isabelle: src/HOL/Multivariate_Analysis/Convex_Euclidean

41959 b460124855b8 tuned headers; wenzelm parents: 41413 diff changeset	1	(* Title: HOL/Multivariate_Analysis/Convex_Euclidean_Space.thy
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2	Author: Robert Himmelmann, TU Muenchen
40887 ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	3	Author: Bogdan Grechuk, University of Edinburgh
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4	*)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	5
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	6	header {* Convex sets, functions and related things. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	7
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	8	theory Convex_Euclidean_Space
41413 64cd30d6b0b8 explicit file specifications -- avoid secondary load path; wenzelm parents: 40897 diff changeset	9	imports Topology_Euclidean_Space Convex "~~/src/HOL/Library/Set_Algebras"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	10	begin
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	11
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	12
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	13	(* ------------------------------------------------------------------------- *)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	14	(* To be moved elsewhere *)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	15	(* ------------------------------------------------------------------------- *)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	16
40377 0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	17	lemma linear_scaleR: "linear (%(x :: 'n::euclidean_space). scaleR c x)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	18	by (metis linear_conv_bounded_linear scaleR.bounded_linear_right)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	19
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	20	lemma injective_scaleR:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	21	assumes "(c :: real) ~= 0"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	22	shows "inj (%(x :: 'n::euclidean_space). scaleR c x)"
40719 acb830207103 keep private things private, without comments; wenzelm parents: 40377 diff changeset	23	by (metis assms injI real_vector.scale_cancel_left)
40377 0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	24
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	25	lemma linear_add_cmul:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	26	fixes f :: "('m::euclidean_space) => ('n::euclidean_space)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	27	assumes "linear f"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	28	shows "f(a \<^sub>R x + b \<^sub>R y) = a \<^sub>R f x + b \<^sub>R f y"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	29	using linear_add[of f] linear_cmul[of f] assms by (simp)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	30
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	31	lemma mem_convex_2:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	32	assumes "convex S" "x : S" "y : S" "u>=0" "v>=0" "u+v=1"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	33	shows "(u \<^sub>R x + v \<^sub>R y) : S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	34	using assms convex_def[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	35
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	36	lemma mem_convex_alt:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	37	assumes "convex S" "x : S" "y : S" "u>=0" "v>=0" "u+v>0"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	38	shows "((u/(u+v)) \<^sub>R x + (v/(u+v)) \<^sub>R y) : S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	39	apply (subst mem_convex_2)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	40	using assms apply (auto simp add: algebra_simps zero_le_divide_iff)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	41	using add_divide_distrib[of u v "u+v"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	42
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	43	lemma card_ge1: assumes "d ~= {}" "finite d" shows "card d >= 1"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	44	by (metis Suc_eq_plus1 assms(1) assms(2) card_eq_0_iff fact_ge_one_nat fact_num_eq_if_nat one_le_mult_iff plus_nat.add_0)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	45
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	46	lemma inj_on_image_mem_iff: "inj_on f B ==> (A <= B) ==> (f a : f`A) ==> (a : B) ==> (a : A)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	47	by (blast dest: inj_onD)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	48
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	49	lemma independent_injective_on_span_image:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	50	assumes iS: "independent (S::(_::euclidean_space) set)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	51	and lf: "linear f" and fi: "inj_on f (span S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	52	shows "independent (f ` S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	53	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	54	{fix a assume a: "a : S" "f a : span (f ` S - {f a})"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	55	have eq: "f ` S - {f a} = f ` (S - {a})" using fi a span_inc
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	56	by (auto simp add: inj_on_def)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	57	from a have "f a : f ` span (S -{a})"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	58	unfolding eq span_linear_image[OF lf, of "S - {a}"] by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	59	moreover have "span (S -{a}) <= span S" using span_mono[of "S-{a}" S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	60	ultimately have "a : span (S -{a})" using fi a span_inc by (auto simp add: inj_on_def)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	61	with a(1) iS have False by (simp add: dependent_def) }
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	62	then show ?thesis unfolding dependent_def by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	63	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	64
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	65	lemma dim_image_eq:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	66	fixes f :: "'n::euclidean_space => 'm::euclidean_space"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	67	assumes lf: "linear f" and fi: "inj_on f (span S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	68	shows "dim (f ` S) = dim (S:: ('n::euclidean_space) set)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	69	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	70	obtain B where B_def: "B<=S & independent B & S <= span B & card B = dim S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	71	using basis_exists[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	72	hence "span S = span B" using span_mono[of B S] span_mono[of S "span B"] span_span[of B] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	73	hence "independent (f ` B)" using independent_injective_on_span_image[of B f] B_def assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	74	moreover have "card (f ` B) = card B" using assms card_image[of f B] subset_inj_on[of f "span S" B]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	75	B_def span_inc by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	76	moreover have "(f ` B) <= (f ` S)" using B_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	77	ultimately have "dim (f ` S) >= dim S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	78	using independent_card_le_dim[of "f ` B" "f ` S"] B_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	79	from this show ?thesis using dim_image_le[of f S] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	80	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	81
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	82	lemma linear_injective_on_subspace_0:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	83	fixes f :: "('m::euclidean_space) => ('n::euclidean_space)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	84	assumes lf: "linear f" and "subspace S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	85	shows "inj_on f S <-> (!x : S. f x = 0 --> x = 0)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	86	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	87	have "inj_on f S <-> (!x : S. !y : S. f x = f y --> x = y)" by (simp add: inj_on_def)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	88	also have "... <-> (!x : S. !y : S. f x - f y = 0 --> x - y = 0)" by simp
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	89	also have "... <-> (!x : S. !y : S. f (x - y) = 0 --> x - y = 0)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	90	by (simp add: linear_sub[OF lf])
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	91	also have "... <-> (! x : S. f x = 0 --> x = 0)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	92	using `subspace S` subspace_def[of S] subspace_sub[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	93	finally show ?thesis .
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	94	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	95
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	96	lemma subspace_Inter: "(!s : f. subspace s) ==> subspace (Inter f)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	97	unfolding subspace_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	98
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	99	lemma span_eq[simp]: "(span s = s) <-> subspace s"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	100	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	101	{ fix f assume "f <= subspace"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	102	hence "subspace (Inter f)" using subspace_Inter[of f] unfolding subset_eq mem_def by auto }
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	103	thus ?thesis using hull_eq[unfolded mem_def, of subspace s] span_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	104	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	105
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	106	lemma basis_inj_on: "d \<subseteq> {..<DIM('n)} \<Longrightarrow> inj_on (basis :: nat => 'n::euclidean_space) d"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	107	by(auto simp add: inj_on_def euclidean_eq[where 'a='n])
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	108
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	109	lemma finite_substdbasis: "finite {basis i ::'n::euclidean_space \|i. i : (d:: nat set)}" (is "finite ?S")
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	110	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	111	have eq: "?S = basis ` d" by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	112	show ?thesis unfolding eq apply(rule finite_subset[OF _ range_basis_finite]) by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	113	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	114
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	115	lemma card_substdbasis: assumes "d \<subseteq> {..<DIM('n::euclidean_space)}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	116	shows "card {basis i ::'n::euclidean_space \| i. i : d} = card d" (is "card ?S = _")
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	117	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	118	have eq: "?S = basis ` d" by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	119	show ?thesis unfolding eq using card_image[OF basis_inj_on[of d]] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	120	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	121
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	122	lemma substdbasis_expansion_unique: assumes "d\<subseteq>{..<DIM('a::euclidean_space)}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	123	shows "setsum (%i. f i *\<^sub>R basis i) d = (x::'a::euclidean_space)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	124	<-> (!i<DIM('a). (i:d --> f i = x$$i) & (i ~: d --> x $$ i = 0))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	125	proof- have :"\<And>x a b P. x (if P then a else b) = (if P then xa else xb)" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	126	have **:"finite d" apply(rule finite_subset[OF assms]) by fastsimp
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	127	have **:"\<And>i. (setsum (%i. f i \<^sub>R ((basis i)::'a)) d) $$ i = (\<Sum>x\<in>d. if x = i then f x else 0)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	128	unfolding euclidean_component.setsum euclidean_scaleR basis_component *
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	129	apply(rule setsum_cong2) using assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	130	show ?thesis unfolding euclidean_eq[where 'a='a] * setsum_delta[OF ] using assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	131	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	132
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	133	lemma independent_substdbasis: assumes "d\<subseteq>{..<DIM('a::euclidean_space)}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	134	shows "independent {basis i ::'a::euclidean_space \|i. i : (d :: nat set)}" (is "independent ?A")
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	135	proof -
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	136	have *: "{basis i \|i. i < DIM('a)} = basis ` {..<DIM('a)}" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	137	show ?thesis
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	138	apply(intro independent_mono[of "{basis i ::'a \|i. i : {..<DIM('a::euclidean_space)}}" "?A"] )
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	139	using independent_basis[where 'a='a] assms by (auto simp: *)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	140	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	141
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	142	lemma dim_cball:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	143	assumes "0<e"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	144	shows "dim (cball (0 :: 'n::euclidean_space) e) = DIM('n)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	145	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	146	{ fix x :: "'n::euclidean_space" def y == "(e/norm x) *\<^sub>R x"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	147	hence "y : cball 0 e" using cball_def dist_norm[of 0 y] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	148	moreover have "x = (norm x/e) *\<^sub>R y" using y_def assms by simp
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	149	moreover hence "x = (norm x/e) *\<^sub>R y" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	150	ultimately have "x : span (cball 0 e)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	151	using span_mul[of y "cball 0 e" "norm x/e"] span_inc[of "cball 0 e"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	152	} hence "span (cball 0 e) = (UNIV :: ('n::euclidean_space) set)" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	153	from this show ?thesis using dim_span[of "cball (0 :: 'n::euclidean_space) e"] by (auto simp add: dim_UNIV)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	154	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	155
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	156	lemma indep_card_eq_dim_span:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	157	fixes B :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	158	assumes "independent B"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	159	shows "finite B & card B = dim (span B)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	160	using assms basis_card_eq_dim[of B "span B"] span_inc by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	161
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	162	lemma setsum_not_0: "setsum f A ~= 0 ==> EX a:A. f a ~= 0"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	163	apply(rule ccontr) by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	164
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	165	lemma translate_inj_on:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	166	fixes A :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	167	shows "inj_on (%x. a+x) A" unfolding inj_on_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	168
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	169	lemma translation_assoc:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	170	fixes a b :: "'a::ab_group_add"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	171	shows "(\<lambda>x. b+x) ` ((\<lambda>x. a+x) ` S) = (\<lambda>x. (a+b)+x) ` S" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	172
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	173	lemma translation_invert:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	174	fixes a :: "'a::ab_group_add"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	175	assumes "(\<lambda>x. a+x) ` A = (\<lambda>x. a+x) ` B"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	176	shows "A=B"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	177	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	178	have "(%x. -a+x) ` ((%x. a+x) ` A) = (%x. -a+x) ` ((%x. a+x) ` B)" using assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	179	from this show ?thesis using translation_assoc[of "-a" a A] translation_assoc[of "-a" a B] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	180	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	181
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	182	lemma translation_galois:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	183	fixes a :: "'a::ab_group_add"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	184	shows "T=((\<lambda>x. a+x) ` S) <-> S=((\<lambda>x. (-a)+x) ` T)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	185	using translation_assoc[of "-a" a S] apply auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	186	using translation_assoc[of a "-a" T] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	187
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	188	lemma translation_inverse_subset:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	189	assumes "((%x. -a+x) ` V) <= (S :: 'n::ab_group_add set)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	190	shows "V <= ((%x. a+x) ` S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	191	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	192	{ fix x assume "x:V" hence "x-a : S" using assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	193	hence "x : {a + v \|v. v : S}" apply auto apply (rule exI[of _ "x-a"]) apply simp done
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	194	hence "x : ((%x. a+x) ` S)" by auto }
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	195	from this show ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	196	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	197
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	198	lemma basis_0[simp]:"(basis i::'a::euclidean_space) = 0 \<longleftrightarrow> i\<ge>DIM('a)"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	199	using norm_basis[of i, where 'a='a] unfolding norm_eq_zero[where 'a='a,THEN sym] by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	200
40377 0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	201	lemma basis_to_basis_subspace_isomorphism:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	202	assumes s: "subspace (S:: ('n::euclidean_space) set)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	203	and t: "subspace (T :: ('m::euclidean_space) set)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	204	and d: "dim S = dim T"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	205	and B: "B <= S" "independent B" "S <= span B" "card B = dim S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	206	and C: "C <= T" "independent C" "T <= span C" "card C = dim T"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	207	shows "EX f. linear f & f ` B = C & f ` S = T & inj_on f S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	208	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	209	(* Proof is a modified copy of the proof of similar lemma subspace_isomorphism
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	210	*)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	211	from B independent_bound have fB: "finite B" by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	212	from C independent_bound have fC: "finite C" by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	213	from B(4) C(4) card_le_inj[of B C] d obtain f where
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	214	f: "f ` B \<subseteq> C" "inj_on f B" using `finite B` `finite C` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	215	from linear_independent_extend[OF B(2)] obtain g where
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	216	g: "linear g" "\<forall>x\<in> B. g x = f x" by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	217	from inj_on_iff_eq_card[OF fB, of f] f(2)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	218	have "card (f ` B) = card B" by simp
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	219	with B(4) C(4) have ceq: "card (f ` B) = card C" using d
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	220	by simp
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	221	have "g ` B = f ` B" using g(2)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	222	by (auto simp add: image_iff)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	223	also have "\<dots> = C" using card_subset_eq[OF fC f(1) ceq] .
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	224	finally have gBC: "g ` B = C" .
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	225	have gi: "inj_on g B" using f(2) g(2)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	226	by (auto simp add: inj_on_def)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	227	note g0 = linear_indep_image_lemma[OF g(1) fB, unfolded gBC, OF C(2) gi]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	228	{fix x y assume x: "x \<in> S" and y: "y \<in> S" and gxy:"g x = g y"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	229	from B(3) x y have x': "x \<in> span B" and y': "y \<in> span B" by blast+
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	230	from gxy have th0: "g (x - y) = 0" by (simp add: linear_sub[OF g(1)])
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	231	have th1: "x - y \<in> span B" using x' y' by (metis span_sub)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	232	have "x=y" using g0[OF th1 th0] by simp }
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	233	then have giS: "inj_on g S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	234	unfolding inj_on_def by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	235	from span_subspace[OF B(1,3) s]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	236	have "g ` S = span (g ` B)" by (simp add: span_linear_image[OF g(1)])
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	237	also have "\<dots> = span C" unfolding gBC ..
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	238	also have "\<dots> = T" using span_subspace[OF C(1,3) t] .
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	239	finally have gS: "g ` S = T" .
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	240	from g(1) gS giS gBC show ?thesis by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	241	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	242
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	243	lemma closure_linear_image:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	244	fixes f :: "('m::euclidean_space) => ('n::euclidean_space)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	245	assumes "linear f"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	246	shows "f ` (closure S) <= closure (f ` S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	247	using image_closure_subset[of S f "closure (f ` S)"] assms linear_conv_bounded_linear[of f]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	248	linear_continuous_on[of f "closure S"] closed_closure[of "f ` S"] closure_subset[of "f ` S"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	249
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	250	lemma closure_injective_linear_image:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	251	fixes f :: "('n::euclidean_space) => ('n::euclidean_space)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	252	assumes "linear f" "inj f"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	253	shows "f ` (closure S) = closure (f ` S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	254	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	255	obtain f' where f'_def: "linear f' & f o f' = id & f' o f = id"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	256	using assms linear_injective_isomorphism[of f] isomorphism_expand by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	257	hence "f' ` closure (f ` S) <= closure (S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	258	using closure_linear_image[of f' "f ` S"] image_compose[of f' f] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	259	hence "f ` f' ` closure (f ` S) <= f ` closure (S)" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	260	hence "closure (f ` S) <= f ` closure (S)" using image_compose[of f f' "closure (f ` S)"] f'_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	261	from this show ?thesis using closure_linear_image[of f S] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	262	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	263
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	264	lemma closure_direct_sum:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	265	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	266	fixes T :: "('m::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	267	shows "closure (S <> T) = closure S <> closure T"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	268	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	269	{ fix x assume "x : closure S <*> closure T"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	270	from this obtain xs xt where xst_def: "xs : closure S & xt : closure T & (xs,xt) = x" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	271	{ fix ee assume ee_def: "(ee :: real) > 0"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	272	def e == "ee/2" hence e_def: "(e :: real)>0 & 2*e=ee" using ee_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	273	from this obtain e where e_def: "(e :: real)>0 & 2*e=ee" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	274	obtain ys where ys_def: "ys : S & (dist ys xs < e)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	275	using e_def xst_def closure_approachable[of xs S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	276	obtain yt where yt_def: "yt : T & (dist yt xt < e)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	277	using e_def xst_def closure_approachable[of xt T] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	278	from ys_def yt_def have "dist (ys,yt) (xs,xt) < sqrt (2*e^2)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	279	unfolding dist_norm apply (auto simp add: norm_Pair)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	280	using mult_strict_mono'[of "norm (ys - xs)" e "norm (ys - xs)" e] e_def
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	281	mult_strict_mono'[of "norm (yt - xt)" e "norm (yt - xt)" e] by (simp add: power2_eq_square)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	282	hence "((ys,yt) : S <> T) & (dist (ys,yt) x < 2e)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	283	using e_def sqrt_add_le_add_sqrt[of "e^2" "e^2"] xst_def ys_def yt_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	284	hence "EX y: S <*> T. dist y x < ee" using e_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	285	} hence "x : closure (S <> T)" using closure_approachable[of x "S <> T"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	286	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	287	hence "closure (S <> T) >= closure S <> closure T" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	288	moreover have "closed (closure S <*> closure T)" using closed_Times by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	289	ultimately show ?thesis using closure_minimal[of "S <> T" "closure S <> closure T"]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	290	closure_subset[of S] closure_subset[of T] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	291	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	292
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	293	lemma closure_scaleR:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	294	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	295	shows "(op \<^sub>R c) ` (closure S) = closure ((op \<^sub>R c) ` S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	296	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	297	{ assume "c ~= 0" hence ?thesis using closure_injective_linear_image[of "(op *\<^sub>R c)" S]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	298	linear_scaleR injective_scaleR by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	299	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	300	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	301	{ assume zero: "c=0 & S ~= {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	302	hence "closure S ~= {}" using closure_subset by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	303	hence "op *\<^sub>R c ` (closure S) = {0}" using zero by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	304	moreover have "op *\<^sub>R 0 ` S = {0}" using zero by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	305	ultimately have ?thesis using zero by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	306	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	307	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	308	{ assume "S={}" hence ?thesis by auto }
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	309	ultimately show ?thesis by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	310	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	311
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	312	lemma fst_linear: "linear fst" unfolding linear_def by (simp add: algebra_simps)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	313
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	314	lemma snd_linear: "linear snd" unfolding linear_def by (simp add: algebra_simps)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	315
40897 1eb1b2f9d062 adapt proofs to changed set_plus_image (cf. ee8d0548c148); hoelzl parents: 40887 diff changeset	316	lemma fst_snd_linear: "linear (%(x,y). x + y)" unfolding linear_def by (simp add: algebra_simps)
40377 0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	317
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	318	lemma scaleR_2:
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	319	fixes x :: "'a::real_vector"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	320	shows "scaleR 2 x = x + x"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	321	unfolding one_add_one_is_two [symmetric] scaleR_left_distrib by simp
34964 4e8be3c04d37 Replaced vec1 and dest_vec1 by abbreviation. hoelzl parents: 34915 diff changeset	322
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	323	declare euclidean_simps[simp]
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	324
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	325	lemma vector_choose_size: "0 <= c ==> \<exists>(x::'a::euclidean_space). norm x = c"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	326	apply (rule exI[where x="c *\<^sub>R basis 0 ::'a"]) using DIM_positive[where 'a='a] by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	327
