isabelle: src/HOL/Analysis/Interval_Integral.thy@f8b98d31ad45 (annotated)

63627 6ddb43c6b711 rename HOL-Multivariate_Analysis to HOL-Analysis. hoelzl parents: 63626 diff changeset	1	(* Title: HOL/Analysis/Interval_Integral.thy
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	2	Author: Jeremy Avigad (CMU), Johannes Hölzl (TUM), Luke Serafin (CMU)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	3
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	4	Lebesgue integral over an interval (with endpoints possibly +-\<infinity>)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	5	*)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	6
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	7	theory Interval_Integral
63941 f353674c2528 move absolutely_integrable_on to Equivalence_Lebesgue_Henstock_Integration, now based on the Lebesgue integral hoelzl parents: 63886 diff changeset	8	imports Equivalence_Lebesgue_Henstock_Integration
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	9	begin
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	10
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	11	lemma continuous_on_vector_derivative:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	12	"(\<And>x. x \<in> S \<Longrightarrow> (f has_vector_derivative f' x) (at x within S)) \<Longrightarrow> continuous_on S f"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	13	by (auto simp: continuous_on_eq_continuous_within intro!: has_vector_derivative_continuous)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	14
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	15	definition "einterval a b = {x. a < ereal x \<and> ereal x < b}"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	16
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	17	lemma einterval_eq[simp]:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	18	shows einterval_eq_Icc: "einterval (ereal a) (ereal b) = {a <..< b}"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	19	and einterval_eq_Ici: "einterval (ereal a) \<infinity> = {a <..}"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	20	and einterval_eq_Iic: "einterval (- \<infinity>) (ereal b) = {..< b}"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	21	and einterval_eq_UNIV: "einterval (- \<infinity>) \<infinity> = UNIV"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	22	by (auto simp: einterval_def)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	23
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	24	lemma einterval_same: "einterval a a = {}"
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	25	by (auto simp: einterval_def)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	26
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	27	lemma einterval_iff: "x \<in> einterval a b \<longleftrightarrow> a < ereal x \<and> ereal x < b"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	28	by (simp add: einterval_def)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	29
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	30	lemma einterval_nonempty: "a < b \<Longrightarrow> \<exists>c. c \<in> einterval a b"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	31	by (cases a b rule: ereal2_cases, auto simp: einterval_def intro!: dense gt_ex lt_ex)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	32
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	33	lemma open_einterval[simp]: "open (einterval a b)"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	34	by (cases a b rule: ereal2_cases)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	35	(auto simp: einterval_def intro!: open_Collect_conj open_Collect_less continuous_intros)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	36
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	37	lemma borel_einterval[measurable]: "einterval a b \<in> sets borel"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	38	unfolding einterval_def by measurable
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	39
67974 3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	40	subsection\<open>Approximating a (possibly infinite) interval\<close>
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	41
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	42	lemma filterlim_sup1: "(LIM x F. f x :> G1) \<Longrightarrow> (LIM x F. f x :> (sup G1 G2))"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	43	unfolding filterlim_def by (auto intro: le_supI1)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	44
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	45	lemma ereal_incseq_approx:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	46	fixes a b :: ereal
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	47	assumes "a < b"
68095 4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	48	obtains X :: "nat \<Rightarrow> real" where "incseq X" "\<And>i. a < X i" "\<And>i. X i < b" "X \<longlonglongrightarrow> b"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	49	proof (cases b)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	50	case PInf
61808 fc1556774cfe isabelle update_cartouches -c -t; wenzelm parents: 61609 diff changeset	51	with \<open>a < b\<close> have "a = -\<infinity> \<or> (\<exists>r. a = ereal r)"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	52	by (cases a) auto
61969 e01015e49041 more symbols; wenzelm parents: 61945 diff changeset	53	moreover have "(\<lambda>x. ereal (real (Suc x))) \<longlonglongrightarrow> \<infinity>"
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	54	by (simp add: Lim_PInfty LIMSEQ_Suc_iff) (metis le_SucI of_nat_Suc of_nat_mono order_trans real_arch_simple)
61969 e01015e49041 more symbols; wenzelm parents: 61945 diff changeset	55	moreover have "\<And>r. (\<lambda>x. ereal (r + real (Suc x))) \<longlonglongrightarrow> \<infinity>"
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	56	by (simp add: LIMSEQ_Suc_iff Lim_PInfty) (metis add.commute diff_le_eq nat_ceiling_le_eq)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	57	ultimately show thesis
61609 77b453bd616f Coercion "real" now has type nat => real only and is no longer overloaded. Type class "real_of" is gone. Many duplicate theorems removed. paulson <lp15@cam.ac.uk> parents: 59867 diff changeset	58	by (intro that[of "\<lambda>i. real_of_ereal a + Suc i"])
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	59	(auto simp: incseq_def PInf)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	60	next
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	61	case (real b')
63040 eb4ddd18d635 eliminated old 'def'; wenzelm parents: 62390 diff changeset	62	define d where "d = b' - (if a = -\<infinity> then b' - 1 else real_of_ereal a)"
61808 fc1556774cfe isabelle update_cartouches -c -t; wenzelm parents: 61609 diff changeset	63	with \<open>a < b\<close> have a': "0 < d"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	64	by (cases a) (auto simp: real)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	65	moreover
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	66	have "\<And>i r. r < b' \<Longrightarrow> (b' - r) * 1 < (b' - r) * real (Suc (Suc i))"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	67	by (intro mult_strict_left_mono) auto
61808 fc1556774cfe isabelle update_cartouches -c -t; wenzelm parents: 61609 diff changeset	68	with \<open>a < b\<close> a' have "\<And>i. a < ereal (b' - d / real (Suc (Suc i)))"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	69	by (cases a) (auto simp: real d_def field_simps)
68095 4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	70	moreover
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	71	have "(\<lambda>i. b' - d / real i) \<longlonglongrightarrow> b'"
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	72	by (force intro: tendsto_eq_intros tendsto_divide_0[OF tendsto_const] filterlim_sup1
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	73	simp: at_infinity_eq_at_top_bot filterlim_real_sequentially)
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	74	then have "(\<lambda>i. b' - d / Suc (Suc i)) \<longlonglongrightarrow> b'"
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	75	by (blast intro: dest: filterlim_sequentially_Suc [THEN iffD2])
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	76	ultimately show thesis
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	77	by (intro that[of "\<lambda>i. b' - d / Suc (Suc i)"])
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	78	(auto simp: real incseq_def intro!: divide_left_mono)
61808 fc1556774cfe isabelle update_cartouches -c -t; wenzelm parents: 61609 diff changeset	79	qed (insert \<open>a < b\<close>, auto)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	80
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	81	lemma ereal_decseq_approx:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	82	fixes a b :: ereal
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	83	assumes "a < b"
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	84	obtains X :: "nat \<Rightarrow> real" where
61969 e01015e49041 more symbols; wenzelm parents: 61945 diff changeset	85	"decseq X" "\<And>i. a < X i" "\<And>i. X i < b" "X \<longlonglongrightarrow> a"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	86	proof -
61808 fc1556774cfe isabelle update_cartouches -c -t; wenzelm parents: 61609 diff changeset	87	have "-b < -a" using \<open>a < b\<close> by simp
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	88	from ereal_incseq_approx[OF this] guess X .
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	89	then show thesis
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	90	apply (intro that[of "\<lambda>i. - X i"])
68403 223172b97d0b reorient -> split; documented split nipkow parents: 68096 diff changeset	91	apply (auto simp: decseq_def incseq_def simp flip: uminus_ereal.simps)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	92	apply (metis ereal_minus_less_minus ereal_uminus_uminus ereal_Lim_uminus)+
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	93	done
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	94	qed
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	95
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	96	lemma einterval_Icc_approximation:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	97	fixes a b :: ereal
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	98	assumes "a < b"
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	99	obtains u l :: "nat \<Rightarrow> real" where
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	100	"einterval a b = (\<Union>i. {l i .. u i})"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	101	"incseq u" "decseq l" "\<And>i. l i < u i" "\<And>i. a < l i" "\<And>i. u i < b"
61969 e01015e49041 more symbols; wenzelm parents: 61945 diff changeset	102	"l \<longlonglongrightarrow> a" "u \<longlonglongrightarrow> b"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	103	proof -
61808 fc1556774cfe isabelle update_cartouches -c -t; wenzelm parents: 61609 diff changeset	104	from dense[OF \<open>a < b\<close>] obtain c where "a < c" "c < b" by safe
fc1556774cfe isabelle update_cartouches -c -t; wenzelm parents: 61609 diff changeset	105	from ereal_incseq_approx[OF \<open>c < b\<close>] guess u . note u = this
fc1556774cfe isabelle update_cartouches -c -t; wenzelm parents: 61609 diff changeset	106	from ereal_decseq_approx[OF \<open>a < c\<close>] guess l . note l = this
fc1556774cfe isabelle update_cartouches -c -t; wenzelm parents: 61609 diff changeset	107	{ fix i from less_trans[OF \<open>l i < c\<close> \<open>c < u i\<close>] have "l i < u i" by simp }
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	108	have "einterval a b = (\<Union>i. {l i .. u i})"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	109	proof (auto simp: einterval_iff)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	110	fix x assume "a < ereal x" "ereal x < b"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	111	have "eventually (\<lambda>i. ereal (l i) < ereal x) sequentially"
61808 fc1556774cfe isabelle update_cartouches -c -t; wenzelm parents: 61609 diff changeset	112	using l(4) \<open>a < ereal x\<close> by (rule order_tendstoD)
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	113	moreover
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	114	have "eventually (\<lambda>i. ereal x < ereal (u i)) sequentially"
61808 fc1556774cfe isabelle update_cartouches -c -t; wenzelm parents: 61609 diff changeset	115	using u(4) \<open>ereal x< b\<close> by (rule order_tendstoD)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	116	ultimately have "eventually (\<lambda>i. l i < x \<and> x < u i) sequentially"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	117	by eventually_elim auto
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	118	then show "\<exists>i. l i \<le> x \<and> x \<le> u i"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	119	by (auto intro: less_imp_le simp: eventually_sequentially)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	120	next
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	121	fix x i assume "l i \<le> x" "x \<le> u i"
61808 fc1556774cfe isabelle update_cartouches -c -t; wenzelm parents: 61609 diff changeset	122	with \<open>a < ereal (l i)\<close> \<open>ereal (u i) < b\<close>
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	123	show "a < ereal x" "ereal x < b"
68403 223172b97d0b reorient -> split; documented split nipkow parents: 68096 diff changeset	124	by (auto simp flip: ereal_less_eq(3))
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	125	qed
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	126	show thesis
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	127	by (intro that) fact+
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	128	qed
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	129
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	130	(* TODO: in this definition, it would be more natural if einterval a b included a and b when
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	131	they are real. *)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	132	definition interval_lebesgue_integral :: "real measure \<Rightarrow> ereal \<Rightarrow> ereal \<Rightarrow> (real \<Rightarrow> 'a) \<Rightarrow> 'a::{banach, second_countable_topology}" where
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	133	"interval_lebesgue_integral M a b f =
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	134	(if a \<le> b then (LINT x:einterval a b\|M. f x) else - (LINT x:einterval b a\|M. f x))"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	135
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	136	syntax
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	137	"_ascii_interval_lebesgue_integral" :: "pttrn \<Rightarrow> real \<Rightarrow> real \<Rightarrow> real measure \<Rightarrow> real \<Rightarrow> real"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	138	("(5LINT _=_.._\|_. _)" [0,60,60,61,100] 60)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	139
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	140	translations
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	141	"LINT x=a..b\|M. f" == "CONST interval_lebesgue_integral M a b (\<lambda>x. f)"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	142
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	143	definition interval_lebesgue_integrable :: "real measure \<Rightarrow> ereal \<Rightarrow> ereal \<Rightarrow> (real \<Rightarrow> 'a::{banach, second_countable_topology}) \<Rightarrow> bool" where
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	144	"interval_lebesgue_integrable M a b f =
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	145	(if a \<le> b then set_integrable M (einterval a b) f else set_integrable M (einterval b a) f)"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	146
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	147	syntax
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	148	"_ascii_interval_lebesgue_borel_integral" :: "pttrn \<Rightarrow> real \<Rightarrow> real \<Rightarrow> real \<Rightarrow> real"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	149	("(4LBINT _=_.._. _)" [0,60,60,61] 60)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	150
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	151	translations
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	152	"LBINT x=a..b. f" == "CONST interval_lebesgue_integral CONST lborel a b (\<lambda>x. f)"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	153
67974 3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	154	subsection\<open>Basic properties of integration over an interval\<close>
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	155
