_integral_le[OF assms(1,2)[unfolded has_integral_integral] assms(3)] .
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3904
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3905	lemma has_integral_nonneg: fixes f::"real^'n \<Rightarrow> real"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3906	assumes "(f has_integral i) s" "\<forall>x\<in>s. 0 \<le> f x" shows "0 \<le> i"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3907	using has_integral_component_nonneg[of "vec1 o f" "vec1 i" s 1]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3908	unfolding o_def using assms by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3909
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3910	lemma integral_nonneg: fixes f::"real^'n \<Rightarrow> real"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3911	assumes "f integrable_on s" "\<forall>x\<in>s. 0 \<le> f x" shows "0 \<le> integral s f"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3912	using has_integral_nonneg[OF assms(1)[unfolded has_integral_integral] assms(2)] .
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	3913
35751 f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3914	subsection {* Hence a general restriction property. *}
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3915
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3916	lemma has_integral_restrict[simp]: assumes "s \<subseteq> t" shows
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3917	"((\<lambda>x. if x \<in> s then f x else (0::'a::banach)) has_integral i) t \<longleftrightarrow> (f has_integral i) s"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3918	proof- have *:"\<And>x. (if x \<in> t then if x \<in> s then f x else 0 else 0) = (if x\<in>s then f x else 0)" using assms by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3919	show ?thesis apply(subst(2) has_integral') apply(subst has_integral') unfolding * by rule qed
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3920
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3921	lemma has_integral_restrict_univ: fixes f::"real^'n \<Rightarrow> 'a::banach" shows
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3922	"((\<lambda>x. if x \<in> s then f x else 0) has_integral i) UNIV \<longleftrightarrow> (f has_integral i) s" by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3923
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3924	lemma has_integral_on_superset: fixes f::"real^'n \<Rightarrow> 'a::banach"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3925	assumes "\<forall>x. ~(x \<in> s) \<longrightarrow> f x = 0" "s \<subseteq> t" "(f has_integral i) s"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3926	shows "(f has_integral i) t"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3927	proof- have "(\<lambda>x. if x \<in> s then f x else 0) = (\<lambda>x. if x \<in> t then f x else 0)"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3928	apply(rule) using assms(1-2) by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3929	thus ?thesis apply- using assms(3) apply(subst has_integral_restrict_univ[THEN sym])
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3930	apply- apply(subst(asm) has_integral_restrict_univ[THEN sym]) by auto qed
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3931
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3932	lemma integrable_on_superset: fixes f::"real^'n \<Rightarrow> 'a::banach"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3933	assumes "\<forall>x. ~(x \<in> s) \<longrightarrow> f x = 0" "s \<subseteq> t" "f integrable_on s"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3934	shows "f integrable_on t"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3935	using assms unfolding integrable_on_def by(auto intro:has_integral_on_superset)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3936
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3937	lemma integral_restrict_univ[intro]: fixes f::"real^'n \<Rightarrow> 'a::banach"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3938	shows "f integrable_on s \<Longrightarrow> integral UNIV (\<lambda>x. if x \<in> s then f x else 0) = integral s f"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3939	apply(rule integral_unique) unfolding has_integral_restrict_univ by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3940
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3941	lemma integrable_restrict_univ: fixes f::"real^'n \<Rightarrow> 'a::banach" shows
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3942	"(\<lambda>x. if x \<in> s then f x else 0) integrable_on UNIV \<longleftrightarrow> f integrable_on s"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3943	unfolding integrable_on_def by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3944
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3945	lemma negligible_on_intervals: "negligible s \<longleftrightarrow> (\<forall>a b. negligible(s \<inter> {a..b}))" (is "?l = ?r")
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3946	proof assume ?r show ?l unfolding negligible_def
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3947	proof safe case goal1 show ?case apply(rule has_integral_negligible[OF `?r`[rule_format,of a b]])
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3948	unfolding indicator_def by auto qed qed auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3949
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3950	lemma has_integral_spike_set_eq: fixes f::"real^'n \<Rightarrow> 'a::banach"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3951	assumes "negligible((s - t) \<union> (t - s))" shows "((f has_integral y) s \<longleftrightarrow> (f has_integral y) t)"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3952	unfolding has_integral_restrict_univ[THEN sym,of f] apply(rule has_integral_spike_eq[OF assms]) by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3953
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3954	lemma has_integral_spike_set[dest]: fixes f::"real^'n \<Rightarrow> 'a::banach"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3955	assumes "negligible((s - t) \<union> (t - s))" "(f has_integral y) s"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3956	shows "(f has_integral y) t"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3957	using assms has_integral_spike_set_eq by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3958
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3959	lemma integrable_spike_set[dest]: fixes f::"real^'n \<Rightarrow> 'a::banach"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3960	assumes "negligible((s - t) \<union> (t - s))" "f integrable_on s"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3961	shows "f integrable_on t" using assms(2) unfolding integrable_on_def
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3962	unfolding has_integral_spike_set_eq[OF assms(1)] .
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3963
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3964	lemma integrable_spike_set_eq: fixes f::"real^'n \<Rightarrow> 'a::banach"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3965	assumes "negligible((s - t) \<union> (t - s))"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3966	shows "(f integrable_on s \<longleftrightarrow> f integrable_on t)"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3967	apply(rule,rule_tac[!] integrable_spike_set) using assms by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3968
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3969	(*lemma integral_spike_set:
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3970	"\<forall>f:real^M->real^N g s t.
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3971	negligible(s DIFF t \<union> t DIFF s)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3972	\<longrightarrow> integral s f = integral t f"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3973	qed REPEAT STRIP_TAC THEN REWRITE_TAC[integral] THEN
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3974	AP_TERM_TAC THEN ABS_TAC THEN MATCH_MP_TAC HAS_INTEGRAL_SPIKE_SET_EQ THEN
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3975	ASM_MESON_TAC[]);;
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3976
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3977	lemma has_integral_interior:
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3978	"\<forall>f:real^M->real^N y s.
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3979	negligible(frontier s)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3980	\<longrightarrow> ((f has_integral y) (interior s) \<longleftrightarrow> (f has_integral y) s)"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3981	qed REPEAT STRIP_TAC THEN MATCH_MP_TAC HAS_INTEGRAL_SPIKE_SET_EQ THEN
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3982	FIRST_X_ASSUM(MATCH_MP_TAC o MATCH_MP (REWRITE_RULE[IMP_CONJ]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3983	NEGLIGIBLE_SUBSET)) THEN
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3984	REWRITE_TAC[frontier] THEN
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3985	MP_TAC(ISPEC `s:real^M->bool` INTERIOR_SUBSET) THEN
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3986	MP_TAC(ISPEC `s:real^M->bool` CLOSURE_SUBSET) THEN
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3987	SET_TAC[]);;
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3988
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3989	lemma has_integral_closure:
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3990	"\<forall>f:real^M->real^N y s.
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3991	negligible(frontier s)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3992	\<longrightarrow> ((f has_integral y) (closure s) \<longleftrightarrow> (f has_integral y) s)"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3993	qed REPEAT STRIP_TAC THEN MATCH_MP_TAC HAS_INTEGRAL_SPIKE_SET_EQ THEN
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3994	FIRST_X_ASSUM(MATCH_MP_TAC o MATCH_MP (REWRITE_RULE[IMP_CONJ]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3995	NEGLIGIBLE_SUBSET)) THEN
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3996	REWRITE_TAC[frontier] THEN
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3997	MP_TAC(ISPEC `s:real^M->bool` INTERIOR_SUBSET) THEN
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3998	MP_TAC(ISPEC `s:real^M->bool` CLOSURE_SUBSET) THEN
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	3999	SET_TAC[]);;*)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4000
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4001	subsection {* More lemmas that are useful later. *}
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4002
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4003	lemma has_integral_subset_component_le: fixes f::"real^'n \<Rightarrow> real^'m"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4004	assumes "s \<subseteq> t" "(f has_integral i) s" "(f has_integral j) t" "\<forall>x\<in>t. 0 \<le> f(x)$k"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4005	shows "i$k \<le> j$k"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4006	proof- note has_integral_restrict_univ[THEN sym, of f]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4007	note assms(2-3)[unfolded this] note * = has_integral_component_le[OF this]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4008	show ?thesis apply(rule *) using assms(1,4) by auto qed
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4009
36243 027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4010	lemma has_integral_subset_le: fixes f::"real^'n \<Rightarrow> real"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4011	assumes "s \<subseteq> t" "(f has_integral i) s" "(f has_integral j) t" "\<forall>x\<in>t. 0 \<le> f(x)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4012	shows "i \<le> j" using has_integral_subset_component_le[OF assms(1), of "vec1 o f" "vec1 i" "vec1 j" 1]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4013	unfolding o_def using assms by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4014
35751 f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4015	lemma integral_subset_component_le: fixes f::"real^'n \<Rightarrow> real^'m"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4016	assumes "s \<subseteq> t" "f integrable_on s" "f integrable_on t" "\<forall>x \<in> t. 0 \<le> f(x)$k"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4017	shows "(integral s f)$k \<le> (integral t f)$k"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4018	apply(rule has_integral_subset_component_le) using assms by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4019
36243 027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4020	lemma integral_subset_le: fixes f::"real^'n \<Rightarrow> real"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4021	assumes "s \<subseteq> t" "f integrable_on s" "f integrable_on t" "\<forall>x \<in> t. 0 \<le> f(x)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4022	shows "(integral s f) \<le> (integral t f)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4023	apply(rule has_integral_subset_le) using assms by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4024
35751 f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4025	lemma has_integral_alt': fixes f::"real^'n \<Rightarrow> 'a::banach"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4026	shows "(f has_integral i) s \<longleftrightarrow> (\<forall>a b. (\<lambda>x. if x \<in> s then f x else 0) integrable_on {a..b}) \<and>
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4027	(\<forall>e>0. \<exists>B>0. \<forall>a b. ball 0 B \<subseteq> {a..b} \<longrightarrow> norm(integral {a..b} (\<lambda>x. if x \<in> s then f x else 0) - i) < e)" (is "?l = ?r")
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4028	proof assume ?r
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4029	show ?l apply- apply(subst has_integral')
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4030	proof safe case goal1 from `?r`[THEN conjunct2,rule_format,OF this] guess B .. note B=conjunctD2[OF this]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4031	show ?case apply(rule,rule,rule B,safe)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4032	apply(rule_tac x="integral {a..b} (\<lambda>x. if x \<in> s then f x else 0)" in exI)
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4033	apply(drule B(2)[rule_format]) using integrable_integral[OF `?r`[THEN conjunct1,rule_format]] by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4034	qed next
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4035	assume ?l note as = this[unfolded has_integral'[of f],rule_format]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4036	let ?f = "\<lambda>x. if x \<in> s then f x else 0"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4037	show ?r proof safe fix a b::"real^'n"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4038	from as[OF zero_less_one] guess B .. note B=conjunctD2[OF this,rule_format]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4039	let ?a = "(\<chi> i. min (a$i) (-B))::real^'n" and ?b = "(\<chi> i. max (b$i) B)::real^'n"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4040	show "?f integrable_on {a..b}" apply(rule integrable_subinterval[of _ ?a ?b])
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4041	proof- have "ball 0 B \<subseteq> {?a..?b}" apply safe unfolding mem_ball mem_interval vector_dist_norm
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4042	proof case goal1 thus ?case using component_le_norm[of x i] by(auto simp add:field_simps) qed
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4043	from B(2)[OF this] guess z .. note conjunct1[OF this]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4044	thus "?f integrable_on {?a..?b}" unfolding integrable_on_def by auto
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4045	show "{a..b} \<subseteq> {?a..?b}" apply safe unfolding mem_interval apply(rule,erule_tac x=i in allE) by auto qed
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4046
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4047	fix e::real assume "e>0" from as[OF this] guess B .. note B=conjunctD2[OF this,rule_format]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4048	show "\<exists>B>0. \<forall>a b. ball 0 B \<subseteq> {a..b} \<longrightarrow>
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4049	norm (integral {a..b} (\<lambda>x. if x \<in> s then f x else 0) - i) < e"
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4050	proof(rule,rule,rule B,safe) case goal1 from B(2)[OF this] guess z .. note z=conjunctD2[OF this]
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4051	from integral_unique[OF this(1)] show ?case using z(2) by auto qed qed qed
f7f8d59b60b9 added lemmas himmelma parents: 35540 diff changeset	4052
35752 c8a8df426666 reset smt_certificates himmelma parents: 35751 diff changeset	4053
36243 027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4054	subsection {* Continuity of the integral (for a 1-dimensional interval). *}
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4055
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4056	lemma integrable_alt: fixes f::"real^'n \<Rightarrow> 'a::banach" shows
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4057	"f integrable_on s \<longleftrightarrow>
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4058	(\<forall>a b. (\<lambda>x. if x \<in> s then f x else 0) integrable_on {a..b}) \<and>
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4059	(\<forall>e>0. \<exists>B>0. \<forall>a b c d. ball 0 B \<subseteq> {a..b} \<and> ball 0 B \<subseteq> {c..d}
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4060	\<longrightarrow> norm(integral {a..b} (\<lambda>x. if x \<in> s then f x else 0) -
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4061	integral {c..d} (\<lambda>x. if x \<in> s then f x else 0)) < e)" (is "?l = ?r")
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4062	proof assume ?l then guess y unfolding integrable_on_def .. note this[unfolded has_integral_alt'[of f]]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4063	note y=conjunctD2[OF this,rule_format] show ?r apply safe apply(rule y)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4064	proof- case goal1 hence "e/2 > 0" by auto from y(2)[OF this] guess B .. note B=conjunctD2[OF this,rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4065	show ?case apply(rule,rule,rule B)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4066	proof safe case goal1 show ?case apply(rule norm_triangle_half_l)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4067	using B(2)[OF goal1(1)] B(2)[OF goal1(2)] by auto qed qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4068
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4069	next assume ?r note as = conjunctD2[OF this,rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4070	have "Cauchy (\<lambda>n. integral ({(\<chi> i. - real n) .. (\<chi> i. real n)}) (\<lambda>x. if x \<in> s then f x else 0))"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4071	proof(unfold Cauchy_def,safe) case goal1
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4072	from as(2)[OF this] guess B .. note B = conjunctD2[OF this,rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4073	from real_arch_simple[of B] guess N .. note N = this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4074	{ fix n assume n:"n \<ge> N" have "ball 0 B \<subseteq> {\<chi> i. - real n..\<chi> i. real n}" apply safe
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4075	unfolding mem_ball mem_interval vector_dist_norm
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4076	proof case goal1 thus ?case using component_le_norm[of x i]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4077	using n N by(auto simp add:field_simps) qed }
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4078	thus ?case apply-apply(rule_tac x=N in exI) apply safe unfolding vector_dist_norm apply(rule B(2)) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4079	qed from this[unfolded convergent_eq_cauchy[THEN sym]] guess i ..
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4080	note i = this[unfolded Lim_sequentially, rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4081
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4082	show ?l unfolding integrable_on_def has_integral_alt'[of f] apply(rule_tac x=i in exI)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4083	apply safe apply(rule as(1)[unfolded integrable_on_def])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4084	proof- case goal1 hence *:"e/2 > 0" by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4085	from i[OF this] guess N .. note N =this[rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4086	from as(2)[OF *] guess B .. note B=conjunctD2[OF this,rule_format] let ?B = "max (real N) B"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4087	show ?case apply(rule_tac x="?B" in exI)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4088	proof safe show "0 < ?B" using B(1) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4089	fix a b assume ab:"ball 0 ?B \<subseteq> {a..b::real^'n}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4090	from real_arch_simple[of ?B] guess n .. note n=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4091	show "norm (integral {a..b} (\<lambda>x. if x \<in> s then f x else 0) - i) < e"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4092	apply(rule norm_triangle_half_l) apply(rule B(2)) defer apply(subst norm_minus_commute)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4093	apply(rule N[unfolded vector_dist_norm, of n])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4094	proof safe show "N \<le> n" using n by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4095	fix x::"real^'n" assume x:"x \<in> ball 0 B" hence "x\<in> ball 0 ?B" by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4096	thus "x\<in>{a..b}" using ab by blast
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4097	show "x\<in>{\<chi> i. - real n..\<chi> i. real n}" using x unfolding mem_interval mem_ball vector_dist_norm apply-
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4098	proof case goal1 thus ?case using component_le_norm[of x i]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4099	using n by(auto simp add:field_simps) qed qed qed qed qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4100
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4101	lemma integrable_altD: fixes f::"real^'n \<Rightarrow> 'a::banach"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4102	assumes "f integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4103	shows "\<And>a b. (\<lambda>x. if x \<in> s then f x else 0) integrable_on {a..b}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4104	"\<And>e. e>0 \<Longrightarrow> \<exists>B>0. \<forall>a b c d. ball 0 B \<subseteq> {a..b} \<and> ball 0 B \<subseteq> {c..d}
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4105	\<longrightarrow> norm(integral {a..b} (\<lambda>x. if x \<in> s then f x else 0) - integral {c..d} (\<lambda>x. if x \<in> s then f x else 0)) < e"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4106	using assms[unfolded integrable_alt[of f]] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4107
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4108	lemma integrable_on_subinterval: fixes f::"real^'n \<Rightarrow> 'a::banach"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4109	assumes "f integrable_on s" "{a..b} \<subseteq> s" shows "f integrable_on {a..b}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4110	apply(rule integrable_eq) defer apply(rule integrable_altD(1)[OF assms(1)])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4111	using assms(2) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4112
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4113	subsection {* A straddling criterion for integrability. *}
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4114
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4115	lemma integrable_straddle_interval: fixes f::"real^'n \<Rightarrow> real"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4116	assumes "\<forall>e>0. \<exists>g h i j. (g has_integral i) ({a..b}) \<and> (h has_integral j) ({a..b}) \<and>
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4117	norm(i - j) < e \<and> (\<forall>x\<in>{a..b}. (g x) \<le> (f x) \<and> (f x) \<le>(h x))"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4118	shows "f integrable_on {a..b}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4119	proof(subst integrable_cauchy,safe)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4120	case goal1 hence e:"e/3 > 0" by auto note assms[rule_format,OF this]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4121	then guess g h i j apply- by(erule exE conjE)+ note obt = this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4122	from obt(1)[unfolded has_integral[of g], rule_format, OF e] guess d1 .. note d1=conjunctD2[OF this,rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4123	from obt(2)[unfolded has_integral[of h], rule_format, OF e] guess d2 .. note d2=conjunctD2[OF this,rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4124	show ?case apply(rule_tac x="\<lambda>x. d1 x \<inter> d2 x" in exI) apply(rule conjI gauge_inter d1 d2)+ unfolding fine_inter
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4125	proof safe have **:"\<And>i j g1 g2 h1 h2 f1 f2. g1 - h2 \<le> f1 - f2 \<Longrightarrow> f1 - f2 \<le> h1 - g2 \<Longrightarrow>
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4126	abs(i - j) < e / 3 \<Longrightarrow> abs(g2 - i) < e / 3 \<Longrightarrow> abs(g1 - i) < e / 3 \<Longrightarrow>
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4127	abs(h2 - j) < e / 3 \<Longrightarrow> abs(h1 - j) < e / 3 \<Longrightarrow> abs(f1 - f2) < e" using `e>0` by arith
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4128	case goal1 note tagged_division_ofD(2-4) note * = this[OF goal1(1)] this[OF goal1(4)]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4129
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4130	have "(\<Sum>(x, k)\<in>p1. content k \<^sub>R f x) - (\<Sum>(x, k)\<in>p1. content k \<^sub>R g x) \<ge> 0"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4131	"0 \<le> (\<Sum>(x, k)\<in>p2. content k \<^sub>R h x) - (\<Sum>(x, k)\<in>p2. content k \<^sub>R f x)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4132	"(\<Sum>(x, k)\<in>p2. content k \<^sub>R f x) - (\<Sum>(x, k)\<in>p2. content k \<^sub>R g x) \<ge> 0"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4133	"0 \<le> (\<Sum>(x, k)\<in>p1. content k \<^sub>R h x) - (\<Sum>(x, k)\<in>p1. content k \<^sub>R f x)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4134	unfolding setsum_subtractf[THEN sym] apply- apply(rule_tac[!] setsum_nonneg)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4135	apply safe unfolding real_scaleR_def mult.diff_right[THEN sym]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4136	apply(rule_tac[!] mult_nonneg_nonneg)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4137	proof- fix a b assume ab:"(a,b) \<in> p1"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4138	show "0 \<le> content b" using *(3)[OF ab] apply safe using content_pos_le . thus "0 \<le> content b" .