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	328	lemma setsum_delta_notmem: assumes "x\<notin>s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	329	shows "setsum (\<lambda>y. if (y = x) then P x else Q y) s = setsum Q s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	330	"setsum (\<lambda>y. if (x = y) then P x else Q y) s = setsum Q s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	331	"setsum (\<lambda>y. if (y = x) then P y else Q y) s = setsum Q s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	332	"setsum (\<lambda>y. if (x = y) then P y else Q y) s = setsum Q s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	333	apply(rule_tac [!] setsum_cong2) using assms by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	334
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	335	lemma setsum_delta'':
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	336	fixes s::"'a::real_vector set" assumes "finite s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	337	shows "(\<Sum>x\<in>s. (if y = x then f x else 0) \<^sub>R x) = (if y\<in>s then (f y) \<^sub>R y else 0)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	338	proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	339	have :"\<And>x y. (if y = x then f x else (0::real)) \<^sub>R x = (if x=y then (f x) *\<^sub>R x else 0)" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	340	show ?thesis unfolding * using setsum_delta[OF assms, of y "\<lambda>x. f x *\<^sub>R x"] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	341	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	342
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	343	lemma if_smult:"(if P then x else (y::real)) \<^sub>R v = (if P then x \<^sub>R v else y *\<^sub>R v)" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	344
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	345	lemma image_smult_interval:"(\<lambda>x. m *\<^sub>R (x::'a::ordered_euclidean_space)) ` {a..b} =
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	346	(if {a..b} = {} then {} else if 0 \<le> m then {m \<^sub>R a..m \<^sub>R b} else {m \<^sub>R b..m \<^sub>R a})"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	347	using image_affinity_interval[of m 0 a b] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	348
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	349	lemma dist_triangle_eq:
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	350	fixes x y z :: "'a::euclidean_space"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	351	shows "dist x z = dist x y + dist y z \<longleftrightarrow> norm (x - y) \<^sub>R (y - z) = norm (y - z) \<^sub>R (x - y)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	352	proof- have *:"x - y + (y - z) = x - z" by auto
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	353	show ?thesis unfolding dist_norm norm_triangle_eq[of "x - y" "y - z", unfolded *]
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	354	by(auto simp add:norm_minus_commute) qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	355
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	356	lemma norm_minus_eqI:"x = - y \<Longrightarrow> norm x = norm y" by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	357
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	358	lemma Min_grI: assumes "finite A" "A \<noteq> {}" "\<forall>a\<in>A. x < a" shows "x < Min A"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	359	unfolding Min_gr_iff[OF assms(1,2)] using assms(3) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	360
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	361	lemma norm_lt: "norm x < norm y \<longleftrightarrow> inner x x < inner y y"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	362	unfolding norm_eq_sqrt_inner by simp
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	363
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	364	lemma norm_le: "norm x \<le> norm y \<longleftrightarrow> inner x x \<le> inner y y"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	365	unfolding norm_eq_sqrt_inner by simp
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	366
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	367
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	368
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	369	subsection {* Affine set and affine hull.*}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	370
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	371	definition
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	372	affine :: "'a::real_vector set \<Rightarrow> bool" where
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	373	"affine s \<longleftrightarrow> (\<forall>x\<in>s. \<forall>y\<in>s. \<forall>u v. u + v = 1 \<longrightarrow> u \<^sub>R x + v \<^sub>R y \<in> s)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	374
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	375	lemma affine_alt: "affine s \<longleftrightarrow> (\<forall>x\<in>s. \<forall>y\<in>s. \<forall>u::real. (1 - u) \<^sub>R x + u \<^sub>R y \<in> s)"
36071 c8ae8e56d42e tuned many proofs a bit nipkow parents: 35577 diff changeset	376	unfolding affine_def by(metis eq_diff_eq')
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	377
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	378	lemma affine_empty[intro]: "affine {}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	379	unfolding affine_def by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	380
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	381	lemma affine_sing[intro]: "affine {x}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	382	unfolding affine_alt by (auto simp add: scaleR_left_distrib [symmetric])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	383
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	384	lemma affine_UNIV[intro]: "affine UNIV"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	385	unfolding affine_def by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	386
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	387	lemma affine_Inter: "(\<forall>s\<in>f. affine s) \<Longrightarrow> affine (\<Inter> f)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	388	unfolding affine_def by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	389
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	390	lemma affine_Int: "affine s \<Longrightarrow> affine t \<Longrightarrow> affine (s \<inter> t)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	391	unfolding affine_def by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	392
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	393	lemma affine_affine_hull: "affine(affine hull s)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	394	unfolding hull_def using affine_Inter[of "{t \<in> affine. s \<subseteq> t}"]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	395	unfolding mem_def by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	396
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	397	lemma affine_hull_eq[simp]: "(affine hull s = s) \<longleftrightarrow> affine s"
36071 c8ae8e56d42e tuned many proofs a bit nipkow parents: 35577 diff changeset	398	by (metis affine_affine_hull hull_same mem_def)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	399
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	400	subsection {* Some explicit formulations (from Lars Schewe). *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	401
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	402	lemma affine: fixes V::"'a::real_vector set"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	403	shows "affine V \<longleftrightarrow> (\<forall>s u. finite s \<and> s \<noteq> {} \<and> s \<subseteq> V \<and> setsum u s = 1 \<longrightarrow> (setsum (\<lambda>x. (u x) *\<^sub>R x)) s \<in> V)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	404	unfolding affine_def apply rule apply(rule, rule, rule) apply(erule conjE)+
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	405	defer apply(rule, rule, rule, rule, rule) proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	406	fix x y u v assume as:"x \<in> V" "y \<in> V" "u + v = (1::real)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	407	"\<forall>s u. finite s \<and> s \<noteq> {} \<and> s \<subseteq> V \<and> setsum u s = 1 \<longrightarrow> (\<Sum>x\<in>s. u x *\<^sub>R x) \<in> V"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	408	thus "u \<^sub>R x + v \<^sub>R y \<in> V" apply(cases "x=y")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	409	using as(4)[THEN spec[where x="{x,y}"], THEN spec[where x="\<lambda>w. if w = x then u else v"]] and as(1-3)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	410	by(auto simp add: scaleR_left_distrib[THEN sym])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	411	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	412	fix s u assume as:"\<forall>x\<in>V. \<forall>y\<in>V. \<forall>u v. u + v = 1 \<longrightarrow> u \<^sub>R x + v \<^sub>R y \<in> V"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	413	"finite s" "s \<noteq> {}" "s \<subseteq> V" "setsum u s = (1::real)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	414	def n \<equiv> "card s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	415	have "card s = 0 \<or> card s = 1 \<or> card s = 2 \<or> card s > 2" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	416	thus "(\<Sum>x\<in>s. u x *\<^sub>R x) \<in> V" proof(auto simp only: disjE)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	417	assume "card s = 2" hence "card s = Suc (Suc 0)" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	418	then obtain a b where "s = {a, b}" unfolding card_Suc_eq by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	419	thus ?thesis using as(1)[THEN bspec[where x=a], THEN bspec[where x=b]] using as(4,5)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	420	by(auto simp add: setsum_clauses(2))
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	421	next assume "card s > 2" thus ?thesis using as and n_def proof(induct n arbitrary: u s)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	422	case (Suc n) fix s::"'a set" and u::"'a \<Rightarrow> real"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	423	assume IA:"\<And>u s. \<lbrakk>2 < card s; \<forall>x\<in>V. \<forall>y\<in>V. \<forall>u v. u + v = 1 \<longrightarrow> u \<^sub>R x + v \<^sub>R y \<in> V; finite s;
34915 7894c7dab132 Adapted to changes in induct method. berghofe parents: 34291 diff changeset	424	s \<noteq> {}; s \<subseteq> V; setsum u s = 1; n = card s \<rbrakk> \<Longrightarrow> (\<Sum>x\<in>s. u x *\<^sub>R x) \<in> V" and
7894c7dab132 Adapted to changes in induct method. berghofe parents: 34291 diff changeset	425	as:"Suc n = card s" "2 < card s" "\<forall>x\<in>V. \<forall>y\<in>V. \<forall>u v. u + v = 1 \<longrightarrow> u \<^sub>R x + v \<^sub>R y \<in> V"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	426	"finite s" "s \<noteq> {}" "s \<subseteq> V" "setsum u s = 1"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	427	have "\<exists>x\<in>s. u x \<noteq> 1" proof(rule_tac ccontr)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	428	assume " \<not> (\<exists>x\<in>s. u x \<noteq> 1)" hence "setsum u s = real_of_nat (card s)" unfolding card_eq_setsum by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	429	thus False using as(7) and `card s > 2` by (metis Numeral1_eq1_nat less_0_number_of less_int_code(15)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	430	less_nat_number_of not_less_iff_gr_or_eq of_nat_1 of_nat_eq_iff pos2 rel_simps(4)) qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	431	then obtain x where x:"x\<in>s" "u x \<noteq> 1" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	432
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	433	have c:"card (s - {x}) = card s - 1" apply(rule card_Diff_singleton) using `x\<in>s` as(4) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	434	have *:"s = insert x (s - {x})" "finite (s - {x})" using `x\<in>s` and as(4) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	435	have **:"setsum u (s - {x}) = 1 - u x"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	436	using setsum_clauses(2)[OF (2), of u x, unfolded (1)[THEN sym] as(7)] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	437	have **:"inverse (1 - u x) setsum u (s - {x}) = 1" unfolding ** using `u x \<noteq> 1` by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	438	have "(\<Sum>xa\<in>s - {x}. (inverse (1 - u x) * u xa) *\<^sub>R xa) \<in> V" proof(cases "card (s - {x}) > 2")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	439	case True hence "s - {x} \<noteq> {}" "card (s - {x}) = n" unfolding c and as(1)[symmetric] proof(rule_tac ccontr)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	440	assume "\<not> s - {x} \<noteq> {}" hence "card (s - {x}) = 0" unfolding card_0_eq[OF *(2)] by simp
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	441	thus False using True by auto qed auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	442	thus ?thesis apply(rule_tac IA[of "s - {x}" "\<lambda>y. (inverse (1 - u x) * u y)"])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	443	unfolding setsum_right_distrib[THEN sym] using as and *** and True by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	444	next case False hence "card (s - {x}) = Suc (Suc 0)" using as(2) and c by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	445	then obtain a b where "(s - {x}) = {a, b}" "a\<noteq>b" unfolding card_Suc_eq by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	446	thus ?thesis using as(3)[THEN bspec[where x=a], THEN bspec[where x=b]]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	447	using *** *(2) and `s \<subseteq> V` unfolding setsum_right_distrib by(auto simp add: setsum_clauses(2)) qed
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	448	hence "u x + (1 - u x) = 1 \<Longrightarrow> u x \<^sub>R x + (1 - u x) \<^sub>R ((\<Sum>xa\<in>s - {x}. u xa *\<^sub>R xa) /\<^sub>R (1 - u x)) \<in> V"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	449	apply-apply(rule as(3)[rule_format])
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	450	unfolding RealVector.scaleR_right.setsum using x(1) as(6) by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	451	thus "(\<Sum>x\<in>s. u x *\<^sub>R x) \<in> V" unfolding scaleR_scaleR[THEN sym] and scaleR_right.setsum [symmetric]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	452	apply(subst ) unfolding setsum_clauses(2)[OF (2)]
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	453	using `u x \<noteq> 1` by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	454	qed auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	455	next assume "card s = 1" then obtain a where "s={a}" by(auto simp add: card_Suc_eq)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	456	thus ?thesis using as(4,5) by simp
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	457	qed(insert `s\<noteq>{}` `finite s`, auto)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	458	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	459
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	460	lemma affine_hull_explicit:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	461	"affine hull p = {y. \<exists>s u. finite s \<and> s \<noteq> {} \<and> s \<subseteq> p \<and> setsum u s = 1 \<and> setsum (\<lambda>v. (u v) *\<^sub>R v) s = y}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	462	apply(rule hull_unique) apply(subst subset_eq) prefer 3 apply rule unfolding mem_Collect_eq and mem_def[of _ affine]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	463	apply (erule exE)+ apply(erule conjE)+ prefer 2 apply rule proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	464	fix x assume "x\<in>p" thus "\<exists>s u. finite s \<and> s \<noteq> {} \<and> s \<subseteq> p \<and> setsum u s = 1 \<and> (\<Sum>v\<in>s. u v *\<^sub>R v) = x"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	465	apply(rule_tac x="{x}" in exI, rule_tac x="\<lambda>x. 1" in exI) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	466	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	467	fix t x s u assume as:"p \<subseteq> t" "affine t" "finite s" "s \<noteq> {}" "s \<subseteq> p" "setsum u s = 1" "(\<Sum>v\<in>s. u v *\<^sub>R v) = x"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	468	thus "x \<in> t" using as(2)[unfolded affine, THEN spec[where x=s], THEN spec[where x=u]] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	469	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	470	show "affine {y. \<exists>s u. finite s \<and> s \<noteq> {} \<and> s \<subseteq> p \<and> setsum u s = 1 \<and> (\<Sum>v\<in>s. u v *\<^sub>R v) = y}" unfolding affine_def
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	471	apply(rule,rule,rule,rule,rule) unfolding mem_Collect_eq proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	472	fix u v ::real assume uv:"u + v = 1"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	473	fix x assume "\<exists>s u. finite s \<and> s \<noteq> {} \<and> s \<subseteq> p \<and> setsum u s = 1 \<and> (\<Sum>v\<in>s. u v *\<^sub>R v) = x"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	474	then obtain sx ux where x:"finite sx" "sx \<noteq> {}" "sx \<subseteq> p" "setsum ux sx = 1" "(\<Sum>v\<in>sx. ux v *\<^sub>R v) = x" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	475	fix y assume "\<exists>s u. finite s \<and> s \<noteq> {} \<and> s \<subseteq> p \<and> setsum u s = 1 \<and> (\<Sum>v\<in>s. u v *\<^sub>R v) = y"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	476	then obtain sy uy where y:"finite sy" "sy \<noteq> {}" "sy \<subseteq> p" "setsum uy sy = 1" "(\<Sum>v\<in>sy. uy v *\<^sub>R v) = y" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	477	have xy:"finite (sx \<union> sy)" using x(1) y(1) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	478	have **:"(sx \<union> sy) \<inter> sx = sx" "(sx \<union> sy) \<inter> sy = sy" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	479	show "\<exists>s ua. finite s \<and> s \<noteq> {} \<and> s \<subseteq> p \<and> setsum ua s = 1 \<and> (\<Sum>v\<in>s. ua v \<^sub>R v) = u \<^sub>R x + v *\<^sub>R y"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	480	apply(rule_tac x="sx \<union> sy" in exI)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	481	apply(rule_tac x="\<lambda>a. (if a\<in>sx then u * ux a else 0) + (if a\<in>sy then v * uy a else 0)" in exI)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	482	unfolding scaleR_left_distrib setsum_addf if_smult scaleR_zero_left ** setsum_restrict_set[OF xy, THEN sym]
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	483	unfolding scaleR_scaleR[THEN sym] RealVector.scaleR_right.setsum [symmetric] and setsum_right_distrib[THEN sym]
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	484	unfolding x y using x(1-3) y(1-3) uv by simp qed qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	485
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	486	lemma affine_hull_finite:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	487	assumes "finite s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	488	shows "affine hull s = {y. \<exists>u. setsum u s = 1 \<and> setsum (\<lambda>v. u v *\<^sub>R v) s = y}"
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	489	unfolding affine_hull_explicit and set_eq_iff and mem_Collect_eq apply (rule,rule)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	490	apply(erule exE)+ apply(erule conjE)+ defer apply(erule exE) apply(erule conjE) proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	491	fix x u assume "setsum u s = 1" "(\<Sum>v\<in>s. u v *\<^sub>R v) = x"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	492	thus "\<exists>sa u. finite sa \<and> \<not> (\<forall>x. (x \<in> sa) = (x \<in> {})) \<and> sa \<subseteq> s \<and> setsum u sa = 1 \<and> (\<Sum>v\<in>sa. u v *\<^sub>R v) = x"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	493	apply(rule_tac x=s in exI, rule_tac x=u in exI) using assms by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	494	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	495	fix x t u assume "t \<subseteq> s" hence *:"s \<inter> t = t" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	496	assume "finite t" "\<not> (\<forall>x. (x \<in> t) = (x \<in> {}))" "setsum u t = 1" "(\<Sum>v\<in>t. u v *\<^sub>R v) = x"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	497	thus "\<exists>u. setsum u s = 1 \<and> (\<Sum>v\<in>s. u v *\<^sub>R v) = x" apply(rule_tac x="\<lambda>x. if x\<in>t then u x else 0" in exI)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	498	unfolding if_smult scaleR_zero_left and setsum_restrict_set[OF assms, THEN sym] and * by auto qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	499
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	500	subsection {* Stepping theorems and hence small special cases. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	501
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	502	lemma affine_hull_empty[simp]: "affine hull {} = {}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	503	apply(rule hull_unique) unfolding mem_def by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	504
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	505	lemma affine_hull_finite_step:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	506	fixes y :: "'a::real_vector"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	507	shows "(\<exists>u. setsum u {} = w \<and> setsum (\<lambda>x. u x *\<^sub>R x) {} = y) \<longleftrightarrow> w = 0 \<and> y = 0" (is ?th1)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	508	"finite s \<Longrightarrow> (\<exists>u. setsum u (insert a s) = w \<and> setsum (\<lambda>x. u x *\<^sub>R x) (insert a s) = y) \<longleftrightarrow>
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	509	(\<exists>v u. setsum u s = w - v \<and> setsum (\<lambda>x. u x \<^sub>R x) s = y - v \<^sub>R a)" (is "?as \<Longrightarrow> (?lhs = ?rhs)")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	510	proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	511	show ?th1 by simp
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	512	assume ?as
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	513	{ assume ?lhs
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	514	then obtain u where u:"setsum u (insert a s) = w \<and> (\<Sum>x\<in>insert a s. u x *\<^sub>R x) = y" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	515	have ?rhs proof(cases "a\<in>s")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	516	case True hence *:"insert a s = s" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	517	show ?thesis using u[unfolded *] apply(rule_tac x=0 in exI) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	518	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	519	case False thus ?thesis apply(rule_tac x="u a" in exI) using u and `?as` by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	520	qed } moreover
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	521	{ assume ?rhs
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	522	then obtain v u where vu:"setsum u s = w - v" "(\<Sum>x\<in>s. u x \<^sub>R x) = y - v \<^sub>R a" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	523	have :"\<And>x M. (if x = a then v else M) \<^sub>R x = (if x = a then v \<^sub>R x else M \<^sub>R x)" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	524	have ?lhs proof(cases "a\<in>s")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	525	case True thus ?thesis
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	526	apply(rule_tac x="\<lambda>x. (if x=a then v else 0) + u x" in exI)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	527	unfolding setsum_clauses(2)[OF `?as`] apply simp
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	528	unfolding scaleR_left_distrib and setsum_addf
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	529	unfolding vu and * and scaleR_zero_left
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	530	by (auto simp add: setsum_delta[OF `?as`])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	531	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	532	case False
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	533	hence **:"\<And>x. x \<in> s \<Longrightarrow> u x = (if x = a then v else u x)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	534	"\<And>x. x \<in> s \<Longrightarrow> u x \<^sub>R x = (if x = a then v \<^sub>R x else u x *\<^sub>R x)" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	535	from False show ?thesis
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	536	apply(rule_tac x="\<lambda>x. if x=a then v else u x" in exI)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	537	unfolding setsum_clauses(2)[OF `?as`] and * using vu
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	538	using setsum_cong2[of s "\<lambda>x. u x \<^sub>R x" "\<lambda>x. if x = a then v \<^sub>R x else u x \<^sub>R x", OF *(2)]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	539	using setsum_cong2[of s u "\<lambda>x. if x = a then v else u x", OF **(1)] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	540	qed }
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	541	ultimately show "?lhs = ?rhs" by blast
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	542	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	543
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	544	lemma affine_hull_2:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	545	fixes a b :: "'a::real_vector"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	546	shows "affine hull {a,b} = {u \<^sub>R a + v \<^sub>R b\| u v. (u + v = 1)}" (is "?lhs = ?rhs")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	547	proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	548	have *:"\<And>x y z. z = x - y \<longleftrightarrow> y + z = (x::real)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	549	"\<And>x y z. z = x - y \<longleftrightarrow> y + z = (x::'a)" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	550	have "?lhs = {y. \<exists>u. setsum u {a, b} = 1 \<and> (\<Sum>v\<in>{a, b}. u v *\<^sub>R v) = y}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	551	using affine_hull_finite[of "{a,b}"] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	552	also have "\<dots> = {y. \<exists>v u. u b = 1 - v \<and> u b \<^sub>R b = y - v \<^sub>R a}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	553	by(simp add: affine_hull_finite_step(2)[of "{b}" a])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	554	also have "\<dots> = ?rhs" unfolding * by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	555	finally show ?thesis by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	556	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	557
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	558	lemma affine_hull_3:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	559	fixes a b c :: "'a::real_vector"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	560	shows "affine hull {a,b,c} = { u \<^sub>R a + v \<^sub>R b + w *\<^sub>R c\| u v w. u + v + w = 1}" (is "?lhs = ?rhs")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	561	proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	562	have *:"\<And>x y z. z = x - y \<longleftrightarrow> y + z = (x::real)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	563	"\<And>x y z. z = x - y \<longleftrightarrow> y + z = (x::'a)" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	564	show ?thesis apply(simp add: affine_hull_finite affine_hull_finite_step)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	565	unfolding * apply auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	566	apply(rule_tac x=v in exI) apply(rule_tac x=va in exI) apply auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	567	apply(rule_tac x=u in exI) by(auto intro!: exI)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	568	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	569
40377 0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	570	lemma mem_affine:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	571	assumes "affine S" "x : S" "y : S" "u+v=1"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	572	shows "(u \<^sub>R x + v \<^sub>R y) : S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	573	using assms affine_def[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	574
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	575	lemma mem_affine_3:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	576	assumes "affine S" "x : S" "y : S" "z : S" "u+v+w=1"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	577	shows "(u \<^sub>R x + v \<^sub>R y + w *\<^sub>R z) : S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	578	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	579	have "(u \<^sub>R x + v \<^sub>R y + w *\<^sub>R z) : affine hull {x, y, z}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	580	using affine_hull_3[of x y z] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	581	moreover have " affine hull {x, y, z} <= affine hull S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	582	using hull_mono[of "{x, y, z}" "S"] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	583	moreover have "affine hull S = S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	584	using assms affine_hull_eq[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	585	ultimately show ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	586	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	587
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	588	lemma mem_affine_3_minus:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	589	assumes "affine S" "x : S" "y : S" "z : S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	590	shows "x + v *\<^sub>R (y-z) : S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	591	using mem_affine_3[of S x y z 1 v "-v"] assms by (simp add: algebra_simps)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	592
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	593
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	594	subsection {* Some relations between affine hull and subspaces. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	595
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	596	lemma affine_hull_insert_subset_span:
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	597	fixes a :: "'a::euclidean_space"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	598	shows "affine hull (insert a s) \<subseteq> {a + v\| v . v \<in> span {x - a \| x . x \<in> s}}"
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	599	unfolding subset_eq Ball_def unfolding affine_hull_explicit span_explicit mem_Collect_eq
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	600	apply(rule,rule) apply(erule exE)+ apply(erule conjE)+ proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	601	fix x t u assume as:"finite t" "t \<noteq> {}" "t \<subseteq> insert a s" "setsum u t = 1" "(\<Sum>v\<in>t. u v *\<^sub>R v) = x"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	602	have "(\<lambda>x. x - a) ` (t - {a}) \<subseteq> {x - a \|x. x \<in> s}" using as(3) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	603	thus "\<exists>v. x = a + v \<and> (\<exists>S u. finite S \<and> S \<subseteq> {x - a \|x. x \<in> s} \<and> (\<Sum>v\<in>S. u v *\<^sub>R v) = v)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	604	apply(rule_tac x="x - a" in exI)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	605	apply (rule conjI, simp)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	606	apply(rule_tac x="(\<lambda>x. x - a) ` (t - {a})" in exI)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	607	apply(rule_tac x="\<lambda>x. u (x + a)" in exI)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	608	apply (rule conjI) using as(1) apply simp
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	609	apply (erule conjI)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	610	using as(1)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	611	apply (simp add: setsum_reindex[unfolded inj_on_def] scaleR_right_diff_distrib setsum_subtractf scaleR_left.setsum[THEN sym] setsum_diff1 scaleR_left_diff_distrib)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	612	unfolding as by simp qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	613
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	614	lemma affine_hull_insert_span:
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	615	fixes a :: "'a::euclidean_space"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	616	assumes "a \<notin> s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	617	shows "affine hull (insert a s) =
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	618	{a + v \| v . v \<in> span {x - a \| x. x \<in> s}}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	619	apply(rule, rule affine_hull_insert_subset_span) unfolding subset_eq Ball_def
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	620	unfolding affine_hull_explicit and mem_Collect_eq proof(rule,rule,erule exE,erule conjE)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	621	fix y v assume "y = a + v" "v \<in> span {x - a \|x. x \<in> s}"
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	622	then obtain t u where obt:"finite t" "t \<subseteq> {x - a \|x. x \<in> s}" "a + (\<Sum>v\<in>t. u v *\<^sub>R v) = y" unfolding span_explicit by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	623	def f \<equiv> "(\<lambda>x. x + a) ` t"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	624	have f:"finite f" "f \<subseteq> s" "(\<Sum>v\<in>f. u (v - a) *\<^sub>R (v - a)) = y - a" unfolding f_def using obt
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	625	by(auto simp add: setsum_reindex[unfolded inj_on_def])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	626	have *:"f \<inter> {a} = {}" "f \<inter> - {a} = f" using f(2) assms by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	627	show "\<exists>sa u. finite sa \<and> sa \<noteq> {} \<and> sa \<subseteq> insert a s \<and> setsum u sa = 1 \<and> (\<Sum>v\<in>sa. u v *\<^sub>R v) = y"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	628	apply(rule_tac x="insert a f" in exI)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	629	apply(rule_tac x="\<lambda>x. if x=a then 1 - setsum (\<lambda>x. u (x - a)) f else u (x - a)" in exI)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	630	using assms and f unfolding setsum_clauses(2)[OF f(1)] and if_smult
35577 43b93e294522 Generalized setsum_cases hoelzl parents: 35542 diff changeset	631	unfolding setsum_cases[OF f(1), of "\<lambda>x. x = a"]
43b93e294522 Generalized setsum_cases hoelzl parents: 35542 diff changeset	632	by (auto simp add: setsum_subtractf scaleR_left.setsum algebra_simps *) qed
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	633
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	634	lemma affine_hull_span:
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	635	fixes a :: "'a::euclidean_space"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	636	assumes "a \<in> s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	637	shows "affine hull s = {a + v \| v. v \<in> span {x - a \| x. x \<in> s - {a}}}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	638	using affine_hull_insert_span[of a "s - {a}", unfolded insert_Diff[OF assms]] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	639
40377 0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	640	subsection{* Parallel Affine Sets *}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	641
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	642	definition affine_parallel :: "'a::real_vector set => 'a::real_vector set => bool"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	643	where "affine_parallel S T = (? a. T = ((%x. a + x) ` S))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	644
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	645	lemma affine_parallel_expl_aux:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	646	fixes S T :: "'a::real_vector set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	647	assumes "!x. (x : S <-> (a+x) : T)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	648	shows "T = ((%x. a + x) ` S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	649	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	650	{ fix x assume "x : T" hence "(-a)+x : S" using assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	651	hence " x : ((%x. a + x) ` S)" using imageI[of "-a+x" S "(%x. a+x)"] by auto}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	652	moreover have "T >= ((%x. a + x) ` S)" using assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	653	ultimately show ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	654	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	655
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	656	lemma affine_parallel_expl:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	657	"affine_parallel S T = (? a. !x. (x : S <-> (a+x) : T))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	658	unfolding affine_parallel_def using affine_parallel_expl_aux[of S _ T] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	659
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	660	lemma affine_parallel_reflex: "affine_parallel S S" unfolding affine_parallel_def apply (rule exI[of _ "0"]) by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	661
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	662	lemma affine_parallel_commut:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	663	assumes "affine_parallel A B" shows "affine_parallel B A"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	664	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	665	from assms obtain a where "B=((%x. a + x) ` A)" unfolding affine_parallel_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	666	from this show ?thesis using translation_galois[of B a A] unfolding affine_parallel_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	667	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	668
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	669	lemma affine_parallel_assoc:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	670	assumes "affine_parallel A B" "affine_parallel B C"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	671	shows "affine_parallel A C"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	672	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	673	from assms obtain ab where "B=((%x. ab + x) ` A)" unfolding affine_parallel_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	674	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	675	from assms obtain bc where "C=((%x. bc + x) ` B)" unfolding affine_parallel_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	676	ultimately show ?thesis using translation_assoc[of bc ab A] unfolding affine_parallel_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	677	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	678
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	679	lemma affine_translation_aux:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	680	fixes a :: "'a::real_vector"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	681	assumes "affine ((%x. a + x) ` S)" shows "affine S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	682	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	683	{ fix x y u v
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	684	assume xy: "x : S" "y : S" "(u :: real)+v=1"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	685	hence "(a+x):((%x. a + x) ` S)" "(a+y):((%x. a + x) ` S)" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	686	hence h1: "u \<^sub>R (a+x) + v \<^sub>R (a+y) : ((%x. a + x) ` S)" using xy assms unfolding affine_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	687	have "u \<^sub>R (a+x) + v \<^sub>R (a+y) = (u+v) \<^sub>R a + (u \<^sub>R x + v *\<^sub>R y)" by (simp add:algebra_simps)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	688	also have "...= a + (u \<^sub>R x + v \<^sub>R y)" using `u+v=1` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	689	ultimately have "a + (u \<^sub>R x + v \<^sub>R y) : ((%x. a + x) ` S)" using h1 by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	690	hence "u \<^sub>R x + v \<^sub>R y : S" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	691	} from this show ?thesis unfolding affine_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	692	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	693
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	694	lemma affine_translation:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	695	fixes a :: "'a::real_vector"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	696	shows "affine S <-> affine ((%x. a + x) ` S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	697	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	698	have "affine S ==> affine ((%x. a + x) ` S)" using affine_translation_aux[of "-a" "((%x. a + x) ` S)"] using translation_assoc[of "-a" a S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	699	from this show ?thesis using affine_translation_aux by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	700	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	701
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	702	lemma parallel_is_affine:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	703	fixes S T :: "'a::real_vector set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	704	assumes "affine S" "affine_parallel S T"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	705	shows "affine T"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	706	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	707	from assms obtain a where "T=((%x. a + x) ` S)" unfolding affine_parallel_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	708	from this show ?thesis using affine_translation assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	709	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	710
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	711	lemma subspace_imp_affine:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	712	fixes s :: "(_::euclidean_space) set" shows "subspace s \<Longrightarrow> affine s"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	713	unfolding subspace_def affine_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	714
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	715	subsection{* Subspace Parallel to an Affine Set *}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	716
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	717	lemma subspace_affine:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	718	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	719	shows "subspace S <-> (affine S & 0 : S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	720	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	721	have h0: "subspace S ==> (affine S & 0 : S)" using subspace_imp_affine[of S] subspace_0 by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	722	{ assume assm: "affine S & 0 : S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	723	{ fix c :: real
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	724	fix x assume x_def: "x : S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	725	have "c \<^sub>R x = (1-c) \<^sub>R 0 + c *\<^sub>R x" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	726	moreover have "(1-c) \<^sub>R 0 + c \<^sub>R x : S" using affine_alt[of S] assm x_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	727	ultimately have "c *\<^sub>R x : S" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	728	} hence h1: "!c. !x : S. c *\<^sub>R x : S" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	729	{ fix x y assume xy_def: "x : S" "y : S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	730	def u == "(1 :: real)/2"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	731	have "(1/2) \<^sub>R (x+y) = (1/2) \<^sub>R (x+y)" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	732	moreover have "(1/2) \<^sub>R (x+y)=(1/2) \<^sub>R x + (1-(1/2)) *\<^sub>R y" by (simp add: algebra_simps)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	733	moreover have "(1-u) \<^sub>R x + u \<^sub>R y : S" using affine_alt[of S] assm xy_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	734	ultimately have "(1/2) *\<^sub>R (x+y) : S" using u_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	735	moreover have "(x+y) = 2 \<^sub>R ((1/2) \<^sub>R (x+y))" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	736	ultimately have "(x+y) : S" using h1[rule_format, of "(1/2) *\<^sub>R (x+y)" "2"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	737	} hence "!x : S. !y : S. (x+y) : S" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	738	hence "subspace S" using h1 assm unfolding subspace_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	739	} from this show ?thesis using h0 by metis
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	740	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	741
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	742	lemma affine_diffs_subspace:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	743	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	744	assumes "affine S" "a : S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	745	shows "subspace ((%x. (-a)+x) ` S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	746	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	747	have "affine ((%x. (-a)+x) ` S)" using affine_translation assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	748	moreover have "0 : ((%x. (-a)+x) ` S)" using assms exI[of "(%x. x:S & -a+x=0)" a] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	749	ultimately show ?thesis using subspace_affine by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	750	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	751
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	752	lemma parallel_subspace_explicit:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	753	fixes a :: "'n::euclidean_space"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	754	assumes "affine S" "a : S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	755	assumes "L == {y. ? x : S. (-a)+x=y}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	756	shows "subspace L & affine_parallel S L"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	757	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	758	have par: "affine_parallel S L" unfolding affine_parallel_def using assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	759	hence "affine L" using assms parallel_is_affine by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	760	moreover have "0 : L" using assms apply auto using exI[of "(%x. x:S & -a+x=0)" a] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	761	ultimately show ?thesis using subspace_affine par by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	762	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	763
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	764	lemma parallel_subspace_aux:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	765	fixes A B :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	766	assumes "subspace A" "subspace B" "affine_parallel A B"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	767	shows "A>=B"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	768	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	769	from assms obtain a where a_def: "!x. (x : A <-> (a+x) : B)" using affine_parallel_expl[of A B] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	770	hence "-a : A" using assms subspace_0[of B] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	771	hence "a : A" using assms subspace_neg[of A "-a"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	772	from this show ?thesis using assms a_def unfolding subspace_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	773	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	774
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	775	lemma parallel_subspace:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	776	fixes A B :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	777	assumes "subspace A" "subspace B" "affine_parallel A B"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	778	shows "A=B"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	779	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	780	have "A>=B" using assms parallel_subspace_aux by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	781	moreover have "A<=B" using assms parallel_subspace_aux[of B A] affine_parallel_commut by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	782	ultimately show ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	783	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	784
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	785	lemma affine_parallel_subspace:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	786	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	787	assumes "affine S" "S ~= {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	788	shows "?!L. subspace L & affine_parallel S L"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	789	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	790	have ex: "? L. subspace L & affine_parallel S L" using assms parallel_subspace_explicit by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	791	{ fix L1 L2 assume ass: "subspace L1 & affine_parallel S L1" "subspace L2 & affine_parallel S L2"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	792	hence "affine_parallel L1 L2" using affine_parallel_commut[of S L1] affine_parallel_assoc[of L1 S L2] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	793	hence "L1=L2" using ass parallel_subspace by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	794	} from this show ?thesis using ex by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	795	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	796
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	797	subsection {* Cones. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	798
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	799	definition
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	800	cone :: "'a::real_vector set \<Rightarrow> bool" where
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	801	"cone s \<longleftrightarrow> (\<forall>x\<in>s. \<forall>c\<ge>0. (c *\<^sub>R x) \<in> s)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	802
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	803	lemma cone_empty[intro, simp]: "cone {}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	804	unfolding cone_def by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	805
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	806	lemma cone_univ[intro, simp]: "cone UNIV"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	807	unfolding cone_def by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	808
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	809	lemma cone_Inter[intro]: "(\<forall>s\<in>f. cone s) \<Longrightarrow> cone(\<Inter> f)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	810	unfolding cone_def by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	811
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	812	subsection {* Conic hull. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	813
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	814	lemma cone_cone_hull: "cone (cone hull s)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	815	unfolding hull_def using cone_Inter[of "{t \<in> conic. s \<subseteq> t}"]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	816	by (auto simp add: mem_def)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	817
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	818	lemma cone_hull_eq: "(cone hull s = s) \<longleftrightarrow> cone s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	819	apply(rule hull_eq[unfolded mem_def])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	820	using cone_Inter unfolding subset_eq by (auto simp add: mem_def)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	821
40377 0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	822	lemma mem_cone:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	823	assumes "cone S" "x : S" "c>=0"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	824	shows "c *\<^sub>R x : S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	825	using assms cone_def[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	826
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	827	lemma cone_contains_0:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	828	fixes S :: "('m::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	829	assumes "cone S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	830	shows "(S ~= {}) <-> (0 : S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	831	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	832	{ assume "S ~= {}" from this obtain a where "a:S" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	833	hence "0 : S" using assms mem_cone[of S a 0] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	834	} from this show ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	835	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	836
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	837	lemma cone_0:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	838	shows "cone {(0 :: 'm::euclidean_space)}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	839	unfolding cone_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	840
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	841	lemma cone_Union[intro]: "(!s:f. cone s) --> (cone (Union f))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	842	unfolding cone_def by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	843
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	844	lemma cone_iff:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	845	fixes S :: "('m::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	846	assumes "S ~= {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	847	shows "cone S <-> 0:S & (!c. c>0 --> ((op *\<^sub>R c) ` S) = S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	848	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	849	{ assume "cone S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	850	{ fix c assume "(c :: real)>0"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	851	{ fix x assume "x : S" hence "x : (op *\<^sub>R c) ` S" unfolding image_def
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	852	using `cone S` `c>0` mem_cone[of S x "1/c"]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	853	exI[of "(%t. t:S & x = c \<^sub>R t)" "(1 / c) \<^sub>R x"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	854	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	855	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	856	{ fix x assume "x : (op *\<^sub>R c) ` S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	857	(from this obtain t where "t:S & x = c \<^sub>R t" by auto*)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	858	hence "x:S" using `cone S` `c>0` unfolding cone_def image_def `c>0` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	859	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	860	ultimately have "((op *\<^sub>R c) ` S) = S" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	861	} hence "0:S & (!c. c>0 --> ((op *\<^sub>R c) ` S) = S)" using `cone S` cone_contains_0[of S] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	862	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	863	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	864	{ assume a: "0:S & (!c. c>0 --> ((op *\<^sub>R c) ` S) = S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	865	{ fix x assume "x:S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	866	fix c1 assume "(c1 :: real)>=0"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	867	hence "(c1=0) \| (c1>0)" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	868	hence "c1 *\<^sub>R x : S" using a `x:S` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	869	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	870	hence "cone S" unfolding cone_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	871	} ultimately show ?thesis by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	872	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	873
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	874	lemma cone_hull_empty:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	875	"cone hull {} = {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	876	by (metis cone_empty cone_hull_eq)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	877
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	878	lemma cone_hull_empty_iff:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	879	fixes S :: "('m::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	880	shows "(S = {}) <-> (cone hull S = {})"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	881	by (metis bot_least cone_hull_empty hull_subset xtrans(5))
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	882
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	883	lemma cone_hull_contains_0:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	884	fixes S :: "('m::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	885	shows "(S ~= {}) <-> (0 : cone hull S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	886	using cone_cone_hull[of S] cone_contains_0[of "cone hull S"] cone_hull_empty_iff[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	887
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	888	lemma mem_cone_hull:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	889	assumes "x : S" "c>=0"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	890	shows "c *\<^sub>R x : cone hull S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	891	by (metis assms cone_cone_hull hull_inc mem_cone mem_def)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	892
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	893	lemma cone_hull_expl:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	894	fixes S :: "('m::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	895	shows "cone hull S = {c *\<^sub>R x \| c x. c>=0 & x : S}" (is "?lhs = ?rhs")
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	896	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	897	{ fix x assume "x : ?rhs"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	898	from this obtain cx xx where x_def: "x= cx *\<^sub>R xx & (cx :: real)>=0 & xx : S" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	899	fix c assume c_def: "(c :: real)>=0"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	900	hence "c \<^sub>R x = (ccx) *\<^sub>R xx" using x_def by (simp add: algebra_simps)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	901	moreover have "(c*cx) >= 0" using c_def x_def using mult_nonneg_nonneg by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	902	ultimately have "c *\<^sub>R x : ?rhs" using x_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	903	} hence "cone ?rhs" unfolding cone_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	904	hence "?rhs : cone" unfolding mem_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	905	{ fix x assume "x : S" hence "1 *\<^sub>R x : ?rhs" apply auto apply(rule_tac x="1" in exI) by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	906	hence "x : ?rhs" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	907	} hence "S <= ?rhs" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	908	hence "?lhs <= ?rhs" using `?rhs : cone` hull_minimal[of S "?rhs" "cone"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	909	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	910	{ fix x assume "x : ?rhs"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	911	from this obtain cx xx where x_def: "x= cx *\<^sub>R xx & (cx :: real)>=0 & xx : S" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	912	hence "xx : cone hull S" using hull_subset[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	913	hence "x : ?lhs" using x_def cone_cone_hull[of S] cone_def[of "cone hull S"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	914	} ultimately show ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	915	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	916
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	917	lemma cone_closure:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	918	fixes S :: "('m::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	919	assumes "cone S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	920	shows "cone (closure S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	921	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	922	{ assume "S = {}" hence ?thesis by auto }
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	923	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	924	{ assume "S ~= {}" hence "0:S & (!c. c>0 --> op *\<^sub>R c ` S = S)" using cone_iff[of S] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	925	hence "0:(closure S) & (!c. c>0 --> op *\<^sub>R c ` (closure S) = (closure S))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	926	using closure_subset by (auto simp add: closure_scaleR)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	927	hence ?thesis using cone_iff[of "closure S"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	928	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	929	ultimately show ?thesis by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	930	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	931
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	932	subsection {* Affine dependence and consequential theorems (from Lars Schewe). *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	933
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	934	definition
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	935	affine_dependent :: "'a::real_vector set \<Rightarrow> bool" where
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	936	"affine_dependent s \<longleftrightarrow> (\<exists>x\<in>s. x \<in> (affine hull (s - {x})))"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	937
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	938	lemma affine_dependent_explicit:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	939	"affine_dependent p \<longleftrightarrow>
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	940	(\<exists>s u. finite s \<and> s \<subseteq> p \<and> setsum u s = 0 \<and>
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	941	(\<exists>v\<in>s. u v \<noteq> 0) \<and> setsum (\<lambda>v. u v *\<^sub>R v) s = 0)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	942	unfolding affine_dependent_def affine_hull_explicit mem_Collect_eq apply(rule)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	943	apply(erule bexE,erule exE,erule exE) apply(erule conjE)+ defer apply(erule exE,erule exE) apply(erule conjE)+ apply(erule bexE)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	944	proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	945	fix x s u assume as:"x \<in> p" "finite s" "s \<noteq> {}" "s \<subseteq> p - {x}" "setsum u s = 1" "(\<Sum>v\<in>s. u v *\<^sub>R v) = x"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	946	have "x\<notin>s" using as(1,4) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	947	show "\<exists>s u. finite s \<and> s \<subseteq> p \<and> setsum u s = 0 \<and> (\<exists>v\<in>s. u v \<noteq> 0) \<and> (\<Sum>v\<in>s. u v *\<^sub>R v) = 0"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	948	apply(rule_tac x="insert x s" in exI, rule_tac x="\<lambda>v. if v = x then - 1 else u v" in exI)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	949	unfolding if_smult and setsum_clauses(2)[OF as(2)] and setsum_delta_notmem[OF `x\<notin>s`] and as using as by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	950	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	951	fix s u v assume as:"finite s" "s \<subseteq> p" "setsum u s = 0" "(\<Sum>v\<in>s. u v *\<^sub>R v) = 0" "v \<in> s" "u v \<noteq> 0"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	952	have "s \<noteq> {v}" using as(3,6) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	953	thus "\<exists>x\<in>p. \<exists>s u. finite s \<and> s \<noteq> {} \<and> s \<subseteq> p - {x} \<and> setsum u s = 1 \<and> (\<Sum>v\<in>s. u v *\<^sub>R v) = x"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	954	apply(rule_tac x=v in bexI, rule_tac x="s - {v}" in exI, rule_tac x="\<lambda>x. - (1 / u v) * u x" in exI)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	955	unfolding scaleR_scaleR[THEN sym] and scaleR_right.setsum [symmetric] unfolding setsum_right_distrib[THEN sym] and setsum_diff1[OF as(1)] using as by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	956	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	957