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	156	lemma interval_lebesgue_integral_cong:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	157	"a \<le> b \<Longrightarrow> (\<And>x. x \<in> einterval a b \<Longrightarrow> f x = g x) \<Longrightarrow> einterval a b \<in> sets M \<Longrightarrow>
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	158	interval_lebesgue_integral M a b f = interval_lebesgue_integral M a b g"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	159	by (auto intro: set_lebesgue_integral_cong simp: interval_lebesgue_integral_def)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	160
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	161	lemma interval_lebesgue_integral_cong_AE:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	162	"f \<in> borel_measurable M \<Longrightarrow> g \<in> borel_measurable M \<Longrightarrow>
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	163	a \<le> b \<Longrightarrow> AE x \<in> einterval a b in M. f x = g x \<Longrightarrow> einterval a b \<in> sets M \<Longrightarrow>
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	164	interval_lebesgue_integral M a b f = interval_lebesgue_integral M a b g"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	165	by (auto intro: set_lebesgue_integral_cong_AE simp: interval_lebesgue_integral_def)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	166
62083 7582b39f51ed add the proof of the central limit theorem hoelzl parents: 61973 diff changeset	167	lemma interval_integrable_mirror:
7582b39f51ed add the proof of the central limit theorem hoelzl parents: 61973 diff changeset	168	shows "interval_lebesgue_integrable lborel a b (\<lambda>x. f (-x)) \<longleftrightarrow>
7582b39f51ed add the proof of the central limit theorem hoelzl parents: 61973 diff changeset	169	interval_lebesgue_integrable lborel (-b) (-a) f"
7582b39f51ed add the proof of the central limit theorem hoelzl parents: 61973 diff changeset	170	proof -
7582b39f51ed add the proof of the central limit theorem hoelzl parents: 61973 diff changeset	171	have *: "indicator (einterval a b) (- x) = (indicator (einterval (-b) (-a)) x :: real)"
7582b39f51ed add the proof of the central limit theorem hoelzl parents: 61973 diff changeset	172	for a b :: ereal and x :: real
7582b39f51ed add the proof of the central limit theorem hoelzl parents: 61973 diff changeset	173	by (cases a b rule: ereal2_cases) (auto simp: einterval_def split: split_indicator)
7582b39f51ed add the proof of the central limit theorem hoelzl parents: 61973 diff changeset	174	show ?thesis
7582b39f51ed add the proof of the central limit theorem hoelzl parents: 61973 diff changeset	175	unfolding interval_lebesgue_integrable_def
7582b39f51ed add the proof of the central limit theorem hoelzl parents: 61973 diff changeset	176	using lborel_integrable_real_affine_iff[symmetric, of "-1" "\<lambda>x. indicator (einterval _ _) x *\<^sub>R f x" 0]
67974 3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	177	by (simp add: * set_integrable_def)
62083 7582b39f51ed add the proof of the central limit theorem hoelzl parents: 61973 diff changeset	178	qed
7582b39f51ed add the proof of the central limit theorem hoelzl parents: 61973 diff changeset	179
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	180	lemma interval_lebesgue_integral_add [intro, simp]:
6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	181	fixes M a b f
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	182	assumes "interval_lebesgue_integrable M a b f" "interval_lebesgue_integrable M a b g"
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	183	shows "interval_lebesgue_integrable M a b (\<lambda>x. f x + g x)" and
6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	184	"interval_lebesgue_integral M a b (\<lambda>x. f x + g x) =
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	185	interval_lebesgue_integral M a b f + interval_lebesgue_integral M a b g"
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	186	using assms by (auto simp: interval_lebesgue_integral_def interval_lebesgue_integrable_def
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	187	field_simps)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	188
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	189	lemma interval_lebesgue_integral_diff [intro, simp]:
6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	190	fixes M a b f
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	191	assumes "interval_lebesgue_integrable M a b f"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	192	"interval_lebesgue_integrable M a b g"
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	193	shows "interval_lebesgue_integrable M a b (\<lambda>x. f x - g x)" and
6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	194	"interval_lebesgue_integral M a b (\<lambda>x. f x - g x) =
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	195	interval_lebesgue_integral M a b f - interval_lebesgue_integral M a b g"
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	196	using assms by (auto simp: interval_lebesgue_integral_def interval_lebesgue_integrable_def
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	197	field_simps)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	198
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	199	lemma interval_lebesgue_integrable_mult_right [intro, simp]:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	200	fixes M a b c and f :: "real \<Rightarrow> 'a::{banach, real_normed_field, second_countable_topology}"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	201	shows "(c \<noteq> 0 \<Longrightarrow> interval_lebesgue_integrable M a b f) \<Longrightarrow>
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	202	interval_lebesgue_integrable M a b (\<lambda>x. c * f x)"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	203	by (simp add: interval_lebesgue_integrable_def)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	204
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	205	lemma interval_lebesgue_integrable_mult_left [intro, simp]:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	206	fixes M a b c and f :: "real \<Rightarrow> 'a::{banach, real_normed_field, second_countable_topology}"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	207	shows "(c \<noteq> 0 \<Longrightarrow> interval_lebesgue_integrable M a b f) \<Longrightarrow>
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	208	interval_lebesgue_integrable M a b (\<lambda>x. f x * c)"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	209	by (simp add: interval_lebesgue_integrable_def)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	210
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	211	lemma interval_lebesgue_integrable_divide [intro, simp]:
59867 58043346ca64 given up separate type classes demanding `inverse 0 = 0` haftmann parents: 59587 diff changeset	212	fixes M a b c and f :: "real \<Rightarrow> 'a::{banach, real_normed_field, field, second_countable_topology}"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	213	shows "(c \<noteq> 0 \<Longrightarrow> interval_lebesgue_integrable M a b f) \<Longrightarrow>
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	214	interval_lebesgue_integrable M a b (\<lambda>x. f x / c)"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	215	by (simp add: interval_lebesgue_integrable_def)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	216
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	217	lemma interval_lebesgue_integral_mult_right [simp]:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	218	fixes M a b c and f :: "real \<Rightarrow> 'a::{banach, real_normed_field, second_countable_topology}"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	219	shows "interval_lebesgue_integral M a b (\<lambda>x. c * f x) =
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	220	c * interval_lebesgue_integral M a b f"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	221	by (simp add: interval_lebesgue_integral_def)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	222
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	223	lemma interval_lebesgue_integral_mult_left [simp]:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	224	fixes M a b c and f :: "real \<Rightarrow> 'a::{banach, real_normed_field, second_countable_topology}"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	225	shows "interval_lebesgue_integral M a b (\<lambda>x. f x * c) =
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	226	interval_lebesgue_integral M a b f * c"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	227	by (simp add: interval_lebesgue_integral_def)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	228
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	229	lemma interval_lebesgue_integral_divide [simp]:
59867 58043346ca64 given up separate type classes demanding `inverse 0 = 0` haftmann parents: 59587 diff changeset	230	fixes M a b c and f :: "real \<Rightarrow> 'a::{banach, real_normed_field, field, second_countable_topology}"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	231	shows "interval_lebesgue_integral M a b (\<lambda>x. f x / c) =
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	232	interval_lebesgue_integral M a b f / c"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	233	by (simp add: interval_lebesgue_integral_def)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	234
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	235	lemma interval_lebesgue_integral_uminus:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	236	"interval_lebesgue_integral M a b (\<lambda>x. - f x) = - interval_lebesgue_integral M a b f"
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	237	by (auto simp: interval_lebesgue_integral_def interval_lebesgue_integrable_def set_lebesgue_integral_def)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	238
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	239	lemma interval_lebesgue_integral_of_real:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	240	"interval_lebesgue_integral M a b (\<lambda>x. complex_of_real (f x)) =
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	241	of_real (interval_lebesgue_integral M a b f)"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	242	unfolding interval_lebesgue_integral_def
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	243	by (auto simp: interval_lebesgue_integral_def set_integral_complex_of_real)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	244
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	245	lemma interval_lebesgue_integral_le_eq:
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	246	fixes a b f
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	247	assumes "a \<le> b"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	248	shows "interval_lebesgue_integral M a b f = (LINT x : einterval a b \| M. f x)"
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	249	using assms by (auto simp: interval_lebesgue_integral_def)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	250
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	251	lemma interval_lebesgue_integral_gt_eq:
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	252	fixes a b f
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	253	assumes "a > b"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	254	shows "interval_lebesgue_integral M a b f = -(LINT x : einterval b a \| M. f x)"
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	255	using assms by (auto simp: interval_lebesgue_integral_def less_imp_le einterval_def)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	256
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	257	lemma interval_lebesgue_integral_gt_eq':
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	258	fixes a b f
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	259	assumes "a > b"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	260	shows "interval_lebesgue_integral M a b f = - interval_lebesgue_integral M b a f"
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	261	using assms by (auto simp: interval_lebesgue_integral_def less_imp_le einterval_def)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	262
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	263	lemma interval_integral_endpoints_same [simp]: "(LBINT x=a..a. f x) = 0"
67974 3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	264	by (simp add: interval_lebesgue_integral_def set_lebesgue_integral_def einterval_same)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	265
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	266	lemma interval_integral_endpoints_reverse: "(LBINT x=a..b. f x) = -(LBINT x=b..a. f x)"
67974 3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	267	by (cases a b rule: linorder_cases) (auto simp: interval_lebesgue_integral_def set_lebesgue_integral_def einterval_same)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	268
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	269	lemma interval_integrable_endpoints_reverse:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	270	"interval_lebesgue_integrable lborel a b f \<longleftrightarrow>
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	271	interval_lebesgue_integrable lborel b a f"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	272	by (cases a b rule: linorder_cases) (auto simp: interval_lebesgue_integrable_def einterval_same)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	273
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	274	lemma interval_integral_reflect:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	275	"(LBINT x=a..b. f x) = (LBINT x=-b..-a. f (-x))"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	276	proof (induct a b rule: linorder_wlog)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	277	case (sym a b) then show ?case
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	278	by (auto simp: interval_lebesgue_integral_def interval_integrable_endpoints_reverse
62390 842917225d56 more canonical names nipkow parents: 62083 diff changeset	279	split: if_split_asm)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	280	next
67974 3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	281	case (le a b)
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	282	have "LBINT x:{x. - x \<in> einterval a b}. f (- x) = LBINT x:einterval (- b) (- a). f (- x)"
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	283	unfolding interval_lebesgue_integrable_def set_lebesgue_integral_def
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	284	apply (rule Bochner_Integration.integral_cong [OF refl])
68046 6aba668aea78 new simp modifier: reorient nipkow parents: 67974 diff changeset	285	by (auto simp: einterval_iff ereal_uminus_le_reorder ereal_uminus_less_reorder not_less
68403 223172b97d0b reorient -> split; documented split nipkow parents: 68096 diff changeset	286	simp flip: uminus_ereal.simps
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	287	split: split_indicator)
67974 3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	288	then show ?case
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	289	unfolding interval_lebesgue_integral_def
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	290	by (subst set_integral_reflect) (simp add: le)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	291	qed
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	292
61897 bc0fc5499085 Bochner integral: prove dominated convergence at_top hoelzl parents: 61882 diff changeset	293	lemma interval_lebesgue_integral_0_infty:
bc0fc5499085 Bochner integral: prove dominated convergence at_top hoelzl parents: 61882 diff changeset	294	"interval_lebesgue_integrable M 0 \<infinity> f \<longleftrightarrow> set_integrable M {0<..} f"
bc0fc5499085 Bochner integral: prove dominated convergence at_top hoelzl parents: 61882 diff changeset	295	"interval_lebesgue_integral M 0 \<infinity> f = (LINT x:{0<..}\|M. f x)"
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	296	unfolding zero_ereal_def
61897 bc0fc5499085 Bochner integral: prove dominated convergence at_top hoelzl parents: 61882 diff changeset	297	by (auto simp: interval_lebesgue_integral_le_eq interval_lebesgue_integrable_def)
bc0fc5499085 Bochner integral: prove dominated convergence at_top hoelzl parents: 61882 diff changeset	298
bc0fc5499085 Bochner integral: prove dominated convergence at_top hoelzl parents: 61882 diff changeset	299	lemma interval_integral_to_infinity_eq: "(LINT x=ereal a..\<infinity> \| M. f x) = (LINT x : {a<..} \| M. f x)"
bc0fc5499085 Bochner integral: prove dominated convergence at_top hoelzl parents: 61882 diff changeset	300	unfolding interval_lebesgue_integral_def by auto
bc0fc5499085 Bochner integral: prove dominated convergence at_top hoelzl parents: 61882 diff changeset	301
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	302	lemma interval_integrable_to_infinity_eq: "(interval_lebesgue_integrable M a \<infinity> f) =