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4139	show "0 \<le> f a - g a" "0 \<le> h a - f a" using *(1-2)[OF ab] using obt(4)[rule_format,of a] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4140	next fix a b assume ab:"(a,b) \<in> p2"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4141	show "0 \<le> content b" using *(6)[OF ab] apply safe using content_pos_le . thus "0 \<le> content b" .
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4142	show "0 \<le> f a - g a" "0 \<le> h a - f a" using *(4-5)[OF ab] using obt(4)[rule_format,of a] by auto qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4143
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4144	thus ?case apply- unfolding real_norm_def apply(rule **) defer defer
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4145	unfolding real_norm_def[THEN sym] apply(rule obt(3))
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4146	apply(rule d1(2)[OF conjI[OF goal1(4,5)]])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4147	apply(rule d1(2)[OF conjI[OF goal1(1,2)]])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4148	apply(rule d2(2)[OF conjI[OF goal1(4,6)]])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4149	apply(rule d2(2)[OF conjI[OF goal1(1,3)]]) by auto qed qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4150
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4151	lemma integrable_straddle: fixes f::"real^'n \<Rightarrow> real"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4152	assumes "\<forall>e>0. \<exists>g h i j. (g has_integral i) s \<and> (h has_integral j) s \<and>
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4153	norm(i - j) < e \<and> (\<forall>x\<in>s. (g x) \<le>(f x) \<and>(f x) \<le>(h x))"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4154	shows "f integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4155	proof- have "\<And>a b. (\<lambda>x. if x \<in> s then f x else 0) integrable_on {a..b}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4156	proof(rule integrable_straddle_interval,safe) case goal1 hence *:"e/4 > 0" by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4157	from assms[rule_format,OF this] guess g h i j apply-by(erule exE conjE)+ note obt=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4158	note obt(1)[unfolded has_integral_alt'[of g]] note conjunctD2[OF this, rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4159	note g = this(1) and this(2)[OF *] from this(2) guess B1 .. note B1 = conjunctD2[OF this,rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4160	note obt(2)[unfolded has_integral_alt'[of h]] note conjunctD2[OF this, rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4161	note h = this(1) and this(2)[OF *] from this(2) guess B2 .. note B2 = conjunctD2[OF this,rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4162	def c \<equiv> "\<chi> i. min (a$i) (- (max B1 B2))" and d \<equiv> "\<chi> i. max (b$i) (max B1 B2)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4163	have *:"ball 0 B1 \<subseteq> {c..d}" "ball 0 B2 \<subseteq> {c..d}" apply safe unfolding mem_ball mem_interval vector_dist_norm
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4164	proof(rule_tac[!] allI)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4165	case goal1 thus ?case using component_le_norm[of x i] unfolding c_def d_def by auto next
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4166	case goal2 thus ?case using component_le_norm[of x i] unfolding c_def d_def by auto qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4167	have **:"\<And>ch cg ag ah::real. norm(ah - ag) \<le> norm(ch - cg) \<Longrightarrow> norm(cg - i) < e / 4 \<Longrightarrow>
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4168	norm(ch - j) < e / 4 \<Longrightarrow> norm(ag - ah) < e"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4169	using obt(3) unfolding real_norm_def by arith
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4170	show ?case apply(rule_tac x="\<lambda>x. if x \<in> s then g x else 0" in exI)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4171	apply(rule_tac x="\<lambda>x. if x \<in> s then h x else 0" in exI)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4172	apply(rule_tac x="integral {a..b} (\<lambda>x. if x \<in> s then g x else 0)" in exI)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4173	apply(rule_tac x="integral {a..b} (\<lambda>x. if x \<in> s then h x else 0)" in exI)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4174	apply safe apply(rule_tac[1-2] integrable_integral,rule g,rule h)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4175	apply(rule *[OF _ B1(2)[OF (1)] B2(2)[OF *(2)]])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4176	proof- have *:"\<And>x f g. (if x \<in> s then f x else 0) - (if x \<in> s then g x else 0) =
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4177	(if x \<in> s then f x - g x else (0::real))" by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4178	note ** = abs_of_nonneg[OF integral_nonneg[OF integrable_sub, OF h g]]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4179	show " norm (integral {a..b} (\<lambda>x. if x \<in> s then h x else 0) -
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4180	integral {a..b} (\<lambda>x. if x \<in> s then g x else 0))
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4181	\<le> norm (integral {c..d} (\<lambda>x. if x \<in> s then h x else 0) -
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4182	integral {c..d} (\<lambda>x. if x \<in> s then g x else 0))"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4183	unfolding integral_sub[OF h g,THEN sym] real_norm_def apply(subst ) defer apply(subst ) defer
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4184	apply(rule has_integral_subset_le) defer apply(rule integrable_integral integrable_sub h g)+
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4185	proof safe fix x assume "x\<in>{a..b}" thus "x\<in>{c..d}" unfolding mem_interval c_def d_def
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4186	apply - apply rule apply(erule_tac x=i in allE) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4187	qed(insert obt(4), auto) qed(insert obt(4), auto) qed note interv = this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4188
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4189	show ?thesis unfolding integrable_alt[of f] apply safe apply(rule interv)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4190	proof- case goal1 hence *:"e/3 > 0" by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4191	from assms[rule_format,OF this] guess g h i j apply-by(erule exE conjE)+ note obt=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4192	note obt(1)[unfolded has_integral_alt'[of g]] note conjunctD2[OF this, rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4193	note g = this(1) and this(2)[OF *] from this(2) guess B1 .. note B1 = conjunctD2[OF this,rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4194	note obt(2)[unfolded has_integral_alt'[of h]] note conjunctD2[OF this, rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4195	note h = this(1) and this(2)[OF *] from this(2) guess B2 .. note B2 = conjunctD2[OF this,rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4196	show ?case apply(rule_tac x="max B1 B2" in exI) apply safe apply(rule min_max.less_supI1,rule B1)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4197	proof- fix a b c d::"real^'n" assume as:"ball 0 (max B1 B2) \<subseteq> {a..b}" "ball 0 (max B1 B2) \<subseteq> {c..d}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4198	have **:"ball 0 B1 \<subseteq> ball (0::real^'n) (max B1 B2)" "ball 0 B2 \<subseteq> ball (0::real^'n) (max B1 B2)" by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4199	have *:"\<And>ga gc ha hc fa fc::real. abs(ga - i) < e / 3 \<and> abs(gc - i) < e / 3 \<and> abs(ha - j) < e / 3 \<and>
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4200	abs(hc - j) < e / 3 \<and> abs(i - j) < e / 3 \<and> ga \<le> fa \<and> fa \<le> ha \<and> gc \<le> fc \<and> fc \<le> hc\<Longrightarrow> abs(fa - fc) < e" by smt
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4201	show "norm (integral {a..b} (\<lambda>x. if x \<in> s then f x else 0) - integral {c..d} (\<lambda>x. if x \<in> s then f x else 0)) < e"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4202	unfolding real_norm_def apply(rule *, safe) unfolding real_norm_def[THEN sym]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4203	apply(rule B1(2),rule order_trans,rule **,rule as(1))
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4204	apply(rule B1(2),rule order_trans,rule **,rule as(2))
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4205	apply(rule B2(2),rule order_trans,rule **,rule as(1))
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4206	apply(rule B2(2),rule order_trans,rule **,rule as(2))
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4207	apply(rule obt) apply(rule_tac[!] integral_le) using obt
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4208	by(auto intro!: h g interv) qed qed qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4209
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4210	subsection {* Adding integrals over several sets. *}
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4211
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4212	lemma has_integral_union: fixes f::"real^'n \<Rightarrow> 'a::banach"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4213	assumes "(f has_integral i) s" "(f has_integral j) t" "negligible(s \<inter> t)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4214	shows "(f has_integral (i + j)) (s \<union> t)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4215	proof- note * = has_integral_restrict_univ[THEN sym, of f]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4216	show ?thesis unfolding * apply(rule has_integral_spike[OF assms(3)])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4217	defer apply(rule has_integral_add[OF assms(1-2)[unfolded *]]) by auto qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4218
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4219	lemma has_integral_unions: fixes f::"real^'n \<Rightarrow> 'a::banach"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4220	assumes "finite t" "\<forall>s\<in>t. (f has_integral (i s)) s" "\<forall>s\<in>t. \<forall>s'\<in>t. ~(s = s') \<longrightarrow> negligible(s \<inter> s')"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4221	shows "(f has_integral (setsum i t)) (\<Union>t)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4222	proof- note * = has_integral_restrict_univ[THEN sym, of f]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4223	have **:"negligible (\<Union>((\<lambda>(a,b). a \<inter> b) ` {(a,b). a \<in> t \<and> b \<in> {y. y \<in> t \<and> ~(a = y)}}))"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4224	apply(rule negligible_unions) apply(rule finite_imageI) apply(rule finite_subset[of _ "t \<times> t"]) defer
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4225	apply(rule finite_cartesian_product[OF assms(1,1)]) using assms(3) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4226	note assms(2)[unfolded *] note has_integral_setsum[OF assms(1) this]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4227	thus ?thesis unfolding * apply-apply(rule has_integral_spike[OF **]) defer apply assumption
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4228	proof safe case goal1 thus ?case
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4229	proof(cases "x\<in>\<Union>t") case True then guess s unfolding Union_iff .. note s=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4230	hence *:"\<forall>b\<in>t. x \<in> b \<longleftrightarrow> b = s" using goal1(3) by blast
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4231	show ?thesis unfolding if_P[OF True] apply(rule trans) defer
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4232	apply(rule setsum_cong2) apply(subst *, assumption) apply(rule refl)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4233	unfolding setsum_delta[OF assms(1)] using s by auto qed auto qed qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4234
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4235	subsection {* In particular adding integrals over a division, maybe not of an interval. *}
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4236
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4237	lemma has_integral_combine_division: fixes f::"real^'n \<Rightarrow> 'a::banach"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4238	assumes "d division_of s" "\<forall>k\<in>d. (f has_integral (i k)) k"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4239	shows "(f has_integral (setsum i d)) s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4240	proof- note d = division_ofD[OF assms(1)]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4241	show ?thesis unfolding d(6)[THEN sym] apply(rule has_integral_unions)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4242	apply(rule d assms)+ apply(rule,rule,rule)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4243	proof- case goal1 from d(4)[OF this(1)] d(4)[OF this(2)]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4244	guess a c b d apply-by(erule exE)+ note obt=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4245	from d(5)[OF goal1] show ?case unfolding obt interior_closed_interval
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4246	apply-apply(rule negligible_subset[of "({a..b}-{a<..<b}) \<union> ({c..d}-{c<..<d})"])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4247	apply(rule negligible_union negligible_frontier_interval)+ by auto qed qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4248
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4249	lemma integral_combine_division_bottomup: fixes f::"real^'n \<Rightarrow> 'a::banach"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4250	assumes "d division_of s" "\<forall>k\<in>d. f integrable_on k"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4251	shows "integral s f = setsum (\<lambda>i. integral i f) d"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4252	apply(rule integral_unique) apply(rule has_integral_combine_division[OF assms(1)])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4253	using assms(2) unfolding has_integral_integral .
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4254
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4255	lemma has_integral_combine_division_topdown: fixes f::"real^'n \<Rightarrow> 'a::banach"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4256	assumes "f integrable_on s" "d division_of k" "k \<subseteq> s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4257	shows "(f has_integral (setsum (\<lambda>i. integral i f) d)) k"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4258	apply(rule has_integral_combine_division[OF assms(2)])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4259	apply safe unfolding has_integral_integral[THEN sym]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4260	proof- case goal1 from division_ofD(2,4)[OF assms(2) this]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4261	show ?case apply safe apply(rule integrable_on_subinterval)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4262	apply(rule assms) using assms(3) by auto qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4263
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4264	lemma integral_combine_division_topdown: fixes f::"real^'n \<Rightarrow> 'a::banach"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4265	assumes "f integrable_on s" "d division_of s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4266	shows "integral s f = setsum (\<lambda>i. integral i f) d"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4267	apply(rule integral_unique,rule has_integral_combine_division_topdown) using assms by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4268
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4269	lemma integrable_combine_division: fixes f::"real^'n \<Rightarrow> 'a::banach"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4270	assumes "d division_of s" "\<forall>i\<in>d. f integrable_on i"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4271	shows "f integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4272	using assms(2) unfolding integrable_on_def
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4273	by(metis has_integral_combine_division[OF assms(1)])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4274
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4275	lemma integrable_on_subdivision: fixes f::"real^'n \<Rightarrow> 'a::banach"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4276	assumes "d division_of i" "f integrable_on s" "i \<subseteq> s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4277	shows "f integrable_on i"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4278	apply(rule integrable_combine_division assms)+
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4279	proof safe case goal1 note division_ofD(2,4)[OF assms(1) this]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4280	thus ?case apply safe apply(rule integrable_on_subinterval[OF assms(2)])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4281	using assms(3) by auto qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4282
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4283	subsection {* Also tagged divisions. *}
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4284
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4285	lemma has_integral_combine_tagged_division: fixes f::"real^'n \<Rightarrow> 'a::banach"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4286	assumes "p tagged_division_of s" "\<forall>(x,k) \<in> p. (f has_integral (i k)) k"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4287	shows "(f has_integral (setsum (\<lambda>(x,k). i k) p)) s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4288	proof- have *:"(f has_integral (setsum (\<lambda>k. integral k f) (snd ` p))) s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4289	apply(rule has_integral_combine_division) apply(rule division_of_tagged_division[OF assms(1)])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4290	using assms(2) unfolding has_integral_integral[THEN sym] by(safe,auto)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4291	thus ?thesis apply- apply(rule subst[where P="\<lambda>i. (f has_integral i) s"]) defer apply assumption
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4292	apply(rule trans[of _ "setsum (\<lambda>(x,k). integral k f) p"]) apply(subst eq_commute)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4293	apply(rule setsum_over_tagged_division_lemma[OF assms(1)]) apply(rule integral_null,assumption)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4294	apply(rule setsum_cong2) using assms(2) by auto qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4295
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4296	lemma integral_combine_tagged_division_bottomup: fixes f::"real^'n \<Rightarrow> 'a::banach"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4297	assumes "p tagged_division_of {a..b}" "\<forall>(x,k)\<in>p. f integrable_on k"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4298	shows "integral {a..b} f = setsum (\<lambda>(x,k). integral k f) p"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4299	apply(rule integral_unique) apply(rule has_integral_combine_tagged_division[OF assms(1)])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4300	using assms(2) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4301
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4302	lemma has_integral_combine_tagged_division_topdown: fixes f::"real^'n \<Rightarrow> 'a::banach"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4303	assumes "f integrable_on {a..b}" "p tagged_division_of {a..b}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4304	shows "(f has_integral (setsum (\<lambda>(x,k). integral k f) p)) {a..b}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4305	apply(rule has_integral_combine_tagged_division[OF assms(2)])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4306	proof safe case goal1 note tagged_division_ofD(3-4)[OF assms(2) this]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4307	thus ?case using integrable_subinterval[OF assms(1)] by auto qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4308
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4309	lemma integral_combine_tagged_division_topdown: fixes f::"real^'n \<Rightarrow> 'a::banach"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4310	assumes "f integrable_on {a..b}" "p tagged_division_of {a..b}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4311	shows "integral {a..b} f = setsum (\<lambda>(x,k). integral k f) p"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4312	apply(rule integral_unique,rule has_integral_combine_tagged_division_topdown) using assms by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4313
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4314	subsection {* Henstock's lemma. *}
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4315
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4316	lemma henstock_lemma_part1: fixes f::"real^'n \<Rightarrow> 'a::banach"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4317	assumes "f integrable_on {a..b}" "0 < e" "gauge d"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4318	"(\<forall>p. p tagged_division_of {a..b} \<and> d fine p \<longrightarrow> norm (setsum (\<lambda>(x,k). content k *\<^sub>R f x) p - integral({a..b}) f) < e)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4319	and p:"p tagged_partial_division_of {a..b}" "d fine p"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4320	shows "norm(setsum (\<lambda>(x,k). content k *\<^sub>R f x - integral k f) p) \<le> e" (is "?x \<le> e")
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4321	proof- { presume "\<And>k. 0<k \<Longrightarrow> ?x \<le> e + k" thus ?thesis by arith }
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4322	fix k::real assume k:"k>0" note p' = tagged_partial_division_ofD[OF p(1)]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4323	have "\<Union>snd ` p \<subseteq> {a..b}" using p'(3) by fastsimp
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4324	note partial_division_of_tagged_division[OF p(1)] this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4325	from partial_division_extend_interval[OF this] guess q . note q=this and q' = division_ofD[OF this(2)]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4326	def r \<equiv> "q - snd ` p" have "snd ` p \<inter> r = {}" unfolding r_def by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4327	have r:"finite r" using q' unfolding r_def by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4328
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4329	have "\<forall>i\<in>r. \<exists>p. p tagged_division_of i \<and> d fine p \<and>
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4330	norm(setsum (\<lambda>(x,j). content j *\<^sub>R f x) p - integral i f) < k / (real (card r) + 1)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4331	proof safe case goal1 hence i:"i \<in> q" unfolding r_def by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4332	from q'(4)[OF this] guess u v apply-by(erule exE)+ note uv=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4333	have *:"k / (real (card r) + 1) > 0" apply(rule divide_pos_pos,rule k) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4334	have "f integrable_on {u..v}" apply(rule integrable_subinterval[OF assms(1)])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4335	using q'(2)[OF i] unfolding uv by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4336	note integrable_integral[OF this, unfolded has_integral[of f]]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4337	from this[rule_format,OF *] guess dd .. note dd=conjunctD2[OF this,rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4338	note gauge_inter[OF `gauge d` dd(1)] from fine_division_exists[OF this,of u v] guess qq .