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	958	lemma affine_dependent_explicit_finite:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	959	fixes s :: "'a::real_vector set" assumes "finite s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	960	shows "affine_dependent s \<longleftrightarrow> (\<exists>u. setsum u s = 0 \<and> (\<exists>v\<in>s. u v \<noteq> 0) \<and> setsum (\<lambda>v. u v *\<^sub>R v) s = 0)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	961	(is "?lhs = ?rhs")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	962	proof
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	963	have :"\<And>vt u v. (if vt then u v else 0) \<^sub>R v = (if vt then (u v) *\<^sub>R v else (0::'a))" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	964	assume ?lhs
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	965	then obtain t u v where "finite t" "t \<subseteq> s" "setsum u t = 0" "v\<in>t" "u v \<noteq> 0" "(\<Sum>v\<in>t. u v *\<^sub>R v) = 0"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	966	unfolding affine_dependent_explicit by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	967	thus ?rhs apply(rule_tac x="\<lambda>x. if x\<in>t then u x else 0" in exI)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	968	apply auto unfolding * and setsum_restrict_set[OF assms, THEN sym]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	969	unfolding Int_absorb1[OF `t\<subseteq>s`] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	970	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	971	assume ?rhs
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	972	then obtain u v where "setsum u s = 0" "v\<in>s" "u v \<noteq> 0" "(\<Sum>v\<in>s. u v *\<^sub>R v) = 0" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	973	thus ?lhs unfolding affine_dependent_explicit using assms by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	974	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	975
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	976	subsection {* A general lemma. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	977
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	978	lemma convex_connected:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	979	fixes s :: "'a::real_normed_vector set"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	980	assumes "convex s" shows "connected s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	981	proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	982	{ fix e1 e2 assume as:"open e1" "open e2" "e1 \<inter> e2 \<inter> s = {}" "s \<subseteq> e1 \<union> e2"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	983	assume "e1 \<inter> s \<noteq> {}" "e2 \<inter> s \<noteq> {}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	984	then obtain x1 x2 where x1:"x1\<in>e1" "x1\<in>s" and x2:"x2\<in>e2" "x2\<in>s" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	985	hence n:"norm (x1 - x2) > 0" unfolding zero_less_norm_iff using as(3) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	986
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	987	{ fix x e::real assume as:"0 \<le> x" "x \<le> 1" "0 < e"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	988	{ fix y have :"(1 - x) \<^sub>R x1 + x \<^sub>R x2 - ((1 - y) \<^sub>R x1 + y \<^sub>R x2) = (y - x) \<^sub>R x1 - (y - x) *\<^sub>R x2"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	989	by (simp add: algebra_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	990	assume "\<bar>y - x\<bar> < e / norm (x1 - x2)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	991	hence "norm ((1 - x) \<^sub>R x1 + x \<^sub>R x2 - ((1 - y) \<^sub>R x1 + y \<^sub>R x2)) < e"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	992	unfolding * and scaleR_right_diff_distrib[THEN sym]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	993	unfolding less_divide_eq using n by auto }
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	994	hence "\<exists>d>0. \<forall>y. \<bar>y - x\<bar> < d \<longrightarrow> norm ((1 - x) \<^sub>R x1 + x \<^sub>R x2 - ((1 - y) \<^sub>R x1 + y \<^sub>R x2)) < e"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	995	apply(rule_tac x="e / norm (x1 - x2)" in exI) using as
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	996	apply auto unfolding zero_less_divide_iff using n by simp } note * = this
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	997
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	998	have "\<exists>x\<ge>0. x \<le> 1 \<and> (1 - x) \<^sub>R x1 + x \<^sub>R x2 \<notin> e1 \<and> (1 - x) \<^sub>R x1 + x \<^sub>R x2 \<notin> e2"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	999	apply(rule connected_real_lemma) apply (simp add: `x1\<in>e1` `x2\<in>e2` dist_commute)+
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1000	using * apply(simp add: dist_norm)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1001	using as(1,2)[unfolded open_dist] apply simp
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1002	using as(1,2)[unfolded open_dist] apply simp
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1003	using assms[unfolded convex_alt, THEN bspec[where x=x1], THEN bspec[where x=x2]] using x1 x2
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1004	using as(3) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1005	then obtain x where "x\<ge>0" "x\<le>1" "(1 - x) \<^sub>R x1 + x \<^sub>R x2 \<notin> e1" "(1 - x) \<^sub>R x1 + x \<^sub>R x2 \<notin> e2" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1006	hence False using as(4)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1007	using assms[unfolded convex_alt, THEN bspec[where x=x1], THEN bspec[where x=x2]]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1008	using x1(2) x2(2) by auto }
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1009	thus ?thesis unfolding connected_def by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1010	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1011
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1012	subsection {* One rather trivial consequence. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1013
34964 4e8be3c04d37 Replaced vec1 and dest_vec1 by abbreviation. hoelzl parents: 34915 diff changeset	1014	lemma connected_UNIV[intro]: "connected (UNIV :: 'a::real_normed_vector set)"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1015	by(simp add: convex_connected convex_UNIV)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1016
36623 d26348b667f2 Moved Convex theory to library. hoelzl parents: 36590 diff changeset	1017	subsection {* Balls, being convex, are connected. *}
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1018
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	1019	lemma convex_box: fixes a::"'a::euclidean_space"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	1020	assumes "\<And>i. i<DIM('a) \<Longrightarrow> convex {x. P i x}"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	1021	shows "convex {x. \<forall>i<DIM('a). P i (x$$i)}"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	1022	using assms unfolding convex_def by(auto simp add:euclidean_simps)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1023
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	1024	lemma convex_positive_orthant: "convex {x::'a::euclidean_space. (\<forall>i<DIM('a). 0 \<le> x$$i)}"
36623 d26348b667f2 Moved Convex theory to library. hoelzl parents: 36590 diff changeset	1025	by (rule convex_box) (simp add: atLeast_def[symmetric] convex_real_interval)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1026
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1027	lemma convex_local_global_minimum:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1028	fixes s :: "'a::real_normed_vector set"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1029	assumes "0<e" "convex_on s f" "ball x e \<subseteq> s" "\<forall>y\<in>ball x e. f x \<le> f y"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1030	shows "\<forall>y\<in>s. f x \<le> f y"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1031	proof(rule ccontr)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1032	have "x\<in>s" using assms(1,3) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1033	assume "\<not> (\<forall>y\<in>s. f x \<le> f y)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1034	then obtain y where "y\<in>s" and y:"f x > f y" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1035	hence xy:"0 < dist x y" by (auto simp add: dist_nz[THEN sym])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1036
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1037	then obtain u where "0 < u" "u \<le> 1" and u:"u < e / dist x y"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1038	using real_lbound_gt_zero[of 1 "e / dist x y"] using xy `e>0` and divide_pos_pos[of e "dist x y"] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1039	hence "f ((1-u) \<^sub>R x + u \<^sub>R y) \<le> (1-u) * f x + u * f y" using `x\<in>s` `y\<in>s`
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1040	using assms(2)[unfolded convex_on_def, THEN bspec[where x=x], THEN bspec[where x=y], THEN spec[where x="1-u"]] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1041	moreover
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1042	have :"x - ((1 - u) \<^sub>R x + u \<^sub>R y) = u \<^sub>R (x - y)" by (simp add: algebra_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1043	have "(1 - u) \<^sub>R x + u \<^sub>R y \<in> ball x e" unfolding mem_ball dist_norm unfolding * and norm_scaleR and abs_of_pos[OF `0<u`] unfolding dist_norm[THEN sym]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1044	using u unfolding pos_less_divide_eq[OF xy] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1045	hence "f x \<le> f ((1 - u) \<^sub>R x + u \<^sub>R y)" using assms(4) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1046	ultimately show False using mult_strict_left_mono[OF y `u>0`] unfolding left_diff_distrib by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1047	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1048
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1049	lemma convex_ball:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1050	fixes x :: "'a::real_normed_vector"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1051	shows "convex (ball x e)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1052	proof(auto simp add: convex_def)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1053	fix y z assume yz:"dist x y < e" "dist x z < e"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1054	fix u v ::real assume uv:"0 \<le> u" "0 \<le> v" "u + v = 1"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1055	have "dist x (u \<^sub>R y + v \<^sub>R z) \<le> u * dist x y + v * dist x z" using uv yz
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1056	using convex_distance[of "ball x e" x, unfolded convex_on_def, THEN bspec[where x=y], THEN bspec[where x=z]] by auto
36623 d26348b667f2 Moved Convex theory to library. hoelzl parents: 36590 diff changeset	1057	thus "dist x (u \<^sub>R y + v \<^sub>R z) < e" using convex_bound_lt[OF yz uv] by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1058	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1059
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1060	lemma convex_cball:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1061	fixes x :: "'a::real_normed_vector"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1062	shows "convex(cball x e)"
36362 06475a1547cb fix lots of looping simp calls and other warnings huffman parents: 36341 diff changeset	1063	proof(auto simp add: convex_def Ball_def)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1064	fix y z assume yz:"dist x y \<le> e" "dist x z \<le> e"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1065	fix u v ::real assume uv:" 0 \<le> u" "0 \<le> v" "u + v = 1"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1066	have "dist x (u \<^sub>R y + v \<^sub>R z) \<le> u * dist x y + v * dist x z" using uv yz
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1067	using convex_distance[of "cball x e" x, unfolded convex_on_def, THEN bspec[where x=y], THEN bspec[where x=z]] by auto
36623 d26348b667f2 Moved Convex theory to library. hoelzl parents: 36590 diff changeset	1068	thus "dist x (u \<^sub>R y + v \<^sub>R z) \<le> e" using convex_bound_le[OF yz uv] by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1069	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1070
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1071	lemma connected_ball:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1072	fixes x :: "'a::real_normed_vector"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1073	shows "connected (ball x e)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1074	using convex_connected convex_ball by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1075
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1076	lemma connected_cball:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1077	fixes x :: "'a::real_normed_vector"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1078	shows "connected(cball x e)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1079	using convex_connected convex_cball by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1080
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1081	subsection {* Convex hull. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1082
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1083	lemma convex_convex_hull: "convex(convex hull s)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1084	unfolding hull_def using convex_Inter[of "{t\<in>convex. s\<subseteq>t}"]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1085	unfolding mem_def by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1086
34064 eee04bbbae7e avoid dependency on implicit dest rule predicate1D in proofs haftmann parents: 33758 diff changeset	1087	lemma convex_hull_eq: "convex hull s = s \<longleftrightarrow> convex s"
36071 c8ae8e56d42e tuned many proofs a bit nipkow parents: 35577 diff changeset	1088	by (metis convex_convex_hull hull_same mem_def)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1089
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1090	lemma bounded_convex_hull:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1091	fixes s :: "'a::real_normed_vector set"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1092	assumes "bounded s" shows "bounded(convex hull s)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1093	proof- from assms obtain B where B:"\<forall>x\<in>s. norm x \<le> B" unfolding bounded_iff by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1094	show ?thesis apply(rule bounded_subset[OF bounded_cball, of _ 0 B])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1095	unfolding subset_hull[unfolded mem_def, of convex, OF convex_cball]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1096	unfolding subset_eq mem_cball dist_norm using B by auto qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1097
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1098	lemma finite_imp_bounded_convex_hull:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1099	fixes s :: "'a::real_normed_vector set"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1100	shows "finite s \<Longrightarrow> bounded(convex hull s)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1101	using bounded_convex_hull finite_imp_bounded by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1102
40377 0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1103	subsection {* Convex hull is "preserved" by a linear function. *}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1104
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1105	lemma convex_hull_linear_image:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1106	assumes "bounded_linear f"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1107	shows "f ` (convex hull s) = convex hull (f ` s)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1108	apply rule unfolding subset_eq ball_simps apply(rule_tac[!] hull_induct, rule hull_inc) prefer 3
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1109	apply(erule imageE)apply(rule_tac x=xa in image_eqI) apply assumption
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1110	apply(rule hull_subset[unfolded subset_eq, rule_format]) apply assumption
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1111	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1112	interpret f: bounded_linear f by fact
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1113	show "convex {x. f x \<in> convex hull f ` s}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1114	unfolding convex_def by(auto simp add: f.scaleR f.add convex_convex_hull[unfolded convex_def, rule_format]) next
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1115	interpret f: bounded_linear f by fact
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1116	show "convex {x. x \<in> f ` (convex hull s)}" using convex_convex_hull[unfolded convex_def, of s]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1117	unfolding convex_def by (auto simp add: f.scaleR [symmetric] f.add [symmetric])
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1118	qed auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1119
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1120	lemma in_convex_hull_linear_image:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1121	assumes "bounded_linear f" "x \<in> convex hull s"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1122	shows "(f x) \<in> convex hull (f ` s)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1123	using convex_hull_linear_image[OF assms(1)] assms(2) by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1124
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1125	subsection {* Stepping theorems for convex hulls of finite sets. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1126
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1127	lemma convex_hull_empty[simp]: "convex hull {} = {}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1128	apply(rule hull_unique) unfolding mem_def by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1129
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1130	lemma convex_hull_singleton[simp]: "convex hull {a} = {a}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1131	apply(rule hull_unique) unfolding mem_def by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1132
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1133	lemma convex_hull_insert:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1134	fixes s :: "'a::real_vector set"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1135	assumes "s \<noteq> {}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1136	shows "convex hull (insert a s) = {x. \<exists>u\<ge>0. \<exists>v\<ge>0. \<exists>b. (u + v = 1) \<and>
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1137	b \<in> (convex hull s) \<and> (x = u \<^sub>R a + v \<^sub>R b)}" (is "?xyz = ?hull")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1138	apply(rule,rule hull_minimal,rule) unfolding mem_def[of _ convex] and insert_iff prefer 3 apply rule proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1139	fix x assume x:"x = a \<or> x \<in> s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1140	thus "x\<in>?hull" apply rule unfolding mem_Collect_eq apply(rule_tac x=1 in exI) defer
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1141	apply(rule_tac x=0 in exI) using assms hull_subset[of s convex] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1142	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1143	fix x assume "x\<in>?hull"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1144	then obtain u v b where obt:"u\<ge>0" "v\<ge>0" "u + v = 1" "b \<in> convex hull s" "x = u \<^sub>R a + v \<^sub>R b" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1145	have "a\<in>convex hull insert a s" "b\<in>convex hull insert a s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1146	using hull_mono[of s "insert a s" convex] hull_mono[of "{a}" "insert a s" convex] and obt(4) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1147	thus "x\<in> convex hull insert a s" unfolding obt(5) using convex_convex_hull[of "insert a s", unfolded convex_def]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1148	apply(erule_tac x=a in ballE) apply(erule_tac x=b in ballE) apply(erule_tac x=u in allE) using obt by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1149	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1150	show "convex ?hull" unfolding convex_def apply(rule,rule,rule,rule,rule,rule,rule) proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1151	fix x y u v assume as:"(0::real) \<le> u" "0 \<le> v" "u + v = 1" "x\<in>?hull" "y\<in>?hull"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1152	from as(4) obtain u1 v1 b1 where obt1:"u1\<ge>0" "v1\<ge>0" "u1 + v1 = 1" "b1 \<in> convex hull s" "x = u1 \<^sub>R a + v1 \<^sub>R b1" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1153	from as(5) obtain u2 v2 b2 where obt2:"u2\<ge>0" "v2\<ge>0" "u2 + v2 = 1" "b2 \<in> convex hull s" "y = u2 \<^sub>R a + v2 \<^sub>R b2" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1154	have :"\<And>(x::'a) s1 s2. x - s1 \<^sub>R x - s2 \<^sub>R x = ((1::real) - (s1 + s2)) \<^sub>R x" by (auto simp add: algebra_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1155	have "\<exists>b \<in> convex hull s. u \<^sub>R x + v \<^sub>R y = (u * u1) \<^sub>R a + (v u2) \<^sub>R a + (b - (u u1) \<^sub>R b - (v u2) *\<^sub>R b)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1156	proof(cases "u * v1 + v * v2 = 0")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1157	have :"\<And>(x::'a) s1 s2. x - s1 \<^sub>R x - s2 \<^sub>R x = ((1::real) - (s1 + s2)) \<^sub>R x" by (auto simp add: algebra_simps)
36071 c8ae8e56d42e tuned many proofs a bit nipkow parents: 35577 diff changeset	1158	case True hence *:"u v1 = 0" "v * v2 = 0"
c8ae8e56d42e tuned many proofs a bit nipkow parents: 35577 diff changeset	1159	using mult_nonneg_nonneg[OF `u\<ge>0` `v1\<ge>0`] mult_nonneg_nonneg[OF `v\<ge>0` `v2\<ge>0`] by arith+
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1160	hence "u * u1 + v * u2 = 1" using as(3) obt1(3) obt2(3) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1161	thus ?thesis unfolding obt1(5) obt2(5) * using assms hull_subset[of s convex] by(auto simp add: ** scaleR_right_distrib)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1162	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1163	have "1 - (u * u1 + v * u2) = (u + v) - (u * u1 + v * u2)" using as(3) obt1(3) obt2(3) by (auto simp add: field_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1164	also have "\<dots> = u * (v1 + u1 - u1) + v * (v2 + u2 - u2)" using as(3) obt1(3) obt2(3) by (auto simp add: field_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1165	also have "\<dots> = u * v1 + v * v2" by simp finally have *:"1 - (u u1 + v * u2) = u * v1 + v * v2" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1166	case False have "0 \<le> u * v1 + v * v2" "0 \<le> u * v1" "0 \<le> u * v1 + v * v2" "0 \<le> v * v2" apply -
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1167	apply(rule add_nonneg_nonneg) prefer 4 apply(rule add_nonneg_nonneg) apply(rule_tac [!] mult_nonneg_nonneg)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1168	using as(1,2) obt1(1,2) obt2(1,2) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1169	thus ?thesis unfolding obt1(5) obt2(5) unfolding * and ** using False
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1170	apply(rule_tac x="((u * v1) / (u * v1 + v * v2)) \<^sub>R b1 + ((v v2) / (u * v1 + v * v2)) *\<^sub>R b2" in bexI) defer
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1171	apply(rule convex_convex_hull[of s, unfolded convex_def, rule_format]) using obt1(4) obt2(4)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1172	unfolding add_divide_distrib[THEN sym] and real_0_le_divide_iff
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1173	by (auto simp add: scaleR_left_distrib scaleR_right_distrib)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1174	qed note * = this
36071 c8ae8e56d42e tuned many proofs a bit nipkow parents: 35577 diff changeset	1175	have u1:"u1 \<le> 1" unfolding obt1(3)[THEN sym] and not_le using obt1(2) by auto
c8ae8e56d42e tuned many proofs a bit nipkow parents: 35577 diff changeset	1176	have u2:"u2 \<le> 1" unfolding obt2(3)[THEN sym] and not_le using obt2(2) by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1177	have "u1 * u + u2 * v \<le> (max u1 u2) * u + (max u1 u2) * v" apply(rule add_mono)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1178	apply(rule_tac [!] mult_right_mono) using as(1,2) obt1(1,2) obt2(1,2) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1179	also have "\<dots> \<le> 1" unfolding mult.add_right[THEN sym] and as(3) using u1 u2 by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1180	finally
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1181	show "u \<^sub>R x + v \<^sub>R y \<in> ?hull" unfolding mem_Collect_eq apply(rule_tac x="u * u1 + v * u2" in exI)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1182	apply(rule conjI) defer apply(rule_tac x="1 - u * u1 - v * u2" in exI) unfolding Bex_def
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1183	using as(1,2) obt1(1,2) obt2(1,2) * by(auto intro!: mult_nonneg_nonneg add_nonneg_nonneg simp add: algebra_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1184	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1185	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1186
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1187
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1188	subsection {* Explicit expression for convex hull. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1189
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1190	lemma convex_hull_indexed:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1191	fixes s :: "'a::real_vector set"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1192	shows "convex hull s = {y. \<exists>k u x. (\<forall>i\<in>{1::nat .. k}. 0 \<le> u i \<and> x i \<in> s) \<and>
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1193	(setsum u {1..k} = 1) \<and>
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1194	(setsum (\<lambda>i. u i *\<^sub>R x i) {1..k} = y)}" (is "?xyz = ?hull")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1195	apply(rule hull_unique) unfolding mem_def[of _ convex] apply(rule) defer
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1196	apply(subst convex_def) apply(rule,rule,rule,rule,rule,rule,rule)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1197	proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1198	fix x assume "x\<in>s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1199	thus "x \<in> ?hull" unfolding mem_Collect_eq apply(rule_tac x=1 in exI, rule_tac x="\<lambda>x. 1" in exI) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1200	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1201	fix t assume as:"s \<subseteq> t" "convex t"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1202	show "?hull \<subseteq> t" apply(rule) unfolding mem_Collect_eq apply(erule exE \| erule conjE)+ proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1203	fix x k u y assume assm:"\<forall>i\<in>{1::nat..k}. 0 \<le> u i \<and> y i \<in> s" "setsum u {1..k} = 1" "(\<Sum>i = 1..k. u i *\<^sub>R y i) = x"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1204	show "x\<in>t" unfolding assm(3)[THEN sym] apply(rule as(2)[unfolded convex, rule_format])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1205	using assm(1,2) as(1) by auto qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1206	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1207	fix x y u v assume uv:"0\<le>u" "0\<le>v" "u+v=(1::real)" and xy:"x\<in>?hull" "y\<in>?hull"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1208	from xy obtain k1 u1 x1 where x:"\<forall>i\<in>{1::nat..k1}. 0\<le>u1 i \<and> x1 i \<in> s" "setsum u1 {Suc 0..k1} = 1" "(\<Sum>i = Suc 0..k1. u1 i *\<^sub>R x1 i) = x" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1209	from xy obtain k2 u2 x2 where y:"\<forall>i\<in>{1::nat..k2}. 0\<le>u2 i \<and> x2 i \<in> s" "setsum u2 {Suc 0..k2} = 1" "(\<Sum>i = Suc 0..k2. u2 i *\<^sub>R x2 i) = y" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1210	have :"\<And>P (x1::'a) x2 s1 s2 i.(if P i then s1 else s2) \<^sub>R (if P i then x1 else x2) = (if P i then s1 \<^sub>R x1 else s2 \<^sub>R x2)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1211	"{1..k1 + k2} \<inter> {1..k1} = {1..k1}" "{1..k1 + k2} \<inter> - {1..k1} = (\<lambda>i. i + k1) ` {1..k2}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1212	prefer 3 apply(rule,rule) unfolding image_iff apply(rule_tac x="x - k1" in bexI) by(auto simp add: not_le)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1213	have inj:"inj_on (\<lambda>i. i + k1) {1..k2}" unfolding inj_on_def by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1214	show "u \<^sub>R x + v \<^sub>R y \<in> ?hull" apply(rule)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1215	apply(rule_tac x="k1 + k2" in exI, rule_tac x="\<lambda>i. if i \<in> {1..k1} then u * u1 i else v * u2 (i - k1)" in exI)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1216	apply(rule_tac x="\<lambda>i. if i \<in> {1..k1} then x1 i else x2 (i - k1)" in exI) apply(rule,rule) defer apply(rule)
35577 43b93e294522 Generalized setsum_cases hoelzl parents: 35542 diff changeset	1217	unfolding * and setsum_cases[OF finite_atLeastAtMost[of 1 "k1 + k2"]] and setsum_reindex[OF inj] and o_def Collect_mem_eq
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1218	unfolding scaleR_scaleR[THEN sym] scaleR_right.setsum [symmetric] setsum_right_distrib[THEN sym] proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1219	fix i assume i:"i \<in> {1..k1+k2}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1220	show "0 \<le> (if i \<in> {1..k1} then u * u1 i else v * u2 (i - k1)) \<and> (if i \<in> {1..k1} then x1 i else x2 (i - k1)) \<in> s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1221	proof(cases "i\<in>{1..k1}")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1222	case True thus ?thesis using mult_nonneg_nonneg[of u "u1 i"] and uv(1) x(1)[THEN bspec[where x=i]] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1223	next def j \<equiv> "i - k1"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1224	case False with i have "j \<in> {1..k2}" unfolding j_def by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1225	thus ?thesis unfolding j_def[symmetric] using False
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1226	using mult_nonneg_nonneg[of v "u2 j"] and uv(2) y(1)[THEN bspec[where x=j]] by auto qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1227	qed(auto simp add: not_le x(2,3) y(2,3) uv(3))
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1228	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1229
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1230	lemma convex_hull_finite:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1231	fixes s :: "'a::real_vector set"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1232	assumes "finite s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1233	shows "convex hull s = {y. \<exists>u. (\<forall>x\<in>s. 0 \<le> u x) \<and>