61897 bc0fc5499085 Bochner integral: prove dominated convergence at_top hoelzl parents: 61882 diff changeset	303	(set_integrable M {a<..} f)"
bc0fc5499085 Bochner integral: prove dominated convergence at_top hoelzl parents: 61882 diff changeset	304	unfolding interval_lebesgue_integrable_def by auto
bc0fc5499085 Bochner integral: prove dominated convergence at_top hoelzl parents: 61882 diff changeset	305
67974 3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	306	subsection\<open>Basic properties of integration over an interval wrt lebesgue measure\<close>
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	307
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	308	lemma interval_integral_zero [simp]:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	309	fixes a b :: ereal
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	310	shows "LBINT x=a..b. 0 = 0"
67974 3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	311	unfolding interval_lebesgue_integral_def set_lebesgue_integral_def einterval_eq
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	312	by simp
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	313
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	314	lemma interval_integral_const [intro, simp]:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	315	fixes a b c :: real
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	316	shows "interval_lebesgue_integrable lborel a b (\<lambda>x. c)" and "LBINT x=a..b. c = c * (b - a)"
67974 3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	317	unfolding interval_lebesgue_integral_def interval_lebesgue_integrable_def einterval_eq
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	318	by (auto simp: less_imp_le field_simps measure_def set_integrable_def set_lebesgue_integral_def)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	319
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	320	lemma interval_integral_cong_AE:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	321	assumes [measurable]: "f \<in> borel_measurable borel" "g \<in> borel_measurable borel"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	322	assumes "AE x \<in> einterval (min a b) (max a b) in lborel. f x = g x"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	323	shows "interval_lebesgue_integral lborel a b f = interval_lebesgue_integral lborel a b g"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	324	using assms
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	325	proof (induct a b rule: linorder_wlog)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	326	case (sym a b) then show ?case
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	327	by (simp add: min.commute max.commute interval_integral_endpoints_reverse[of a b])
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	328	next
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	329	case (le a b) then show ?case
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	330	by (auto simp: interval_lebesgue_integral_def max_def min_def
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	331	intro!: set_lebesgue_integral_cong_AE)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	332	qed
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	333
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	334	lemma interval_integral_cong:
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	335	assumes "\<And>x. x \<in> einterval (min a b) (max a b) \<Longrightarrow> f x = g x"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	336	shows "interval_lebesgue_integral lborel a b f = interval_lebesgue_integral lborel a b g"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	337	using assms
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	338	proof (induct a b rule: linorder_wlog)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	339	case (sym a b) then show ?case
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	340	by (simp add: min.commute max.commute interval_integral_endpoints_reverse[of a b])
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	341	next
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	342	case (le a b) then show ?case
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	343	by (auto simp: interval_lebesgue_integral_def max_def min_def
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	344	intro!: set_lebesgue_integral_cong)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	345	qed
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	346
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	347	lemma interval_lebesgue_integrable_cong_AE:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	348	"f \<in> borel_measurable lborel \<Longrightarrow> g \<in> borel_measurable lborel \<Longrightarrow>
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	349	AE x \<in> einterval (min a b) (max a b) in lborel. f x = g x \<Longrightarrow>
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	350	interval_lebesgue_integrable lborel a b f = interval_lebesgue_integrable lborel a b g"
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	351	apply (simp add: interval_lebesgue_integrable_def)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	352	apply (intro conjI impI set_integrable_cong_AE)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	353	apply (auto simp: min_def max_def)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	354	done
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	355
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	356	lemma interval_integrable_abs_iff:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	357	fixes f :: "real \<Rightarrow> real"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	358	shows "f \<in> borel_measurable lborel \<Longrightarrow>
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	359	interval_lebesgue_integrable lborel a b (\<lambda>x. \<bar>f x\<bar>) = interval_lebesgue_integrable lborel a b f"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	360	unfolding interval_lebesgue_integrable_def
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	361	by (subst (1 2) set_integrable_abs_iff') simp_all
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	362
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	363	lemma interval_integral_Icc:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	364	fixes a b :: real
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	365	shows "a \<le> b \<Longrightarrow> (LBINT x=a..b. f x) = (LBINT x : {a..b}. f x)"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	366	by (auto intro!: set_integral_discrete_difference[where X="{a, b}"]
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	367	simp add: interval_lebesgue_integral_def)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	368
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	369	lemma interval_integral_Icc':
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	370	"a \<le> b \<Longrightarrow> (LBINT x=a..b. f x) = (LBINT x : {x. a \<le> ereal x \<and> ereal x \<le> b}. f x)"
61609 77b453bd616f Coercion "real" now has type nat => real only and is no longer overloaded. Type class "real_of" is gone. Many duplicate theorems removed. paulson <lp15@cam.ac.uk> parents: 59867 diff changeset	371	by (auto intro!: set_integral_discrete_difference[where X="{real_of_ereal a, real_of_ereal b}"]
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	372	simp add: interval_lebesgue_integral_def einterval_iff)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	373
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	374	lemma interval_integral_Ioc:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	375	"a \<le> b \<Longrightarrow> (LBINT x=a..b. f x) = (LBINT x : {a<..b}. f x)"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	376	by (auto intro!: set_integral_discrete_difference[where X="{a, b}"]
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	377	simp add: interval_lebesgue_integral_def einterval_iff)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	378
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	379	(* TODO: other versions as well? ) ( Yes: I need the Icc' version. *)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	380	lemma interval_integral_Ioc':
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	381	"a \<le> b \<Longrightarrow> (LBINT x=a..b. f x) = (LBINT x : {x. a < ereal x \<and> ereal x \<le> b}. f x)"
61609 77b453bd616f Coercion "real" now has type nat => real only and is no longer overloaded. Type class "real_of" is gone. Many duplicate theorems removed. paulson <lp15@cam.ac.uk> parents: 59867 diff changeset	382	by (auto intro!: set_integral_discrete_difference[where X="{real_of_ereal a, real_of_ereal b}"]
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	383	simp add: interval_lebesgue_integral_def einterval_iff)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	384
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	385	lemma interval_integral_Ico:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	386	"a \<le> b \<Longrightarrow> (LBINT x=a..b. f x) = (LBINT x : {a..<b}. f x)"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	387	by (auto intro!: set_integral_discrete_difference[where X="{a, b}"]
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	388	simp add: interval_lebesgue_integral_def einterval_iff)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	389
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	390	lemma interval_integral_Ioi:
61882 8b4b5d74c587 Probability: fix coercions (real ~> real_of_enat) hoelzl parents: 61808 diff changeset	391	"\<bar>a\<bar> < \<infinity> \<Longrightarrow> (LBINT x=a..\<infinity>. f x) = (LBINT x : {real_of_ereal a <..}. f x)"
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	392	by (auto simp: interval_lebesgue_integral_def einterval_iff)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	393
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	394	lemma interval_integral_Ioo:
61882 8b4b5d74c587 Probability: fix coercions (real ~> real_of_enat) hoelzl parents: 61808 diff changeset	395	"a \<le> b \<Longrightarrow> \<bar>a\<bar> < \<infinity> ==> \<bar>b\<bar> < \<infinity> \<Longrightarrow> (LBINT x=a..b. f x) = (LBINT x : {real_of_ereal a <..< real_of_ereal b}. f x)"
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	396	by (auto simp: interval_lebesgue_integral_def einterval_iff)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	397
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	398	lemma interval_integral_discrete_difference:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	399	fixes f :: "real \<Rightarrow> 'b::{banach, second_countable_topology}" and a b :: ereal
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	400	assumes "countable X"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	401	and eq: "\<And>x. a \<le> b \<Longrightarrow> a < x \<Longrightarrow> x < b \<Longrightarrow> x \<notin> X \<Longrightarrow> f x = g x"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	402	and anti_eq: "\<And>x. b \<le> a \<Longrightarrow> b < x \<Longrightarrow> x < a \<Longrightarrow> x \<notin> X \<Longrightarrow> f x = g x"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	403	assumes "\<And>x. x \<in> X \<Longrightarrow> emeasure M {x} = 0" "\<And>x. x \<in> X \<Longrightarrow> {x} \<in> sets M"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	404	shows "interval_lebesgue_integral M a b f = interval_lebesgue_integral M a b g"
67974 3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	405	unfolding interval_lebesgue_integral_def set_lebesgue_integral_def
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	406	apply (intro if_cong refl arg_cong[where f="\<lambda>x. - x"] integral_discrete_difference[of X] assms)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	407	apply (auto simp: eq anti_eq einterval_iff split: split_indicator)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	408	done
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	409
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	410	lemma interval_integral_sum:
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	411	fixes a b c :: ereal
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	412	assumes integrable: "interval_lebesgue_integrable lborel (min a (min b c)) (max a (max b c)) f"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	413	shows "(LBINT x=a..b. f x) + (LBINT x=b..c. f x) = (LBINT x=a..c. f x)"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	414	proof -
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	415	let ?I = "\<lambda>a b. LBINT x=a..b. f x"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	416	{ fix a b c :: ereal assume "interval_lebesgue_integrable lborel a c f" "a \<le> b" "b \<le> c"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	417	then have ord: "a \<le> b" "b \<le> c" "a \<le> c" and f': "set_integrable lborel (einterval a c) f"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	418	by (auto simp: interval_lebesgue_integrable_def)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	419	then have f: "set_borel_measurable borel (einterval a c) f"
67974 3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	420	unfolding set_integrable_def set_borel_measurable_def
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	421	by (drule_tac borel_measurable_integrable) simp
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	422	have "(LBINT x:einterval a c. f x) = (LBINT x:einterval a b \<union> einterval b c. f x)"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	423	proof (rule set_integral_cong_set)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	424	show "AE x in lborel. (x \<in> einterval a b \<union> einterval b c) = (x \<in> einterval a c)"
61609 77b453bd616f Coercion "real" now has type nat => real only and is no longer overloaded. Type class "real_of" is gone. Many duplicate theorems removed. paulson <lp15@cam.ac.uk> parents: 59867 diff changeset	425	using AE_lborel_singleton[of "real_of_ereal b"] ord
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	426	by (cases a b c rule: ereal3_cases) (auto simp: einterval_iff)
67974 3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	427	show "set_borel_measurable lborel (einterval a c) f" "set_borel_measurable lborel (einterval a b \<union> einterval b c) f"
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	428	unfolding set_borel_measurable_def
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	429	using ord by (auto simp: einterval_iff intro!: set_borel_measurable_subset[OF f, unfolded set_borel_measurable_def])
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	430	qed
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	431	also have "\<dots> = (LBINT x:einterval a b. f x) + (LBINT x:einterval b c. f x)"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	432	using ord
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	433	by (intro set_integral_Un_AE) (auto intro!: set_integrable_subset[OF f'] simp: einterval_iff not_less)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	434	finally have "?I a b + ?I b c = ?I a c"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	435	using ord by (simp add: interval_lebesgue_integral_def)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	436	} note 1 = this
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	437	{ fix a b c :: ereal assume "interval_lebesgue_integrable lborel a c f" "a \<le> b" "b \<le> c"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	438	from 1[OF this] have "?I b c + ?I a b = ?I a c"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	439	by (metis add.commute)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	440	} note 2 = this
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	441	have 3: "\<And>a b. b \<le> a \<Longrightarrow> (LBINT x=a..b. f x) = - (LBINT x=b..a. f x)"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	442	by (rule interval_integral_endpoints_reverse)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	443	show ?thesis
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	444	using integrable
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	445	by (cases a b b c a c rule: linorder_le_cases[case_product linorder_le_cases linorder_cases])
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	446	(simp_all add: min_absorb1 min_absorb2 max_absorb1 max_absorb2 field_simps 1 2 3)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	447	qed
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	448
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	449	lemma interval_integrable_isCont:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	450	fixes a b and f :: "real \<Rightarrow> 'a::{banach, second_countable_topology}"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	451	shows "(\<And>x. min a b \<le> x \<Longrightarrow> x \<le> max a b \<Longrightarrow> isCont f x) \<Longrightarrow>