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4339	thus ?case apply(rule_tac x=qq in exI) using dd(2)[of qq] unfolding fine_inter uv by auto qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4340	from bchoice[OF this] guess qq .. note qq=this[rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4341
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4342	let ?p = "p \<union> \<Union>qq ` r" have "norm ((\<Sum>(x, k)\<in>?p. content k *\<^sub>R f x) - integral {a..b} f) < e"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4343	apply(rule assms(4)[rule_format])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4344	proof show "d fine ?p" apply(rule fine_union,rule p) apply(rule fine_unions) using qq by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4345	note * = tagged_partial_division_of_union_self[OF p(1)]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4346	have "p \<union> \<Union>qq ` r tagged_division_of \<Union>snd ` p \<union> \<Union>r"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4347	proof(rule tagged_division_union[OF * tagged_division_unions])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4348	show "finite r" by fact case goal2 thus ?case using qq by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4349	next case goal3 thus ?case apply(rule,rule,rule) apply(rule q'(5)) unfolding r_def by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4350	next case goal4 thus ?case apply(rule inter_interior_unions_intervals) apply(fact,rule)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4351	apply(rule,rule q') defer apply(rule,subst Int_commute)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4352	apply(rule inter_interior_unions_intervals) apply(rule finite_imageI,rule p',rule) defer
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4353	apply(rule,rule q') using q(1) p' unfolding r_def by auto qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4354	moreover have "\<Union>snd ` p \<union> \<Union>r = {a..b}" "{qq i \|i. i \<in> r} = qq ` r"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4355	unfolding Union_Un_distrib[THEN sym] r_def using q by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4356	ultimately show "?p tagged_division_of {a..b}" by fastsimp qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4357
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4358	hence "norm ((\<Sum>(x, k)\<in>p. content k \<^sub>R f x) + (\<Sum>(x, k)\<in>\<Union>qq ` r. content k \<^sub>R f x) -
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4359	integral {a..b} f) < e" apply(subst setsum_Un_zero[THEN sym]) apply(rule p') prefer 3
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4360	apply assumption apply rule apply(rule finite_imageI,rule r) apply safe apply(drule qq)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4361	proof- fix x l k assume as:"(x,l)\<in>p" "(x,l)\<in>qq k" "k\<in>r"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4362	note qq[OF this(3)] note tagged_division_ofD(3,4)[OF conjunct1[OF this] as(2)]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4363	from this(2) guess u v apply-by(erule exE)+ note uv=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4364	have "l\<in>snd ` p" unfolding image_iff apply(rule_tac x="(x,l)" in bexI) using as by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4365	hence "l\<in>q" "k\<in>q" "l\<noteq>k" using as(1,3) q(1) unfolding r_def by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4366	note q'(5)[OF this] hence "interior l = {}" using subset_interior[OF `l \<subseteq> k`] by blast
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4367	thus "content l *\<^sub>R f x = 0" unfolding uv content_eq_0_interior[THEN sym] by auto qed auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4368
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4369	hence "norm ((\<Sum>(x, k)\<in>p. content k \<^sub>R f x) + setsum (setsum (\<lambda>(x, k). content k \<^sub>R f x))
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4370	(qq ` r) - integral {a..b} f) < e" apply(subst(asm) setsum_UNION_zero)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4371	prefer 4 apply assumption apply(rule finite_imageI,fact)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4372	unfolding split_paired_all split_conv image_iff defer apply(erule bexE)+
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4373	proof- fix x m k l T1 T2 assume "(x,m)\<in>T1" "(x,m)\<in>T2" "T1\<noteq>T2" "k\<in>r" "l\<in>r" "T1 = qq k" "T2 = qq l"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4374	note as = this(1-5)[unfolded this(6-)] note kl = tagged_division_ofD(3,4)[OF qq[THEN conjunct1]]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4375	from this(2)[OF as(4,1)] guess u v apply-by(erule exE)+ note uv=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4376	have *:"interior (k \<inter> l) = {}" unfolding interior_inter apply(rule q')
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4377	using as unfolding r_def by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4378	have "interior m = {}" unfolding subset_empty[THEN sym] unfolding *[THEN sym]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4379	apply(rule subset_interior) using kl(1)[OF as(4,1)] kl(1)[OF as(5,2)] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4380	thus "content m *\<^sub>R f x = 0" unfolding uv content_eq_0_interior[THEN sym] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4381	qed(insert qq, auto)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4382
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4383	hence *:"norm ((\<Sum>(x, k)\<in>p. content k \<^sub>R f x) + setsum (setsum (\<lambda>(x, k). content k *\<^sub>R f x) \<circ> qq) r -
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4384	integral {a..b} f) < e" apply(subst(asm) setsum_reindex_nonzero) apply fact
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4385	apply(rule setsum_0',rule) unfolding split_paired_all split_conv defer apply assumption
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4386	proof- fix k l x m assume as:"k\<in>r" "l\<in>r" "k\<noteq>l" "qq k = qq l" "(x,m)\<in>qq k"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4387	note tagged_division_ofD(6)[OF qq[THEN conjunct1]] from this[OF as(1)] this[OF as(2)]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4388	show "content m *\<^sub>R f x = 0" using as(3) unfolding as by auto qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4389
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4390	have *:"\<And>ir ip i cr cp. norm((cp + cr) - i) < e \<Longrightarrow> norm(cr - ir) < k \<Longrightarrow>
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4391	ip + ir = i \<Longrightarrow> norm(cp - ip) \<le> e + k"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4392	proof- case goal1 thus ?case using norm_triangle_le[of "cp + cr - i" "- (cr - ir)"]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4393	unfolding goal1(3)[THEN sym] norm_minus_cancel by(auto simp add:group_simps) qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4394
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4395	have "?x = norm ((\<Sum>(x, k)\<in>p. content k *\<^sub>R f x) - (\<Sum>(x, k)\<in>p. integral k f))"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4396	unfolding split_def setsum_subtractf ..
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4397	also have "... \<le> e + k" apply(rule [OF *, where ir="setsum (\<lambda>k. integral k f) r"])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4398	proof- case goal2 have *:"(\<Sum>(x, k)\<in>p. integral k f) = (\<Sum>k\<in>snd ` p. integral k f)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4399	apply(subst setsum_reindex_nonzero) apply fact
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4400	unfolding split_paired_all snd_conv split_def o_def
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4401	proof- fix x l y m assume as:"(x,l)\<in>p" "(y,m)\<in>p" "(x,l)\<noteq>(y,m)" "l = m"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4402	from p'(4)[OF as(1)] guess u v apply-by(erule exE)+ note uv=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4403	show "integral l f = 0" unfolding uv apply(rule integral_unique)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4404	apply(rule has_integral_null) unfolding content_eq_0_interior
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4405	using p'(5)[OF as(1-3)] unfolding uv as(4)[THEN sym] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4406	qed auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4407	show ?case unfolding integral_combine_division_topdown[OF assms(1) q(2)] * r_def
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4408	apply(rule setsum_Un_disjoint'[THEN sym]) using q(1) q'(1) p'(1) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4409	next case goal1 have :"k real (card r) / (1 + real (card r)) < k" using k by(auto simp add:field_simps)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4410	show ?case apply(rule le_less_trans[of _ "setsum (\<lambda>x. k / (real (card r) + 1)) r"])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4411	unfolding setsum_subtractf[THEN sym] apply(rule setsum_norm_le,fact)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4412	apply rule apply(drule qq) defer unfolding real_divide_def setsum_left_distrib[THEN sym]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4413	unfolding real_divide_def[THEN sym] using * by(auto simp add:field_simps real_eq_of_nat)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4414	qed finally show "?x \<le> e + k" . qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4415
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4416	lemma henstock_lemma_part2: fixes f::"real^'m \<Rightarrow> real^'n"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4417	assumes "f integrable_on {a..b}" "0 < e" "gauge d"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4418	"\<forall>p. p tagged_division_of {a..b} \<and> d fine p \<longrightarrow> norm (setsum (\<lambda>(x,k). content k *\<^sub>R f x) p -
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4419	integral({a..b}) f) < e" "p tagged_partial_division_of {a..b}" "d fine p"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4420	shows "setsum (\<lambda>(x,k). norm(content k \<^sub>R f x - integral k f)) p \<le> 2 real (CARD('n)) * e"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4421	unfolding split_def apply(rule vsum_norm_allsubsets_bound) defer
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4422	apply(rule henstock_lemma_part1[unfolded split_def,OF assms(1-3)])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4423	apply safe apply(rule assms[rule_format,unfolded split_def]) defer
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4424	apply(rule tagged_partial_division_subset,rule assms,assumption)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4425	apply(rule fine_subset,assumption,rule assms) using assms(5) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4426
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4427	lemma henstock_lemma: fixes f::"real^'m \<Rightarrow> real^'n"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4428	assumes "f integrable_on {a..b}" "e>0"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4429	obtains d where "gauge d"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4430	"\<forall>p. p tagged_partial_division_of {a..b} \<and> d fine p
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4431	\<longrightarrow> setsum (\<lambda>(x,k). norm(content k *\<^sub>R f x - integral k f)) p < e"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4432	proof- have :"e / (2 (real CARD('n) + 1)) > 0" apply(rule divide_pos_pos) using assms(2) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4433	from integrable_integral[OF assms(1),unfolded has_integral[of f],rule_format,OF this]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4434	guess d .. note d = conjunctD2[OF this] show thesis apply(rule that,rule d)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4435	proof safe case goal1 note * = henstock_lemma_part2[OF assms(1) * d this]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4436	show ?case apply(rule le_less_trans[OF *]) using `e>0` by(auto simp add:field_simps) qed qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4437
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4438	subsection {* monotone convergence (bounded interval first). *}
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4439
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4440	lemma monotone_convergence_interval: fixes f::"nat \<Rightarrow> real^'n \<Rightarrow> real^1"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4441	assumes "\<forall>k. (f k) integrable_on {a..b}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4442	"\<forall>k. \<forall>x\<in>{a..b}. dest_vec1(f k x) \<le> dest_vec1(f (Suc k) x)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4443	"\<forall>x\<in>{a..b}. ((\<lambda>k. f k x) ---> g x) sequentially"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4444	"bounded {integral {a..b} (f k) \| k . k \<in> UNIV}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4445	shows "g integrable_on {a..b} \<and> ((\<lambda>k. integral ({a..b}) (f k)) ---> integral ({a..b}) g) sequentially"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4446	proof(case_tac[!] "content {a..b} = 0") assume as:"content {a..b} = 0"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4447	show ?thesis using integrable_on_null[OF as] unfolding integral_null[OF as] using Lim_const by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4448	next assume ab:"content {a..b} \<noteq> 0"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4449	have fg:"\<forall>x\<in>{a..b}. \<forall> k. (f k x)$1 \<le> (g x)$1"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4450	proof safe case goal1 note assms(3)[rule_format,OF this]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4451	note * = Lim_component_ge[OF this trivial_limit_sequentially]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4452	show ?case apply(rule *) unfolding eventually_sequentially
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4453	apply(rule_tac x=k in exI) apply- apply(rule transitive_stepwise_le)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4454	using assms(2)[rule_format,OF goal1] by auto qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4455	have "\<exists>i. ((\<lambda>k. integral ({a..b}) (f k)) ---> i) sequentially"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4456	apply(rule bounded_increasing_convergent) defer
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4457	apply rule apply(rule integral_component_le) apply safe
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4458	apply(rule assms(1-2)[rule_format])+ using assms(4) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4459	then guess i .. note i=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4460	have i':"\<And>k. dest_vec1(integral({a..b}) (f k)) \<le> dest_vec1 i"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4461	apply(rule Lim_component_ge,rule i) apply(rule trivial_limit_sequentially)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4462	unfolding eventually_sequentially apply(rule_tac x=k in exI)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4463	apply(rule transitive_stepwise_le) prefer 3 apply(rule integral_dest_vec1_le)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4464	apply(rule assms(1-2)[rule_format])+ using assms(2) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4465
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4466	have "(g has_integral i) {a..b}" unfolding has_integral
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4467	proof safe case goal1 note e=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4468	hence "\<forall>k. (\<exists>d. gauge d \<and> (\<forall>p. p tagged_division_of {a..b} \<and> d fine p \<longrightarrow>
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4469	norm ((\<Sum>(x, ka)\<in>p. content ka *\<^sub>R f k x) - integral {a..b} (f k)) < e / 2 ^ (k + 2)))"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4470	apply-apply(rule,rule assms(1)[unfolded has_integral_integral has_integral,rule_format])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4471	apply(rule divide_pos_pos) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4472	from choice[OF this] guess c .. note c=conjunctD2[OF this[rule_format],rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4473
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4474	have "\<exists>r. \<forall>k\<ge>r. 0 \<le> i$1 - dest_vec1(integral {a..b} (f k)) \<and>
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4475	i$1 - dest_vec1(integral {a..b} (f k)) < e / 4"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4476	proof- case goal1 have "e/4 > 0" using e by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4477	from i[unfolded Lim_sequentially,rule_format,OF this] guess r ..
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4478	thus ?case apply(rule_tac x=r in exI) apply rule
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4479	apply(erule_tac x=k in allE)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4480	proof- case goal1 thus ?case using i'[of k] unfolding dist_real by auto qed qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4481	then guess r .. note r=conjunctD2[OF this[rule_format]]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4482
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4483	have "\<forall>x\<in>{a..b}. \<exists>n\<ge>r. \<forall>k\<ge>n. 0 \<le> (g x)$1 - (f k x)$1 \<and>
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4484	(g x)$1 - (f k x)$1 < e / (4 * content({a..b}))"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4485	proof case goal1 have "e / (4 * content {a..b}) > 0" apply(rule divide_pos_pos,fact)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4486	using ab content_pos_le[of a b] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4487	from assms(3)[rule_format,OF goal1,unfolded Lim_sequentially,rule_format,OF this]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4488	guess n .. note n=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4489	thus ?case apply(rule_tac x="n + r" in exI) apply safe apply(erule_tac[2-3] x=k in allE)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4490	unfolding dist_real using fg[rule_format,OF goal1] by(auto simp add:field_simps) qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4491	from bchoice[OF this] guess m .. note m=conjunctD2[OF this[rule_format],rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4492	def d \<equiv> "\<lambda>x. c (m x) x"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4493
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4494	show ?case apply(rule_tac x=d in exI)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4495	proof safe show "gauge d" using c(1) unfolding gauge_def d_def by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4496	next fix p assume p:"p tagged_division_of {a..b}" "d fine p"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4497	note p'=tagged_division_ofD[OF p(1)]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4498	have "\<exists>a. \<forall>x\<in>p. m (fst x) \<le> a" by(rule upper_bound_finite_set,fact)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4499	then guess s .. note s=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4500	have *:"\<forall>a b c d. norm(a - b) \<le> e / 4 \<and> norm(b - c) < e / 2 \<and>
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4501	norm(c - d) < e / 4 \<longrightarrow> norm(a - d) < e"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4502	proof safe case goal1 thus ?case using norm_triangle_lt[of "a - b" "b - c" "3* e/4"]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4503	norm_triangle_lt[of "a - b + (b - c)" "c - d" e] unfolding norm_minus_cancel
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4504	by(auto simp add:group_simps) qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4505	show "norm ((\<Sum>(x, k)\<in>p. content k \<^sub>R g x) - i) < e" apply(rule [rule_format,where
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4506	b="\<Sum>(x, k)\<in>p. content k *\<^sub>R f (m x) x" and c="\<Sum>(x, k)\<in>p. integral k (f (m x))"])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4507	proof safe case goal1
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4508	show ?case apply(rule order_trans[of _ "\<Sum>(x, k)\<in>p. content k * (e / (4 * content {a..b}))"])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4509	unfolding setsum_subtractf[THEN sym] apply(rule order_trans,rule setsum_norm[OF p'(1)])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4510	apply(rule setsum_mono) unfolding split_paired_all split_conv
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4511	unfolding split_def setsum_left_distrib[THEN sym] scaleR.diff_right[THEN sym]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4512	unfolding additive_content_tagged_division[OF p(1), unfolded split_def]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4513	proof- fix x k assume xk:"(x,k) \<in> p" hence x:"x\<in>{a..b}" using p'(2-3)[OF xk] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4514	from p'(4)[OF xk] guess u v apply-by(erule exE)+ note uv=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4515	show " norm (content k \<^sub>R (g x - f (m x) x)) \<le> content k (e / (4 * content {a..b}))"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4516	unfolding norm_scaleR uv unfolding abs_of_nonneg[OF content_pos_le]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4517	apply(rule mult_left_mono) unfolding norm_real using m(2)[OF x,of "m x"] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4518	qed(insert ab,auto)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4519
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4520	next case goal2 show ?case apply(rule le_less_trans[of _ "norm (\<Sum>j = 0..s.
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4521	\<Sum>(x, k)\<in>{xk\<in>p. m (fst xk) = j}. content k *\<^sub>R f (m x) x - integral k (f (m x)))"])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4522	apply(subst setsum_group) apply fact apply(rule finite_atLeastAtMost) defer
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4523	apply(subst split_def)+ unfolding setsum_subtractf apply rule
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4524	proof- show "norm (\<Sum>j = 0..s. \<Sum>(x, k)\<in>{xk \<in> p.