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1234	setsum u s = 1 \<and> setsum (\<lambda>x. u x *\<^sub>R x) s = y}" (is "?HULL = ?set")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1235	proof(rule hull_unique, auto simp add: mem_def[of _ convex] convex_def[of ?set])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1236	fix x assume "x\<in>s" thus " \<exists>u. (\<forall>x\<in>s. 0 \<le> u x) \<and> setsum u s = 1 \<and> (\<Sum>x\<in>s. u x *\<^sub>R x) = x"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1237	apply(rule_tac x="\<lambda>y. if x=y then 1 else 0" in exI) apply auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1238	unfolding setsum_delta'[OF assms] and setsum_delta''[OF assms] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1239	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1240	fix u v ::real assume uv:"0 \<le> u" "0 \<le> v" "u + v = 1"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1241	fix ux assume ux:"\<forall>x\<in>s. 0 \<le> ux x" "setsum ux s = (1::real)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1242	fix uy assume uy:"\<forall>x\<in>s. 0 \<le> uy x" "setsum uy s = (1::real)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1243	{ fix x assume "x\<in>s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1244	hence "0 \<le> u * ux x + v * uy x" using ux(1)[THEN bspec[where x=x]] uy(1)[THEN bspec[where x=x]] and uv(1,2)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1245	by (auto, metis add_nonneg_nonneg mult_nonneg_nonneg uv(1) uv(2)) }
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1246	moreover have "(\<Sum>x\<in>s. u * ux x + v * uy x) = 1"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1247	unfolding setsum_addf and setsum_right_distrib[THEN sym] and ux(2) uy(2) using uv(3) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1248	moreover have "(\<Sum>x\<in>s. (u * ux x + v * uy x) \<^sub>R x) = u \<^sub>R (\<Sum>x\<in>s. ux x \<^sub>R x) + v \<^sub>R (\<Sum>x\<in>s. uy x *\<^sub>R x)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1249	unfolding scaleR_left_distrib and setsum_addf and scaleR_scaleR[THEN sym] and scaleR_right.setsum [symmetric] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1250	ultimately show "\<exists>uc. (\<forall>x\<in>s. 0 \<le> uc x) \<and> setsum uc s = 1 \<and> (\<Sum>x\<in>s. uc x \<^sub>R x) = u \<^sub>R (\<Sum>x\<in>s. ux x \<^sub>R x) + v \<^sub>R (\<Sum>x\<in>s. uy x *\<^sub>R x)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1251	apply(rule_tac x="\<lambda>x. u * ux x + v * uy x" in exI) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1252	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1253	fix t assume t:"s \<subseteq> t" "convex t"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1254	fix u assume u:"\<forall>x\<in>s. 0 \<le> u x" "setsum u s = (1::real)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1255	thus "(\<Sum>x\<in>s. u x *\<^sub>R x) \<in> t" using t(2)[unfolded convex_explicit, THEN spec[where x=s], THEN spec[where x=u]]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1256	using assms and t(1) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1257	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1258
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1259	subsection {* Another formulation from Lars Schewe. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1260
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1261	lemma setsum_constant_scaleR:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1262	fixes y :: "'a::real_vector"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1263	shows "(\<Sum>x\<in>A. y) = of_nat (card A) *\<^sub>R y"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1264	apply (cases "finite A")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1265	apply (induct set: finite)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1266	apply (simp_all add: algebra_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1267	done
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1268
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1269	lemma convex_hull_explicit:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1270	fixes p :: "'a::real_vector set"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1271	shows "convex hull p = {y. \<exists>s u. finite s \<and> s \<subseteq> p \<and>
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1272	(\<forall>x\<in>s. 0 \<le> u x) \<and> setsum u s = 1 \<and> setsum (\<lambda>v. u v *\<^sub>R v) s = y}" (is "?lhs = ?rhs")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1273	proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1274	{ fix x assume "x\<in>?lhs"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1275	then obtain k u y where obt:"\<forall>i\<in>{1::nat..k}. 0 \<le> u i \<and> y i \<in> p" "setsum u {1..k} = 1" "(\<Sum>i = 1..k. u i *\<^sub>R y i) = x"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1276	unfolding convex_hull_indexed by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1277
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1278	have fin:"finite {1..k}" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1279	have fin':"\<And>v. finite {i \<in> {1..k}. y i = v}" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1280	{ fix j assume "j\<in>{1..k}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1281	hence "y j \<in> p" "0 \<le> setsum u {i. Suc 0 \<le> i \<and> i \<le> k \<and> y i = y j}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1282	using obt(1)[THEN bspec[where x=j]] and obt(2) apply simp
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1283	apply(rule setsum_nonneg) using obt(1) by auto }
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1284	moreover
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1285	have "(\<Sum>v\<in>y ` {1..k}. setsum u {i \<in> {1..k}. y i = v}) = 1"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1286	unfolding setsum_image_gen[OF fin, THEN sym] using obt(2) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1287	moreover have "(\<Sum>v\<in>y ` {1..k}. setsum u {i \<in> {1..k}. y i = v} *\<^sub>R v) = x"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1288	using setsum_image_gen[OF fin, of "\<lambda>i. u i *\<^sub>R y i" y, THEN sym]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1289	unfolding scaleR_left.setsum using obt(3) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1290	ultimately have "\<exists>s u. finite s \<and> s \<subseteq> p \<and> (\<forall>x\<in>s. 0 \<le> u x) \<and> setsum u s = 1 \<and> (\<Sum>v\<in>s. u v *\<^sub>R v) = x"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1291	apply(rule_tac x="y ` {1..k}" in exI)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1292	apply(rule_tac x="\<lambda>v. setsum u {i\<in>{1..k}. y i = v}" in exI) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1293	hence "x\<in>?rhs" by auto }
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1294	moreover
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1295	{ fix y assume "y\<in>?rhs"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1296	then obtain s u where obt:"finite s" "s \<subseteq> p" "\<forall>x\<in>s. 0 \<le> u x" "setsum u s = 1" "(\<Sum>v\<in>s. u v *\<^sub>R v) = y" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1297
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1298	obtain f where f:"inj_on f {1..card s}" "f ` {1..card s} = s" using ex_bij_betw_nat_finite_1[OF obt(1)] unfolding bij_betw_def by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1299
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1300	{ fix i::nat assume "i\<in>{1..card s}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1301	hence "f i \<in> s" apply(subst f(2)[THEN sym]) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1302	hence "0 \<le> u (f i)" "f i \<in> p" using obt(2,3) by auto }
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1303	moreover have *:"finite {1..card s}" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1304	{ fix y assume "y\<in>s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1305	then obtain i where "i\<in>{1..card s}" "f i = y" using f using image_iff[of y f "{1..card s}"] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1306	hence "{x. Suc 0 \<le> x \<and> x \<le> card s \<and> f x = y} = {i}" apply auto using f(1)[unfolded inj_on_def] apply(erule_tac x=x in ballE) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1307	hence "card {x. Suc 0 \<le> x \<and> x \<le> card s \<and> f x = y} = 1" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1308	hence "(\<Sum>x\<in>{x \<in> {1..card s}. f x = y}. u (f x)) = u y"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1309	"(\<Sum>x\<in>{x \<in> {1..card s}. f x = y}. u (f x) \<^sub>R f x) = u y \<^sub>R y"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1310	by (auto simp add: setsum_constant_scaleR) }
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1311
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1312	hence "(\<Sum>x = 1..card s. u (f x)) = 1" "(\<Sum>i = 1..card s. u (f i) *\<^sub>R f i) = y"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1313	unfolding setsum_image_gen[OF (1), of "\<lambda>x. u (f x) \<^sub>R f x" f] and setsum_image_gen[OF *(1), of "\<lambda>x. u (f x)" f]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1314	unfolding f using setsum_cong2[of s "\<lambda>y. (\<Sum>x\<in>{x \<in> {1..card s}. f x = y}. u (f x) \<^sub>R f x)" "\<lambda>v. u v \<^sub>R v"]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1315	using setsum_cong2 [of s "\<lambda>y. (\<Sum>x\<in>{x \<in> {1..card s}. f x = y}. u (f x))" u] unfolding obt(4,5) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1316
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1317	ultimately have "\<exists>k u x. (\<forall>i\<in>{1..k}. 0 \<le> u i \<and> x i \<in> p) \<and> setsum u {1..k} = 1 \<and> (\<Sum>i::nat = 1..k. u i *\<^sub>R x i) = y"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1318	apply(rule_tac x="card s" in exI) apply(rule_tac x="u \<circ> f" in exI) apply(rule_tac x=f in exI) by fastsimp
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1319	hence "y \<in> ?lhs" unfolding convex_hull_indexed by auto }
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	1320	ultimately show ?thesis unfolding set_eq_iff by blast
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1321	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1322
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1323	subsection {* A stepping theorem for that expansion. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1324
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1325	lemma convex_hull_finite_step:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1326	fixes s :: "'a::real_vector set" assumes "finite s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1327	shows "(\<exists>u. (\<forall>x\<in>insert a s. 0 \<le> u x) \<and> setsum u (insert a s) = w \<and> setsum (\<lambda>x. u x *\<^sub>R x) (insert a s) = y)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1328	\<longleftrightarrow> (\<exists>v\<ge>0. \<exists>u. (\<forall>x\<in>s. 0 \<le> u x) \<and> setsum u s = w - v \<and> setsum (\<lambda>x. u x \<^sub>R x) s = y - v \<^sub>R a)" (is "?lhs = ?rhs")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1329	proof(rule, case_tac[!] "a\<in>s")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1330	assume "a\<in>s" hence *:"insert a s = s" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1331	assume ?lhs thus ?rhs unfolding * apply(rule_tac x=0 in exI) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1332	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1333	assume ?lhs then obtain u where u:"\<forall>x\<in>insert a s. 0 \<le> u x" "setsum u (insert a s) = w" "(\<Sum>x\<in>insert a s. u x *\<^sub>R x) = y" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1334	assume "a\<notin>s" thus ?rhs apply(rule_tac x="u a" in exI) using u(1)[THEN bspec[where x=a]] apply simp
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1335	apply(rule_tac x=u in exI) using u[unfolded setsum_clauses(2)[OF assms]] and `a\<notin>s` by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1336	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1337	assume "a\<in>s" hence *:"insert a s = s" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1338	have fin:"finite (insert a s)" using assms by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1339	assume ?rhs then obtain v u where uv:"v\<ge>0" "\<forall>x\<in>s. 0 \<le> u x" "setsum u s = w - v" "(\<Sum>x\<in>s. u x \<^sub>R x) = y - v \<^sub>R a" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1340	show ?lhs apply(rule_tac x="\<lambda>x. (if a = x then v else 0) + u x" in exI) unfolding scaleR_left_distrib and setsum_addf and setsum_delta''[OF fin] and setsum_delta'[OF fin]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1341	unfolding setsum_clauses(2)[OF assms] using uv and uv(2)[THEN bspec[where x=a]] and `a\<in>s` by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1342	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1343	assume ?rhs then obtain v u where uv:"v\<ge>0" "\<forall>x\<in>s. 0 \<le> u x" "setsum u s = w - v" "(\<Sum>x\<in>s. u x \<^sub>R x) = y - v \<^sub>R a" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1344	moreover assume "a\<notin>s" moreover have "(\<Sum>x\<in>s. if a = x then v else u x) = setsum u s" "(\<Sum>x\<in>s. (if a = x then v else u x) \<^sub>R x) = (\<Sum>x\<in>s. u x \<^sub>R x)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1345	apply(rule_tac setsum_cong2) defer apply(rule_tac setsum_cong2) using `a\<notin>s` by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1346	ultimately show ?lhs apply(rule_tac x="\<lambda>x. if a = x then v else u x" in exI) unfolding setsum_clauses(2)[OF assms] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1347	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1348
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1349	subsection {* Hence some special cases. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1350
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1351	lemma convex_hull_2:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1352	"convex hull {a,b} = {u \<^sub>R a + v \<^sub>R b \| u v. 0 \<le> u \<and> 0 \<le> v \<and> u + v = 1}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1353	proof- have :"\<And>u. (\<forall>x\<in>{a, b}. 0 \<le> u x) \<longleftrightarrow> 0 \<le> u a \<and> 0 \<le> u b" by auto have *:"finite {b}" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1354	show ?thesis apply(simp add: convex_hull_finite) unfolding convex_hull_finite_step[OF *, of a 1, unfolded conj_assoc]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1355	apply auto apply(rule_tac x=v in exI) apply(rule_tac x="1 - v" in exI) apply simp
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1356	apply(rule_tac x=u in exI) apply simp apply(rule_tac x="\<lambda>x. v" in exI) by simp qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1357
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1358	lemma convex_hull_2_alt: "convex hull {a,b} = {a + u *\<^sub>R (b - a) \| u. 0 \<le> u \<and> u \<le> 1}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1359	unfolding convex_hull_2 unfolding Collect_def
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1360	proof(rule ext) have *:"\<And>x y ::real. x + y = 1 \<longleftrightarrow> x = 1 - y" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1361	fix x show "(\<exists>v u. x = v \<^sub>R a + u \<^sub>R b \<and> 0 \<le> v \<and> 0 \<le> u \<and> v + u = 1) = (\<exists>u. x = a + u *\<^sub>R (b - a) \<and> 0 \<le> u \<and> u \<le> 1)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1362	unfolding * apply auto apply(rule_tac[!] x=u in exI) by (auto simp add: algebra_simps) qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1363
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1364	lemma convex_hull_3:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1365	"convex hull {a,b,c} = { u \<^sub>R a + v \<^sub>R b + w *\<^sub>R c \| u v w. 0 \<le> u \<and> 0 \<le> v \<and> 0 \<le> w \<and> u + v + w = 1}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1366	proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1367	have fin:"finite {a,b,c}" "finite {b,c}" "finite {c}" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1368	have *:"\<And>x y z ::real. x + y + z = 1 \<longleftrightarrow> x = 1 - y - z"
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	1369	"\<And>x y z ::_::euclidean_space. x + y + z = 1 \<longleftrightarrow> x = 1 - y - z" by (auto simp add: field_simps)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1370	show ?thesis unfolding convex_hull_finite[OF fin(1)] and Collect_def and convex_hull_finite_step[OF fin(2)] and *
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1371	unfolding convex_hull_finite_step[OF fin(3)] apply(rule ext) apply simp apply auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1372	apply(rule_tac x=va in exI) apply (rule_tac x="u c" in exI) apply simp
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1373	apply(rule_tac x="1 - v - w" in exI) apply simp apply(rule_tac x=v in exI) apply simp apply(rule_tac x="\<lambda>x. w" in exI) by simp qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1374
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1375	lemma convex_hull_3_alt:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1376	"convex hull {a,b,c} = {a + u \<^sub>R (b - a) + v \<^sub>R (c - a) \| u v. 0 \<le> u \<and> 0 \<le> v \<and> u + v \<le> 1}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1377	proof- have *:"\<And>x y z ::real. x + y + z = 1 \<longleftrightarrow> x = 1 - y - z" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1378	show ?thesis unfolding convex_hull_3 apply (auto simp add: *) apply(rule_tac x=v in exI) apply(rule_tac x=w in exI) apply (simp add: algebra_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1379	apply(rule_tac x=u in exI) apply(rule_tac x=v in exI) by (simp add: algebra_simps) qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1380
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1381	subsection {* Relations among closure notions and corresponding hulls. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1382
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1383	text {* TODO: Generalize linear algebra concepts defined in @{text
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1384	Euclidean_Space.thy} so that we can generalize these lemmas. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1385
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1386	lemma affine_imp_convex: "affine s \<Longrightarrow> convex s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1387	unfolding affine_def convex_def by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1388
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1389	lemma subspace_imp_convex:
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	1390	fixes s :: "(_::euclidean_space) set" shows "subspace s \<Longrightarrow> convex s"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1391	using subspace_imp_affine affine_imp_convex by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1392
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1393	lemma affine_hull_subset_span:
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	1394	fixes s :: "(_::euclidean_space) set" shows "(affine hull s) \<subseteq> (span s)"
36071 c8ae8e56d42e tuned many proofs a bit nipkow parents: 35577 diff changeset	1395	by (metis hull_minimal mem_def span_inc subspace_imp_affine subspace_span)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1396
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1397	lemma convex_hull_subset_span:
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	1398	fixes s :: "(_::euclidean_space) set" shows "(convex hull s) \<subseteq> (span s)"
36071 c8ae8e56d42e tuned many proofs a bit nipkow parents: 35577 diff changeset	1399	by (metis hull_minimal mem_def span_inc subspace_imp_convex subspace_span)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1400
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1401	lemma convex_hull_subset_affine_hull: "(convex hull s) \<subseteq> (affine hull s)"
36071 c8ae8e56d42e tuned many proofs a bit nipkow parents: 35577 diff changeset	1402	by (metis affine_affine_hull affine_imp_convex hull_minimal hull_subset mem_def)
c8ae8e56d42e tuned many proofs a bit nipkow parents: 35577 diff changeset	1403
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1404
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1405	lemma affine_dependent_imp_dependent:
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	1406	fixes s :: "(_::euclidean_space) set" shows "affine_dependent s \<Longrightarrow> dependent s"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1407	unfolding affine_dependent_def dependent_def
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1408	using affine_hull_subset_span by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1409
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1410	lemma dependent_imp_affine_dependent:
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	1411	fixes s :: "(_::euclidean_space) set"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1412	assumes "dependent {x - a\| x . x \<in> s}" "a \<notin> s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1413	shows "affine_dependent (insert a s)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1414	proof-
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	1415	from assms(1)[unfolded dependent_explicit] obtain S u v
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1416	where obt:"finite S" "S \<subseteq> {x - a \|x. x \<in> s}" "v\<in>S" "u v \<noteq> 0" "(\<Sum>v\<in>S. u v *\<^sub>R v) = 0" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1417	def t \<equiv> "(\<lambda>x. x + a) ` S"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1418
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1419	have inj:"inj_on (\<lambda>x. x + a) S" unfolding inj_on_def by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1420	have "0\<notin>S" using obt(2) assms(2) unfolding subset_eq by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1421	have fin:"finite t" and "t\<subseteq>s" unfolding t_def using obt(1,2) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1422
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1423	hence "finite (insert a t)" and "insert a t \<subseteq> insert a s" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1424	moreover have *:"\<And>P Q. (\<Sum>x\<in>t. (if x = a then P x else Q x)) = (\<Sum>x\<in>t. Q x)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1425	apply(rule setsum_cong2) using `a\<notin>s` `t\<subseteq>s` by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1426	have "(\<Sum>x\<in>insert a t. if x = a then - (\<Sum>x\<in>t. u (x - a)) else u (x - a)) = 0"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1427	unfolding setsum_clauses(2)[OF fin] using `a\<notin>s` `t\<subseteq>s` apply auto unfolding * by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1428	moreover have "\<exists>v\<in>insert a t. (if v = a then - (\<Sum>x\<in>t. u (x - a)) else u (v - a)) \<noteq> 0"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1429	apply(rule_tac x="v + a" in bexI) using obt(3,4) and `0\<notin>S` unfolding t_def by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1430	moreover have :"\<And>P Q. (\<Sum>x\<in>t. (if x = a then P x else Q x) \<^sub>R x) = (\<Sum>x\<in>t. Q x *\<^sub>R x)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1431	apply(rule setsum_cong2) using `a\<notin>s` `t\<subseteq>s` by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1432	have "(\<Sum>x\<in>t. u (x - a)) \<^sub>R a = (\<Sum>v\<in>t. u (v - a) \<^sub>R v)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1433	unfolding scaleR_left.setsum unfolding t_def and setsum_reindex[OF inj] and o_def
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1434	using obt(5) by (auto simp add: setsum_addf scaleR_right_distrib)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1435	hence "(\<Sum>v\<in>insert a t. (if v = a then - (\<Sum>x\<in>t. u (x - a)) else u (v - a)) *\<^sub>R v) = 0"
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	1436	unfolding setsum_clauses(2)[OF fin] using `a\<notin>s` `t\<subseteq>s` by (auto simp add: *)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1437	ultimately show ?thesis unfolding affine_dependent_explicit
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1438	apply(rule_tac x="insert a t" in exI) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1439	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1440
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1441	lemma convex_cone:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1442	"convex s \<and> cone s \<longleftrightarrow> (\<forall>x\<in>s. \<forall>y\<in>s. (x + y) \<in> s) \<and> (\<forall>x\<in>s. \<forall>c\<ge>0. (c *\<^sub>R x) \<in> s)" (is "?lhs = ?rhs")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1443	proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1444	{ fix x y assume "x\<in>s" "y\<in>s" and ?lhs
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1445	hence "2 \<^sub>R x \<in>s" "2 \<^sub>R y \<in> s" unfolding cone_def by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1446	hence "x + y \<in> s" using `?lhs`[unfolded convex_def, THEN conjunct1]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1447	apply(erule_tac x="2\<^sub>R x" in ballE) apply(erule_tac x="2\<^sub>R y" in ballE)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1448	apply(erule_tac x="1/2" in allE) apply simp apply(erule_tac x="1/2" in allE) by auto }
36362 06475a1547cb fix lots of looping simp calls and other warnings huffman parents: 36341 diff changeset	1449	thus ?thesis unfolding convex_def cone_def by blast
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1450	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1451
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	1452	lemma affine_dependent_biggerset: fixes s::"('a::euclidean_space) set"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	1453	assumes "finite s" "card s \<ge> DIM('a) + 2"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1454	shows "affine_dependent s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1455	proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1456	have "s\<noteq>{}" using assms by auto then obtain a where "a\<in>s" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1457	have *:"{x - a \|x. x \<in> s - {a}} = (\<lambda>x. x - a) ` (s - {a})" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1458	have "card {x - a \|x. x \<in> s - {a}} = card (s - {a})" unfolding *
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1459	apply(rule card_image) unfolding inj_on_def by auto
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	1460	also have "\<dots> > DIM('a)" using assms(2)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1461	unfolding card_Diff_singleton[OF assms(1) `a\<in>s`] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1462	finally show ?thesis apply(subst insert_Diff[OF `a\<in>s`, THEN sym])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1463	apply(rule dependent_imp_affine_dependent)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1464	apply(rule dependent_biggerset) by auto qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1465
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1466	lemma affine_dependent_biggerset_general:
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	1467	assumes "finite (s::('a::euclidean_space) set)" "card s \<ge> dim s + 2"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1468	shows "affine_dependent s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1469	proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1470	from assms(2) have "s \<noteq> {}" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1471	then obtain a where "a\<in>s" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1472	have *:"{x - a \|x. x \<in> s - {a}} = (\<lambda>x. x - a) ` (s - {a})" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1473	have *:"card {x - a \|x. x \<in> s - {a}} = card (s - {a})" unfolding
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1474	apply(rule card_image) unfolding inj_on_def by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1475	have "dim {x - a \|x. x \<in> s - {a}} \<le> dim s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1476	apply(rule subset_le_dim) unfolding subset_eq
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1477	using `a\<in>s` by (auto simp add:span_superset span_sub)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1478	also have "\<dots> < dim s + 1" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1479	also have "\<dots> \<le> card (s - {a})" using assms
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1480	using card_Diff_singleton[OF assms(1) `a\<in>s`] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1481	finally show ?thesis apply(subst insert_Diff[OF `a\<in>s`, THEN sym])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1482	apply(rule dependent_imp_affine_dependent) apply(rule dependent_biggerset_general) unfolding ** by auto qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1483
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1484	subsection {* Caratheodory's theorem. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1485
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	1486	lemma convex_hull_caratheodory: fixes p::"('a::euclidean_space) set"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	1487	shows "convex hull p = {y. \<exists>s u. finite s \<and> s \<subseteq> p \<and> card s \<le> DIM('a) + 1 \<and>
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1488	(\<forall>x\<in>s. 0 \<le> u x) \<and> setsum u s = 1 \<and> setsum (\<lambda>v. u v *\<^sub>R v) s = y}"
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	1489	unfolding convex_hull_explicit set_eq_iff mem_Collect_eq
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1490	proof(rule,rule)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1491	fix y let ?P = "\<lambda>n. \<exists>s u. finite s \<and> card s = n \<and> s \<subseteq> p \<and> (\<forall>x\<in>s. 0 \<le> u x) \<and> setsum u s = 1 \<and> (\<Sum>v\<in>s. u v *\<^sub>R v) = y"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1492	assume "\<exists>s u. finite s \<and> s \<subseteq> p \<and> (\<forall>x\<in>s. 0 \<le> u x) \<and> setsum u s = 1 \<and> (\<Sum>v\<in>s. u v *\<^sub>R v) = y"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1493	then obtain N where "?P N" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1494	hence "\<exists>n\<le>N. (\<forall>k<n. \<not> ?P k) \<and> ?P n" apply(rule_tac ex_least_nat_le) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1495	then obtain n where "?P n" and smallest:"\<forall>k<n. \<not> ?P k" by blast
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1496	then obtain s u where obt:"finite s" "card s = n" "s\<subseteq>p" "\<forall>x\<in>s. 0 \<le> u x" "setsum u s = 1" "(\<Sum>v\<in>s. u v *\<^sub>R v) = y" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1497
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	1498	have "card s \<le> DIM('a) + 1" proof(rule ccontr, simp only: not_le)
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	1499	assume "DIM('a) + 1 < card s"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1500	hence "affine_dependent s" using affine_dependent_biggerset[OF obt(1)] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1501	then obtain w v where wv:"setsum w s = 0" "v\<in>s" "w v \<noteq> 0" "(\<Sum>v\<in>s. w v *\<^sub>R v) = 0"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1502	using affine_dependent_explicit_finite[OF obt(1)] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1503	def i \<equiv> "(\<lambda>v. (u v) / (- w v)) ` {v\<in>s. w v < 0}" def t \<equiv> "Min i"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1504	have "\<exists>x\<in>s. w x < 0" proof(rule ccontr, simp add: not_less)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1505	assume as:"\<forall>x\<in>s. 0 \<le> w x"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1506	hence "setsum w (s - {v}) \<ge> 0" apply(rule_tac setsum_nonneg) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1507	hence "setsum w s > 0" unfolding setsum_diff1'[OF obt(1) `v\<in>s`]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1508	using as[THEN bspec[where x=v]] and `v\<in>s` using `w v \<noteq> 0` by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1509	thus False using wv(1) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1510	qed hence "i\<noteq>{}" unfolding i_def by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1511