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	452	interval_lebesgue_integrable lborel a b f"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	453	proof (induct a b rule: linorder_wlog)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	454	case (le a b) then show ?case
67974 3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	455	unfolding interval_lebesgue_integrable_def set_integrable_def
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	456	by (auto simp: interval_lebesgue_integrable_def
67974 3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	457	intro!: set_integrable_subset[unfolded set_integrable_def, OF borel_integrable_compact[of "{a .. b}"]]
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	458	continuous_at_imp_continuous_on)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	459	qed (auto intro: interval_integrable_endpoints_reverse[THEN iffD1])
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	460
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	461	lemma interval_integrable_continuous_on:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	462	fixes a b :: real and f
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	463	assumes "a \<le> b" and "continuous_on {a..b} f"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	464	shows "interval_lebesgue_integrable lborel a b f"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	465	using assms unfolding interval_lebesgue_integrable_def apply simp
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	466	by (rule set_integrable_subset, rule borel_integrable_atLeastAtMost' [of a b], auto)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	467
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	468	lemma interval_integral_eq_integral:
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	469	fixes f :: "real \<Rightarrow> 'a::euclidean_space"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	470	shows "a \<le> b \<Longrightarrow> set_integrable lborel {a..b} f \<Longrightarrow> LBINT x=a..b. f x = integral {a..b} f"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	471	by (subst interval_integral_Icc, simp) (rule set_borel_integral_eq_integral)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	472
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	473	lemma interval_integral_eq_integral':
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	474	fixes f :: "real \<Rightarrow> 'a::euclidean_space"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	475	shows "a \<le> b \<Longrightarrow> set_integrable lborel (einterval a b) f \<Longrightarrow> LBINT x=a..b. f x = integral (einterval a b) f"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	476	by (subst interval_lebesgue_integral_le_eq, simp) (rule set_borel_integral_eq_integral)
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	477
67974 3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	478
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	479	subsection\<open>General limit approximation arguments\<close>
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	480
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	481	lemma interval_integral_Icc_approx_nonneg:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	482	fixes a b :: ereal
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	483	assumes "a < b"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	484	fixes u l :: "nat \<Rightarrow> real"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	485	assumes approx: "einterval a b = (\<Union>i. {l i .. u i})"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	486	"incseq u" "decseq l" "\<And>i. l i < u i" "\<And>i. a < l i" "\<And>i. u i < b"
61969 e01015e49041 more symbols; wenzelm parents: 61945 diff changeset	487	"l \<longlonglongrightarrow> a" "u \<longlonglongrightarrow> b"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	488	fixes f :: "real \<Rightarrow> real"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	489	assumes f_integrable: "\<And>i. set_integrable lborel {l i..u i} f"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	490	assumes f_nonneg: "AE x in lborel. a < ereal x \<longrightarrow> ereal x < b \<longrightarrow> 0 \<le> f x"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	491	assumes f_measurable: "set_borel_measurable lborel (einterval a b) f"
61969 e01015e49041 more symbols; wenzelm parents: 61945 diff changeset	492	assumes lbint_lim: "(\<lambda>i. LBINT x=l i.. u i. f x) \<longlonglongrightarrow> C"
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	493	shows
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	494	"set_integrable lborel (einterval a b) f"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	495	"(LBINT x=a..b. f x) = C"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	496	proof -
67974 3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	497	have 1 [unfolded set_integrable_def]: "\<And>i. set_integrable lborel {l i..u i} f" by (rule f_integrable)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	498	have 2: "AE x in lborel. mono (\<lambda>n. indicator {l n..u n} x *\<^sub>R f x)"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	499	proof -
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	500	from f_nonneg have "AE x in lborel. \<forall>i. l i \<le> x \<longrightarrow> x \<le> u i \<longrightarrow> 0 \<le> f x"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	501	by eventually_elim
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	502	(metis approx(5) approx(6) dual_order.strict_trans1 ereal_less_eq(3) le_less_trans)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	503	then show ?thesis
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	504	apply eventually_elim
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	505	apply (auto simp: mono_def split: split_indicator)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	506	apply (metis approx(3) decseqD order_trans)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	507	apply (metis approx(2) incseqD order_trans)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	508	done
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	509	qed
61969 e01015e49041 more symbols; wenzelm parents: 61945 diff changeset	510	have 3: "AE x in lborel. (\<lambda>i. indicator {l i..u i} x \<^sub>R f x) \<longlonglongrightarrow> indicator (einterval a b) x \<^sub>R f x"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	511	proof -
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	512	{ fix x i assume "l i \<le> x" "x \<le> u i"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	513	then have "eventually (\<lambda>i. l i \<le> x \<and> x \<le> u i) sequentially"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	514	apply (auto simp: eventually_sequentially intro!: exI[of _ i])
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	515	apply (metis approx(3) decseqD order_trans)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	516	apply (metis approx(2) incseqD order_trans)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	517	done
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	518	then have "eventually (\<lambda>i. f x * indicator {l i..u i} x = f x) sequentially"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	519	by eventually_elim auto }
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	520	then show ?thesis
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	521	unfolding approx(1) by (auto intro!: AE_I2 Lim_eventually split: split_indicator)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	522	qed
61969 e01015e49041 more symbols; wenzelm parents: 61945 diff changeset	523	have 4: "(\<lambda>i. \<integral> x. indicator {l i..u i} x *\<^sub>R f x \<partial>lborel) \<longlonglongrightarrow> C"
67974 3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	524	using lbint_lim by (simp add: interval_integral_Icc [unfolded set_lebesgue_integral_def] approx less_imp_le)
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	525	have 5: "(\<lambda>x. indicat_real (einterval a b) x *\<^sub>R f x) \<in> borel_measurable lborel"
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	526	using f_measurable set_borel_measurable_def by blast
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	527	have "(LBINT x=a..b. f x) = lebesgue_integral lborel (\<lambda>x. indicator (einterval a b) x *\<^sub>R f x)"
67974 3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	528	using assms by (simp add: interval_lebesgue_integral_def set_lebesgue_integral_def less_imp_le)
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	529	also have "\<dots> = C"
67974 3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	530	by (rule integral_monotone_convergence [OF 1 2 3 4 5])
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	531	finally show "(LBINT x=a..b. f x) = C" .
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	532	show "set_integrable lborel (einterval a b) f"
67974 3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	533	unfolding set_integrable_def
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	534	by (rule integrable_monotone_convergence[OF 1 2 3 4 5])
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	535	qed
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	536
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	537	lemma interval_integral_Icc_approx_integrable:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	538	fixes u l :: "nat \<Rightarrow> real" and a b :: ereal
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	539	fixes f :: "real \<Rightarrow> 'a::{banach, second_countable_topology}"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	540	assumes "a < b"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	541	assumes approx: "einterval a b = (\<Union>i. {l i .. u i})"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	542	"incseq u" "decseq l" "\<And>i. l i < u i" "\<And>i. a < l i" "\<And>i. u i < b"
61969 e01015e49041 more symbols; wenzelm parents: 61945 diff changeset	543	"l \<longlonglongrightarrow> a" "u \<longlonglongrightarrow> b"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	544	assumes f_integrable: "set_integrable lborel (einterval a b) f"
61969 e01015e49041 more symbols; wenzelm parents: 61945 diff changeset	545	shows "(\<lambda>i. LBINT x=l i.. u i. f x) \<longlonglongrightarrow> (LBINT x=a..b. f x)"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	546	proof -
61969 e01015e49041 more symbols; wenzelm parents: 61945 diff changeset	547	have "(\<lambda>i. LBINT x:{l i.. u i}. f x) \<longlonglongrightarrow> (LBINT x:einterval a b. f x)"
67974 3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	548	unfolding set_lebesgue_integral_def
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	549	proof (rule integral_dominated_convergence)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	550	show "integrable lborel (\<lambda>x. norm (indicator (einterval a b) x *\<^sub>R f x))"
67974 3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	551	using f_integrable integrable_norm set_integrable_def by blast
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	552	show "(\<lambda>x. indicat_real (einterval a b) x *\<^sub>R f x) \<in> borel_measurable lborel"
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	553	using f_integrable by (simp add: set_integrable_def)
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	554	then show "\<And>i. (\<lambda>x. indicat_real {l i..u i} x *\<^sub>R f x) \<in> borel_measurable lborel"
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	555	by (rule set_borel_measurable_subset [unfolded set_borel_measurable_def]) (auto simp: approx)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	556	show "\<And>i. AE x in lborel. norm (indicator {l i..u i} x \<^sub>R f x) \<le> norm (indicator (einterval a b) x \<^sub>R f x)"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	557	by (intro AE_I2) (auto simp: approx split: split_indicator)
61969 e01015e49041 more symbols; wenzelm parents: 61945 diff changeset	558	show "AE x in lborel. (\<lambda>i. indicator {l i..u i} x \<^sub>R f x) \<longlonglongrightarrow> indicator (einterval a b) x \<^sub>R f x"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	559	proof (intro AE_I2 tendsto_intros Lim_eventually)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	560	fix x
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	561	{ fix i assume "l i \<le> x" "x \<le> u i"
61808 fc1556774cfe isabelle update_cartouches -c -t; wenzelm parents: 61609 diff changeset	562	with \<open>incseq u\<close>[THEN incseqD, of i] \<open>decseq l\<close>[THEN decseqD, of i]
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	563	have "eventually (\<lambda>i. l i \<le> x \<and> x \<le> u i) sequentially"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	564	by (auto simp: eventually_sequentially decseq_def incseq_def intro: order_trans) }
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	565	then show "eventually (\<lambda>xa. indicator {l xa..u xa} x = (indicator (einterval a b) x::real)) sequentially"
61969 e01015e49041 more symbols; wenzelm parents: 61945 diff changeset	566	using approx order_tendstoD(2)[OF \<open>l \<longlonglongrightarrow> a\<close>, of x] order_tendstoD(1)[OF \<open>u \<longlonglongrightarrow> b\<close>, of x]
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	567	by (auto split: split_indicator)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	568	qed
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	569	qed
61808 fc1556774cfe isabelle update_cartouches -c -t; wenzelm parents: 61609 diff changeset	570	with \<open>a < b\<close> \<open>\<And>i. l i < u i\<close> show ?thesis
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	571	by (simp add: interval_lebesgue_integral_le_eq[symmetric] interval_integral_Icc less_imp_le)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	572	qed
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	573
67974 3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	574	subsection\<open>A slightly stronger Fundamental Theorem of Calculus\<close>
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	575
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	576	text\<open>Three versions: first, for finite intervals, and then two versions for
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	577	arbitrary intervals.\<close>
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	578
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	579	(*
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	580	TODO: make the older versions corollaries of these (using continuous_at_imp_continuous_on, etc.)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	581	*)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	582
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	583	lemma interval_integral_FTC_finite:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	584	fixes f F :: "real \<Rightarrow> 'a::euclidean_space" and a b :: real
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	585	assumes f: "continuous_on {min a b..max a b} f"
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	586	assumes F: "\<And>x. min a b \<le> x \<Longrightarrow> x \<le> max a b \<Longrightarrow> (F has_vector_derivative (f x)) (at x within
6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	587	{min a b..max a b})"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	588	shows "(LBINT x=a..b. f x) = F b - F a"
67974 3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	589	proof (cases "a \<le> b")
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	590	case True
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	591	have "(LBINT x=a..b. f x) = (LBINT x. indicat_real {a..b} x *\<^sub>R f x)"
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	592	by (simp add: True interval_integral_Icc set_lebesgue_integral_def)
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	593	also have "\<dots> = F b - F a"
67974 3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	594	proof (rule integral_FTC_atLeastAtMost [OF True])
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	595	show "continuous_on {a..b} f"
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	596	using True f by linarith
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	597	show "\<And>x. \<lbrakk>a \<le> x; x \<le> b\<rbrakk> \<Longrightarrow> (F has_vector_derivative f x) (at x within {a..b})"
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	598	by (metis F True max.commute max_absorb1 min_def)
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	599	qed
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	600	finally show ?thesis .