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4525	m (fst xk) = j}. content k *\<^sub>R f (m x) x - integral k (f (m x))) < e / 2"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4526	apply(rule le_less_trans[of _ "setsum (\<lambda>i. e / 2^(i+2)) {0..s}"])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4527	apply(rule setsum_norm_le[OF finite_atLeastAtMost])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4528	proof show "(\<Sum>i = 0..s. e / 2 ^ (i + 2)) < e / 2"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4529	unfolding power_add real_divide_def inverse_mult_distrib
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4530	unfolding setsum_right_distrib[THEN sym] setsum_left_distrib[THEN sym]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4531	unfolding power_inverse sum_gp apply(rule mult_strict_left_mono[OF _ e])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4532	unfolding power2_eq_square by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4533	fix t assume "t\<in>{0..s}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4534	show "norm (\<Sum>(x, k)\<in>{xk \<in> p. m (fst xk) = t}. content k *\<^sub>R f (m x) x -
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4535	integral k (f (m x))) \<le> e / 2 ^ (t + 2)"apply(rule order_trans[of _
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4536	"norm(setsum (\<lambda>(x,k). content k *\<^sub>R f t x - integral k (f t)) {xk \<in> p. m (fst xk) = t})"])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4537	apply(rule eq_refl) apply(rule arg_cong[where f=norm]) apply(rule setsum_cong2) defer
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4538	apply(rule henstock_lemma_part1) apply(rule assms(1)[rule_format])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4539	apply(rule divide_pos_pos,rule e) defer apply safe apply(rule c)+
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4540	apply rule apply assumption+ apply(rule tagged_partial_division_subset[of p])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4541	apply(rule p(1)[unfolded tagged_division_of_def,THEN conjunct1]) defer
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4542	unfolding fine_def apply safe apply(drule p(2)[unfolded fine_def,rule_format])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4543	unfolding d_def by auto qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4544	qed(insert s, auto)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4545
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4546	next case goal3
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4547	note comb = integral_combine_tagged_division_topdown[OF assms(1)[rule_format] p(1)]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4548	have *:"\<And>sr sx ss ks kr::real^1. kr = sr \<longrightarrow> ks = ss \<longrightarrow> ks \<le> i \<and> sr \<le> sx \<and> sx \<le> ss \<and> 0 \<le> i$1 - kr$1
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4549	\<and> i$1 - kr$1 < e/4 \<longrightarrow> abs(sx$1 - i$1) < e/4" unfolding Cart_eq forall_1 vector_le_def by arith
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4550	show ?case unfolding norm_real Cart_nth.diff apply(rule *[rule_format],safe)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4551	apply(rule comb[of r],rule comb[of s]) unfolding vector_le_def forall_1 setsum_component
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4552	apply(rule i') apply(rule_tac[1-2] setsum_mono) unfolding split_paired_all split_conv
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4553	apply(rule_tac[1-2] integral_component_le[OF ])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4554	proof safe show "0 \<le> i$1 - (integral {a..b} (f r))$1" using r(1) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4555	show "i$1 - (integral {a..b} (f r))$1 < e / 4" using r(2) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4556	fix x k assume xk:"(x,k)\<in>p" from p'(4)[OF this] guess u v apply-by(erule exE)+ note uv=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4557	show "f r integrable_on k" "f s integrable_on k" "f (m x) integrable_on k" "f (m x) integrable_on k"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4558	unfolding uv apply(rule_tac[!] integrable_on_subinterval[OF assms(1)[rule_format]])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4559	using p'(3)[OF xk] unfolding uv by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4560	fix y assume "y\<in>k" hence "y\<in>{a..b}" using p'(3)[OF xk] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4561	hence *:"\<And>m. \<forall>n\<ge>m. (f m y)$1 \<le> (f n y)$1" apply-apply(rule transitive_stepwise_le) using assms(2) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4562	show "(f r y)$1 \<le> (f (m x) y)$1" "(f (m x) y)$1 \<le> (f s y)$1"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4563	apply(rule_tac[!] *[rule_format]) using s[rule_format,OF xk] m(1)[of x] p'(2-3)[OF xk] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4564	qed qed qed qed note * = this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4565
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4566	have "integral {a..b} g = i" apply(rule integral_unique) using * .
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4567	thus ?thesis using i * by auto qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4568
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4569	lemma monotone_convergence_increasing: fixes f::"nat \<Rightarrow> real^'n \<Rightarrow> real^1"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4570	assumes "\<forall>k. (f k) integrable_on s" "\<forall>k. \<forall>x\<in>s. (f k x)$1 \<le> (f (Suc k) x)$1"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4571	"\<forall>x\<in>s. ((\<lambda>k. f k x) ---> g x) sequentially" "bounded {integral s (f k)\| k. True}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4572	shows "g integrable_on s \<and> ((\<lambda>k. integral s (f k)) ---> integral s g) sequentially"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4573	proof- have lem:"\<And>f::nat \<Rightarrow> real^'n \<Rightarrow> real^1. \<And> g s. \<forall>k.\<forall>x\<in>s. 0\<le>dest_vec1 (f k x) \<Longrightarrow> \<forall>k. (f k) integrable_on s \<Longrightarrow>
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4574	\<forall>k. \<forall>x\<in>s. (f k x)$1 \<le> (f (Suc k) x)$1 \<Longrightarrow> \<forall>x\<in>s. ((\<lambda>k. f k x) ---> g x) sequentially \<Longrightarrow>
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4575	bounded {integral s (f k)\| k. True} \<Longrightarrow> g integrable_on s \<and> ((\<lambda>k. integral s (f k)) ---> integral s g) sequentially"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4576	proof- case goal1 note assms=this[rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4577	have "\<forall>x\<in>s. \<forall>k. dest_vec1(f k x) \<le> dest_vec1(g x)" apply safe apply(rule Lim_component_ge)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4578	apply(rule goal1(4)[rule_format],assumption) apply(rule trivial_limit_sequentially)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4579	unfolding eventually_sequentially apply(rule_tac x=k in exI)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4580	apply(rule transitive_stepwise_le) using goal1(3) by auto note fg=this[rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4581
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4582	have "\<exists>i. ((\<lambda>k. integral s (f k)) ---> i) sequentially" apply(rule bounded_increasing_convergent)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4583	apply(rule goal1(5)) apply(rule,rule integral_component_le) apply(rule goal1(2)[rule_format])+
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4584	using goal1(3) by auto then guess i .. note i=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4585	have "\<And>k. \<forall>x\<in>s. \<forall>n\<ge>k. f k x \<le> f n x" apply(rule,rule transitive_stepwise_le) using goal1(3) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4586	hence i':"\<forall>k. (integral s (f k))$1 \<le> i$1" apply-apply(rule,rule Lim_component_ge)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4587	apply(rule i,rule trivial_limit_sequentially) unfolding eventually_sequentially
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4588	apply(rule_tac x=k in exI,safe) apply(rule integral_dest_vec1_le)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4589	apply(rule goal1(2)[rule_format])+ by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4590
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4591	note int = assms(2)[unfolded integrable_alt[of _ s],THEN conjunct1,rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4592	have ifif:"\<And>k t. (\<lambda>x. if x \<in> t then if x \<in> s then f k x else 0 else 0) =
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4593	(\<lambda>x. if x \<in> t\<inter>s then f k x else 0)" apply(rule ext) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4594	have int':"\<And>k a b. f k integrable_on {a..b} \<inter> s" apply(subst integrable_restrict_univ[THEN sym])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4595	apply(subst ifif[THEN sym]) apply(subst integrable_restrict_univ) using int .
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4596	have "\<And>a b. (\<lambda>x. if x \<in> s then g x else 0) integrable_on {a..b} \<and>
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4597	((\<lambda>k. integral {a..b} (\<lambda>x. if x \<in> s then f k x else 0)) --->
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4598	integral {a..b} (\<lambda>x. if x \<in> s then g x else 0)) sequentially"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4599	proof(rule monotone_convergence_interval,safe)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4600	case goal1 show ?case using int .
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4601	next case goal2 thus ?case apply-apply(cases "x\<in>s") using assms(3) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4602	next case goal3 thus ?case apply-apply(cases "x\<in>s") using assms(4) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4603	next case goal4 note * = integral_dest_vec1_nonneg[unfolded vector_le_def forall_1 zero_index]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4604	have "\<And>k. norm (integral {a..b} (\<lambda>x. if x \<in> s then f k x else 0)) \<le> norm (integral s (f k))"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4605	unfolding norm_real apply(subst abs_of_nonneg) apply(rule *[OF int])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4606	apply(safe,case_tac "x\<in>s") apply(drule assms(1)) prefer 3
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4607	apply(subst abs_of_nonneg) apply(rule *[OF assms(2) goal1(1)[THEN spec]])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4608	apply(subst integral_restrict_univ[THEN sym,OF int])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4609	unfolding ifif unfolding integral_restrict_univ[OF int']
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4610	apply(rule integral_subset_component_le[OF _ int' assms(2)]) using assms(1) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4611	thus ?case using assms(5) unfolding bounded_iff apply safe
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4612	apply(rule_tac x=aa in exI,safe) apply(erule_tac x="integral s (f k)" in ballE)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4613	apply(rule order_trans) apply assumption by auto qed note g = conjunctD2[OF this]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4614
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4615	have "(g has_integral i) s" unfolding has_integral_alt' apply safe apply(rule g(1))
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4616	proof- case goal1 hence "e/4>0" by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4617	from i[unfolded Lim_sequentially,rule_format,OF this] guess N .. note N=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4618	note assms(2)[of N,unfolded has_integral_integral has_integral_alt'[of "f N"]]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4619	from this[THEN conjunct2,rule_format,OF `e/4>0`] guess B .. note B=conjunctD2[OF this]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4620	show ?case apply(rule,rule,rule B,safe)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4621	proof- fix a b::"real^'n" assume ab:"ball 0 B \<subseteq> {a..b}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4622	from `e>0` have "e/2>0" by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4623	from g(2)[unfolded Lim_sequentially,of a b,rule_format,OF this] guess M .. note M=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4624	have **:"norm (integral {a..b} (\<lambda>x. if x \<in> s then f N x else 0) - i) < e/2"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4625	apply(rule norm_triangle_half_l) using B(2)[rule_format,OF ab] N[rule_format,of N]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4626	unfolding vector_dist_norm apply-defer apply(subst norm_minus_commute) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4627	have *:"\<And>f1 f2 g. abs(f1 - i$1) < e / 2 \<longrightarrow> abs(f2 - g) < e / 2 \<longrightarrow> f1 \<le> f2 \<longrightarrow> f2 \<le> i$1
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4628	\<longrightarrow> abs(g - i$1) < e" by arith
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4629	show "norm (integral {a..b} (\<lambda>x. if x \<in> s then g x else 0) - i) < e"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4630	unfolding norm_real Cart_simps apply(rule *[rule_format])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4631	apply(rule **[unfolded norm_real Cart_simps])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4632	apply(rule M[rule_format,of "M + N",unfolded dist_real]) apply(rule le_add1)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4633	apply(rule integral_component_le[OF int int]) defer
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4634	apply(rule order_trans[OF _ i'[rule_format,of "M + N"]])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4635	proof safe case goal2 have "\<And>m. x\<in>s \<Longrightarrow> \<forall>n\<ge>m. (f m x)$1 \<le> (f n x)$1"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4636	apply(rule transitive_stepwise_le) using assms(3) by auto thus ?case by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4637	next case goal1 show ?case apply(subst integral_restrict_univ[THEN sym,OF int])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4638	unfolding ifif integral_restrict_univ[OF int']
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4639	apply(rule integral_subset_component_le[OF _ int']) using assms by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4640	qed qed qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4641	thus ?case apply safe defer apply(drule integral_unique) using i by auto qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4642
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4643	have sub:"\<And>k. integral s (\<lambda>x. f k x - f 0 x) = integral s (f k) - integral s (f 0)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4644	apply(subst integral_sub) apply(rule assms(1)[rule_format])+ by rule
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4645	have "\<And>x m. x\<in>s \<Longrightarrow> \<forall>n\<ge>m. dest_vec1 (f m x) \<le> dest_vec1 (f n x)" apply(rule transitive_stepwise_le)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4646	using assms(2) by auto note * = this[rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4647	have "(\<lambda>x. g x - f 0 x) integrable_on s \<and>((\<lambda>k. integral s (\<lambda>x. f (Suc k) x - f 0 x)) --->
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4648	integral s (\<lambda>x. g x - f 0 x)) sequentially" apply(rule lem,safe)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4649	proof- case goal1 thus ?case using *[of x 0 "Suc k"] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4650	next case goal2 thus ?case apply(rule integrable_sub) using assms(1) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4651	next case goal3 thus ?case using *[of x "Suc k" "Suc (Suc k)"] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4652	next case goal4 thus ?case apply-apply(rule Lim_sub)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4653	using seq_offset[OF assms(3)[rule_format],of x 1] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4654	next case goal5 thus ?case using assms(4) unfolding bounded_iff
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4655	apply safe apply(rule_tac x="a + norm (integral s (\<lambda>x. f 0 x))" in exI)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4656	apply safe apply(erule_tac x="integral s (\<lambda>x. f (Suc k) x)" in ballE) unfolding sub
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4657	apply(rule order_trans[OF norm_triangle_ineq4]) by auto qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4658	note conjunctD2[OF this] note Lim_add[OF this(2) Lim_const[of "integral s (f 0)"]]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4659	integrable_add[OF this(1) assms(1)[rule_format,of 0]]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4660	thus ?thesis unfolding sub apply-apply rule defer apply(subst(asm) integral_sub)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4661	using assms(1) apply auto apply(rule seq_offset_rev[where k=1]) by auto qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4662
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4663	lemma monotone_convergence_decreasing: fixes f::"nat \<Rightarrow> real^'n \<Rightarrow> real^1"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4664	assumes "\<forall>k. (f k) integrable_on s" "\<forall>k. \<forall>x\<in>s. (f (Suc k) x)$1 \<le> (f k x)$1"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4665	"\<forall>x\<in>s. ((\<lambda>k. f k x) ---> g x) sequentially" "bounded {integral s (f k)\| k. True}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4666	shows "g integrable_on s \<and> ((\<lambda>k. integral s (f k)) ---> integral s g) sequentially"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4667	proof- note assm = assms[rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4668	have :"{integral s (\<lambda>x. - f k x) \|k. True} = op \<^sub>R -1 ` {integral s (f k)\| k. True}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4669	apply safe unfolding image_iff apply(rule_tac x="integral s (f k)" in bexI) prefer 3
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4670	apply(rule_tac x=k in exI) unfolding integral_neg[OF assm(1)] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4671	have "(\<lambda>x. - g x) integrable_on s \<and> ((\<lambda>k. integral s (\<lambda>x. - f k x))
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4672	---> integral s (\<lambda>x. - g x)) sequentially" apply(rule monotone_convergence_increasing)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4673	apply(safe,rule integrable_neg) apply(rule assm) defer apply(rule Lim_neg)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4674	apply(rule assm,assumption) unfolding * apply(rule bounded_scaling) using assm by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4675	note * = conjunctD2[OF this]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4676	show ?thesis apply rule using integrable_neg[OF *(1)] defer
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4677	using Lim_neg[OF *(2)] apply- unfolding integral_neg[OF assm(1)]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4678	unfolding integral_neg[OF *(1),THEN sym] by auto qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4679
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4680	lemma monotone_convergence_increasing_real: fixes f::"nat \<Rightarrow> real^'n \<Rightarrow> real"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4681	assumes "\<forall>k. (f k) integrable_on s" "\<forall>k. \<forall>x\<in>s. (f (Suc k) x) \<ge> (f k x)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4682	"\<forall>x\<in>s. ((\<lambda>k. f k x) ---> g x) sequentially" "bounded {integral s (f k)\| k. True}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4683	shows "g integrable_on s \<and> ((\<lambda>k. integral s (f k)) ---> integral s g) sequentially"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4684	proof- have *:"{integral s (\<lambda>x. vec1 (f k x)) \|k. True} = vec1 ` {integral s (f k) \|k. True}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4685	unfolding integral_trans[OF assms(1)[rule_format]] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4686	have "vec1 \<circ> g integrable_on s \<and> ((\<lambda>k. integral s (vec1 \<circ> f k)) ---> integral s (vec1 \<circ> g)) sequentially"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4687	apply(rule monotone_convergence_increasing) unfolding o_def integrable_on_trans
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4688	unfolding vec1_dest_vec1 apply(rule assms)+ unfolding Lim_trans unfolding * using assms(3,4) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4689	thus ?thesis unfolding o_def unfolding integral_trans[OF assms(1)[rule_format]] by auto qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4690
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4691	lemma monotone_convergence_decreasing_real: fixes f::"nat \<Rightarrow> real^'n \<Rightarrow> real"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4692	assumes "\<forall>k. (f k) integrable_on s" "\<forall>k. \<forall>x\<in>s. (f (Suc k) x) \<le> (f k x)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4693	"\<forall>x\<in>s. ((\<lambda>k. f k x) ---> g x) sequentially" "bounded {integral s (f k)\| k. True}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4694	shows "g integrable_on s \<and> ((\<lambda>k. integral s (f k)) ---> integral s g) sequentially"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4695	proof- have *:"{integral s (\<lambda>x. vec1 (f k x)) \|k. True} = vec1 ` {integral s (f k) \|k. True}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4696	unfolding integral_trans[OF assms(1)[rule_format]] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4697	have "vec1 \<circ> g integrable_on s \<and> ((\<lambda>k. integral s (vec1 \<circ> f k)) ---> integral s (vec1 \<circ> g)) sequentially"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4698	apply(rule monotone_convergence_decreasing) unfolding o_def integrable_on_trans
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4699	unfolding vec1_dest_vec1 apply(rule assms)+ unfolding Lim_trans unfolding * using assms(3,4) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4700	thus ?thesis unfolding o_def unfolding integral_trans[OF assms(1)[rule_format]] by auto qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4701
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4702	subsection {* absolute integrability (this is the same as Lebesgue integrability). *}
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4703
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4704	definition absolutely_integrable_on (infixr "absolutely'_integrable'_on" 46) where
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4705	"f absolutely_integrable_on s \<longleftrightarrow> f integrable_on s \<and> (\<lambda>x. (norm(f x))) integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4706
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4707	lemma absolutely_integrable_onI[intro?]:
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4708	"f integrable_on s \<Longrightarrow> (\<lambda>x. (norm(f x))) integrable_on s \<Longrightarrow> f absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4709	unfolding absolutely_integrable_on_def by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4710
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4711	lemma absolutely_integrable_onD[dest]: assumes "f absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4712	shows "f integrable_on s" "(\<lambda>x. (norm(f x))) integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4713	using assms unfolding absolutely_integrable_on_def by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4714
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4715	lemma absolutely_integrable_on_trans[simp]: fixes f::"real^'n \<Rightarrow> real" shows
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4716	"(vec1 o f) absolutely_integrable_on s \<longleftrightarrow> f absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4717	unfolding absolutely_integrable_on_def o_def by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4718