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1512	hence "t \<ge> 0" using Min_ge_iff[of i 0 ] and obt(1) unfolding t_def i_def
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1513	using obt(4)[unfolded le_less] apply auto unfolding divide_le_0_iff by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1514	have t:"\<forall>v\<in>s. u v + t * w v \<ge> 0" proof
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1515	fix v assume "v\<in>s" hence v:"0\<le>u v" using obt(4)[THEN bspec[where x=v]] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1516	show"0 \<le> u v + t * w v" proof(cases "w v < 0")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1517	case False thus ?thesis apply(rule_tac add_nonneg_nonneg)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1518	using v apply simp apply(rule mult_nonneg_nonneg) using `t\<ge>0` by auto next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1519	case True hence "t \<le> u v / (- w v)" using `v\<in>s`
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1520	unfolding t_def i_def apply(rule_tac Min_le) using obt(1) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1521	thus ?thesis unfolding real_0_le_add_iff
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1522	using pos_le_divide_eq[OF True[unfolded neg_0_less_iff_less[THEN sym]]] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1523	qed qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1524
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1525	obtain a where "a\<in>s" and "t = (\<lambda>v. (u v) / (- w v)) a" and "w a < 0"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1526	using Min_in[OF _ `i\<noteq>{}`] and obt(1) unfolding i_def t_def by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1527	hence a:"a\<in>s" "u a + t * w a = 0" by auto
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	1528	have *:"\<And>f. setsum f (s - {a}) = setsum f s - ((f a)::'b::ab_group_add)"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	1529	unfolding setsum_diff1'[OF obt(1) `a\<in>s`] by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1530	have "(\<Sum>v\<in>s. u v + t * w v) = 1"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1531	unfolding setsum_addf wv(1) setsum_right_distrib[THEN sym] obt(5) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1532	moreover have "(\<Sum>v\<in>s. u v \<^sub>R v + (t w v) \<^sub>R v) - (u a \<^sub>R a + (t * w a) *\<^sub>R a) = y"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1533	unfolding setsum_addf obt(6) scaleR_scaleR[THEN sym] scaleR_right.setsum [symmetric] wv(4)
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	1534	using a(2) [THEN eq_neg_iff_add_eq_0 [THEN iffD2]] by simp
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1535	ultimately have "?P (n - 1)" apply(rule_tac x="(s - {a})" in exI)
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	1536	apply(rule_tac x="\<lambda>v. u v + t * w v" in exI) using obt(1-3) and t and a
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	1537	by (auto simp add: * scaleR_left_distrib)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1538	thus False using smallest[THEN spec[where x="n - 1"]] by auto qed
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	1539	thus "\<exists>s u. finite s \<and> s \<subseteq> p \<and> card s \<le> DIM('a) + 1
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1540	\<and> (\<forall>x\<in>s. 0 \<le> u x) \<and> setsum u s = 1 \<and> (\<Sum>v\<in>s. u v *\<^sub>R v) = y" using obt by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1541	qed auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1542
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1543	lemma caratheodory:
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	1544	"convex hull p = {x::'a::euclidean_space. \<exists>s. finite s \<and> s \<subseteq> p \<and>
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	1545	card s \<le> DIM('a) + 1 \<and> x \<in> convex hull s}"
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	1546	unfolding set_eq_iff apply(rule, rule) unfolding mem_Collect_eq proof-
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1547	fix x assume "x \<in> convex hull p"
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	1548	then obtain s u where "finite s" "s \<subseteq> p" "card s \<le> DIM('a) + 1"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1549	"\<forall>x\<in>s. 0 \<le> u x" "setsum u s = 1" "(\<Sum>v\<in>s. u v *\<^sub>R v) = x"unfolding convex_hull_caratheodory by auto
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	1550	thus "\<exists>s. finite s \<and> s \<subseteq> p \<and> card s \<le> DIM('a) + 1 \<and> x \<in> convex hull s"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1551	apply(rule_tac x=s in exI) using hull_subset[of s convex]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1552	using convex_convex_hull[unfolded convex_explicit, of s, THEN spec[where x=s], THEN spec[where x=u]] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1553	next
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	1554	fix x assume "\<exists>s. finite s \<and> s \<subseteq> p \<and> card s \<le> DIM('a) + 1 \<and> x \<in> convex hull s"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	1555	then obtain s where "finite s" "s \<subseteq> p" "card s \<le> DIM('a) + 1" "x \<in> convex hull s" by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1556	thus "x \<in> convex hull p" using hull_mono[OF `s\<subseteq>p`] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1557	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	1558
40377 0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1559
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1560	subsection {* Some Properties of Affine Dependent Sets *}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1561
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1562	lemma affine_independent_empty: "~(affine_dependent {})"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1563	by (simp add: affine_dependent_def)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1564
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1565	lemma affine_independent_sing:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1566	fixes a :: "'n::euclidean_space"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1567	shows "~(affine_dependent {a})"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1568	by (simp add: affine_dependent_def)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1569
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1570	lemma affine_hull_translation:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1571	"affine hull ((%x. a + x) ` S) = (%x. a + x) ` (affine hull S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1572	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1573	have "affine ((%x. a + x) ` (affine hull S))" using affine_translation affine_affine_hull by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1574	moreover have "(%x. a + x) ` S <= (%x. a + x) ` (affine hull S)" using hull_subset[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1575	ultimately have h1: "affine hull ((%x. a + x) ` S) <= (%x. a + x) ` (affine hull S)" by (metis hull_minimal mem_def)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1576	have "affine((%x. -a + x) ` (affine hull ((%x. a + x) ` S)))" using affine_translation affine_affine_hull by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1577	moreover have "(%x. -a + x) ` (%x. a + x) ` S <= (%x. -a + x) ` (affine hull ((%x. a + x) ` S))" using hull_subset[of "(%x. a + x) ` S"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1578	moreover have "S=(%x. -a + x) ` (%x. a + x) ` S" using translation_assoc[of "-a" a] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1579	ultimately have "(%x. -a + x) ` (affine hull ((%x. a + x) ` S)) >= (affine hull S)" by (metis hull_minimal mem_def)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1580	hence "affine hull ((%x. a + x) ` S) >= (%x. a + x) ` (affine hull S)" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1581	from this show ?thesis using h1 by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1582	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1583
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1584	lemma affine_dependent_translation:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1585	assumes "affine_dependent S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1586	shows "affine_dependent ((%x. a + x) ` S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1587	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1588	obtain x where x_def: "x : S & x : affine hull (S - {x})" using assms affine_dependent_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1589	have "op + a ` (S - {x}) = op + a ` S - {a + x}" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1590	hence "a+x : affine hull ((%x. a + x) ` S - {a+x})" using affine_hull_translation[of a "S-{x}"] x_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1591	moreover have "a+x : (%x. a + x) ` S" using x_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1592	ultimately show ?thesis unfolding affine_dependent_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1593	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1594
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1595	lemma affine_dependent_translation_eq:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1596	"affine_dependent S <-> affine_dependent ((%x. a + x) ` S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1597	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1598	{ assume "affine_dependent ((%x. a + x) ` S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1599	hence "affine_dependent S" using affine_dependent_translation[of "((%x. a + x) ` S)" "-a"] translation_assoc[of "-a" a] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1600	} from this show ?thesis using affine_dependent_translation by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1601	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1602
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1603	lemma affine_hull_0_dependent:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1604	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1605	assumes "0 : affine hull S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1606	shows "dependent S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1607	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1608	obtain s u where s_u_def: "finite s & s ~= {} & s <= S & setsum u s = 1 & (SUM v:s. u v *\<^sub>R v) = 0" using assms affine_hull_explicit[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1609	hence "EX v:s. u v ~= 0" using setsum_not_0[of "u" "s"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1610	hence "finite s & s <= S & (EX v:s. u v ~= 0 & (SUM v:s. u v *\<^sub>R v) = 0)" using s_u_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1611	from this show ?thesis unfolding dependent_explicit[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1612	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1613
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1614	lemma affine_dependent_imp_dependent2:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1615	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1616	assumes "affine_dependent (insert 0 S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1617	shows "dependent S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1618	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1619	obtain x where x_def: "x:insert 0 S & x : affine hull (insert 0 S - {x})" using affine_dependent_def[of "(insert 0 S)"] assms by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1620	hence "x : span (insert 0 S - {x})" using affine_hull_subset_span by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1621	moreover have "span (insert 0 S - {x}) = span (S - {x})" using insert_Diff_if[of "0" S "{x}"] span_insert_0[of "S-{x}"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1622	ultimately have "x : span (S - {x})" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1623	hence "(x~=0) ==> dependent S" using x_def dependent_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1624	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1625	{ assume "x=0" hence "0 : affine hull S" using x_def hull_mono[of "S - {0}" S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1626	hence "dependent S" using affine_hull_0_dependent by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1627	} ultimately show ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1628	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1629
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1630	lemma affine_dependent_iff_dependent:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1631	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1632	assumes "a ~: S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1633	shows "affine_dependent (insert a S) <-> dependent ((%x. -a + x) ` S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1634	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1635	have "(op + (- a) ` S)={x - a\| x . x : S}" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1636	from this show ?thesis using affine_dependent_translation_eq[of "(insert a S)" "-a"]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1637	affine_dependent_imp_dependent2 assms
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1638	dependent_imp_affine_dependent[of a S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1639	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1640
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1641	lemma affine_dependent_iff_dependent2:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1642	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1643	assumes "a : S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1644	shows "affine_dependent S <-> dependent ((%x. -a + x) ` (S-{a}))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1645	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1646	have "insert a (S - {a})=S" using assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1647	from this show ?thesis using assms affine_dependent_iff_dependent[of a "S-{a}"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1648	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1649
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1650	lemma affine_hull_insert_span_gen:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1651	fixes a :: "_::euclidean_space"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1652	shows "affine hull (insert a s) = (%x. a+x) ` span ((%x. -a+x) ` s)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1653	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1654	have h1: "{x - a \|x. x : s}=((%x. -a+x) ` s)" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1655	{ assume "a ~: s" hence ?thesis using affine_hull_insert_span[of a s] h1 by auto}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1656	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1657	{ assume a1: "a : s"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1658	have "EX x. x:s & -a+x=0" apply (rule exI[of _ a]) using a1 by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1659	hence "insert 0 ((%x. -a+x) ` (s - {a}))=(%x. -a+x) ` s" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1660	hence "span ((%x. -a+x) ` (s - {a}))=span ((%x. -a+x) ` s)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1661	using span_insert_0[of "op + (- a) ` (s - {a})"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1662	moreover have "{x - a \|x. x : (s - {a})}=((%x. -a+x) ` (s - {a}))" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1663	moreover have "insert a (s - {a})=(insert a s)" using assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1664	ultimately have ?thesis using assms affine_hull_insert_span[of "a" "s-{a}"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1665	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1666	ultimately show ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1667	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1668
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1669	lemma affine_hull_span2:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1670	fixes a :: "_::euclidean_space"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1671	assumes "a : s"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1672	shows "affine hull s = (%x. a+x) ` span ((%x. -a+x) ` (s-{a}))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1673	using affine_hull_insert_span_gen[of a "s - {a}", unfolded insert_Diff[OF assms]] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1674
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1675	lemma affine_hull_span_gen:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1676	fixes a :: "_::euclidean_space"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1677	assumes "a : affine hull s"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1678	shows "affine hull s = (%x. a+x) ` span ((%x. -a+x) ` s)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1679	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1680	have "affine hull (insert a s) = affine hull s" using hull_redundant[of a affine s] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1681	from this show ?thesis using affine_hull_insert_span_gen[of a "s"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1682	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1683
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1684	lemma affine_hull_span_0:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1685	assumes "(0 :: _::euclidean_space) : affine hull S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1686	shows "affine hull S = span S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1687	using affine_hull_span_gen[of "0" S] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1688
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1689
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1690	lemma extend_to_affine_basis:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1691	fixes S V :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1692	assumes "~(affine_dependent S)" "S <= V" "S~={}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1693	shows "? T. ~(affine_dependent T) & S<=T & T<=V & affine hull T = affine hull V"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1694	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1695	obtain a where a_def: "a : S" using assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1696	hence h0: "independent ((%x. -a + x) ` (S-{a}))" using affine_dependent_iff_dependent2 assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1697	from this obtain B
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1698	where B_def: "(%x. -a+x) ` (S - {a}) <= B & B <= (%x. -a+x) ` V & independent B & (%x. -a+x) ` V <= span B"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1699	using maximal_independent_subset_extend[of "(%x. -a+x) ` (S-{a})" "(%x. -a + x) ` V"] assms by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1700	def T == "(%x. a+x) ` (insert 0 B)" hence "T=insert a ((%x. a+x) ` B)" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1701	hence "affine hull T = (%x. a+x) ` span B" using affine_hull_insert_span_gen[of a "((%x. a+x) ` B)"] translation_assoc[of "-a" a B] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1702	hence "V <= affine hull T" using B_def assms translation_inverse_subset[of a V "span B"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1703	moreover have "T<=V" using T_def B_def a_def assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1704	ultimately have "affine hull T = affine hull V"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1705	by (metis Int_absorb1 Int_absorb2 Int_commute Int_lower2 assms hull_hull hull_mono)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1706	moreover have "S<=T" using T_def B_def translation_inverse_subset[of a "S-{a}" B] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1707	moreover have "~(affine_dependent T)" using T_def affine_dependent_translation_eq[of "insert 0 B"] affine_dependent_imp_dependent2 B_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1708	ultimately show ?thesis using `T<=V` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1709	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1710
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1711	lemma affine_basis_exists:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1712	fixes V :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1713	shows "? B. B <= V & ~(affine_dependent B) & affine hull V = affine hull B"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1714	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1715	{ assume empt: "V={}" have "? B. B <= V & ~(affine_dependent B) & (affine hull V=affine hull B)" using empt affine_independent_empty by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1716	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1717	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1718	{ assume nonempt: "V~={}" obtain x where "x:V" using nonempt by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1719	hence "? B. B <= V & ~(affine_dependent B) & (affine hull V=affine hull B)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1720	using affine_dependent_def[of "{x}"] extend_to_affine_basis[of "{x}:: ('n::euclidean_space) set" V] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1721	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1722	ultimately show ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1723	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1724
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1725	subsection {* Affine Dimension of a Set *}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1726
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1727	definition "aff_dim V = (SOME d :: int. ? B. (affine hull B=affine hull V) & ~(affine_dependent B) & (of_nat(card B) = d+1))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1728
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1729	lemma aff_dim_basis_exists:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1730	fixes V :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1731	shows "? B. (affine hull B=affine hull V) & ~(affine_dependent B) & (of_nat(card B) = aff_dim V+1)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1732	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1733	obtain B where B_def: "~(affine_dependent B) & (affine hull B=affine hull V)" using affine_basis_exists[of V] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1734	from this show ?thesis unfolding aff_dim_def some_eq_ex[of "%d. ? (B :: ('n::euclidean_space) set). (affine hull B=affine hull V) & ~(affine_dependent B) & (of_nat(card B) = d+1)"] apply auto apply (rule exI[of _ "int (card B)-(1 :: int)"]) apply (rule exI[of _ "B"]) by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1735	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1736
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1737	lemma affine_hull_nonempty: "(S ~= {}) <-> affine hull S ~= {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1738	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1739	fix S have "(S = {}) ==> affine hull S = {}"using affine_hull_empty by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1740	moreover have "affine hull S = {} ==> S = {}" unfolding hull_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1741	ultimately show "(S ~= {}) <-> affine hull S ~= {}" by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1742	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1743
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1744	lemma aff_dim_parallel_subspace_aux:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1745	fixes B :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1746	assumes "~(affine_dependent B)" "a:B"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1747	shows "finite B & ((card B) - 1 = dim (span ((%x. -a+x) ` (B-{a}))))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1748	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1749	have "independent ((%x. -a + x) ` (B-{a}))" using affine_dependent_iff_dependent2 assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1750	hence fin: "dim (span ((%x. -a+x) ` (B-{a}))) = card ((%x. -a + x) ` (B-{a}))" "finite ((%x. -a + x) ` (B - {a}))" using indep_card_eq_dim_span[of "(%x. -a+x) ` (B-{a})"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1751	{ assume emp: "(%x. -a + x) ` (B - {a}) = {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1752	have "B=insert a ((%x. a + x) ` (%x. -a + x) ` (B - {a}))" using translation_assoc[of "a" "-a" "(B - {a})"] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1753	hence "B={a}" using emp by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1754	hence ?thesis using assms fin by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1755	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1756	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1757	{ assume "(%x. -a + x) ` (B - {a}) ~= {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1758	hence "card ((%x. -a + x) ` (B - {a}))>0" using fin by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1759	moreover have h1: "card ((%x. -a + x) ` (B-{a})) = card (B-{a})"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1760	apply (rule card_image) using translate_inj_on by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1761	ultimately have "card (B-{a})>0" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1762	hence "finite(B-{a})" using card_gt_0_iff[of "(B - {a})"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1763	moreover hence "(card (B-{a})= (card B) - 1)" using card_Diff_singleton assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1764	ultimately have ?thesis using fin h1 by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1765	} ultimately show ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1766	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1767
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1768	lemma aff_dim_parallel_subspace:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1769	fixes V L :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1770	assumes "V ~= {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1771	assumes "subspace L" "affine_parallel (affine hull V) L"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1772	shows "aff_dim V=int(dim L)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1773	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1774	obtain B where B_def: "affine hull B = affine hull V & ~ affine_dependent B & int (card B) = aff_dim V + 1" using aff_dim_basis_exists by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1775	hence "B~={}" using assms B_def affine_hull_nonempty[of V] affine_hull_nonempty[of B] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1776	from this obtain a where a_def: "a : B" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1777	def Lb == "span ((%x. -a+x) ` (B-{a}))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1778	moreover have "affine_parallel (affine hull B) Lb"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1779	using Lb_def B_def assms affine_hull_span2[of a B] a_def affine_parallel_commut[of "Lb" "(affine hull B)"] unfolding affine_parallel_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1780	moreover have "subspace Lb" using Lb_def subspace_span by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1781	moreover have "affine hull B ~= {}" using assms B_def affine_hull_nonempty[of V] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1782	ultimately have "L=Lb" using assms affine_parallel_subspace[of "affine hull B"] affine_affine_hull[of B] B_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1783	hence "dim L=dim Lb" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1784	moreover have "(card B) - 1 = dim Lb" "finite B" using Lb_def aff_dim_parallel_subspace_aux a_def B_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1785	(* hence "card B=dim Lb+1" using `B~={}` card_gt_0_iff[of B] by auto *)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1786	ultimately show ?thesis using B_def `B~={}` card_gt_0_iff[of B] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1787	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1788
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1789	lemma aff_independent_finite:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1790	fixes B :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1791	assumes "~(affine_dependent B)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1792	shows "finite B"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1793	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1794	{ assume "B~={}" from this obtain a where "a:B" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1795	hence ?thesis using aff_dim_parallel_subspace_aux assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1796	} from this show ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1797	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1798
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1799	lemma independent_finite:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1800	fixes B :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1801	assumes "independent B"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1802	shows "finite B"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1803	using affine_dependent_imp_dependent[of B] aff_independent_finite[of B] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1804
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1805	lemma subspace_dim_equal:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1806	assumes "subspace (S :: ('n::euclidean_space) set)" "subspace T" "S <= T" "dim S >= dim T"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1807	shows "S=T"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1808	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1809	obtain B where B_def: "B <= S & independent B & S <= span B & (card B = dim S)" using basis_exists[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1810	hence "span B <= S" using span_mono[of B S] span_eq[of S] assms by metis
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1811	hence "span B = S" using B_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1812	have "dim S = dim T" using assms dim_subset[of S T] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1813	hence "T <= span B" using card_eq_dim[of B T] B_def independent_finite assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1814	from this show ?thesis using assms `span B=S` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1815	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1816
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1817	lemma span_substd_basis: assumes "d\<subseteq>{..<DIM('a::euclidean_space)}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1818	shows "(span {basis i \| i. i : d}) = {x::'a::euclidean_space. (!i<DIM('a). i ~: d --> x$$i = 0)}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1819	(is "span ?A = ?B")
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1820	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1821	have "?A <= ?B" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1822	moreover have s: "subspace ?B" using subspace_substandard[of "%i. i ~: d"] .