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	601	next
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	602	case False
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	603	then have "b \<le> a"
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	604	by simp
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	605	have "- interval_lebesgue_integral lborel (ereal b) (ereal a) f = - (LBINT x. indicat_real {b..a} x *\<^sub>R f x)"
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	606	by (simp add: \<open>b \<le> a\<close> interval_integral_Icc set_lebesgue_integral_def)
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	607	also have "\<dots> = F b - F a"
67974 3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	608	proof (subst integral_FTC_atLeastAtMost [OF \<open>b \<le> a\<close>])
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	609	show "continuous_on {b..a} f"
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	610	using False f by linarith
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	611	show "\<And>x. \<lbrakk>b \<le> x; x \<le> a\<rbrakk>
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	612	\<Longrightarrow> (F has_vector_derivative f x) (at x within {b..a})"
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	613	by (metis F False max_def min_def)
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	614	qed auto
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	615	finally show ?thesis
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	616	by (metis interval_integral_endpoints_reverse)
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	617	qed
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	618
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	619
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	620	lemma interval_integral_FTC_nonneg:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	621	fixes f F :: "real \<Rightarrow> real" and a b :: ereal
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	622	assumes "a < b"
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	623	assumes F: "\<And>x. a < ereal x \<Longrightarrow> ereal x < b \<Longrightarrow> DERIV F x :> f x"
6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	624	assumes f: "\<And>x. a < ereal x \<Longrightarrow> ereal x < b \<Longrightarrow> isCont f x"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	625	assumes f_nonneg: "AE x in lborel. a < ereal x \<longrightarrow> ereal x < b \<longrightarrow> 0 \<le> f x"
61973 0c7e865fa7cb more symbols; wenzelm parents: 61969 diff changeset	626	assumes A: "((F \<circ> real_of_ereal) \<longlongrightarrow> A) (at_right a)"
0c7e865fa7cb more symbols; wenzelm parents: 61969 diff changeset	627	assumes B: "((F \<circ> real_of_ereal) \<longlongrightarrow> B) (at_left b)"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	628	shows
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	629	"set_integrable lborel (einterval a b) f"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	630	"(LBINT x=a..b. f x) = B - A"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	631	proof -
68095 4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	632	obtain u l where approx:
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	633	"einterval a b = (\<Union>i. {l i .. u i})"
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	634	"incseq u" "decseq l" "\<And>i. l i < u i" "\<And>i. a < l i" "\<And>i. u i < b"
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	635	"l \<longlonglongrightarrow> a" "u \<longlonglongrightarrow> b"
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	636	by (blast intro: einterval_Icc_approximation[OF \<open>a < b\<close>])
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	637	have [simp]: "\<And>x i. l i \<le> x \<Longrightarrow> a < ereal x"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	638	by (rule order_less_le_trans, rule approx, force)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	639	have [simp]: "\<And>x i. x \<le> u i \<Longrightarrow> ereal x < b"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	640	by (rule order_le_less_trans, subst ereal_less_eq(3), assumption, rule approx)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	641	have FTCi: "\<And>i. (LBINT x=l i..u i. f x) = F (u i) - F (l i)"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	642	using assms approx apply (intro interval_integral_FTC_finite)
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	643	apply (auto simp: less_imp_le min_def max_def
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	644	has_field_derivative_iff_has_vector_derivative[symmetric])
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	645	apply (rule continuous_at_imp_continuous_on, auto intro!: f)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	646	by (rule DERIV_subset [OF F], auto)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	647	have 1: "\<And>i. set_integrable lborel {l i..u i} f"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	648	proof -
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	649	fix i show "set_integrable lborel {l i .. u i} f"
67974 3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	650	using \<open>a < l i\<close> \<open>u i < b\<close> unfolding set_integrable_def
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	651	by (intro borel_integrable_compact f continuous_at_imp_continuous_on compact_Icc ballI)
68403 223172b97d0b reorient -> split; documented split nipkow parents: 68096 diff changeset	652	(auto simp flip: ereal_less_eq)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	653	qed
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	654	have 2: "set_borel_measurable lborel (einterval a b) f"
67974 3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	655	unfolding set_borel_measurable_def
66164 2d79288b042c New theorems and much tidying up of the old ones paulson <lp15@cam.ac.uk> parents: 63941 diff changeset	656	by (auto simp del: real_scaleR_def intro!: borel_measurable_continuous_on_indicator
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	657	simp: continuous_on_eq_continuous_at einterval_iff f)
61969 e01015e49041 more symbols; wenzelm parents: 61945 diff changeset	658	have 3: "(\<lambda>i. LBINT x=l i..u i. f x) \<longlonglongrightarrow> B - A"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	659	apply (subst FTCi)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	660	apply (intro tendsto_intros)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	661	using B approx unfolding tendsto_at_iff_sequentially comp_def
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	662	using tendsto_at_iff_sequentially[where 'a=real]
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	663	apply (elim allE[of _ "\<lambda>i. ereal (u i)"], auto)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	664	using A approx unfolding tendsto_at_iff_sequentially comp_def
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	665	by (elim allE[of _ "\<lambda>i. ereal (l i)"], auto)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	666	show "(LBINT x=a..b. f x) = B - A"
61808 fc1556774cfe isabelle update_cartouches -c -t; wenzelm parents: 61609 diff changeset	667	by (rule interval_integral_Icc_approx_nonneg [OF \<open>a < b\<close> approx 1 f_nonneg 2 3])
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	668	show "set_integrable lborel (einterval a b) f"
61808 fc1556774cfe isabelle update_cartouches -c -t; wenzelm parents: 61609 diff changeset	669	by (rule interval_integral_Icc_approx_nonneg [OF \<open>a < b\<close> approx 1 f_nonneg 2 3])
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	670	qed
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	671
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	672	lemma interval_integral_FTC_integrable:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	673	fixes f F :: "real \<Rightarrow> 'a::euclidean_space" and a b :: ereal
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	674	assumes "a < b"
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	675	assumes F: "\<And>x. a < ereal x \<Longrightarrow> ereal x < b \<Longrightarrow> (F has_vector_derivative f x) (at x)"
6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	676	assumes f: "\<And>x. a < ereal x \<Longrightarrow> ereal x < b \<Longrightarrow> isCont f x"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	677	assumes f_integrable: "set_integrable lborel (einterval a b) f"
61973 0c7e865fa7cb more symbols; wenzelm parents: 61969 diff changeset	678	assumes A: "((F \<circ> real_of_ereal) \<longlongrightarrow> A) (at_right a)"
0c7e865fa7cb more symbols; wenzelm parents: 61969 diff changeset	679	assumes B: "((F \<circ> real_of_ereal) \<longlongrightarrow> B) (at_left b)"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	680	shows "(LBINT x=a..b. f x) = B - A"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	681	proof -
68095 4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	682	obtain u l where approx:
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	683	"einterval a b = (\<Union>i. {l i .. u i})"
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	684	"incseq u" "decseq l" "\<And>i. l i < u i" "\<And>i. a < l i" "\<And>i. u i < b"
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	685	"l \<longlonglongrightarrow> a" "u \<longlonglongrightarrow> b"
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	686	by (blast intro: einterval_Icc_approximation[OF \<open>a < b\<close>])
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	687	have [simp]: "\<And>x i. l i \<le> x \<Longrightarrow> a < ereal x"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	688	by (rule order_less_le_trans, rule approx, force)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	689	have [simp]: "\<And>x i. x \<le> u i \<Longrightarrow> ereal x < b"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	690	by (rule order_le_less_trans, subst ereal_less_eq(3), assumption, rule approx)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	691	have FTCi: "\<And>i. (LBINT x=l i..u i. f x) = F (u i) - F (l i)"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	692	using assms approx
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	693	by (auto simp: less_imp_le min_def max_def
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	694	intro!: f continuous_at_imp_continuous_on interval_integral_FTC_finite
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	695	intro: has_vector_derivative_at_within)
61969 e01015e49041 more symbols; wenzelm parents: 61945 diff changeset	696	have "(\<lambda>i. LBINT x=l i..u i. f x) \<longlonglongrightarrow> B - A"
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	697	unfolding FTCi
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	698	proof (intro tendsto_intros)
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	699	show "(\<lambda>x. F (l x)) \<longlonglongrightarrow> A"
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	700	using A approx unfolding tendsto_at_iff_sequentially comp_def
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	701	by (elim allE[of _ "\<lambda>i. ereal (l i)"], auto)
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	702	show "(\<lambda>x. F (u x)) \<longlonglongrightarrow> B"
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	703	using B approx unfolding tendsto_at_iff_sequentially comp_def
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	704	by (elim allE[of _ "\<lambda>i. ereal (u i)"], auto)
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	705	qed
61969 e01015e49041 more symbols; wenzelm parents: 61945 diff changeset	706	moreover have "(\<lambda>i. LBINT x=l i..u i. f x) \<longlonglongrightarrow> (LBINT x=a..b. f x)"
61808 fc1556774cfe isabelle update_cartouches -c -t; wenzelm parents: 61609 diff changeset	707	by (rule interval_integral_Icc_approx_integrable [OF \<open>a < b\<close> approx f_integrable])
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	708	ultimately show ?thesis
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	709	by (elim LIMSEQ_unique)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	710	qed
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	711
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	712	(*
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	713	The second Fundamental Theorem of Calculus and existence of antiderivatives on an
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	714	einterval.