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4719	lemma integral_norm_bound_integral: fixes f::"real^'n \<Rightarrow> 'a::banach"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4720	assumes "f integrable_on s" "g integrable_on s" "\<forall>x\<in>s. norm(f x) \<le> g x"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4721	shows "norm(integral s f) \<le> (integral s g)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4722	proof- have *:"\<And>x y. (\<forall>e::real. 0 < e \<longrightarrow> x < y + e) \<longrightarrow> x \<le> y" apply(safe,rule ccontr)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4723	apply(erule_tac x="x - y" in allE) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4724	have "\<And>e sg dsa dia ig. norm(sg) \<le> dsa \<longrightarrow> abs(dsa - dia) < e / 2 \<longrightarrow> norm(sg - ig) < e / 2
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4725	\<longrightarrow> norm(ig) < dia + e"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4726	proof safe case goal1 show ?case apply(rule le_less_trans[OF norm_triangle_sub[of ig sg]])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4727	apply(subst real_sum_of_halves[of e,THEN sym]) unfolding class_semiring.add_a
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4728	apply(rule add_le_less_mono) defer apply(subst norm_minus_commute,rule goal1)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4729	apply(rule order_trans[OF goal1(1)]) using goal1(2) by arith
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4730	qed note norm=this[rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4731	have lem:"\<And>f::real^'n \<Rightarrow> 'a. \<And> g a b. f integrable_on {a..b} \<Longrightarrow> g integrable_on {a..b} \<Longrightarrow>
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4732	\<forall>x\<in>{a..b}. norm(f x) \<le> (g x) \<Longrightarrow> norm(integral({a..b}) f) \<le> (integral({a..b}) g)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4733	proof(rule [rule_format]) case goal1 hence :"e/2>0" by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4734	from integrable_integral[OF goal1(1),unfolded has_integral[of f],rule_format,OF *]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4735	guess d1 .. note d1 = conjunctD2[OF this,rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4736	from integrable_integral[OF goal1(2),unfolded has_integral[of g],rule_format,OF *]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4737	guess d2 .. note d2 = conjunctD2[OF this,rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4738	note gauge_inter[OF d1(1) d2(1)]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4739	from fine_division_exists[OF this, of a b] guess p . note p=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4740	show ?case apply(rule norm) defer
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4741	apply(rule d2(2)[OF conjI[OF p(1)],unfolded real_norm_def]) defer
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4742	apply(rule d1(2)[OF conjI[OF p(1)]]) defer apply(rule setsum_norm_le)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4743	proof safe fix x k assume "(x,k)\<in>p" note as = tagged_division_ofD(2-4)[OF p(1) this]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4744	from this(3) guess u v apply-by(erule exE)+ note uv=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4745	show "norm (content k \<^sub>R f x) \<le> content k \<^sub>R g x" unfolding uv norm_scaleR
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4746	unfolding abs_of_nonneg[OF content_pos_le] real_scaleR_def
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4747	apply(rule mult_left_mono) using goal1(3) as by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4748	qed(insert p[unfolded fine_inter],auto) qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4749
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4750	{ presume "\<And>e. 0 < e \<Longrightarrow> norm (integral s f) < integral s g + e"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4751	thus ?thesis apply-apply(rule *[rule_format]) by auto }
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4752	fix e::real assume "e>0" hence e:"e/2 > 0" by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4753	note assms(1)[unfolded integrable_alt[of f]] note f=this[THEN conjunct1,rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4754	note assms(2)[unfolded integrable_alt[of g]] note g=this[THEN conjunct1,rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4755	from integrable_integral[OF assms(1),unfolded has_integral'[of f],rule_format,OF e]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4756	guess B1 .. note B1=conjunctD2[OF this[rule_format],rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4757	from integrable_integral[OF assms(2),unfolded has_integral'[of g],rule_format,OF e]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4758	guess B2 .. note B2=conjunctD2[OF this[rule_format],rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4759	from bounded_subset_closed_interval[OF bounded_ball, of "0::real^'n" "max B1 B2"]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4760	guess a b apply-by(erule exE)+ note ab=this[unfolded ball_max_Un]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4761
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4762	have "ball 0 B1 \<subseteq> {a..b}" using ab by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4763	from B1(2)[OF this] guess z .. note z=conjunctD2[OF this]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4764	have "ball 0 B2 \<subseteq> {a..b}" using ab by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4765	from B2(2)[OF this] guess w .. note w=conjunctD2[OF this]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4766
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4767	show "norm (integral s f) < integral s g + e" apply(rule norm)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4768	apply(rule lem[OF f g, of a b]) unfolding integral_unique[OF z(1)] integral_unique[OF w(1)]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4769	defer apply(rule w(2)[unfolded real_norm_def],rule z(2))
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4770	apply safe apply(case_tac "x\<in>s") unfolding if_P apply(rule assms(3)[rule_format]) by auto qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4771
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4772	lemma integral_norm_bound_integral_component: fixes f::"real^'n \<Rightarrow> 'a::banach"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4773	assumes "f integrable_on s" "g integrable_on s" "\<forall>x\<in>s. norm(f x) \<le> (g x)$k"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4774	shows "norm(integral s f) \<le> (integral s g)$k"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4775	proof- have "norm (integral s f) \<le> integral s ((\<lambda>x. x $ k) o g)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4776	apply(rule integral_norm_bound_integral[OF assms(1)])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4777	apply(rule integrable_linear[OF assms(2)],rule)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4778	unfolding o_def by(rule assms)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4779	thus ?thesis unfolding o_def integral_component_eq[OF assms(2)] . qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4780
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4781	lemma has_integral_norm_bound_integral_component: fixes f::"real^'n \<Rightarrow> 'a::banach"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4782	assumes "(f has_integral i) s" "(g has_integral j) s" "\<forall>x\<in>s. norm(f x) \<le> (g x)$k"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4783	shows "norm(i) \<le> j$k" using integral_norm_bound_integral_component[of f s g k]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4784	unfolding integral_unique[OF assms(1)] integral_unique[OF assms(2)]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4785	using assms by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4786
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4787	lemma absolutely_integrable_le: fixes f::"real^'n \<Rightarrow> 'a::banach"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4788	assumes "f absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4789	shows "norm(integral s f) \<le> integral s (\<lambda>x. norm(f x))"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4790	apply(rule integral_norm_bound_integral) using assms by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4791
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4792	lemma absolutely_integrable_0[intro]: "(\<lambda>x. 0) absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4793	unfolding absolutely_integrable_on_def by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4794
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4795	lemma absolutely_integrable_cmul[intro]:
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4796	"f absolutely_integrable_on s \<Longrightarrow> (\<lambda>x. c *\<^sub>R f x) absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4797	unfolding absolutely_integrable_on_def using integrable_cmul[of f s c]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4798	using integrable_cmul[of "\<lambda>x. norm (f x)" s "abs c"] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4799
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4800	lemma absolutely_integrable_neg[intro]:
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4801	"f absolutely_integrable_on s \<Longrightarrow> (\<lambda>x. -f(x)) absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4802	apply(drule absolutely_integrable_cmul[where c="-1"]) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4803
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4804	lemma absolutely_integrable_norm[intro]:
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4805	"f absolutely_integrable_on s \<Longrightarrow> (\<lambda>x. norm(f x)) absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4806	unfolding absolutely_integrable_on_def by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4807
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4808	lemma absolutely_integrable_abs[intro]:
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4809	"f absolutely_integrable_on s \<Longrightarrow> (\<lambda>x. abs(f x::real)) absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4810	apply(drule absolutely_integrable_norm) unfolding real_norm_def .
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4811
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4812	lemma absolutely_integrable_on_subinterval: fixes f::"real^'n \<Rightarrow> 'a::banach" shows
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4813	"f absolutely_integrable_on s \<Longrightarrow> {a..b} \<subseteq> s \<Longrightarrow> f absolutely_integrable_on {a..b}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4814	unfolding absolutely_integrable_on_def by(meson integrable_on_subinterval)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4815
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4816	lemma absolutely_integrable_bounded_variation: fixes f::"real^'n \<Rightarrow> 'a::banach"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4817	assumes "f absolutely_integrable_on UNIV"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4818	obtains B where "\<forall>d. d division_of (\<Union>d) \<longrightarrow> setsum (\<lambda>k. norm(integral k f)) d \<le> B"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4819	apply(rule that[of "integral UNIV (\<lambda>x. norm (f x))"])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4820	proof safe case goal1 note d = division_ofD[OF this(2)]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4821	have "(\<Sum>k\<in>d. norm (integral k f)) \<le> (\<Sum>i\<in>d. integral i (\<lambda>x. norm (f x)))"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4822	apply(rule setsum_mono,rule absolutely_integrable_le) apply(drule d(4),safe)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4823	apply(rule absolutely_integrable_on_subinterval[OF assms]) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4824	also have "... \<le> integral (\<Union>d) (\<lambda>x. norm (f x))"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4825	apply(subst integral_combine_division_topdown[OF _ goal1(2)])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4826	using integrable_on_subdivision[OF goal1(2)] using assms by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4827	also have "... \<le> integral UNIV (\<lambda>x. norm (f x))"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4828	apply(rule integral_subset_le)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4829	using integrable_on_subdivision[OF goal1(2)] using assms by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4830	finally show ?case . qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4831
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4832	lemma helplemma:
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4833	assumes "setsum (\<lambda>x. norm(f x - g x)) s < e" "finite s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4834	shows "abs(setsum (\<lambda>x. norm(f x)) s - setsum (\<lambda>x. norm(g x)) s) < e"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4835	unfolding setsum_subtractf[THEN sym] apply(rule le_less_trans[OF setsum_abs])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4836	apply(rule le_less_trans[OF _ assms(1)]) apply(rule setsum_mono)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4837	using norm_triangle_ineq3 .
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4838
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4839	lemma bounded_variation_absolutely_integrable_interval:
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4840	fixes f::"real^'n \<Rightarrow> real^'m" assumes "f integrable_on {a..b}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4841	"\<forall>d. d division_of {a..b} \<longrightarrow> setsum (\<lambda>k. norm(integral k f)) d \<le> B"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4842	shows "f absolutely_integrable_on {a..b}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4843	proof- let ?S = "(\<lambda>d. setsum (\<lambda>k. norm(integral k f)) d) ` {d. d division_of {a..b} }" def i \<equiv> "Sup ?S"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4844	have i:"isLub UNIV ?S i" unfolding i_def apply(rule Sup)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4845	apply(rule elementary_interval) defer apply(rule_tac x=B in exI)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4846	apply(rule setleI) using assms(2) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4847	show ?thesis apply(rule,rule assms) apply rule apply(subst has_integral[of _ i])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4848	proof safe case goal1 hence "i - e / 2 \<notin> Collect (isUb UNIV (setsum (\<lambda>k. norm (integral k f)) `
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4849	{d. d division_of {a..b}}))" using isLub_ubs[OF i,rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4850	unfolding setge_def ubs_def by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4851	hence " \<exists>y. y division_of {a..b} \<and> i - e / 2 < (\<Sum>k\<in>y. norm (integral k f))"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4852	unfolding mem_Collect_eq isUb_def setle_def by simp then guess d .. note d=conjunctD2[OF this]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4853	note d' = division_ofD[OF this(1)]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4854
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4855	have "\<forall>x. \<exists>e>0. \<forall>i\<in>d. x \<notin> i \<longrightarrow> ball x e \<inter> i = {}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4856	proof case goal1 have "\<exists>da>0. \<forall>xa\<in>\<Union>{i \<in> d. x \<notin> i}. da \<le> dist x xa"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4857	apply(rule separate_point_closed) apply(rule closed_Union)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4858	apply(rule finite_subset[OF _ d'(1)]) apply safe apply(drule d'(4)) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4859	thus ?case apply safe apply(rule_tac x=da in exI,safe)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4860	apply(erule_tac x=xa in ballE) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4861	qed from choice[OF this] guess k .. note k=conjunctD2[OF this[rule_format],rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4862
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4863	have "e/2 > 0" using goal1 by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4864	from henstock_lemma[OF assms(1) this] guess g . note g=this[rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4865	let ?g = "\<lambda>x. g x \<inter> ball x (k x)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4866	show ?case apply(rule_tac x="?g" in exI) apply safe
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4867	proof- show "gauge ?g" using g(1) unfolding gauge_def using k(1) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4868	fix p assume "p tagged_division_of {a..b}" "?g fine p"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4869	note p = this(1) conjunctD2[OF this(2)[unfolded fine_inter]]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4870	note p' = tagged_division_ofD[OF p(1)]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4871	def p' \<equiv> "{(x,k) \| x k. \<exists>i l. x \<in> i \<and> i \<in> d \<and> (x,l) \<in> p \<and> k = i \<inter> l}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4872	have gp':"g fine p'" using p(2) unfolding p'_def fine_def by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4873	have p'':"p' tagged_division_of {a..b}" apply(rule tagged_division_ofI)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4874	proof- show "finite p'" apply(rule finite_subset[of _ "(\<lambda>(k,(x,l)). (x,k \<inter> l))
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4875	` {(k,xl) \| k xl. k \<in> d \<and> xl \<in> p}"]) unfolding p'_def
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4876	defer apply(rule finite_imageI,rule finite_product_dependent[OF d'(1) p'(1)])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4877	apply safe unfolding image_iff apply(rule_tac x="(i,x,l)" in bexI) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4878	fix x k assume "(x,k)\<in>p'"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4879	hence "\<exists>i l. x \<in> i \<and> i \<in> d \<and> (x, l) \<in> p \<and> k = i \<inter> l" unfolding p'_def by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4880	then guess i l apply-by(erule exE)+ note il=conjunctD4[OF this]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4881	show "x\<in>k" "k\<subseteq>{a..b}" using p'(2-3)[OF il(3)] il by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4882	show "\<exists>a b. k = {a..b}" unfolding il using p'(4)[OF il(3)] d'(4)[OF il(2)]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4883	apply safe unfolding inter_interval by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4884	next fix x1 k1 assume "(x1,k1)\<in>p'"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4885	hence "\<exists>i l. x1 \<in> i \<and> i \<in> d \<and> (x1, l) \<in> p \<and> k1 = i \<inter> l" unfolding p'_def by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4886	then guess i1 l1 apply-by(erule exE)+ note il1=conjunctD4[OF this]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4887	fix x2 k2 assume "(x2,k2)\<in>p'"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4888	hence "\<exists>i l. x2 \<in> i \<and> i \<in> d \<and> (x2, l) \<in> p \<and> k2 = i \<inter> l" unfolding p'_def by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4889	then guess i2 l2 apply-by(erule exE)+ note il2=conjunctD4[OF this]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4890	assume "(x1, k1) \<noteq> (x2, k2)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4891	hence "interior(i1) \<inter> interior(i2) = {} \<or> interior(l1) \<inter> interior(l2) = {}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4892	using d'(5)[OF il1(2) il2(2)] p'(5)[OF il1(3) il2(3)] unfolding il1 il2 by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4893	thus "interior k1 \<inter> interior k2 = {}" unfolding il1 il2 by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4894	next have *:"\<forall>(x, X) \<in> p'. X \<subseteq> {a..b}" unfolding p'_def using d' by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4895	show "\<Union>{k. \<exists>x. (x, k) \<in> p'} = {a..b}" apply rule apply(rule Union_least)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4896	unfolding mem_Collect_eq apply(erule exE) apply(drule *[rule_format]) apply safe
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4897	proof- fix y assume y:"y\<in>{a..b}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4898	hence "\<exists>x l. (x, l) \<in> p \<and> y\<in>l" unfolding p'(6)[THEN sym] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4899	then guess x l apply-by(erule exE)+ note xl=conjunctD2[OF this]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4900	hence "\<exists>k. k\<in>d \<and> y\<in>k" using y unfolding d'(6)[THEN sym] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4901	then guess i .. note i = conjunctD2[OF this]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4902	have "x\<in>i" using fineD[OF p(3) xl(1)] using k(2)[OF i(1), of x] using i(2) xl(2) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4903	thus "y\<in>\<Union>{k. \<exists>x. (x, k) \<in> p'}" unfolding p'_def Union_iff apply(rule_tac x="i \<inter> l" in bexI)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4904	defer unfolding mem_Collect_eq apply(rule_tac x=x in exI)+ apply(rule_tac x="i\<inter>l" in exI)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4905	apply safe apply(rule_tac x=i in exI) apply(rule_tac x=l in exI) using i xl by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4906	qed qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4907
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4908	hence "(\<Sum>(x, k)\<in>p'. norm (content k *\<^sub>R f x - integral k f)) < e / 2"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4909	apply-apply(rule g(2)[rule_format]) unfolding tagged_division_of_def apply safe using gp' .
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4910	hence *:" \<bar>(\<Sum>(x,k)\<in>p'. norm (content k \<^sub>R f x)) - (\<Sum>(x,k)\<in>p'. norm (integral k f))\<bar> < e / 2"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4911	unfolding split_def apply(rule helplemma) using p'' by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4912
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4913	have p'alt:"p' = {(x,(i \<inter> l)) \| x i l. (x,l) \<in> p \<and> i \<in> d \<and> ~(i \<inter> l = {})}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4914	proof safe case goal2
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4915	have "x\<in>i" using fineD[OF p(3) goal2(1)] k(2)[OF goal2(2), of x] goal2(4-) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4916	hence "(x, i \<inter> l) \<in> p'" unfolding p'_def apply safe
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4917	apply(rule_tac x=x in exI,rule_tac x="i\<inter>l" in exI) apply safe using goal2 by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4918	thus ?case using goal2(3) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4919	next fix x k assume "(x,k)\<in>p'"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4920	hence "\<exists>i l. x \<in> i \<and> i \<in> d \<and> (x, l) \<in> p \<and> k = i \<inter> l" unfolding p'_def by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4921	then guess i l apply-by(erule exE)+ note il=conjunctD4[OF this]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4922	thus "\<exists>y i l. (x, k) = (y, i \<inter> l) \<and> (y, l) \<in> p \<and> i \<in> d \<and> i \<inter> l \<noteq> {}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4923	apply(rule_tac x=x in exI,rule_tac x=i in exI,rule_tac x=l in exI)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4924	using p'(2)[OF il(3)] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4925	qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4926	have sum_p':"(\<Sum>(x, k)\<in>p'. norm (integral k f)) = (\<Sum>k\<in>snd ` p'. norm (integral k f))"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4927	apply(subst setsum_over_tagged_division_lemma[OF p'',of "\<lambda>k. norm (integral k f)"])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4928	unfolding norm_eq_zero apply(rule integral_null,assumption) ..