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1823	ultimately have "span ?A <= ?B" using span_mono[of "?A" "?B"] span_eq[of "?B"] by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1824	moreover have "card d <= dim (span ?A)" using independent_card_le_dim[of "?A" "span ?A"]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1825	independent_substdbasis[OF assms] card_substdbasis[OF assms] span_inc[of "?A"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1826	moreover hence "dim ?B <= dim (span ?A)" using dim_substandard[OF assms] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1827	ultimately show ?thesis using s subspace_dim_equal[of "span ?A" "?B"]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1828	subspace_span[of "?A"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1829	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1830
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1831	lemma basis_to_substdbasis_subspace_isomorphism:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1832	fixes B :: "('a::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1833	assumes "independent B"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1834	shows "EX f d. card d = card B & linear f & f ` B = {basis i::'a \|i. i : (d :: nat set)} &
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1835	f ` span B = {x. ALL i<DIM('a). i ~: d --> x $$ i = (0::real)} & inj_on f (span B) \<and> d\<subseteq>{..<DIM('a)}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1836	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1837	have B:"card B=dim B" using dim_unique[of B B "card B"] assms span_inc[of B] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1838	def d \<equiv> "{..<dim B}" have t:"card d = dim B" unfolding d_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1839	have "dim B <= DIM('a)" using dim_subset_UNIV[of B] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1840	hence d:"d\<subseteq>{..<DIM('a)}" unfolding d_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1841	let ?t = "{x::'a::euclidean_space. !i<DIM('a). i ~: d --> x$$i = 0}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1842	have "EX f. linear f & f ` B = {basis i \|i. i : d} &
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1843	f ` span B = ?t & inj_on f (span B)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1844	apply (rule basis_to_basis_subspace_isomorphism[of "span B" ?t B "{basis i \|i. i : d}"])
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1845	apply(rule subspace_span) apply(rule subspace_substandard) defer
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1846	apply(rule span_inc) apply(rule assms) defer unfolding dim_span[of B] apply(rule B)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1847	unfolding span_substd_basis[OF d,THEN sym] card_substdbasis[OF d] apply(rule span_inc)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1848	apply(rule independent_substdbasis[OF d]) apply(rule,assumption)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1849	unfolding t[THEN sym] span_substd_basis[OF d] dim_substandard[OF d] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1850	from this t `card B=dim B` show ?thesis using d by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1851	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1852
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1853	lemma aff_dim_empty:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1854	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1855	shows "S = {} <-> aff_dim S = -1"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1856	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1857	obtain B where "affine hull B = affine hull S & ~ affine_dependent B & int (card B) = aff_dim S + 1" using aff_dim_basis_exists by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1858	moreover hence "S={} <-> B={}" using affine_hull_nonempty[of B] affine_hull_nonempty[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1859	ultimately show ?thesis using aff_independent_finite[of B] card_gt_0_iff[of B] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1860	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1861
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1862	lemma aff_dim_affine_hull:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1863	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1864	shows "aff_dim (affine hull S)=aff_dim S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1865	unfolding aff_dim_def using hull_hull[of _ S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1866
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1867	lemma aff_dim_affine_hull2:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1868	fixes S T :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1869	assumes "affine hull S=affine hull T"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1870	shows "aff_dim S=aff_dim T" unfolding aff_dim_def using assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1871
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1872	lemma aff_dim_unique:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1873	fixes B V :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1874	assumes "(affine hull B=affine hull V) & ~(affine_dependent B)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1875	shows "of_nat(card B) = aff_dim V+1"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1876	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1877	{ assume "B={}" hence "V={}" using affine_hull_nonempty[of V] affine_hull_nonempty[of B] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1878	hence "aff_dim V = (-1::int)" using aff_dim_empty by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1879	hence ?thesis using `B={}` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1880	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1881	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1882	{ assume "B~={}" from this obtain a where a_def: "a:B" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1883	def Lb == "span ((%x. -a+x) ` (B-{a}))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1884	have "affine_parallel (affine hull B) Lb"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1885	using Lb_def affine_hull_span2[of a B] a_def affine_parallel_commut[of "Lb" "(affine hull B)"]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1886	unfolding affine_parallel_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1887	moreover have "subspace Lb" using Lb_def subspace_span by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1888	ultimately have "aff_dim B=int(dim Lb)" using aff_dim_parallel_subspace[of B Lb] `B~={}` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1889	moreover have "(card B) - 1 = dim Lb" "finite B" using Lb_def aff_dim_parallel_subspace_aux a_def assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1890	ultimately have "(of_nat(card B) = aff_dim B+1)" using `B~={}` card_gt_0_iff[of B] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1891	hence ?thesis using aff_dim_affine_hull2 assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1892	} ultimately show ?thesis by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1893	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1894
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1895	lemma aff_dim_affine_independent:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1896	fixes B :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1897	assumes "~(affine_dependent B)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1898	shows "of_nat(card B) = aff_dim B+1"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1899	using aff_dim_unique[of B B] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1900
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1901	lemma aff_dim_sing:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1902	fixes a :: "'n::euclidean_space"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1903	shows "aff_dim {a}=0"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1904	using aff_dim_affine_independent[of "{a}"] affine_independent_sing by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1905
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1906	lemma aff_dim_inner_basis_exists:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1907	fixes V :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1908	shows "? B. B<=V & (affine hull B=affine hull V) & ~(affine_dependent B) & (of_nat(card B) = aff_dim V+1)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1909	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1910	obtain B where B_def: "~(affine_dependent B) & B<=V & (affine hull B=affine hull V)" using affine_basis_exists[of V] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1911	moreover hence "of_nat(card B) = aff_dim V+1" using aff_dim_unique by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1912	ultimately show ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1913	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1914
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1915	lemma aff_dim_le_card:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1916	fixes V :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1917	assumes "finite V"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1918	shows "aff_dim V <= of_nat(card V) - 1"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1919	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1920	obtain B where B_def: "B<=V & (of_nat(card B) = aff_dim V+1)" using aff_dim_inner_basis_exists[of V] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1921	moreover hence "card B <= card V" using assms card_mono by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1922	ultimately show ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1923	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1924
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1925	lemma aff_dim_parallel_eq:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1926	fixes S T :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1927	assumes "affine_parallel (affine hull S) (affine hull T)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1928	shows "aff_dim S=aff_dim T"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1929	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1930	{ assume "T~={}" "S~={}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1931	from this obtain L where L_def: "subspace L & affine_parallel (affine hull T) L"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1932	using affine_parallel_subspace[of "affine hull T"] affine_affine_hull[of T] affine_hull_nonempty by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1933	hence "aff_dim T = int(dim L)" using aff_dim_parallel_subspace `T~={}` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1934	moreover have "subspace L & affine_parallel (affine hull S) L"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1935	using L_def affine_parallel_assoc[of "affine hull S" "affine hull T" L] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1936	moreover hence "aff_dim S = int(dim L)" using aff_dim_parallel_subspace `S~={}` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1937	ultimately have ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1938	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1939	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1940	{ assume "S={}" hence "S={} & T={}" using assms affine_hull_nonempty unfolding affine_parallel_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1941	hence ?thesis using aff_dim_empty by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1942	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1943	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1944	{ assume "T={}" hence "S={} & T={}" using assms affine_hull_nonempty unfolding affine_parallel_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1945	hence ?thesis using aff_dim_empty by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1946	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1947	ultimately show ?thesis by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1948	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1949
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1950	lemma aff_dim_translation_eq:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1951	fixes a :: "'n::euclidean_space"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1952	shows "aff_dim ((%x. a + x) ` S)=aff_dim S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1953	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1954	have "affine_parallel (affine hull S) (affine hull ((%x. a + x) ` S))" unfolding affine_parallel_def apply (rule exI[of _ "a"]) using affine_hull_translation[of a S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1955	from this show ?thesis using aff_dim_parallel_eq[of S "(%x. a + x) ` S"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1956	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1957
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1958	lemma aff_dim_affine:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1959	fixes S L :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1960	assumes "S ~= {}" "affine S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1961	assumes "subspace L" "affine_parallel S L"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1962	shows "aff_dim S=int(dim L)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1963	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1964	have 1: "(affine hull S) = S" using assms affine_hull_eq[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1965	hence "affine_parallel (affine hull S) L" using assms by (simp add:1)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1966	from this show ?thesis using assms aff_dim_parallel_subspace[of S L] by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1967	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1968
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1969	lemma dim_affine_hull:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1970	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1971	shows "dim (affine hull S)=dim S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1972	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1973	have "dim (affine hull S)>=dim S" using dim_subset by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1974	moreover have "dim(span S) >= dim (affine hull S)" using dim_subset affine_hull_subset_span by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1975	moreover have "dim(span S)=dim S" using dim_span by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1976	ultimately show ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1977	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1978
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1979	lemma aff_dim_subspace:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1980	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1981	assumes "S ~= {}" "subspace S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1982	shows "aff_dim S=int(dim S)" using aff_dim_affine[of S S] assms subspace_imp_affine[of S] affine_parallel_reflex[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1983
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1984	lemma aff_dim_zero:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1985	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1986	assumes "0 : affine hull S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1987	shows "aff_dim S=int(dim S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1988	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1989	have "subspace(affine hull S)" using subspace_affine[of "affine hull S"] affine_affine_hull assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1990	hence "aff_dim (affine hull S) =int(dim (affine hull S))" using assms aff_dim_subspace[of "affine hull S"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1991	from this show ?thesis using aff_dim_affine_hull[of S] dim_affine_hull[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1992	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1993
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1994	lemma aff_dim_univ: "aff_dim (UNIV :: ('n::euclidean_space) set) = int(DIM('n))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1995	using aff_dim_subspace[of "(UNIV :: ('n::euclidean_space) set)"]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1996	dim_UNIV[where 'a="'n::euclidean_space"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1997
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1998	lemma aff_dim_geq:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	1999	fixes V :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2000	shows "aff_dim V >= -1"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2001	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2002	obtain B where B_def: "affine hull B = affine hull V & ~ affine_dependent B & int (card B) = aff_dim V + 1" using aff_dim_basis_exists by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2003	from this show ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2004	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2005
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2006	lemma independent_card_le_aff_dim:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2007	assumes "(B::('n::euclidean_space) set) <= V"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2008	assumes "~(affine_dependent B)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2009	shows "int(card B) <= aff_dim V+1"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2010	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2011	{ assume "B~={}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2012	from this obtain T where T_def: "~(affine_dependent T) & B<=T & T<=V & affine hull T = affine hull V"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2013	using assms extend_to_affine_basis[of B V] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2014	hence "of_nat(card T) = aff_dim V+1" using aff_dim_unique by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2015	hence ?thesis using T_def card_mono[of T B] aff_independent_finite[of T] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2016	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2017	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2018	{ assume "B={}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2019	moreover have "-1<= aff_dim V" using aff_dim_geq by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2020	ultimately have ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2021	} ultimately show ?thesis by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2022	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2023
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2024	lemma aff_dim_subset:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2025	fixes S T :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2026	assumes "S <= T"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2027	shows "aff_dim S <= aff_dim T"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2028	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2029	obtain B where B_def: "~(affine_dependent B) & B<=S & (affine hull B=affine hull S) & of_nat(card B) = aff_dim S+1" using aff_dim_inner_basis_exists[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2030	moreover hence "int (card B) <= aff_dim T + 1" using assms independent_card_le_aff_dim[of B T] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2031	ultimately show ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2032	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2033
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2034	lemma aff_dim_subset_univ:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2035	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2036	shows "aff_dim S <= int(DIM('n))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2037	proof -
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2038	have "aff_dim (UNIV :: ('n::euclidean_space) set) = int(DIM('n))" using aff_dim_univ by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2039	from this show "aff_dim (S:: ('n::euclidean_space) set) <= int(DIM('n))" using assms aff_dim_subset[of S "(UNIV :: ('n::euclidean_space) set)"] subset_UNIV by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2040	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2041
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2042	lemma affine_dim_equal:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2043	assumes "affine (S :: ('n::euclidean_space) set)" "affine T" "S ~= {}" "S <= T" "aff_dim S = aff_dim T"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2044	shows "S=T"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2045	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2046	obtain a where "a : S" using assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2047	hence "a : T" using assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2048	def LS == "{y. ? x : S. (-a)+x=y}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2049	hence ls: "subspace LS & affine_parallel S LS" using assms parallel_subspace_explicit[of S a LS] `a : S` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2050	hence h1: "int(dim LS) = aff_dim S" using assms aff_dim_affine[of S LS] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2051	have "T ~= {}" using assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2052	def LT == "{y. ? x : T. (-a)+x=y}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2053	hence lt: "subspace LT & affine_parallel T LT" using assms parallel_subspace_explicit[of T a LT] `a : T` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2054	hence "int(dim LT) = aff_dim T" using assms aff_dim_affine[of T LT] `T ~= {}` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2055	hence "dim LS = dim LT" using h1 assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2056	moreover have "LS <= LT" using LS_def LT_def assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2057	ultimately have "LS=LT" using subspace_dim_equal[of LS LT] ls lt by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2058	moreover have "S = {x. ? y : LS. a+y=x}" using LS_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2059	moreover have "T = {x. ? y : LT. a+y=x}" using LT_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2060	ultimately show ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2061	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2062
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2063	lemma affine_hull_univ:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2064	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2065	assumes "aff_dim S = int(DIM('n))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2066	shows "affine hull S = (UNIV :: ('n::euclidean_space) set)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2067	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2068	have "S ~= {}" using assms aff_dim_empty[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2069	have h0: "S <= affine hull S" using hull_subset[of S _] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2070	have h1: "aff_dim (UNIV :: ('n::euclidean_space) set) = aff_dim S" using aff_dim_univ assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2071	hence h2: "aff_dim (affine hull S) <= aff_dim (UNIV :: ('n::euclidean_space) set)" using aff_dim_subset_univ[of "affine hull S"] assms h0 by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2072	have h3: "aff_dim S <= aff_dim (affine hull S)" using h0 aff_dim_subset[of S "affine hull S"] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2073	hence h4: "aff_dim (affine hull S) = aff_dim (UNIV :: ('n::euclidean_space) set)" using h0 h1 h2 by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2074	from this show ?thesis using affine_dim_equal[of "affine hull S" "(UNIV :: ('n::euclidean_space) set)"] affine_affine_hull[of S] affine_UNIV assms h4 h0 `S ~= {}` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2075	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2076
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2077	lemma aff_dim_convex_hull:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2078	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2079	shows "aff_dim (convex hull S)=aff_dim S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2080	using aff_dim_affine_hull[of S] convex_hull_subset_affine_hull[of S]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2081	hull_subset[of S "convex"] aff_dim_subset[of S "convex hull S"]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2082	aff_dim_subset[of "convex hull S" "affine hull S"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2083
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2084	lemma aff_dim_cball:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2085	fixes a :: "'n::euclidean_space"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2086	assumes "0<e"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2087	shows "aff_dim (cball a e) = int (DIM('n))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2088	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2089	have "(%x. a + x) ` (cball 0 e)<=cball a e" unfolding cball_def dist_norm by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2090	hence "aff_dim (cball (0 :: 'n::euclidean_space) e) <= aff_dim (cball a e)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2091	using aff_dim_translation_eq[of a "cball 0 e"]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2092	aff_dim_subset[of "op + a ` cball 0 e" "cball a e"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2093	moreover have "aff_dim (cball (0 :: 'n::euclidean_space) e) = int (DIM('n))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2094	using hull_inc[of "(0 :: 'n::euclidean_space)" "cball 0 e"] centre_in_cball[of "(0 :: 'n::euclidean_space)"] assms
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2095	by (simp add: dim_cball[of e] aff_dim_zero[of "cball 0 e"])
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2096	ultimately show ?thesis using aff_dim_subset_univ[of "cball a e"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2097	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2098
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2099	lemma aff_dim_open:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2100	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2101	assumes "open S" "S ~= {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2102	shows "aff_dim S = int (DIM('n))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2103	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2104	obtain x where "x:S" using assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2105	from this obtain e where e_def: "e>0 & cball x e <= S" using open_contains_cball[of S] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2106	from this have "aff_dim (cball x e) <= aff_dim S" using aff_dim_subset by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2107	from this show ?thesis using aff_dim_cball[of e x] aff_dim_subset_univ[of S] e_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2108	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2109
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2110	lemma low_dim_interior:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2111	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2112	assumes "~(aff_dim S = int (DIM('n)))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2113	shows "interior S = {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2114	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2115	have "aff_dim(interior S) <= aff_dim S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2116	using interior_subset aff_dim_subset[of "interior S" S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2117	from this show ?thesis using aff_dim_open[of "interior S"] aff_dim_subset_univ[of S] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2118	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2119
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2120	subsection{* Relative Interior of a Set *}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2121
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2122	definition "rel_interior S = {x. ? T. openin (subtopology euclidean (affine hull S)) T & x : T & T <= S}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2123
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2124	lemma rel_interior: "rel_interior S = {x : S. ? T. open T & x : T & (T Int (affine hull S)) <= S}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2125	unfolding rel_interior_def[of S] openin_open[of "affine hull S"] apply auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2126	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2127	fix x T assume a: "x:S" "open T" "x : T" "(T Int (affine hull S)) <= S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2128	hence h1: "x : T Int affine hull S" using hull_inc by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2129	show "EX Tb. (EX Ta. open Ta & Tb = affine hull S Int Ta) & x : Tb & Tb <= S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2130	apply (rule_tac x="T Int (affine hull S)" in exI)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2131	using a h1 by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2132	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2133
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2134	lemma mem_rel_interior:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2135	"x : rel_interior S <-> (? T. open T & x : (T Int S) & (T Int (affine hull S)) <= S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2136	by (auto simp add: rel_interior)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2137
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2138	lemma mem_rel_interior_ball: "x : rel_interior S <-> x : S & (? e. 0 < e & ((ball x e) Int (affine hull S)) <= S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2139	apply (simp add: rel_interior, safe)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2140	apply (force simp add: open_contains_ball)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2141	apply (rule_tac x="ball x e" in exI)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2142	apply (simp add: open_ball centre_in_ball)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2143	done
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2144
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2145	lemma rel_interior_ball:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2146	"rel_interior S = {x : S. ? e. e>0 & ((ball x e) Int (affine hull S)) <= S}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2147	using mem_rel_interior_ball [of _ S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2148
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2149	lemma mem_rel_interior_cball: "x : rel_interior S <-> x : S & (? e. 0 < e & ((cball x e) Int (affine hull S)) <= S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2150	apply (simp add: rel_interior, safe)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2151	apply (force simp add: open_contains_cball)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2152	apply (rule_tac x="ball x e" in exI)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2153	apply (simp add: open_ball centre_in_ball subset_trans [OF ball_subset_cball])
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2154	apply auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2155	done
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2156
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2157	lemma rel_interior_cball: "rel_interior S = {x : S. ? e. e>0 & ((cball x e) Int (affine hull S)) <= S}" using mem_rel_interior_cball [of _ S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2158
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2159	lemma rel_interior_empty: "rel_interior {} = {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2160	by (auto simp add: rel_interior_def)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2161
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2162	lemma affine_hull_sing: "affine hull {a :: 'n::euclidean_space} = {a}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2163	by (metis affine_hull_eq affine_sing)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2164
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2165	lemma rel_interior_sing: "rel_interior {a :: 'n::euclidean_space} = {a}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2166	unfolding rel_interior_ball affine_hull_sing apply auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2167	apply(rule_tac x="1 :: real" in exI) apply simp
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2168	done
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2169
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2170	lemma subset_rel_interior:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2171	fixes S T :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2172	assumes "S<=T" "affine hull S=affine hull T"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2173	shows "rel_interior S <= rel_interior T"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2174	using assms by (auto simp add: rel_interior_def)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2175
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2176	lemma rel_interior_subset: "rel_interior S <= S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2177	by (auto simp add: rel_interior_def)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2178
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2179	lemma rel_interior_subset_closure: "rel_interior S <= closure S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2180	using rel_interior_subset by (auto simp add: closure_def)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2181
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2182	lemma interior_subset_rel_interior: "interior S <= rel_interior S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2183	by (auto simp add: rel_interior interior_def)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2184
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2185	lemma interior_rel_interior:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2186	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2187	assumes "aff_dim S = int(DIM('n))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2188	shows "rel_interior S = interior S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2189	proof -
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2190	have "affine hull S = UNIV" using assms affine_hull_univ[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2191	from this show ?thesis unfolding rel_interior interior_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2192	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2193
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2194	lemma rel_interior_open:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2195	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2196	assumes "open S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2197	shows "rel_interior S = S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2198	by (metis assms interior_eq interior_subset_rel_interior rel_interior_subset set_eq_subset)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2199
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2200	lemma interior_rel_interior_gen:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2201	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2202	shows "interior S = (if aff_dim S = int(DIM('n)) then rel_interior S else {})"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2203	by (metis interior_rel_interior low_dim_interior)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2204
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2205	lemma rel_interior_univ:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2206	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2207	shows "rel_interior (affine hull S) = affine hull S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2208	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2209	have h1: "rel_interior (affine hull S) <= affine hull S" using rel_interior_subset by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2210	{ fix x assume x_def: "x : affine hull S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2211	obtain e :: real where "e=1" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2212	hence "e>0 & ball x e Int affine hull (affine hull S) <= affine hull S" using hull_hull[of _ S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2213	hence "x : rel_interior (affine hull S)" using x_def rel_interior_ball[of "affine hull S"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2214	} from this show ?thesis using h1 by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2215	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2216
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2217	lemma rel_interior_univ2: "rel_interior (UNIV :: ('n::euclidean_space) set) = UNIV"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2218	by (metis open_UNIV rel_interior_open)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2219
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2220	lemma rel_interior_convex_shrink:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2221	fixes S :: "('a::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2222	assumes "convex S" "c : rel_interior S" "x : S" "0 < e" "e <= 1"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2223	shows "x - e *\<^sub>R (x - c) : rel_interior S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2224	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2225	(* Proof is a modified copy of the proof of similar lemma mem_interior_convex_shrink