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	715	*)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	716
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	717	lemma interval_integral_FTC2:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	718	fixes a b c :: real and f :: "real \<Rightarrow> 'a::euclidean_space"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	719	assumes "a \<le> c" "c \<le> b"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	720	and contf: "continuous_on {a..b} f"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	721	fixes x :: real
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	722	assumes "a \<le> x" and "x \<le> b"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	723	shows "((\<lambda>u. LBINT y=c..u. f y) has_vector_derivative (f x)) (at x within {a..b})"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	724	proof -
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	725	let ?F = "(\<lambda>u. LBINT y=a..u. f y)"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	726	have intf: "set_integrable lborel {a..b} f"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	727	by (rule borel_integrable_atLeastAtMost', rule contf)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	728	have "((\<lambda>u. integral {a..u} f) has_vector_derivative f x) (at x within {a..b})"
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	729	using \<open>a \<le> x\<close> \<open>x \<le> b\<close>
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	730	by (auto intro: integral_has_vector_derivative continuous_on_subset [OF contf])
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	731	then have "((\<lambda>u. integral {a..u} f) has_vector_derivative (f x)) (at x within {a..b})"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	732	by simp
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	733	then have "(?F has_vector_derivative (f x)) (at x within {a..b})"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	734	by (rule has_vector_derivative_weaken)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	735	(auto intro!: assms interval_integral_eq_integral[symmetric] set_integrable_subset [OF intf])
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	736	then have "((\<lambda>x. (LBINT y=c..a. f y) + ?F x) has_vector_derivative (f x)) (at x within {a..b})"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	737	by (auto intro!: derivative_eq_intros)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	738	then show ?thesis
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	739	proof (rule has_vector_derivative_weaken)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	740	fix u assume "u \<in> {a .. b}"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	741	then show "(LBINT y=c..a. f y) + (LBINT y=a..u. f y) = (LBINT y=c..u. f y)"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	742	using assms
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	743	apply (intro interval_integral_sum)
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	744	apply (auto simp: interval_lebesgue_integrable_def simp del: real_scaleR_def)
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	745	by (rule set_integrable_subset [OF intf], auto simp: min_def max_def)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	746	qed (insert assms, auto)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	747	qed
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	748
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	749	lemma einterval_antiderivative:
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	750	fixes a b :: ereal and f :: "real \<Rightarrow> 'a::euclidean_space"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	751	assumes "a < b" and contf: "\<And>x :: real. a < x \<Longrightarrow> x < b \<Longrightarrow> isCont f x"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	752	shows "\<exists>F. \<forall>x :: real. a < x \<longrightarrow> x < b \<longrightarrow> (F has_vector_derivative f x) (at x)"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	753	proof -
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	754	from einterval_nonempty [OF \<open>a < b\<close>] obtain c :: real where [simp]: "a < c" "c < b"
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	755	by (auto simp: einterval_def)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	756	let ?F = "(\<lambda>u. LBINT y=c..u. f y)"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	757	show ?thesis
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	758	proof (rule exI, clarsimp)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	759	fix x :: real
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	760	assume [simp]: "a < x" "x < b"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	761	have 1: "a < min c x" by simp
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	762	from einterval_nonempty [OF 1] obtain d :: real where [simp]: "a < d" "d < c" "d < x"
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	763	by (auto simp: einterval_def)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	764	have 2: "max c x < b" by simp
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	765	from einterval_nonempty [OF 2] obtain e :: real where [simp]: "c < e" "x < e" "e < b"
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	766	by (auto simp: einterval_def)
68095 4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	767	have "(?F has_vector_derivative f x) (at x within {d<..<e})"
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	768	proof (rule has_vector_derivative_within_subset [of _ _ _ "{d..e}"])
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	769	have "continuous_on {d..e} f"
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	770	proof (intro continuous_at_imp_continuous_on ballI contf; clarsimp)
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	771	show "\<And>x. \<lbrakk>d \<le> x; x \<le> e\<rbrakk> \<Longrightarrow> a < ereal x"
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	772	using \<open>a < ereal d\<close> ereal_less_ereal_Ex by auto
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	773	show "\<And>x. \<lbrakk>d \<le> x; x \<le> e\<rbrakk> \<Longrightarrow> ereal x < b"
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	774	using \<open>ereal e < b\<close> ereal_less_eq(3) le_less_trans by blast
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	775	qed
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	776	then show "(?F has_vector_derivative f x) (at x within {d..e})"
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	777	by (intro interval_integral_FTC2) (use \<open>d < c\<close> \<open>c < e\<close> \<open>d < x\<close> \<open>x < e\<close> in \<open>linarith+\<close>)
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	778	qed auto
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	779	then show "(?F has_vector_derivative f x) (at x)"
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	780	by (force simp: has_vector_derivative_within_open [of _ "{d<..<e}"])
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	781	qed
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	782	qed
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	783
67974 3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	784	subsection\<open>The substitution theorem\<close>
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	785
67974 3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	786	text\<open>Once again, three versions: first, for finite intervals, and then two versions for
3f352a91b45a replacement of set integral abbreviations by actual definitions! paulson <lp15@cam.ac.uk> parents: 66164 diff changeset	787	arbitrary intervals.\<close>
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	788
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	789	lemma interval_integral_substitution_finite:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	790	fixes a b :: real and f :: "real \<Rightarrow> 'a::euclidean_space"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	791	assumes "a \<le> b"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	792	and derivg: "\<And>x. a \<le> x \<Longrightarrow> x \<le> b \<Longrightarrow> (g has_real_derivative (g' x)) (at x within {a..b})"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	793	and contf : "continuous_on (g ` {a..b}) f"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	794	and contg': "continuous_on {a..b} g'"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	795	shows "LBINT x=a..b. g' x *\<^sub>R f (g x) = LBINT y=g a..g b. f y"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	796	proof-
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	797	have v_derivg: "\<And>x. a \<le> x \<Longrightarrow> x \<le> b \<Longrightarrow> (g has_vector_derivative (g' x)) (at x within {a..b})"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	798	using derivg unfolding has_field_derivative_iff_has_vector_derivative .
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	799	then have contg [simp]: "continuous_on {a..b} g"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	800	by (rule continuous_on_vector_derivative) auto
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	801	have 1: "\<exists>x\<in>{a..b}. u = g x" if "min (g a) (g b) \<le> u" "u \<le> max (g a) (g b)" for u
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	802	by (cases "g a \<le> g b") (use that assms IVT' [of g a u b] IVT2' [of g b u a] in \<open>auto simp: min_def max_def\<close>)
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	803	obtain c d where g_im: "g ` {a..b} = {c..d}" and "c \<le> d"
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	804	by (metis continuous_image_closed_interval contg \<open>a \<le> b\<close>)
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	805	obtain F where derivF:
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	806	"\<And>x. \<lbrakk>a \<le> x; x \<le> b\<rbrakk> \<Longrightarrow> (F has_vector_derivative (f (g x))) (at (g x) within (g ` {a..b}))"
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	807	using continuous_on_subset [OF contf] g_im
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	808	by (metis antiderivative_continuous atLeastAtMost_iff image_subset_iff set_eq_subset)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	809	have contfg: "continuous_on {a..b} (\<lambda>x. f (g x))"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	810	by (blast intro: continuous_on_compose2 contf contg)
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	811	have "LBINT x. indicat_real {a..b} x \<^sub>R g' x \<^sub>R f (g x) = F (g b) - F (g a)"
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	812	apply (rule integral_FTC_atLeastAtMost
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	813	[OF \<open>a \<le> b\<close> vector_diff_chain_within[OF v_derivg derivF, unfolded comp_def]])
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	814	apply (auto intro!: continuous_on_scaleR contg' contfg)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	815	done
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	816	then have "LBINT x=a..b. g' x *\<^sub>R f (g x) = F (g b) - F (g a)"
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	817	by (simp add: assms interval_integral_Icc set_lebesgue_integral_def)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	818	moreover have "LBINT y=(g a)..(g b). f y = F (g b) - F (g a)"
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	819	proof (rule interval_integral_FTC_finite)
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	820	show "continuous_on {min (g a) (g b)..max (g a) (g b)} f"
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	821	by (rule continuous_on_subset [OF contf]) (auto simp: image_def 1)
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	822	show "(F has_vector_derivative f y) (at y within {min (g a) (g b)..max (g a) (g b)})"
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	823	if y: "min (g a) (g b) \<le> y" "y \<le> max (g a) (g b)" for y
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	824	proof -
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	825	obtain x where "a \<le> x" "x \<le> b" "y = g x"
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	826	using 1 y by force
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	827	then show ?thesis
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	828	by (auto simp: image_def intro!: 1 has_vector_derivative_within_subset [OF derivF])
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	829	qed
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	830	qed
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	831	ultimately show ?thesis by simp
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	832	qed
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	833
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	834	(* TODO: is it possible to lift the assumption here that g' is nonnegative? *)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	835
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	836	lemma interval_integral_substitution_integrable:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	837	fixes f :: "real \<Rightarrow> 'a::euclidean_space" and a b u v :: ereal
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	838	assumes "a < b"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	839	and deriv_g: "\<And>x. a < ereal x \<Longrightarrow> ereal x < b \<Longrightarrow> DERIV g x :> g' x"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	840	and contf: "\<And>x. a < ereal x \<Longrightarrow> ereal x < b \<Longrightarrow> isCont f (g x)"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	841	and contg': "\<And>x. a < ereal x \<Longrightarrow> ereal x < b \<Longrightarrow> isCont g' x"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	842	and g'_nonneg: "\<And>x. a \<le> ereal x \<Longrightarrow> ereal x \<le> b \<Longrightarrow> 0 \<le> g' x"
61973 0c7e865fa7cb more symbols; wenzelm parents: 61969 diff changeset	843	and A: "((ereal \<circ> g \<circ> real_of_ereal) \<longlongrightarrow> A) (at_right a)"
0c7e865fa7cb more symbols; wenzelm parents: 61969 diff changeset	844	and B: "((ereal \<circ> g \<circ> real_of_ereal) \<longlongrightarrow> B) (at_left b)"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	845	and integrable: "set_integrable lborel (einterval a b) (\<lambda>x. g' x *\<^sub>R f (g x))"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	846	and integrable2: "set_integrable lborel (einterval A B) (\<lambda>x. f x)"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	847	shows "(LBINT x=A..B. f x) = (LBINT x=a..b. g' x *\<^sub>R f (g x))"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	848	proof -
68095 4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	849	obtain u l where approx [simp]:
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	850	"einterval a b = (\<Union>i. {l i .. u i})"
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	851	"incseq u" "decseq l" "\<And>i. l i < u i" "\<And>i. a < l i" "\<And>i. u i < b"