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4929	note snd_p = division_ofD[OF division_of_tagged_division[OF p(1)]]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4930
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4931	have *:"\<And>sni sni' sf sf'. abs(sf' - sni') < e / 2 \<longrightarrow> i - e / 2 < sni \<and> sni' \<le> i \<and>
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4932	sni \<le> sni' \<and> sf' = sf \<longrightarrow> abs(sf - i) < e" by arith
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4933	show "norm ((\<Sum>(x, k)\<in>p. content k *\<^sub>R norm (f x)) - i) < e"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4934	unfolding real_norm_def apply(rule [rule_format,OF *],safe) apply(rule d(2))
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4935	proof- case goal1 show ?case unfolding sum_p'
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4936	apply(rule isLubD2[OF i]) using division_of_tagged_division[OF p''] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4937	next case goal2 have *:"{k \<inter> l \| k l. k \<in> d \<and> l \<in> snd ` p} =
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4938	(\<lambda>(k,l). k \<inter> l) ` {(k,l)\|k l. k \<in> d \<and> l \<in> snd ` p}" by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4939	have "(\<Sum>k\<in>d. norm (integral k f)) \<le> (\<Sum>i\<in>d. \<Sum>l\<in>snd ` p. norm (integral (i \<inter> l) f))"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4940	proof(rule setsum_mono) case goal1 note k=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4941	from d'(4)[OF this] guess u v apply-by(erule exE)+ note uv=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4942	def d' \<equiv> "{{u..v} \<inter> l \|l. l \<in> snd ` p \<and> ~({u..v} \<inter> l = {})}" note uvab = d'(2)[OF k[unfolded uv]]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4943	have "d' division_of {u..v}" apply(subst d'_def) apply(rule division_inter_1)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4944	apply(rule division_of_tagged_division[OF p(1)]) using uvab .
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4945	hence "norm (integral k f) \<le> setsum (\<lambda>k. norm (integral k f)) d'"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4946	unfolding uv apply(subst integral_combine_division_topdown[of _ _ d'])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4947	apply(rule integrable_on_subinterval[OF assms(1) uvab]) apply assumption
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4948	apply(rule setsum_norm_le) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4949	also have "... = (\<Sum>k\<in>{k \<inter> l \|l. l \<in> snd ` p}. norm (integral k f))"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4950	apply(rule setsum_mono_zero_left) apply(subst simple_image)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4951	apply(rule finite_imageI)+ apply fact unfolding d'_def uv apply blast
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4952	proof case goal1 hence "i \<in> {{u..v} \<inter> l \|l. l \<in> snd ` p}" by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4953	from this[unfolded mem_Collect_eq] guess l .. note l=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4954	hence "{u..v} \<inter> l = {}" using goal1 by auto thus ?case using l by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4955	qed also have "... = (\<Sum>l\<in>snd ` p. norm (integral (k \<inter> l) f))" unfolding simple_image
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4956	apply(rule setsum_reindex_nonzero[unfolded o_def])apply(rule finite_imageI,rule p')
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4957	proof- case goal1 have "interior (k \<inter> l) \<subseteq> interior (l \<inter> y)" apply(subst(2) interior_inter)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4958	apply(rule Int_greatest) defer apply(subst goal1(4)) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4959	hence *:"interior (k \<inter> l) = {}" using snd_p(5)[OF goal1(1-3)] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4960	from d'(4)[OF k] snd_p(4)[OF goal1(1)] guess u1 v1 u2 v2 apply-by(erule exE)+ note uv=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4961	show ?case using * unfolding uv inter_interval content_eq_0_interior[THEN sym] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4962	qed finally show ?case .
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4963	qed also have "... = (\<Sum>(i,l)\<in>{(i, l) \|i l. i \<in> d \<and> l \<in> snd ` p}. norm (integral (i\<inter>l) f))"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4964	apply(subst sum_sum_product[THEN sym],fact) using p'(1) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4965	also have "... = (\<Sum>x\<in>{(i, l) \|i l. i \<in> d \<and> l \<in> snd ` p}. norm (integral (split op \<inter> x) f))"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4966	unfolding split_def ..
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4967	also have "... = (\<Sum>k\<in>{i \<inter> l \|i l. i \<in> d \<and> l \<in> snd ` p}. norm (integral k f))"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4968	unfolding * apply(rule setsum_reindex_nonzero[THEN sym,unfolded o_def])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4969	apply(rule finite_product_dependent) apply(fact,rule finite_imageI,rule p')
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4970	unfolding split_paired_all mem_Collect_eq split_conv o_def
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4971	proof- note * = division_ofD(4,5)[OF division_of_tagged_division,OF p(1)]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4972	fix l1 l2 k1 k2 assume as:"(l1, k1) \<noteq> (l2, k2)" "l1 \<inter> k1 = l2 \<inter> k2"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4973	"\<exists>i l. (l1, k1) = (i, l) \<and> i \<in> d \<and> l \<in> snd ` p"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4974	"\<exists>i l. (l2, k2) = (i, l) \<and> i \<in> d \<and> l \<in> snd ` p"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4975	hence "l1 \<in> d" "k1 \<in> snd ` p" by auto from d'(4)[OF this(1)] *(1)[OF this(2)]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4976	guess u1 v1 u2 v2 apply-by(erule exE)+ note uv=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4977	have "l1 \<noteq> l2 \<or> k1 \<noteq> k2" using as by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4978	hence "(interior(k1) \<inter> interior(k2) = {} \<or> interior(l1) \<inter> interior(l2) = {})" apply-
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4979	apply(erule disjE) apply(rule disjI2) apply(rule d'(5)) prefer 4 apply(rule disjI1)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4980	apply(rule *) using as by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4981	moreover have "interior(l1 \<inter> k1) = interior(l2 \<inter> k2)" using as(2) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4982	ultimately have "interior(l1 \<inter> k1) = {}" by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4983	thus "norm (integral (l1 \<inter> k1) f) = 0" unfolding uv inter_interval
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4984	unfolding content_eq_0_interior[THEN sym] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4985	qed also have "... = (\<Sum>(x, k)\<in>p'. norm (integral k f))" unfolding sum_p'
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4986	apply(rule setsum_mono_zero_right) apply(subst *)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4987	apply(rule finite_imageI[OF finite_product_dependent]) apply fact
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4988	apply(rule finite_imageI[OF p'(1)]) apply safe
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4989	proof- case goal2 have "ia \<inter> b = {}" using goal2 unfolding p'alt image_iff Bex_def not_ex
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4990	apply(erule_tac x="(a,ia\<inter>b)" in allE) by auto thus ?case by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4991	next case goal1 thus ?case unfolding p'_def apply safe
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4992	apply(rule_tac x=i in exI,rule_tac x=l in exI) unfolding snd_conv image_iff
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4993	apply safe apply(rule_tac x="(a,l)" in bexI) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4994	qed finally show ?case .
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4995
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4996	next case goal3
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4997	let ?S = "{(x, i \<inter> l) \|x i l. (x, l) \<in> p \<and> i \<in> d}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4998	have Sigma_alt:"\<And>s t. s \<times> t = {(i, j) \|i j. i \<in> s \<and> j \<in> t}" by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	4999	have :"?S = (\<lambda>(xl,i). (fst xl, snd xl \<inter> i)) ` (p \<times> d)" ({(xl,i)\|xl i. xl\<in>p \<and> i\<in>d}"**)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5000	apply safe unfolding image_iff apply(rule_tac x="((x,l),i)" in bexI) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5001	note pdfin = finite_cartesian_product[OF p'(1) d'(1)]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5002	have "(\<Sum>(x, k)\<in>p'. norm (content k \<^sub>R f x)) = (\<Sum>(x, k)\<in>?S. \<bar>content k\<bar> norm (f x))"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5003	unfolding norm_scaleR apply(rule setsum_mono_zero_left)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5004	apply(subst *, rule finite_imageI) apply fact unfolding p'alt apply blast
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5005	apply safe apply(rule_tac x=x in exI,rule_tac x=i in exI,rule_tac x=l in exI) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5006	also have "... = (\<Sum>((x,l),i)\<in>p \<times> d. \<bar>content (l \<inter> i)\<bar> * norm (f x))" unfolding *
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5007	apply(subst setsum_reindex_nonzero,fact) unfolding split_paired_all
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5008	unfolding o_def split_def snd_conv fst_conv mem_Sigma_iff Pair_eq apply(erule_tac conjE)+
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5009	proof- fix x1 l1 k1 x2 l2 k2 assume as:"(x1,l1)\<in>p" "(x2,l2)\<in>p" "k1\<in>d" "k2\<in>d"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5010	"x1 = x2" "l1 \<inter> k1 = l2 \<inter> k2" "\<not> ((x1 = x2 \<and> l1 = l2) \<and> k1 = k2)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5011	from d'(4)[OF as(3)] p'(4)[OF as(1)] guess u1 v1 u2 v2 apply-by(erule exE)+ note uv=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5012	from as have "l1 \<noteq> l2 \<or> k1 \<noteq> k2" by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5013	hence "(interior(k1) \<inter> interior(k2) = {} \<or> interior(l1) \<inter> interior(l2) = {})"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5014	apply-apply(erule disjE) apply(rule disjI2) defer apply(rule disjI1)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5015	apply(rule d'(5)[OF as(3-4)],assumption) apply(rule p'(5)[OF as(1-2)]) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5016	moreover have "interior(l1 \<inter> k1) = interior(l2 \<inter> k2)" unfolding as ..
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5017	ultimately have "interior (l1 \<inter> k1) = {}" by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5018	thus "\<bar>content (l1 \<inter> k1)\<bar> * norm (f x1) = 0" unfolding uv inter_interval
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5019	unfolding content_eq_0_interior[THEN sym] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5020	qed safe also have "... = (\<Sum>(x, k)\<in>p. content k *\<^sub>R norm (f x))" unfolding Sigma_alt
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5021	apply(subst sum_sum_product[THEN sym]) apply(rule p', rule,rule d')
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5022	apply(rule setsum_cong2) unfolding split_paired_all split_conv
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5023	proof- fix x l assume as:"(x,l)\<in>p"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5024	note xl = p'(2-4)[OF this] from this(3) guess u v apply-by(erule exE)+ note uv=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5025	have "(\<Sum>i\<in>d. \<bar>content (l \<inter> i)\<bar>) = (\<Sum>k\<in>d. content (k \<inter> {u..v}))"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5026	apply(rule setsum_cong2) apply(drule d'(4),safe) apply(subst Int_commute)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5027	unfolding inter_interval uv apply(subst abs_of_nonneg) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5028	also have "... = setsum content {k\<inter>{u..v}\| k. k\<in>d}" unfolding simple_image
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5029	apply(rule setsum_reindex_nonzero[unfolded o_def,THEN sym]) apply(rule d')
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5030	proof- case goal1 from d'(4)[OF this(1)] d'(4)[OF this(2)]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5031	guess u1 v1 u2 v2 apply- by(erule exE)+ note uv=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5032	have "{} = interior ((k \<inter> y) \<inter> {u..v})" apply(subst interior_inter)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5033	using d'(5)[OF goal1(1-3)] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5034	also have "... = interior (y \<inter> (k \<inter> {u..v}))" by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5035	also have "... = interior (k \<inter> {u..v})" unfolding goal1(4) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5036	finally show ?case unfolding uv inter_interval content_eq_0_interior ..
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5037	qed also have "... = setsum content {{u..v} \<inter> k \|k. k \<in> d \<and> ~({u..v} \<inter> k = {})}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5038	apply(rule setsum_mono_zero_right) unfolding simple_image
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5039	apply(rule finite_imageI,rule d') apply blast apply safe
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5040	apply(rule_tac x=k in exI)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5041	proof- case goal1 from d'(4)[OF this(1)] guess a b apply-by(erule exE)+ note ab=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5042	have "interior (k \<inter> {u..v}) \<noteq> {}" using goal1(2)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5043	unfolding ab inter_interval content_eq_0_interior by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5044	thus ?case using goal1(1) using interior_subset[of "k \<inter> {u..v}"] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5045	qed finally show "(\<Sum>i\<in>d. \<bar>content (l \<inter> i)\<bar> * norm (f x)) = content l *\<^sub>R norm (f x)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5046	unfolding setsum_left_distrib[THEN sym] real_scaleR_def apply -
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5047	apply(subst(asm) additive_content_division[OF division_inter_1[OF d(1)]])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5048	using xl(2)[unfolded uv] unfolding uv by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5049	qed finally show ?case .
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5050	qed qed qed qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5051
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5052	lemma bounded_variation_absolutely_integrable: fixes f::"real^'n \<Rightarrow> real^'m"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5053	assumes "f integrable_on UNIV" "\<forall>d. d division_of (\<Union>d) \<longrightarrow> setsum (\<lambda>k. norm(integral k f)) d \<le> B"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5054	shows "f absolutely_integrable_on UNIV"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5055	proof(rule absolutely_integrable_onI,fact,rule)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5056	let ?S = "(\<lambda>d. setsum (\<lambda>k. norm(integral k f)) d) ` {d. d division_of (\<Union>d)}" def i \<equiv> "Sup ?S"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5057	have i:"isLub UNIV ?S i" unfolding i_def apply(rule Sup)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5058	apply(rule elementary_interval) defer apply(rule_tac x=B in exI)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5059	apply(rule setleI) using assms(2) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5060	have f_int:"\<And>a b. f absolutely_integrable_on {a..b}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5061	apply(rule bounded_variation_absolutely_integrable_interval[where B=B])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5062	apply(rule integrable_on_subinterval[OF assms(1)]) defer apply safe
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5063	apply(rule assms(2)[rule_format]) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5064	show "((\<lambda>x. norm (f x)) has_integral i) UNIV" apply(subst has_integral_alt',safe)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5065	proof- case goal1 show ?case using f_int[of a b] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5066	next case goal2 have "\<exists>y\<in>setsum (\<lambda>k. norm (integral k f)) ` {d. d division_of \<Union>d}. \<not> y \<le> i - e"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5067	proof(rule ccontr) case goal1 hence "i \<le> i - e" apply-
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5068	apply(rule isLub_le_isUb[OF i]) apply(rule isUbI) unfolding setle_def by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5069	thus False using goal2 by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5070	qed then guess K .. note * = this[unfolded image_iff not_le]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5071	from this(1) guess d .. note this[unfolded mem_Collect_eq]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5072	note d = this(1) *(2)[unfolded this(2)] note d'=division_ofD[OF this(1)]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5073	have "bounded (\<Union>d)" by(rule elementary_bounded,fact)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5074	from this[unfolded bounded_pos] guess K .. note K=conjunctD2[OF this]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5075	show ?case apply(rule_tac x="K + 1" in exI,safe)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5076	proof- fix a b assume ab:"ball 0 (K + 1) \<subseteq> {a..b::real^'n}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5077	have *:"\<forall>s s1. i - e < s1 \<and> s1 \<le> s \<and> s < i + e \<longrightarrow> abs(s - i) < (e::real)" by arith
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5078	show "norm (integral {a..b} (\<lambda>x. if x \<in> UNIV then norm (f x) else 0) - i) < e"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5079	unfolding real_norm_def apply(rule *[rule_format],safe) apply(rule d(2))
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5080	proof- case goal1 have "(\<Sum>k\<in>d. norm (integral k f)) \<le> setsum (\<lambda>k. integral k (\<lambda>x. norm (f x))) d"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5081	apply(rule setsum_mono) apply(rule absolutely_integrable_le)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5082	apply(drule d'(4),safe) by(rule f_int)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5083	also have "... = integral (\<Union>d) (\<lambda>x. norm(f x))"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5084	apply(rule integral_combine_division_bottomup[THEN sym])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5085	apply(rule d) unfolding forall_in_division[OF d(1)] using f_int by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5086	also have "... \<le> integral {a..b} (\<lambda>x. if x \<in> UNIV then norm (f x) else 0)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5087	proof- case goal1 have "\<Union>d \<subseteq> {a..b}" apply rule apply(drule K(2)[rule_format])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5088	apply(rule ab[unfolded subset_eq,rule_format]) by(auto simp add:dist_norm)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5089	thus ?case apply- apply(subst if_P,rule) apply(rule integral_subset_le) defer
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5090	apply(rule integrable_on_subdivision[of _ _ _ "{a..b}"])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5091	apply(rule d) using f_int[of a b] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5092	qed finally show ?case .
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5093
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5094	next note f = absolutely_integrable_onD[OF f_int[of a b]]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5095	note * = this(2)[unfolded has_integral_integral has_integral[of "\<lambda>x. norm (f x)"],rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5096	have "e/2>0" using `e>0` by auto from *[OF this] guess d1 .. note d1=conjunctD2[OF this]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5097	from henstock_lemma[OF f(1) `e/2>0`] guess d2 . note d2=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5098	from fine_division_exists[OF gauge_inter[OF d1(1) d2(1)], of a b] guess p .
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5099	note p=this(1) conjunctD2[OF this(2)[unfolded fine_inter]]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5100	have *:"\<And>sf sf' si di. sf' = sf \<longrightarrow> si \<le> i \<longrightarrow> abs(sf - si) < e / 2
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5101	\<longrightarrow> abs(sf' - di) < e / 2 \<longrightarrow> di < i + e" by arith
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5102	show "integral {a..b} (\<lambda>x. if x \<in> UNIV then norm (f x) else 0) < i + e" apply(subst if_P,rule)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5103	proof(rule *[rule_format])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5104	show "\<bar>(\<Sum>(x,k)\<in>p. norm (content k *\<^sub>R f x)) - (\<Sum>(x,k)\<in>p. norm (integral k f))\<bar> < e / 2"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5105	unfolding split_def apply(rule helplemma) using d2(2)[rule_format,of p]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5106	using p(1,3) unfolding tagged_division_of_def split_def by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5107	show "abs ((\<Sum>(x, k)\<in>p. content k *\<^sub>R norm (f x)) - integral {a..b} (\<lambda>x. norm(f x))) < e / 2"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5108	using d1(2)[rule_format,OF conjI[OF p(1,2)]] unfolding real_norm_def .