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	852	"l \<longlonglongrightarrow> a" "u \<longlonglongrightarrow> b"
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	853	by (blast intro: einterval_Icc_approximation[OF \<open>a < b\<close>])
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	854	note less_imp_le [simp]
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	855	have [simp]: "\<And>x i. l i \<le> x \<Longrightarrow> a < ereal x"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	856	by (rule order_less_le_trans, rule approx, force)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	857	have [simp]: "\<And>x i. x \<le> u i \<Longrightarrow> ereal x < b"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	858	by (rule order_le_less_trans, subst ereal_less_eq(3), assumption, rule approx)
68095 4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	859	then have lessb[simp]: "\<And>i. l i < b"
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	860	using approx(4) less_eq_real_def by blast
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	861	have [simp]: "\<And>i. a < u i"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	862	by (rule order_less_trans, rule approx, auto, rule approx)
68095 4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	863	have lle[simp]: "\<And>i j. i \<le> j \<Longrightarrow> l j \<le> l i" by (rule decseqD, rule approx)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	864	have [simp]: "\<And>i j. i \<le> j \<Longrightarrow> u i \<le> u j" by (rule incseqD, rule approx)
68095 4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	865	have g_nondec [simp]: "g x \<le> g y" if "a < x" "x \<le> y" "y < b" for x y
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	866	proof (rule DERIV_nonneg_imp_nondecreasing [OF \<open>x \<le> y\<close>], intro exI conjI allI impI)
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	867	show "\<And>u. x \<le> u \<and> u \<le> y \<Longrightarrow> (g has_real_derivative g' u) (at u)"
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	868	by (meson deriv_g ereal_less_eq(3) le_less_trans less_le_trans that)
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	869	show "\<And>u. x \<le> u \<and> u \<le> y \<Longrightarrow> 0 \<le> g' u"
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	870	by (meson assms(5) dual_order.trans le_ereal_le less_imp_le order_refl that)
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	871	qed
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	872	have "A \<le> B" and un: "einterval A B = (\<Union>i. {g(l i)<..<g(u i)})"
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	873	proof -
61969 e01015e49041 more symbols; wenzelm parents: 61945 diff changeset	874	have A2: "(\<lambda>i. g (l i)) \<longlonglongrightarrow> A"
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	875	using A apply (auto simp: einterval_def tendsto_at_iff_sequentially comp_def)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	876	by (drule_tac x = "\<lambda>i. ereal (l i)" in spec, auto)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	877	hence A3: "\<And>i. g (l i) \<ge> A"
68532 f8b98d31ad45 Incorporating new/strengthened proofs from Library and AFP entries paulson <lp15@cam.ac.uk> parents: 68403 diff changeset	878	by (intro decseq_ge, auto simp: decseq_def)
61969 e01015e49041 more symbols; wenzelm parents: 61945 diff changeset	879	have B2: "(\<lambda>i. g (u i)) \<longlonglongrightarrow> B"
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	880	using B apply (auto simp: einterval_def tendsto_at_iff_sequentially comp_def)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	881	by (drule_tac x = "\<lambda>i. ereal (u i)" in spec, auto)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	882	hence B3: "\<And>i. g (u i) \<le> B"
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	883	by (intro incseq_le, auto simp: incseq_def)
68095 4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	884	have "ereal (g (l 0)) \<le> ereal (g (u 0))"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	885	by auto
68095 4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	886	then show "A \<le> B"
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	887	by (meson A3 B3 order.trans)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	888	{ fix x :: real
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	889	assume "A < x" and "x < B"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	890	then have "eventually (\<lambda>i. ereal (g (l i)) < x \<and> x < ereal (g (u i))) sequentially"
68095 4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	891	by (fast intro: eventually_conj order_tendstoD A2 B2)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	892	hence "\<exists>i. g (l i) < x \<and> x < g (u i)"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	893	by (simp add: eventually_sequentially, auto)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	894	} note AB = this
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	895	show "einterval A B = (\<Union>i. {g(l i)<..<g(u i)})"
68095 4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	896	proof
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	897	show "einterval A B \<subseteq> (\<Union>i. {g(l i)<..<g(u i)})"
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	898	by (auto simp: einterval_def AB)
68095 4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	899	show "(\<Union>i. {g(l i)<..<g(u i)}) \<subseteq> einterval A B"
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	900	proof (clarsimp simp add: einterval_def, intro conjI)
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	901	show "\<And>x i. \<lbrakk>g (l i) < x; x < g (u i)\<rbrakk> \<Longrightarrow> A < ereal x"
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	902	using A3 le_ereal_less by blast
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	903	show "\<And>x i. \<lbrakk>g (l i) < x; x < g (u i)\<rbrakk> \<Longrightarrow> ereal x < B"
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	904	using B3 ereal_le_less by blast
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	905	qed
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	906	qed
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	907	qed
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	908	(* finally, the main argument *)
68095 4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	909	have eq1: "(LBINT x=l i.. u i. g' x *\<^sub>R f (g x)) = (LBINT y=g (l i)..g (u i). f y)" for i
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	910	apply (rule interval_integral_substitution_finite [OF _ DERIV_subset [OF deriv_g]])
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	911	unfolding has_field_derivative_iff_has_vector_derivative[symmetric]
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	912	apply (auto intro!: continuous_at_imp_continuous_on contf contg')
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	913	done
61969 e01015e49041 more symbols; wenzelm parents: 61945 diff changeset	914	have "(\<lambda>i. LBINT x=l i..u i. g' x \<^sub>R f (g x)) \<longlonglongrightarrow> (LBINT x=a..b. g' x \<^sub>R f (g x))"
61808 fc1556774cfe isabelle update_cartouches -c -t; wenzelm parents: 61609 diff changeset	915	apply (rule interval_integral_Icc_approx_integrable [OF \<open>a < b\<close> approx])
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	916	by (rule assms)
61969 e01015e49041 more symbols; wenzelm parents: 61945 diff changeset	917	hence 2: "(\<lambda>i. (LBINT y=g (l i)..g (u i). f y)) \<longlonglongrightarrow> (LBINT x=a..b. g' x *\<^sub>R f (g x))"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	918	by (simp add: eq1)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	919	have incseq: "incseq (\<lambda>i. {g (l i)<..<g (u i)})"
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	920	apply (auto simp: incseq_def)
68095 4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	921	using lessb lle approx(5) g_nondec le_less_trans apply blast
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	922	by (force intro: less_le_trans)
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	923	have "(\<lambda>i. set_lebesgue_integral lborel {g (l i)<..<g (u i)} f)
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	924	\<longlonglongrightarrow> set_lebesgue_integral lborel (einterval A B) f"
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	925	unfolding un by (rule set_integral_cont_up) (use incseq integrable2 un in auto)
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	926	then have "(\<lambda>i. (LBINT y=g (l i)..g (u i). f y)) \<longlonglongrightarrow> (LBINT x = A..B. f x)"
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	927	by (simp add: interval_lebesgue_integral_le_eq \<open>A \<le> B\<close>)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	928	thus ?thesis by (intro LIMSEQ_unique [OF _ 2])
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	929	qed
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	930
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	931	(* TODO: the last two proofs are only slightly different. Factor out common part?
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	932	An alternative: make the second one the main one, and then have another lemma
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	933	that says that if f is nonnegative and all the other hypotheses hold, then it is integrable. *)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	934
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	935	lemma interval_integral_substitution_nonneg:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	936	fixes f g g':: "real \<Rightarrow> real" and a b u v :: ereal
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	937	assumes "a < b"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	938	and deriv_g: "\<And>x. a < ereal x \<Longrightarrow> ereal x < b \<Longrightarrow> DERIV g x :> g' x"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	939	and contf: "\<And>x. a < ereal x \<Longrightarrow> ereal x < b \<Longrightarrow> isCont f (g x)"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	940	and contg': "\<And>x. a < ereal x \<Longrightarrow> ereal x < b \<Longrightarrow> isCont g' x"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	941	and f_nonneg: "\<And>x. a < ereal x \<Longrightarrow> ereal x < b \<Longrightarrow> 0 \<le> f (g x)" (* TODO: make this AE? *)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	942	and g'_nonneg: "\<And>x. a \<le> ereal x \<Longrightarrow> ereal x \<le> b \<Longrightarrow> 0 \<le> g' x"
61973 0c7e865fa7cb more symbols; wenzelm parents: 61969 diff changeset	943	and A: "((ereal \<circ> g \<circ> real_of_ereal) \<longlongrightarrow> A) (at_right a)"
0c7e865fa7cb more symbols; wenzelm parents: 61969 diff changeset	944	and B: "((ereal \<circ> g \<circ> real_of_ereal) \<longlongrightarrow> B) (at_left b)"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	945	and integrable_fg: "set_integrable lborel (einterval a b) (\<lambda>x. f (g x) * g' x)"
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	946	shows
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	947	"set_integrable lborel (einterval A B) f"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	948	"(LBINT x=A..B. f x) = (LBINT x=a..b. (f (g x) * g' x))"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	949	proof -
61808 fc1556774cfe isabelle update_cartouches -c -t; wenzelm parents: 61609 diff changeset	950	from einterval_Icc_approximation[OF \<open>a < b\<close>] guess u l . note approx [simp] = this
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	951	note less_imp_le [simp]
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	952	have aless[simp]: "\<And>x i. l i \<le> x \<Longrightarrow> a < ereal x"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	953	by (rule order_less_le_trans, rule approx, force)
68095 4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	954	have lessb[simp]: "\<And>x i. x \<le> u i \<Longrightarrow> ereal x < b"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	955	by (rule order_le_less_trans, subst ereal_less_eq(3), assumption, rule approx)
68095 4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	956	have llb[simp]: "\<And>i. l i < b"
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	957	using lessb approx(4) less_eq_real_def by blast
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	958	have alu[simp]: "\<And>i. a < u i"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	959	by (rule order_less_trans, rule approx, auto, rule approx)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	960	have [simp]: "\<And>i j. i \<le> j \<Longrightarrow> l j \<le> l i" by (rule decseqD, rule approx)
68095 4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	961	have uleu[simp]: "\<And>i j. i \<le> j \<Longrightarrow> u i \<le> u j" by (rule incseqD, rule approx)
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	962	have g_nondec [simp]: "g x \<le> g y" if "a < x" "x \<le> y" "y < b" for x y
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	963	proof (rule DERIV_nonneg_imp_nondecreasing [OF \<open>x \<le> y\<close>], intro exI conjI allI impI)
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	964	show "\<And>u. x \<le> u \<and> u \<le> y \<Longrightarrow> (g has_real_derivative g' u) (at u)"
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	965	by (meson deriv_g ereal_less_eq(3) le_less_trans less_le_trans that)
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	966	show "\<And>u. x \<le> u \<and> u \<le> y \<Longrightarrow> 0 \<le> g' u"
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	967	by (meson g'_nonneg less_ereal.simps(1) less_trans not_less that)
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	968	qed
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	969	have "A \<le> B" and un: "einterval A B = (\<Union>i. {g(l i)<..<g(u i)})"
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	970	proof -
61969 e01015e49041 more symbols; wenzelm parents: 61945 diff changeset	971	have A2: "(\<lambda>i. g (l i)) \<longlonglongrightarrow> A"
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	972	using A apply (auto simp: einterval_def tendsto_at_iff_sequentially comp_def)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	973	by (drule_tac x = "\<lambda>i. ereal (l i)" in spec, auto)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	974	hence A3: "\<And>i. g (l i) \<ge> A"
68532 f8b98d31ad45 Incorporating new/strengthened proofs from Library and AFP entries paulson <lp15@cam.ac.uk> parents: 68403 diff changeset	975	by (intro decseq_ge, auto simp: decseq_def)
61969 e01015e49041 more symbols; wenzelm parents: 61945 diff changeset	976	have B2: "(\<lambda>i. g (u i)) \<longlonglongrightarrow> B"
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	977	using B apply (auto simp: einterval_def tendsto_at_iff_sequentially comp_def)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	978	by (drule_tac x = "\<lambda>i. ereal (u i)" in spec, auto)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	979	hence B3: "\<And>i. g (u i) \<le> B"