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5109	show "(\<Sum>(x, k)\<in>p. content k \<^sub>R norm (f x)) = (\<Sum>(x, k)\<in>p. norm (content k \<^sub>R f x))"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5110	apply(rule setsum_cong2) unfolding split_paired_all split_conv
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5111	apply(drule tagged_division_ofD(4)[OF p(1)]) unfolding norm_scaleR
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5112	apply(subst abs_of_nonneg) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5113	show "(\<Sum>(x, k)\<in>p. norm (integral k f)) \<le> i"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5114	apply(subst setsum_over_tagged_division_lemma[OF p(1)]) defer apply(rule isLubD2[OF i])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5115	unfolding image_iff apply(rule_tac x="snd ` p" in bexI) unfolding mem_Collect_eq defer
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5116	apply(rule partial_division_of_tagged_division[of _ "{a..b}"])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5117	using p(1) unfolding tagged_division_of_def by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5118	qed qed qed(insert K,auto) qed qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5119
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5120	lemma absolutely_integrable_restrict_univ:
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5121	"(\<lambda>x. if x \<in> s then f x else (0::'a::banach)) absolutely_integrable_on UNIV \<longleftrightarrow> f absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5122	unfolding absolutely_integrable_on_def if_distrib norm_zero integrable_restrict_univ ..
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5123
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5124	lemma absolutely_integrable_add[intro]: fixes f g::"real^'n \<Rightarrow> real^'m"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5125	assumes "f absolutely_integrable_on s" "g absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5126	shows "(\<lambda>x. f(x) + g(x)) absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5127	proof- let ?P = "\<And>f g::real^'n \<Rightarrow> real^'m. f absolutely_integrable_on UNIV \<Longrightarrow>
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5128	g absolutely_integrable_on UNIV \<Longrightarrow> (\<lambda>x. f(x) + g(x)) absolutely_integrable_on UNIV"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5129	{ presume as:"PROP ?P" note a = absolutely_integrable_restrict_univ[THEN sym]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5130	have *:"\<And>x. (if x \<in> s then f x else 0) + (if x \<in> s then g x else 0)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5131	= (if x \<in> s then f x + g x else 0)" by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5132	show ?thesis apply(subst a) using as[OF assms[unfolded a[of f] a[of g]]] unfolding * . }
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5133	fix f g::"real^'n \<Rightarrow> real^'m" assume assms:"f absolutely_integrable_on UNIV"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5134	"g absolutely_integrable_on UNIV"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5135	note absolutely_integrable_bounded_variation
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5136	from this[OF assms(1)] this[OF assms(2)] guess B1 B2 . note B=this[rule_format]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5137	show "(\<lambda>x. f(x) + g(x)) absolutely_integrable_on UNIV"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5138	apply(rule bounded_variation_absolutely_integrable[of _ "B1+B2"])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5139	apply(rule integrable_add) prefer 3
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5140	proof safe case goal1 have "\<And>k. k \<in> d \<Longrightarrow> f integrable_on k \<and> g integrable_on k"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5141	apply(drule division_ofD(4)[OF goal1]) apply safe
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5142	apply(rule_tac[!] integrable_on_subinterval[of _ UNIV]) using assms by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5143	hence "(\<Sum>k\<in>d. norm (integral k (\<lambda>x. f x + g x))) \<le>
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5144	(\<Sum>k\<in>d. norm (integral k f)) + (\<Sum>k\<in>d. norm (integral k g))" apply-
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5145	unfolding setsum_addf[THEN sym] apply(rule setsum_mono)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5146	apply(subst integral_add) prefer 3 apply(rule norm_triangle_ineq) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5147	also have "... \<le> B1 + B2" using B(1)[OF goal1] B(2)[OF goal1] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5148	finally show ?case .
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5149	qed(insert assms,auto) qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5150
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5151	lemma absolutely_integrable_sub[intro]: fixes f g::"real^'n \<Rightarrow> real^'m"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5152	assumes "f absolutely_integrable_on s" "g absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5153	shows "(\<lambda>x. f(x) - g(x)) absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5154	using absolutely_integrable_add[OF assms(1) absolutely_integrable_neg[OF assms(2)]]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5155	unfolding group_simps .
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5156
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5157	lemma absolutely_integrable_linear: fixes f::"real^'m \<Rightarrow> real^'n" and h::"real^'n \<Rightarrow> real^'p"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5158	assumes "f absolutely_integrable_on s" "bounded_linear h"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5159	shows "(h o f) absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5160	proof- { presume as:"\<And>f::real^'m \<Rightarrow> real^'n. \<And>h::real^'n \<Rightarrow> real^'p.
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5161	f absolutely_integrable_on UNIV \<Longrightarrow> bounded_linear h \<Longrightarrow>
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5162	(h o f) absolutely_integrable_on UNIV" note a = absolutely_integrable_restrict_univ[THEN sym]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5163	show ?thesis apply(subst a) using as[OF assms[unfolded a[of f] a[of g]]]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5164	unfolding o_def if_distrib linear_simps[OF assms(2)] . }
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5165	fix f::"real^'m \<Rightarrow> real^'n" and h::"real^'n \<Rightarrow> real^'p"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5166	assume assms:"f absolutely_integrable_on UNIV" "bounded_linear h"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5167	from absolutely_integrable_bounded_variation[OF assms(1)] guess B . note B=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5168	from bounded_linear.pos_bounded[OF assms(2)] guess b .. note b=conjunctD2[OF this]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5169	show "(h o f) absolutely_integrable_on UNIV"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5170	apply(rule bounded_variation_absolutely_integrable[of _ "B * b"])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5171	apply(rule integrable_linear[OF _ assms(2)])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5172	proof safe case goal2
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5173	have "(\<Sum>k\<in>d. norm (integral k (h \<circ> f))) \<le> setsum (\<lambda>k. norm(integral k f)) d * b"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5174	unfolding setsum_left_distrib apply(rule setsum_mono)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5175	proof- case goal1 from division_ofD(4)[OF goal2 this]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5176	guess u v apply-by(erule exE)+ note uv=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5177	have *:"f integrable_on k" unfolding uv apply(rule integrable_on_subinterval[of _ UNIV])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5178	using assms by auto note this[unfolded has_integral_integral]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5179	note has_integral_linear[OF this assms(2)] integrable_linear[OF * assms(2)]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5180	note * = has_integral_unique[OF this(2)[unfolded has_integral_integral] this(1)]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5181	show ?case unfolding * using b by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5182	qed also have "... \<le> B * b" apply(rule mult_right_mono) using B goal2 b by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5183	finally show ?case .
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5184	qed(insert assms,auto) qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5185
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5186	lemma absolutely_integrable_setsum: fixes f::"'a \<Rightarrow> real^'n \<Rightarrow> real^'m"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5187	assumes "finite t" "\<And>a. a \<in> t \<Longrightarrow> (f a) absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5188	shows "(\<lambda>x. setsum (\<lambda>a. f a x) t) absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5189	using assms(1,2) apply induct defer apply(subst setsum.insert) apply assumption+ by(rule,auto)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5190
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5191	lemma absolutely_integrable_vector_abs:
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5192	assumes "f absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5193	shows "(\<lambda>x. (\<chi> i. abs(f x$i))::real^'n) absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5194	proof- have *:"\<And>x. ((\<chi> i. abs(f x$i))::real^'n) = (setsum (\<lambda>i.
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5195	(((\<lambda>y. (\<chi> j. if j = i then y$1 else 0)) o
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5196	(vec1 o ((\<lambda>x. (norm((\<chi> j. if j = i then x$i else 0)::real^'n))) o f))) x)) UNIV)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5197	unfolding Cart_eq setsum_component Cart_lambda_beta
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5198	proof case goal1 have *:"\<And>i xa. ((if i = xa then f x $ xa else 0) \<bullet> (if i = xa then f x $ xa else 0)) =
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5199	(if i = xa then (f x $ xa) * (f x $ xa) else 0)" by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5200	have "\<bar>f x $ i\<bar> = (setsum (\<lambda>k. if k = i then abs ((f x)$i) else 0) UNIV)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5201	unfolding setsum_delta[OF finite_UNIV] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5202	also have "... = (\<Sum>xa\<in>UNIV. ((\<lambda>y. \<chi> j. if j = xa then dest_vec1 y else 0) \<circ>
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5203	(\<lambda>x. vec1 (norm (\<chi> j. if j = xa then x $ xa else 0))) \<circ> f) x $ i)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5204	unfolding norm_eq_sqrt_inner inner_vector_def Cart_lambda_beta o_def *
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5205	apply(rule setsum_cong2) unfolding setsum_delta[OF finite_UNIV] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5206	finally show ?case unfolding o_def . qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5207	show ?thesis unfolding * apply(rule absolutely_integrable_setsum) apply(rule finite_UNIV)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5208	apply(rule absolutely_integrable_linear)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5209	unfolding absolutely_integrable_on_trans unfolding o_def apply(rule absolutely_integrable_norm)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5210	apply(rule absolutely_integrable_linear[OF assms,unfolded o_def]) unfolding linear_linear
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5211	apply(rule_tac[!] linearI) unfolding Cart_eq by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5212	qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5213
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5214	lemma absolutely_integrable_max: fixes f::"real^'m \<Rightarrow> real^'n"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5215	assumes "f absolutely_integrable_on s" "g absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5216	shows "(\<lambda>x. (\<chi> i. max (f(x)$i) (g(x)$i))::real^'n) absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5217	proof- have :"\<And>x. (1 / 2) \<^sub>R ((\<chi> i. \<bar>(f x - g x) $ i\<bar>) + (f x + g x)) = (\<chi> i. max (f(x)$i) (g(x)$i))"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5218	unfolding Cart_eq by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5219	note absolutely_integrable_sub[OF assms] absolutely_integrable_add[OF assms]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5220	note absolutely_integrable_vector_abs[OF this(1)] this(2)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5221	note absolutely_integrable_add[OF this] note absolutely_integrable_cmul[OF this,of "1/2"]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5222	thus ?thesis unfolding * . qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5223
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5224	lemma absolutely_integrable_max_real: fixes f::"real^'m \<Rightarrow> real"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5225	assumes "f absolutely_integrable_on s" "g absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5226	shows "(\<lambda>x. max (f x) (g x)) absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5227	proof- have *:"(\<lambda>x. \<chi> i. max ((vec1 \<circ> f) x $ i) ((vec1 \<circ> g) x $ i)) = vec1 o (\<lambda>x. max (f x) (g x))"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5228	apply rule unfolding Cart_eq by auto note absolutely_integrable_max[of "vec1 o f" s "vec1 o g"]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5229	note this[unfolded absolutely_integrable_on_trans,OF assms]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5230	thus ?thesis unfolding * by auto qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5231
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5232	lemma absolutely_integrable_min: fixes f::"real^'m \<Rightarrow> real^'n"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5233	assumes "f absolutely_integrable_on s" "g absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5234	shows "(\<lambda>x. (\<chi> i. min (f(x)$i) (g(x)$i))::real^'n) absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5235	proof- have :"\<And>x. (1 / 2) \<^sub>R ((f x + g x) - (\<chi> i. \<bar>(f x - g x) $ i\<bar>)) = (\<chi> i. min (f(x)$i) (g(x)$i))"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5236	unfolding Cart_eq by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5237	note absolutely_integrable_add[OF assms] absolutely_integrable_sub[OF assms]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5238	note this(1) absolutely_integrable_vector_abs[OF this(2)]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5239	note absolutely_integrable_sub[OF this] note absolutely_integrable_cmul[OF this,of "1/2"]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5240	thus ?thesis unfolding * . qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5241
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5242	lemma absolutely_integrable_min_real: fixes f::"real^'m \<Rightarrow> real"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5243	assumes "f absolutely_integrable_on s" "g absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5244	shows "(\<lambda>x. min (f x) (g x)) absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5245	proof- have *:"(\<lambda>x. \<chi> i. min ((vec1 \<circ> f) x $ i) ((vec1 \<circ> g) x $ i)) = vec1 o (\<lambda>x. min (f x) (g x))"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5246	apply rule unfolding Cart_eq by auto note absolutely_integrable_min[of "vec1 o f" s "vec1 o g"]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5247	note this[unfolded absolutely_integrable_on_trans,OF assms]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5248	thus ?thesis unfolding * by auto qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5249
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5250	lemma absolutely_integrable_abs_eq: fixes f::"real^'n \<Rightarrow> real^'m"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5251	shows "f absolutely_integrable_on s \<longleftrightarrow> f integrable_on s \<and>
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5252	(\<lambda>x. (\<chi> i. abs(f x$i))::real^'m) integrable_on s" (is "?l = ?r")
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5253	proof assume ?l thus ?r apply-apply rule defer
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5254	apply(drule absolutely_integrable_vector_abs) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5255	next assume ?r { presume lem:"\<And>f::real^'n \<Rightarrow> real^'m. f integrable_on UNIV \<Longrightarrow>
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5256	(\<lambda>x. (\<chi> i. abs(f(x)$i))::real^'m) integrable_on UNIV \<Longrightarrow> f absolutely_integrable_on UNIV"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5257	have *:"\<And>x. (\<chi> i. \<bar>(if x \<in> s then f x else 0) $ i\<bar>) = (if x\<in>s then (\<chi> i. \<bar>f x $ i\<bar>) else 0)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5258	unfolding Cart_eq by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5259	show ?l apply(subst absolutely_integrable_restrict_univ[THEN sym]) apply(rule lem)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5260	unfolding integrable_restrict_univ * using `?r` by auto }
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5261	fix f::"real^'n \<Rightarrow> real^'m" assume assms:"f integrable_on UNIV"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5262	"(\<lambda>x. (\<chi> i. abs(f(x)$i))::real^'m) integrable_on UNIV"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5263	let ?B = "setsum (\<lambda>i. integral UNIV (\<lambda>x. (\<chi> j. abs(f x$j)) ::real^'m) $ i) UNIV"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5264	show "f absolutely_integrable_on UNIV"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5265	apply(rule bounded_variation_absolutely_integrable[OF assms(1), where B="?B"],safe)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5266	proof- case goal1 note d=this and d'=division_ofD[OF this]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5267	have "(\<Sum>k\<in>d. norm (integral k f)) \<le>
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5268	(\<Sum>k\<in>d. setsum (op $ (integral k (\<lambda>x. \<chi> j. \<bar>f x $ j\<bar>))) UNIV)" apply(rule setsum_mono)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5269	apply(rule order_trans[OF norm_le_l1],rule setsum_mono)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5270	proof- fix k and i::'m assume "k\<in>d"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5271	from d'(4)[OF this] guess a b apply-by(erule exE)+ note ab=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5272	show "\<bar>integral k f $ i\<bar> \<le> integral k (\<lambda>x. \<chi> j. \<bar>f x $ j\<bar>) $ i" apply(rule abs_leI)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5273	unfolding vector_uminus_component[THEN sym] defer apply(subst integral_neg[THEN sym])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5274	defer apply(rule_tac[1-2] integral_component_le) apply(rule integrable_neg)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5275	using integrable_on_subinterval[OF assms(1),of a b]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5276	integrable_on_subinterval[OF assms(2),of a b] unfolding ab by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5277	qed also have "... \<le> setsum (op $ (integral UNIV (\<lambda>x. \<chi> j. \<bar>f x $ j\<bar>))) UNIV"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5278	apply(subst setsum_commute,rule setsum_mono)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5279	proof- case goal1 have *:"(\<lambda>x. \<chi> j. \<bar>f x $ j\<bar>) integrable_on \<Union>d"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5280	using integrable_on_subdivision[OF d assms(2)] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5281	have "(\<Sum>i\<in>d. integral i (\<lambda>x. \<chi> j. \<bar>f x $ j\<bar>) $ j)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5282	= integral (\<Union>d) (\<lambda>x. (\<chi> j. abs(f x$j)) ::real^'m) $ j"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5283	unfolding setsum_component[THEN sym]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5284	apply(subst integral_combine_division_topdown[THEN sym,OF * d]) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5285	also have "... \<le> integral UNIV (\<lambda>x. \<chi> j. \<bar>f x $ j\<bar>) $ j"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5286	apply(rule integral_subset_component_le) using assms * by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5287	finally show ?case .