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	980	by (intro incseq_le, auto simp: incseq_def)
68095 4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	981	have "ereal (g (l 0)) \<le> ereal (g (u 0))"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	982	by auto
68095 4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	983	then show "A \<le> B"
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	984	by (meson A3 B3 order.trans)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	985	{ fix x :: real
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	986	assume "A < x" and "x < B"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	987	then have "eventually (\<lambda>i. ereal (g (l i)) < x \<and> x < ereal (g (u i))) sequentially"
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	988	by (fast intro: eventually_conj order_tendstoD A2 B2)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	989	hence "\<exists>i. g (l i) < x \<and> x < g (u i)"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	990	by (simp add: eventually_sequentially, auto)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	991	} note AB = this
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	992	show "einterval A B = (\<Union>i. {g(l i)<..<g(u i)})"
68095 4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	993	proof
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	994	show "einterval A B \<subseteq> (\<Union>i. {g (l i)<..<g (u i)})"
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	995	by (auto simp: einterval_def AB)
68095 4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	996	show "(\<Union>i. {g (l i)<..<g (u i)}) \<subseteq> einterval A B"
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	997	apply (clarsimp simp: einterval_def, intro conjI)
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	998	using A3 le_ereal_less apply blast
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	999	using B3 ereal_le_less by blast
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	1000	qed
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1001	qed
68095 4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	1002	(* finally, the main argument *)
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	1003	have eq1: "(LBINT x=l i.. u i. (f (g x) * g' x)) = (LBINT y=g (l i)..g (u i). f y)" for i
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	1004	proof -
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	1005	have "(LBINT x=l i.. u i. g' x *\<^sub>R f (g x)) = (LBINT y=g (l i)..g (u i). f y)"
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	1006	apply (rule interval_integral_substitution_finite [OF _ DERIV_subset [OF deriv_g]])
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	1007	unfolding has_field_derivative_iff_has_vector_derivative[symmetric]
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	1008	apply (auto intro!: continuous_at_imp_continuous_on contf contg')
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	1009	done
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	1010	then show ?thesis
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	1011	by (simp add: ac_simps)
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	1012	qed
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1013	have incseq: "incseq (\<lambda>i. {g (l i)<..<g (u i)})"
68095 4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	1014	apply (clarsimp simp add: incseq_def, intro conjI)
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	1015	apply (meson llb antimono_def approx(3) approx(5) g_nondec le_less_trans)
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	1016	using alu uleu approx(6) g_nondec less_le_trans by blast
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	1017	have img: "\<exists>c \<ge> l i. c \<le> u i \<and> x = g c" if "g (l i) \<le> x" "x \<le> g (u i)" for x i
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	1018	proof -
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	1019	have "continuous_on {l i..u i} g"
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	1020	by (force intro!: DERIV_isCont deriv_g continuous_at_imp_continuous_on)
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	1021	with that show ?thesis
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	1022	using IVT' [of g] approx(4) dual_order.strict_implies_order by blast
4fa3e63ecc7e starting to tidy up Interval_Integral.thy paulson <lp15@cam.ac.uk> parents: 68046 diff changeset	1023	qed
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	1024	have "continuous_on {g (l i)..g (u i)} f" for i
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	1025	apply (intro continuous_intros continuous_at_imp_continuous_on)
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	1026	using contf img by force
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	1027	then have int_f: "\<And>i. set_integrable lborel {g (l i)<..<g (u i)} f"
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	1028	by (rule set_integrable_subset [OF borel_integrable_atLeastAtMost']) (auto intro: less_imp_le)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1029	have integrable: "set_integrable lborel (\<Union>i. {g (l i)<..<g (u i)}) f"
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	1030	proof (intro pos_integrable_to_top incseq int_f)
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	1031	let ?l = "(LBINT x=a..b. f (g x) * g' x)"
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	1032	have "(\<lambda>i. LBINT x=l i..u i. f (g x) * g' x) \<longlonglongrightarrow> ?l"
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	1033	by (intro assms interval_integral_Icc_approx_integrable [OF \<open>a < b\<close> approx])
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	1034	hence "(\<lambda>i. (LBINT y=g (l i)..g (u i). f y)) \<longlonglongrightarrow> ?l"
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	1035	by (simp add: eq1)
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	1036	then show "(\<lambda>i. set_lebesgue_integral lborel {g (l i)<..<g (u i)} f) \<longlonglongrightarrow> ?l"
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	1037	unfolding interval_lebesgue_integral_def by auto
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	1038	have "\<And>x i. g (l i) \<le> x \<Longrightarrow> x \<le> g (u i) \<Longrightarrow> 0 \<le> f x"
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	1039	using aless f_nonneg img lessb by blast
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	1040	then show "\<And>x i. x \<in> {g (l i)<..<g (u i)} \<Longrightarrow> 0 \<le> f x"
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	1041	using less_eq_real_def by auto
e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	1042	qed (auto simp: greaterThanLessThan_borel)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1043	thus "set_integrable lborel (einterval A B) f"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1044	by (simp add: un)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1045
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1046	have "(LBINT x=A..B. f x) = (LBINT x=a..b. g' x *\<^sub>R f (g x))"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1047	proof (rule interval_integral_substitution_integrable)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1048	show "set_integrable lborel (einterval a b) (\<lambda>x. g' x *\<^sub>R f (g x))"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1049	using integrable_fg by (simp add: ac_simps)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1050	qed fact+
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1051	then show "(LBINT x=A..B. f x) = (LBINT x=a..b. (f (g x) * g' x))"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1052	by (simp add: ac_simps)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1053	qed
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1054
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1055
63941 f353674c2528 move absolutely_integrable_on to Equivalence_Lebesgue_Henstock_Integration, now based on the Lebesgue integral hoelzl parents: 63886 diff changeset	1056	syntax "_complex_lebesgue_borel_integral" :: "pttrn \<Rightarrow> real \<Rightarrow> complex"
f353674c2528 move absolutely_integrable_on to Equivalence_Lebesgue_Henstock_Integration, now based on the Lebesgue integral hoelzl parents: 63886 diff changeset	1057	("(2CLBINT _. _)" [0,60] 60)
f353674c2528 move absolutely_integrable_on to Equivalence_Lebesgue_Henstock_Integration, now based on the Lebesgue integral hoelzl parents: 63886 diff changeset	1058
f353674c2528 move absolutely_integrable_on to Equivalence_Lebesgue_Henstock_Integration, now based on the Lebesgue integral hoelzl parents: 63886 diff changeset	1059	translations "CLBINT x. f" == "CONST complex_lebesgue_integral CONST lborel (\<lambda>x. f)"
f353674c2528 move absolutely_integrable_on to Equivalence_Lebesgue_Henstock_Integration, now based on the Lebesgue integral hoelzl parents: 63886 diff changeset	1060
f353674c2528 move absolutely_integrable_on to Equivalence_Lebesgue_Henstock_Integration, now based on the Lebesgue integral hoelzl parents: 63886 diff changeset	1061	syntax "_complex_set_lebesgue_borel_integral" :: "pttrn \<Rightarrow> real set \<Rightarrow> real \<Rightarrow> complex"
f353674c2528 move absolutely_integrable_on to Equivalence_Lebesgue_Henstock_Integration, now based on the Lebesgue integral hoelzl parents: 63886 diff changeset	1062	("(3CLBINT _:_. _)" [0,60,61] 60)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1063
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1064	translations
63941 f353674c2528 move absolutely_integrable_on to Equivalence_Lebesgue_Henstock_Integration, now based on the Lebesgue integral hoelzl parents: 63886 diff changeset	1065	"CLBINT x:A. f" == "CONST complex_set_lebesgue_integral CONST lborel A (\<lambda>x. f)"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1066
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	1067	abbreviation complex_interval_lebesgue_integral ::
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1068	"real measure \<Rightarrow> ereal \<Rightarrow> ereal \<Rightarrow> (real \<Rightarrow> complex) \<Rightarrow> complex" where
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1069	"complex_interval_lebesgue_integral M a b f \<equiv> interval_lebesgue_integral M a b f"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1070
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	1071	abbreviation complex_interval_lebesgue_integrable ::
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1072	"real measure \<Rightarrow> ereal \<Rightarrow> ereal \<Rightarrow> (real \<Rightarrow> complex) \<Rightarrow> bool" where
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1073	"complex_interval_lebesgue_integrable M a b f \<equiv> interval_lebesgue_integrable M a b f"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1074
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1075	syntax
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1076	"_ascii_complex_interval_lebesgue_borel_integral" :: "pttrn \<Rightarrow> ereal \<Rightarrow> ereal \<Rightarrow> real \<Rightarrow> complex"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1077	("(4CLBINT _=_.._. _)" [0,60,60,61] 60)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1078
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1079	translations
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1080	"CLBINT x=a..b. f" == "CONST complex_interval_lebesgue_integral CONST lborel a b (\<lambda>x. f)"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1081
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1082	lemma interval_integral_norm:
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1083	fixes f :: "real \<Rightarrow> 'a :: {banach, second_countable_topology}"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1084	shows "interval_lebesgue_integrable lborel a b f \<Longrightarrow> a \<le> b \<Longrightarrow>
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1085	norm (LBINT t=a..b. f t) \<le> LBINT t=a..b. norm (f t)"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1086	using integral_norm_bound[of lborel "\<lambda>x. indicator (einterval a b) x *\<^sub>R f x"]
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	1087	by (auto simp: interval_lebesgue_integral_def interval_lebesgue_integrable_def set_lebesgue_integral_def)
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1088
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1089	lemma interval_integral_norm2:
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	1090	"interval_lebesgue_integrable lborel a b f \<Longrightarrow>
61945 1135b8de26c3 more symbols; wenzelm parents: 61897 diff changeset	1091	norm (LBINT t=a..b. f t) \<le> \<bar>LBINT t=a..b. norm (f t)\<bar>"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1092	proof (induct a b rule: linorder_wlog)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1093	case (sym a b) then show ?case
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1094	by (simp add: interval_integral_endpoints_reverse[of a b] interval_integrable_endpoints_reverse[of a b])
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1095	next
63329 6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	1096	case (le a b)
6b26c378ab35 Probability: tuned headers; cleanup Radon_Nikodym hoelzl parents: 63092 diff changeset	1097	then have "\<bar>LBINT t=a..b. norm (f t)\<bar> = LBINT t=a..b. norm (f t)"
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1098	using integrable_norm[of lborel "\<lambda>x. indicator (einterval a b) x *\<^sub>R f x"]
68096 e58c9ac761cb more tidying paulson <lp15@cam.ac.uk> parents: 68095 diff changeset	1099	by (auto simp: interval_lebesgue_integral_def interval_lebesgue_integrable_def set_lebesgue_integral_def
59092 d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1100	intro!: integral_nonneg_AE abs_of_nonneg)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1101	then show ?case
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1102	using le by (simp add: interval_integral_norm)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1103	qed
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1104
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1105	(* TODO: should we have a library of facts like these? *)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1106	lemma integral_cos: "t \<noteq> 0 \<Longrightarrow> LBINT x=a..b. cos (t * x) = sin (t * b) / t - sin (t * a) / t"
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1107	apply (intro interval_integral_FTC_finite continuous_intros)
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1108	by (auto intro!: derivative_eq_intros simp: has_field_derivative_iff_has_vector_derivative[symmetric])
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1109
d469103c0737 add integral substitution theorems from Manuel Eberl, Jeremy Avigad, Luke Serafin, and Sudeep Kanav hoelzl parents: diff changeset	1110	end

author	paulson <lp15@cam.ac.uk>
	Thu, 28 Jun 2018 17:14:40 +0100
changeset 68532	f8b98d31ad45
parent 68403	223172b97d0b
child 68638	87d1bff264df
permissions	-rw-r--r--