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5288	qed finally show ?case . qed qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5289
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5290	lemma nonnegative_absolutely_integrable: fixes f::"real^'n \<Rightarrow> real^'m"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5291	assumes "\<forall>x\<in>s. \<forall>i. 0 \<le> f(x)$i" "f integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5292	shows "f absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5293	unfolding absolutely_integrable_abs_eq apply rule defer
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5294	apply(rule integrable_eq[of _ f]) unfolding Cart_eq using assms by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5295
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5296	lemma absolutely_integrable_integrable_bound: fixes f::"real^'n \<Rightarrow> real^'m"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5297	assumes "\<forall>x\<in>s. norm(f x) \<le> g x" "f integrable_on s" "g integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5298	shows "f absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5299	proof- { presume *:"\<And>f::real^'n \<Rightarrow> real^'m. \<And> g. \<forall>x. norm(f x) \<le> g x \<Longrightarrow> f integrable_on UNIV
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5300	\<Longrightarrow> g integrable_on UNIV \<Longrightarrow> f absolutely_integrable_on UNIV"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5301	show ?thesis apply(subst absolutely_integrable_restrict_univ[THEN sym])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5302	apply(rule *[of _ "\<lambda>x. if x\<in>s then g x else 0"])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5303	using assms unfolding integrable_restrict_univ by auto }
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5304	fix g and f :: "real^'n \<Rightarrow> real^'m"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5305	assume assms:"\<forall>x. norm(f x) \<le> g x" "f integrable_on UNIV" "g integrable_on UNIV"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5306	show "f absolutely_integrable_on UNIV"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5307	apply(rule bounded_variation_absolutely_integrable[OF assms(2),where B="integral UNIV g"])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5308	proof safe case goal1 note d=this and d'=division_ofD[OF this]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5309	have "(\<Sum>k\<in>d. norm (integral k f)) \<le> (\<Sum>k\<in>d. integral k g)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5310	apply(rule setsum_mono) apply(rule integral_norm_bound_integral) apply(drule_tac[!] d'(4),safe)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5311	apply(rule_tac[1-2] integrable_on_subinterval) using assms by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5312	also have "... = integral (\<Union>d) g" apply(rule integral_combine_division_bottomup[THEN sym])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5313	apply(rule d,safe) apply(drule d'(4),safe)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5314	apply(rule integrable_on_subinterval[OF assms(3)]) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5315	also have "... \<le> integral UNIV g" apply(rule integral_subset_le) defer
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5316	apply(rule integrable_on_subdivision[OF d,of _ UNIV]) prefer 4
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5317	apply(rule,rule_tac y="norm (f x)" in order_trans) using assms by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5318	finally show ?case . qed qed
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5319
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5320	lemma absolutely_integrable_integrable_bound_real: fixes f::"real^'n \<Rightarrow> real"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5321	assumes "\<forall>x\<in>s. norm(f x) \<le> g x" "f integrable_on s" "g integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5322	shows "f absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5323	apply(subst absolutely_integrable_on_trans[THEN sym])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5324	apply(rule absolutely_integrable_integrable_bound[where g=g])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5325	using assms unfolding o_def by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5326
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5327	lemma absolutely_integrable_absolutely_integrable_bound:
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5328	fixes f::"real^'n \<Rightarrow> real^'m" and g::"real^'n \<Rightarrow> real^'p"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5329	assumes "\<forall>x\<in>s. norm(f x) \<le> norm(g x)" "f integrable_on s" "g absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5330	shows "f absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5331	apply(rule absolutely_integrable_integrable_bound[of s f "\<lambda>x. norm (g x)"])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5332	using assms by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5333
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5334	lemma absolutely_integrable_inf_real:
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5335	assumes "finite k" "k \<noteq> {}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5336	"\<forall>i\<in>k. (\<lambda>x. (fs x i)::real) absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5337	shows "(\<lambda>x. (Inf ((fs x) ` k))) absolutely_integrable_on s" using assms
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5338	proof induct case (insert a k) let ?P = " (\<lambda>x. if fs x ` k = {} then fs x a
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5339	else min (fs x a) (Inf (fs x ` k))) absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5340	show ?case unfolding image_insert
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5341	apply(subst Inf_insert_finite) apply(rule finite_imageI[OF insert(1)])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5342	proof(cases "k={}") case True
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5343	thus ?P apply(subst if_P) defer apply(rule insert(5)[rule_format]) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5344	next case False thus ?P apply(subst if_not_P) defer
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5345	apply(rule absolutely_integrable_min_real)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5346	defer apply(rule insert(3)[OF False]) using insert(5) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5347	qed qed auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5348
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5349	lemma absolutely_integrable_sup_real:
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5350	assumes "finite k" "k \<noteq> {}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5351	"\<forall>i\<in>k. (\<lambda>x. (fs x i)::real) absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5352	shows "(\<lambda>x. (Sup ((fs x) ` k))) absolutely_integrable_on s" using assms
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5353	proof induct case (insert a k) let ?P = " (\<lambda>x. if fs x ` k = {} then fs x a
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5354	else max (fs x a) (Sup (fs x ` k))) absolutely_integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5355	show ?case unfolding image_insert
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5356	apply(subst Sup_insert_finite) apply(rule finite_imageI[OF insert(1)])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5357	proof(cases "k={}") case True
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5358	thus ?P apply(subst if_P) defer apply(rule insert(5)[rule_format]) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5359	next case False thus ?P apply(subst if_not_P) defer
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5360	apply(rule absolutely_integrable_max_real)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5361	defer apply(rule insert(3)[OF False]) using insert(5) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5362	qed qed auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5363
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5364	subsection {* Dominated convergence. *}
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5365
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5366	lemma dominated_convergence: fixes f::"nat \<Rightarrow> real^'n \<Rightarrow> real"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5367	assumes "\<And>k. (f k) integrable_on s" "h integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5368	"\<And>k. \<forall>x \<in> s. norm(f k x) \<le> (h x)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5369	"\<forall>x \<in> s. ((\<lambda>k. f k x) ---> g x) sequentially"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5370	shows "g integrable_on s" "((\<lambda>k. integral s (f k)) ---> integral s g) sequentially"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5371	proof- have "\<And>m. (\<lambda>x. Inf {f j x \|j. m \<le> j}) integrable_on s \<and>
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5372	((\<lambda>k. integral s (\<lambda>x. Inf {f j x \|j. j \<in> {m..m + k}})) --->
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5373	integral s (\<lambda>x. Inf {f j x \|j. m \<le> j}))sequentially"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5374	proof(rule monotone_convergence_decreasing_real,safe) fix m::nat
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5375	show "bounded {integral s (\<lambda>x. Inf {f j x \|j. j \<in> {m..m + k}}) \|k. True}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5376	unfolding bounded_iff apply(rule_tac x="integral s h" in exI)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5377	proof safe fix k::nat
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5378	show "norm (integral s (\<lambda>x. Inf {f j x \|j. j \<in> {m..m + k}})) \<le> integral s h"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5379	apply(rule integral_norm_bound_integral) unfolding simple_image
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5380	apply(rule absolutely_integrable_onD) apply(rule absolutely_integrable_inf_real)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5381	prefer 5 unfolding real_norm_def apply(rule) apply(rule Inf_abs_ge)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5382	prefer 5 apply rule apply(rule_tac g=h in absolutely_integrable_integrable_bound_real)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5383	using assms unfolding real_norm_def by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5384	qed fix k::nat show "(\<lambda>x. Inf {f j x \|j. j \<in> {m..m + k}}) integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5385	unfolding simple_image apply(rule absolutely_integrable_onD)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5386	apply(rule absolutely_integrable_inf_real) prefer 3
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5387	using absolutely_integrable_integrable_bound_real[OF assms(3,1,2)] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5388	fix x assume x:"x\<in>s" show "Inf {f j x \|j. j \<in> {m..m + Suc k}}
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5389	\<le> Inf {f j x \|j. j \<in> {m..m + k}}" apply(rule Inf_ge) unfolding setge_def
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5390	defer apply rule apply(subst Inf_finite_le_iff) prefer 3
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5391	apply(rule_tac x=xa in bexI) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5392	let ?S = "{f j x\| j. m \<le> j}" def i \<equiv> "Inf ?S"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5393	show "((\<lambda>k. Inf {f j x \|j. j \<in> {m..m + k}}) ---> i) sequentially"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5394	unfolding Lim_sequentially
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5395	proof safe case goal1 note e=this have i:"isGlb UNIV ?S i" unfolding i_def apply(rule Inf)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5396	defer apply(rule_tac x="- h x - 1" in exI) unfolding setge_def
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5397	proof safe case goal1 thus ?case using assms(3)[rule_format,OF x, of j] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5398	qed auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5399
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5400	have "\<exists>y\<in>?S. \<not> y \<ge> i + e"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5401	proof(rule ccontr) case goal1 hence "i \<ge> i + e" apply-
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5402	apply(rule isGlb_le_isLb[OF i]) apply(rule isLbI) unfolding setge_def by fastsimp+
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5403	thus False using e by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5404	qed then guess y .. note y=this[unfolded not_le]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5405	from this(1)[unfolded mem_Collect_eq] guess N .. note N=conjunctD2[OF this]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5406
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5407	show ?case apply(rule_tac x=N in exI)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5408	proof safe case goal1
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5409	have *:"\<And>y ix. y < i + e \<longrightarrow> i \<le> ix \<longrightarrow> ix \<le> y \<longrightarrow> abs(ix - i) < e" by arith
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5410	show ?case unfolding dist_real_def apply(rule *[rule_format,OF y(2)])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5411	unfolding i_def apply(rule real_le_inf_subset) prefer 3
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5412	apply(rule,rule isGlbD1[OF i]) prefer 3 apply(subst Inf_finite_le_iff)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5413	prefer 3 apply(rule_tac x=y in bexI) using N goal1 by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5414	qed qed qed note dec1 = conjunctD2[OF this]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5415
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5416	have "\<And>m. (\<lambda>x. Sup {f j x \|j. m \<le> j}) integrable_on s \<and>
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5417	((\<lambda>k. integral s (\<lambda>x. Sup {f j x \|j. j \<in> {m..m + k}})) --->
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5418	integral s (\<lambda>x. Sup {f j x \|j. m \<le> j})) sequentially"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5419	proof(rule monotone_convergence_increasing_real,safe) fix m::nat
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5420	show "bounded {integral s (\<lambda>x. Sup {f j x \|j. j \<in> {m..m + k}}) \|k. True}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5421	unfolding bounded_iff apply(rule_tac x="integral s h" in exI)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5422	proof safe fix k::nat
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5423	show "norm (integral s (\<lambda>x. Sup {f j x \|j. j \<in> {m..m + k}})) \<le> integral s h"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5424	apply(rule integral_norm_bound_integral) unfolding simple_image
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5425	apply(rule absolutely_integrable_onD) apply(rule absolutely_integrable_sup_real)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5426	prefer 5 unfolding real_norm_def apply(rule) apply(rule Sup_abs_le)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5427	prefer 5 apply rule apply(rule_tac g=h in absolutely_integrable_integrable_bound_real)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5428	using assms unfolding real_norm_def by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5429	qed fix k::nat show "(\<lambda>x. Sup {f j x \|j. j \<in> {m..m + k}}) integrable_on s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5430	unfolding simple_image apply(rule absolutely_integrable_onD)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5431	apply(rule absolutely_integrable_sup_real) prefer 3
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5432	using absolutely_integrable_integrable_bound_real[OF assms(3,1,2)] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5433	fix x assume x:"x\<in>s" show "Sup {f j x \|j. j \<in> {m..m + Suc k}}
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5434	\<ge> Sup {f j x \|j. j \<in> {m..m + k}}" apply(rule Sup_le) unfolding setle_def
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5435	defer apply rule apply(subst Sup_finite_ge_iff) prefer 3 apply(rule_tac x=y in bexI) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5436	let ?S = "{f j x\| j. m \<le> j}" def i \<equiv> "Sup ?S"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5437	show "((\<lambda>k. Sup {f j x \|j. j \<in> {m..m + k}}) ---> i) sequentially"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5438	unfolding Lim_sequentially
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5439	proof safe case goal1 note e=this have i:"isLub UNIV ?S i" unfolding i_def apply(rule Sup)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5440	defer apply(rule_tac x="h x" in exI) unfolding setle_def
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5441	proof safe case goal1 thus ?case using assms(3)[rule_format,OF x, of j] by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5442	qed auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5443
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5444	have "\<exists>y\<in>?S. \<not> y \<le> i - e"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5445	proof(rule ccontr) case goal1 hence "i \<le> i - e" apply-
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5446	apply(rule isLub_le_isUb[OF i]) apply(rule isUbI) unfolding setle_def by fastsimp+
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5447	thus False using e by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5448	qed then guess y .. note y=this[unfolded not_le]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5449	from this(1)[unfolded mem_Collect_eq] guess N .. note N=conjunctD2[OF this]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5450
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5451	show ?case apply(rule_tac x=N in exI)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5452	proof safe case goal1
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5453	have *:"\<And>y ix. i - e < y \<longrightarrow> ix \<le> i \<longrightarrow> y \<le> ix \<longrightarrow> abs(ix - i) < e" by arith
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5454	show ?case unfolding dist_real_def apply(rule *[rule_format,OF y(2)])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5455	unfolding i_def apply(rule real_ge_sup_subset) prefer 3
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5456	apply(rule,rule isLubD1[OF i]) prefer 3 apply(subst Sup_finite_ge_iff)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5457	prefer 3 apply(rule_tac x=y in bexI) using N goal1 by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5458	qed qed qed note inc1 = conjunctD2[OF this]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5459
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5460	have "g integrable_on s \<and> ((\<lambda>k. integral s (\<lambda>x. Inf {f j x \|j. k \<le> j})) ---> integral s g) sequentially"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5461	apply(rule monotone_convergence_increasing_real,safe) apply fact
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5462	proof- show "bounded {integral s (\<lambda>x. Inf {f j x \|j. k \<le> j}) \|k. True}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5463	unfolding bounded_iff apply(rule_tac x="integral s h" in exI)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5464	proof safe fix k::nat
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5465	show "norm (integral s (\<lambda>x. Inf {f j x \|j. k \<le> j})) \<le> integral s h"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5466	apply(rule integral_norm_bound_integral) apply fact+
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5467	unfolding real_norm_def apply(rule) apply(rule Inf_abs_ge) using assms(3) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5468	qed fix k::nat and x assume x:"x\<in>s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5469
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5470	have *:"\<And>x y::real. x \<ge> - y \<Longrightarrow> - x \<le> y" by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5471	show "Inf {f j x \|j. k \<le> j} \<le> Inf {f j x \|j. Suc k \<le> j}" apply-
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5472	apply(rule real_le_inf_subset) prefer 3 unfolding setge_def
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5473	apply(rule_tac x="- h x" in exI) apply safe apply(rule *)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5474	using assms(3)[rule_format,OF x] unfolding real_norm_def abs_le_iff by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5475	show "((\<lambda>k. Inf {f j x \|j. k \<le> j}) ---> g x) sequentially" unfolding Lim_sequentially
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5476	proof safe case goal1 hence "0<e/2" by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5477	from assms(4)[unfolded Lim_sequentially,rule_format,OF x this] guess N .. note N=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5478	show ?case apply(rule_tac x=N in exI,safe) unfolding dist_real_def
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5479	apply(rule le_less_trans[of _ "e/2"]) apply(rule Inf_asclose) apply safe
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5480	defer apply(rule less_imp_le) using N goal1 unfolding dist_real_def by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5481	qed qed note inc2 = conjunctD2[OF this]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5482
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5483	have "g integrable_on s \<and> ((\<lambda>k. integral s (\<lambda>x. Sup {f j x \|j. k \<le> j})) ---> integral s g) sequentially"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5484	apply(rule monotone_convergence_decreasing_real,safe) apply fact
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5485	proof- show "bounded {integral s (\<lambda>x. Sup {f j x \|j. k \<le> j}) \|k. True}"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5486	unfolding bounded_iff apply(rule_tac x="integral s h" in exI)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5487	proof safe fix k::nat
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5488	show "norm (integral s (\<lambda>x. Sup {f j x \|j. k \<le> j})) \<le> integral s h"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5489	apply(rule integral_norm_bound_integral) apply fact+
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5490	unfolding real_norm_def apply(rule) apply(rule Sup_abs_le) using assms(3) by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5491	qed fix k::nat and x assume x:"x\<in>s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5492
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5493	show "Sup {f j x \|j. k \<le> j} \<ge> Sup {f j x \|j. Suc k \<le> j}" apply-
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5494	apply(rule real_ge_sup_subset) prefer 3 unfolding setle_def
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5495	apply(rule_tac x="h x" in exI) apply safe
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5496	using assms(3)[rule_format,OF x] unfolding real_norm_def abs_le_iff by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5497	show "((\<lambda>k. Sup {f j x \|j. k \<le> j}) ---> g x) sequentially" unfolding Lim_sequentially
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5498	proof safe case goal1 hence "0<e/2" by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5499	from assms(4)[unfolded Lim_sequentially,rule_format,OF x this] guess N .. note N=this
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5500	show ?case apply(rule_tac x=N in exI,safe) unfolding dist_real_def
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5501	apply(rule le_less_trans[of _ "e/2"]) apply(rule Sup_asclose) apply safe
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5502	defer apply(rule less_imp_le) using N goal1 unfolding dist_real_def by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5503	qed qed note dec2 = conjunctD2[OF this]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5504
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5505	show "g integrable_on s" by fact
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5506	show "((\<lambda>k. integral s (f k)) ---> integral s g) sequentially" unfolding Lim_sequentially
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5507	proof safe case goal1
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5508	from inc2(2)[unfolded Lim_sequentially,rule_format,OF goal1] guess N1 .. note N1=this[unfolded dist_real_def]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5509	from dec2(2)[unfolded Lim_sequentially,rule_format,OF goal1] guess N2 .. note N2=this[unfolded dist_real_def]
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5510	show ?case apply(rule_tac x="N1+N2" in exI,safe)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5511	proof- fix n assume n:"n \<ge> N1 + N2"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5512	have *:"\<And>i0 i i1 g. \<bar>i0 - g\<bar> < e \<longrightarrow> \<bar>i1 - g\<bar> < e \<longrightarrow> i0 \<le> i \<longrightarrow> i \<le> i1 \<longrightarrow> \<bar>i - g\<bar> < e" by arith
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5513	show "dist (integral s (f n)) (integral s g) < e" unfolding dist_real_def
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5514	apply(rule *[rule_format,OF N1[rule_format] N2[rule_format], of n n])
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5515	proof- show "integral s (\<lambda>x. Inf {f j x \|j. n \<le> j}) \<le> integral s (f n)"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5516	proof(rule integral_le[OF dec1(1) assms(1)],safe)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5517	fix x assume x:"x \<in> s" have *:"\<And>x y::real. x \<ge> - y \<Longrightarrow> - x \<le> y" by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5518	show "Inf {f j x \|j. n \<le> j} \<le> f n x" apply(rule Inf_lower[where z="- h x"]) defer
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5519	apply(rule *) using assms(3)[rule_format,OF x] unfolding real_norm_def abs_le_iff by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5520	qed show "integral s (f n) \<le> integral s (\<lambda>x. Sup {f j x \|j. n \<le> j})"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5521	proof(rule integral_le[OF assms(1) inc1(1)],safe)
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5522	fix x assume x:"x \<in> s"
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5523	show "f n x \<le> Sup {f j x \|j. n \<le> j}" apply(rule Sup_upper[where z="h x"]) defer
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5524	using assms(3)[rule_format,OF x] unfolding real_norm_def abs_le_iff by auto
027ae62681be Translated remaining theorems about integration from HOL light. himmelma parents: 36081 diff changeset	5525	qed qed(insert n,auto) qed qed qed
35752 c8a8df426666 reset smt_certificates himmelma parents: 35751 diff changeset	5526
c8a8df426666 reset smt_certificates himmelma parents: 35751 diff changeset	5527	declare [[smt_certificates=""]]
36244 009b0ee1b838 Only use provided SMT-certificates in HOL-Multivariate_Analysis. hoelzl parents: 36243 diff changeset	5528	declare [[smt_fixed=false]]
35752 c8a8df426666 reset smt_certificates himmelma parents: 35751 diff changeset	5529
35173 9b24bfca8044 Renamed Multivariate-Analysis/Integration to Multivariate-Analysis/Integration_MV to avoid name clash with Integration. hoelzl parents: 35172 diff changeset	5530	end

author	wenzelm
	Fri, 23 Apr 2010 23:33:48 +0200
changeset 36318	3567d0571932
parent 36244	009b0ee1b838
child 36334	068a01b4bc56
permissions	-rw-r--r--