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2226	*)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2227	obtain d where "d>0" and d:"ball c d Int affine hull S <= S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2228	using assms(2) unfolding mem_rel_interior_ball by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2229	{ fix y assume as:"dist (x - e \<^sub>R (x - c)) y < e d & y : affine hull S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2230	have :"y = (1 - (1 - e)) \<^sub>R ((1 / e) \<^sub>R y - ((1 - e) / e) \<^sub>R x) + (1 - e) *\<^sub>R x" using `e>0` by (auto simp add: scaleR_left_diff_distrib scaleR_right_diff_distrib)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2231	have "x : affine hull S" using assms hull_subset[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2232	moreover have "1 / e + - ((1 - e) / e) = 1"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2233	using `e>0` mult_left.diff[of "1" "(1-e)" "1/e"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2234	ultimately have *: "(1 / e) \<^sub>R y - ((1 - e) / e) *\<^sub>R x : affine hull S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2235	using as affine_affine_hull[of S] mem_affine[of "affine hull S" y x "(1 / e)" "-((1 - e) / e)"] by (simp add: algebra_simps)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2236	have "dist c ((1 / e) \<^sub>R y - ((1 - e) / e) \<^sub>R x) = abs(1/e) * norm (e \<^sub>R c - y + (1 - e) \<^sub>R x)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2237	unfolding dist_norm unfolding norm_scaleR[THEN sym] apply(rule arg_cong[where f=norm]) using `e>0`
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2238	by(auto simp add:euclidean_eq[where 'a='a] field_simps)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2239	also have "... = abs(1/e) * norm (x - e *\<^sub>R (x - c) - y)" by(auto intro!:arg_cong[where f=norm] simp add: algebra_simps)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2240	also have "... < d" using as[unfolded dist_norm] and `e>0`
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2241	by(auto simp add:pos_divide_less_eq[OF `e>0`] real_mult_commute)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2242	finally have "y : S" apply(subst *)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2243	apply(rule assms(1)[unfolded convex_alt,rule_format])
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2244	apply(rule d[unfolded subset_eq,rule_format]) unfolding mem_ball using assms(3-5) ** by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2245	} hence "ball (x - e \<^sub>R (x - c)) (ed) Int affine hull S <= S" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2246	moreover have "0 < e*d" using `0<e` `0<d` using real_mult_order by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2247	moreover have "c : S" using assms rel_interior_subset by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2248	moreover hence "x - e *\<^sub>R (x - c) : S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2249	using mem_convex[of S x c e] apply (simp add: algebra_simps) using assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2250	ultimately show ?thesis
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2251	using mem_rel_interior_ball[of "x - e *\<^sub>R (x - c)" S] `e>0` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2252	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2253
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2254	lemma interior_real_semiline:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2255	fixes a :: real
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2256	shows "interior {a..} = {a<..}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2257	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2258	{ fix y assume "a<y" hence "y : interior {a..}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2259	apply (simp add: mem_interior) apply (rule_tac x="(y-a)" in exI) apply (auto simp add: dist_norm)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2260	done }
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2261	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2262	{ fix y assume "y : interior {a..}" (hence "a<=y" using interior_subset by auto)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2263	from this obtain e where e_def: "e>0 & cball y e \<subseteq> {a..}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2264	using mem_interior_cball[of y "{a..}"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2265	moreover hence "y-e : cball y e" by (auto simp add: cball_def dist_norm)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2266	ultimately have "a<=y-e" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2267	hence "a<y" using e_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2268	} ultimately show ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2269	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2270
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2271	lemma rel_interior_real_interval:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2272	fixes a b :: real assumes "a < b" shows "rel_interior {a..b} = {a<..<b}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2273	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2274	have "{a<..<b} \<noteq> {}" using assms unfolding set_eq_iff by (auto intro!: exI[of _ "(a + b) / 2"])
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2275	then show ?thesis
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2276	using interior_rel_interior_gen[of "{a..b}", symmetric]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2277	by (simp split: split_if_asm add: interior_closed_interval)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2278	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2279
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2280	lemma rel_interior_real_semiline:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2281	fixes a :: real shows "rel_interior {a..} = {a<..}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2282	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2283	have *: "{a<..} \<noteq> {}" unfolding set_eq_iff by (auto intro!: exI[of _ "a + 1"])
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2284	then show ?thesis using interior_real_semiline
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2285	interior_rel_interior_gen[of "{a..}"]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2286	by (auto split: split_if_asm)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2287	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2288
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2289	subsection "Relative open"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2290
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2291	definition "rel_open S <-> (rel_interior S) = S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2292
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2293	lemma rel_open: "rel_open S <-> openin (subtopology euclidean (affine hull S)) S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2294	unfolding rel_open_def rel_interior_def apply auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2295	using openin_subopen[of "subtopology euclidean (affine hull S)" S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2296
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2297	lemma opein_rel_interior:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2298	"openin (subtopology euclidean (affine hull S)) (rel_interior S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2299	apply (simp add: rel_interior_def)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2300	apply (subst openin_subopen) by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2301
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2302	lemma affine_rel_open:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2303	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2304	assumes "affine S" shows "rel_open S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2305	unfolding rel_open_def using assms rel_interior_univ[of S] affine_hull_eq[of S] by metis
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2306
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2307	lemma affine_closed:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2308	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2309	assumes "affine S" shows "closed S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2310	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2311	{ assume "S ~= {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2312	from this obtain L where L_def: "subspace L & affine_parallel S L"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2313	using assms affine_parallel_subspace[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2314	from this obtain "a" where a_def: "S=(op + a ` L)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2315	using affine_parallel_def[of L S] affine_parallel_commut by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2316	have "closed L" using L_def closed_subspace by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2317	hence "closed S" using closed_translation a_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2318	} from this show ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2319	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2320
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2321	lemma closure_affine_hull:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2322	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2323	shows "closure S <= affine hull S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2324	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2325	have "closure S <= closure (affine hull S)" using subset_closure by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2326	moreover have "closure (affine hull S) = affine hull S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2327	using affine_affine_hull affine_closed[of "affine hull S"] closure_eq by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2328	ultimately show ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2329	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2330
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2331	lemma closure_same_affine_hull:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2332	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2333	shows "affine hull (closure S) = affine hull S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2334	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2335	have "affine hull (closure S) <= affine hull S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2336	using hull_mono[of "closure S" "affine hull S" "affine"] closure_affine_hull[of S] hull_hull[of "affine" S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2337	moreover have "affine hull (closure S) >= affine hull S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2338	using hull_mono[of "S" "closure S" "affine"] closure_subset by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2339	ultimately show ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2340	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2341
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2342	lemma closure_aff_dim:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2343	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2344	shows "aff_dim (closure S) = aff_dim S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2345	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2346	have "aff_dim S <= aff_dim (closure S)" using aff_dim_subset closure_subset by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2347	moreover have "aff_dim (closure S) <= aff_dim (affine hull S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2348	using aff_dim_subset closure_affine_hull by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2349	moreover have "aff_dim (affine hull S) = aff_dim S" using aff_dim_affine_hull by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2350	ultimately show ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2351	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2352
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2353	lemma rel_interior_closure_convex_shrink:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2354	fixes S :: "(_::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2355	assumes "convex S" "c : rel_interior S" "x : closure S" "0 < e" "e <= 1"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2356	shows "x - e *\<^sub>R (x - c) : rel_interior S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2357	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2358	(* Proof is a modified copy of the proof of similar lemma mem_interior_closure_convex_shrink
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2359	*)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2360	obtain d where "d>0" and d:"ball c d Int affine hull S <= S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2361	using assms(2) unfolding mem_rel_interior_ball by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2362	have "EX y : S. norm (y - x) * (1 - e) < e * d" proof(cases "x : S")
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2363	case True thus ?thesis using `e>0` `d>0` by(rule_tac bexI[where x=x], auto intro!: mult_pos_pos) next
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2364	case False hence x:"x islimpt S" using assms(3)[unfolded closure_def] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2365	show ?thesis proof(cases "e=1")
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2366	case True obtain y where "y : S" "y ~= x" "dist y x < 1"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2367	using x[unfolded islimpt_approachable,THEN spec[where x=1]] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2368	thus ?thesis apply(rule_tac x=y in bexI) unfolding True using `d>0` by auto next
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2369	case False hence "0 < e * d / (1 - e)" and *:"1 - e > 0"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2370	using `e<=1` `e>0` `d>0` by(auto intro!:mult_pos_pos divide_pos_pos)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2371	then obtain y where "y : S" "y ~= x" "dist y x < e * d / (1 - e)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2372	using x[unfolded islimpt_approachable,THEN spec[where x="e*d / (1 - e)"]] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2373	thus ?thesis apply(rule_tac x=y in bexI) unfolding dist_norm using pos_less_divide_eq[OF *] by auto qed qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2374	then obtain y where "y : S" and y:"norm (y - x) * (1 - e) < e * d" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2375	def z == "c + ((1 - e) / e) *\<^sub>R (x - y)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2376	have :"x - e \<^sub>R (x - c) = y - e *\<^sub>R (y - z)" unfolding z_def using `e>0` by (auto simp add: scaleR_right_diff_distrib scaleR_right_distrib scaleR_left_diff_distrib)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2377	have zball: "z\<in>ball c d"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2378	using mem_ball z_def dist_norm[of c] using y and assms(4,5) by (auto simp add:field_simps norm_minus_commute)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2379	have "x : affine hull S" using closure_affine_hull assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2380	moreover have "y : affine hull S" using `y : S` hull_subset[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2381	moreover have "c : affine hull S" using assms rel_interior_subset hull_subset[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2382	ultimately have "z : affine hull S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2383	using z_def affine_affine_hull[of S]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2384	mem_affine_3_minus [of "affine hull S" c x y "(1 - e) / e"]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2385	assms by (auto simp add: field_simps)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2386	hence "z : S" using d zball by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2387	obtain d1 where "d1>0" and d1:"ball z d1 <= ball c d"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2388	using zball open_ball[of c d] openE[of "ball c d" z] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2389	hence "(ball z d1) Int (affine hull S) <= (ball c d) Int (affine hull S)" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2390	hence "(ball z d1) Int (affine hull S) <= S" using d by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2391	hence "z : rel_interior S" using mem_rel_interior_ball using `d1>0` `z : S` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2392	hence "y - e *\<^sub>R (y - z) : rel_interior S" using rel_interior_convex_shrink[of S z y e] assms`y : S` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2393	thus ?thesis using * by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2394	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2395
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2396	subsection{* Relative interior preserves under linear transformations *}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2397
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2398	lemma rel_interior_translation_aux:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2399	fixes a :: "'n::euclidean_space"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2400	shows "((%x. a + x) ` rel_interior S) <= rel_interior ((%x. a + x) ` S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2401	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2402	{ fix x assume x_def: "x : rel_interior S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2403	from this obtain T where T_def: "open T & x : (T Int S) & (T Int (affine hull S)) <= S" using mem_rel_interior[of x S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2404	from this have "open ((%x. a + x) ` T)" and
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2405	"(a + x) : (((%x. a + x) ` T) Int ((%x. a + x) ` S))" and
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2406	"(((%x. a + x) ` T) Int (affine hull ((%x. a + x) ` S))) <= ((%x. a + x) ` S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2407	using affine_hull_translation[of a S] open_translation[of T a] x_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2408	from this have "(a+x) : rel_interior ((%x. a + x) ` S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2409	using mem_rel_interior[of "a+x" "((%x. a + x) ` S)"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2410	} from this show ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2411	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2412
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2413	lemma rel_interior_translation:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2414	fixes a :: "'n::euclidean_space"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2415	shows "rel_interior ((%x. a + x) ` S) = ((%x. a + x) ` rel_interior S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2416	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2417	have "(%x. (-a) + x) ` rel_interior ((%x. a + x) ` S) <= rel_interior S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2418	using rel_interior_translation_aux[of "-a" "(%x. a + x) ` S"]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2419	translation_assoc[of "-a" "a"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2420	hence "((%x. a + x) ` rel_interior S) >= rel_interior ((%x. a + x) ` S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2421	using translation_inverse_subset[of a "rel_interior (op + a ` S)" "rel_interior S"]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2422	by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2423	from this show ?thesis using rel_interior_translation_aux[of a S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2424	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2425
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2426
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2427	lemma affine_hull_linear_image:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2428	assumes "bounded_linear f"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2429	shows "f ` (affine hull s) = affine hull f ` s"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2430	(* Proof is a modified copy of the proof of similar lemma convex_hull_linear_image
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2431	*)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2432	apply rule unfolding subset_eq ball_simps apply(rule_tac[!] hull_induct, rule hull_inc) prefer 3
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2433	apply(erule imageE)apply(rule_tac x=xa in image_eqI) apply assumption
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2434	apply(rule hull_subset[unfolded subset_eq, rule_format]) apply assumption
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2435	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2436	interpret f: bounded_linear f by fact
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2437	show "affine {x. f x : affine hull f ` s}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2438	unfolding affine_def by(auto simp add: f.scaleR f.add affine_affine_hull[unfolded affine_def, rule_format]) next
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2439	interpret f: bounded_linear f by fact
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2440	show "affine {x. x : f ` (affine hull s)}" using affine_affine_hull[unfolded affine_def, of s]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2441	unfolding affine_def by (auto simp add: f.scaleR [symmetric] f.add [symmetric])
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2442	qed auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2443
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2444
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2445	lemma rel_interior_injective_on_span_linear_image:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2446	fixes f :: "('m::euclidean_space) => ('n::euclidean_space)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2447	fixes S :: "('m::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2448	assumes "bounded_linear f" and "inj_on f (span S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2449	shows "rel_interior (f ` S) = f ` (rel_interior S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2450	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2451	{ fix z assume z_def: "z : rel_interior (f ` S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2452	have "z : f ` S" using z_def rel_interior_subset[of "f ` S"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2453	from this obtain x where x_def: "x : S & (f x = z)" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2454	obtain e2 where e2_def: "e2>0 & cball z e2 Int affine hull (f ` S) <= (f ` S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2455	using z_def rel_interior_cball[of "f ` S"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2456	obtain K where K_def: "K>0 & (! x. norm (f x) <= norm x * K)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2457	using assms RealVector.bounded_linear.pos_bounded[of f] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2458	def e1 == "1/K" hence e1_def: "e1>0 & (! x. e1 * norm (f x) <= norm x)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2459	using K_def pos_le_divide_eq[of e1] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2460	def e == "e1 * e2" hence "e>0" using e1_def e2_def real_mult_order by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2461	{ fix y assume y_def: "y : cball x e Int affine hull S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2462	from this have h1: "f y : affine hull (f ` S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2463	using affine_hull_linear_image[of f S] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2464	from y_def have "norm (x-y)<=e1 * e2"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2465	using cball_def[of x e] dist_norm[of x y] e_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2466	moreover have "(f x)-(f y)=f (x-y)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2467	using assms linear_sub[of f x y] linear_conv_bounded_linear[of f] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2468	moreover have "e1 * norm (f (x-y)) <= norm (x-y)" using e1_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2469	ultimately have "e1 * norm ((f x)-(f y)) <= e1 * e2" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2470	hence "(f y) : (cball z e2)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2471	using cball_def[of "f x" e2] dist_norm[of "f x" "f y"] e1_def x_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2472	hence "f y : (f ` S)" using y_def e2_def h1 by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2473	hence "y : S" using assms y_def hull_subset[of S] affine_hull_subset_span
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2474	inj_on_image_mem_iff[of f "span S" S y] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2475	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2476	hence "z : f ` (rel_interior S)" using mem_rel_interior_cball[of x S] `e>0` x_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2477	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2478	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2479	{ fix x assume x_def: "x : rel_interior S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2480	from this obtain e2 where e2_def: "e2>0 & cball x e2 Int affine hull S <= S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2481	using rel_interior_cball[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2482	have "x : S" using x_def rel_interior_subset by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2483	hence *: "f x : f ` S" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2484	have "! x:span S. f x = 0 --> x = 0"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2485	using assms subspace_span linear_conv_bounded_linear[of f]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2486	linear_injective_on_subspace_0[of f "span S"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2487	from this obtain e1 where e1_def: "e1>0 & (! x : span S. e1 * norm x <= norm (f x))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2488	using assms injective_imp_isometric[of "span S" f]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2489	subspace_span[of S] closed_subspace[of "span S"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2490	def e == "e1 * e2" hence "e>0" using e1_def e2_def real_mult_order by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2491	{ fix y assume y_def: "y : cball (f x) e Int affine hull (f ` S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2492	from this have "y : f ` (affine hull S)" using affine_hull_linear_image[of f S] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2493	from this obtain xy where xy_def: "xy : affine hull S & (f xy = y)" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2494	from this y_def have "norm ((f x)-(f xy))<=e1 * e2"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2495	using cball_def[of "f x" e] dist_norm[of "f x" y] e_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2496	moreover have "(f x)-(f xy)=f (x-xy)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2497	using assms linear_sub[of f x xy] linear_conv_bounded_linear[of f] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2498	moreover have "x-xy : span S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2499	using subspace_sub[of "span S" x xy] subspace_span `x : S` xy_def
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2500	affine_hull_subset_span[of S] span_inc by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2501	moreover hence "e1 * norm (x-xy) <= norm (f (x-xy))" using e1_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2502	ultimately have "e1 * norm (x-xy) <= e1 * e2" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2503	hence "xy : (cball x e2)" using cball_def[of x e2] dist_norm[of x xy] e1_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2504	hence "y : (f ` S)" using xy_def e2_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2505	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2506	hence "(f x) : rel_interior (f ` S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2507	using mem_rel_interior_cball[of "(f x)" "(f ` S)"] * `e>0` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2508	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2509	ultimately show ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2510	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2511
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2512	lemma rel_interior_injective_linear_image:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2513	fixes f :: "('m::euclidean_space) => ('n::euclidean_space)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2514	assumes "bounded_linear f" and "inj f"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2515	shows "rel_interior (f ` S) = f ` (rel_interior S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2516	using assms rel_interior_injective_on_span_linear_image[of f S]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2517	subset_inj_on[of f "UNIV" "span S"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2518
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2519	subsection{* Some Properties of subset of standard basis *}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2520
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2521	lemma affine_hull_substd_basis: assumes "d\<subseteq>{..<DIM('a::euclidean_space)}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2522	shows "affine hull (insert 0 {basis i \| i. i : d}) =
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2523	{x::'a::euclidean_space. (!i<DIM('a). i ~: d --> x$$i = 0)}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2524	(is "affine hull (insert 0 ?A) = ?B")
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2525	proof- have *:"\<And>A. op + (0\<Colon>'a) ` A = A" "\<And>A. op + (- (0\<Colon>'a)) ` A = A" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2526	show ?thesis unfolding affine_hull_insert_span_gen span_substd_basis[OF assms,THEN sym] * ..
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2527	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2528
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2529	lemma affine_hull_convex_hull: "affine hull (convex hull S) = affine hull S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2530	by (metis Int_absorb1 Int_absorb2 convex_hull_subset_affine_hull hull_hull hull_mono hull_subset)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	2531
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2532	subsection {* Openness and compactness are preserved by convex hull operation. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2533
34964 4e8be3c04d37 Replaced vec1 and dest_vec1 by abbreviation. hoelzl parents: 34915 diff changeset	2534	lemma open_convex_hull[intro]:
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2535	fixes s :: "'a::real_normed_vector set"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2536	assumes "open s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2537	shows "open(convex hull s)"
43969 8adc47768db0 adjusted to tailored version of ball_simps haftmann parents: 41959 diff changeset	2538	unfolding open_contains_cball convex_hull_explicit unfolding mem_Collect_eq ball_simps(8)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2539	proof(rule, rule) fix a
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2540	assume "\<exists>sa u. finite sa \<and> sa \<subseteq> s \<and> (\<forall>x\<in>sa. 0 \<le> u x) \<and> setsum u sa = 1 \<and> (\<Sum>v\<in>sa. u v *\<^sub>R v) = a"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2541	then obtain t u where obt:"finite t" "t\<subseteq>s" "\<forall>x\<in>t. 0 \<le> u x" "setsum u t = 1" "(\<Sum>v\<in>t. u v *\<^sub>R v) = a" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2542
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2543	from assms[unfolded open_contains_cball] obtain b where b:"\<forall>x\<in>s. 0 < b x \<and> cball x (b x) \<subseteq> s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2544	using bchoice[of s "\<lambda>x e. e>0 \<and> cball x e \<subseteq> s"] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2545	have "b ` t\<noteq>{}" unfolding i_def using obt by auto def i \<equiv> "b ` t"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2546
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2547	show "\<exists>e>0. cball a e \<subseteq> {y. \<exists>sa u. finite sa \<and> sa \<subseteq> s \<and> (\<forall>x\<in>sa. 0 \<le> u x) \<and> setsum u sa = 1 \<and> (\<Sum>v\<in>sa. u v *\<^sub>R v) = y}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2548	apply(rule_tac x="Min i" in exI) unfolding subset_eq apply rule defer apply rule unfolding mem_Collect_eq
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2549	proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2550	show "0 < Min i" unfolding i_def and Min_gr_iff[OF finite_imageI[OF obt(1)] `b \` t\<noteq>{}`]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2551	using b apply simp apply rule apply(erule_tac x=x in ballE) using `t\<subseteq>s` by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2552	next fix y assume "y \<in> cball a (Min i)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2553	hence y:"norm (a - y) \<le> Min i" unfolding dist_norm[THEN sym] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2554	{ fix x assume "x\<in>t"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2555	hence "Min i \<le> b x" unfolding i_def apply(rule_tac Min_le) using obt(1) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2556	hence "x + (y - a) \<in> cball x (b x)" using y unfolding mem_cball dist_norm by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2557	moreover from `x\<in>t` have "x\<in>s" using obt(2) by auto
36362 06475a1547cb fix lots of looping simp calls and other warnings huffman parents: 36341 diff changeset	2558	ultimately have "x + (y - a) \<in> s" using y and b[THEN bspec[where x=x]] unfolding subset_eq by fast }
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2559	moreover
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2560	have *:"inj_on (\<lambda>v. v + (y - a)) t" unfolding inj_on_def by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2561	have "(\<Sum>v\<in>(\<lambda>v. v + (y - a)) ` t. u (v - (y - a))) = 1"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2562	unfolding setsum_reindex[OF *] o_def using obt(4) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2563	moreover have "(\<Sum>v\<in>(\<lambda>v. v + (y - a)) ` t. u (v - (y - a)) *\<^sub>R v) = y"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2564	unfolding setsum_reindex[OF *] o_def using obt(4,5)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2565	by (simp add: setsum_addf setsum_subtractf scaleR_left.setsum[THEN sym] scaleR_right_distrib)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2566	ultimately show "\<exists>sa u. finite sa \<and> (\<forall>x\<in>sa. x \<in> s) \<and> (\<forall>x\<in>sa. 0 \<le> u x) \<and> setsum u sa = 1 \<and> (\<Sum>v\<in>sa. u v *\<^sub>R v) = y"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2567	apply(rule_tac x="(\<lambda>v. v + (y - a)) ` t" in exI) apply(rule_tac x="\<lambda>v. u (v - (y - a))" in exI)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2568	using obt(1, 3) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2569	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2570	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2571
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2572	lemma compact_convex_combinations:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2573	fixes s t :: "'a::real_normed_vector set"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2574	assumes "compact s" "compact t"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2575	shows "compact { (1 - u) \<^sub>R x + u \<^sub>R y \| x y u. 0 \<le> u \<and> u \<le> 1 \<and> x \<in> s \<and> y \<in> t}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2576	proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2577	let ?X = "{0..1} \<times> s \<times> t"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2578	let ?h = "(\<lambda>z. (1 - fst z) \<^sub>R fst (snd z) + fst z \<^sub>R snd (snd z))"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2579	have :"{ (1 - u) \<^sub>R x + u *\<^sub>R y \| x y u. 0 \<le> u \<and> u \<le> 1 \<and> x \<in> s \<and> y \<in> t} = ?h ` ?X"
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	2580	apply(rule set_eqI) unfolding image_iff mem_Collect_eq
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2581	apply rule apply auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2582	apply (rule_tac x=u in rev_bexI, simp)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2583	apply (erule rev_bexI, erule rev_bexI, simp)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2584	by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2585	have "continuous_on ({0..1} \<times> s \<times> t)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2586	(\<lambda>z. (1 - fst z) \<^sub>R fst (snd z) + fst z \<^sub>R snd (snd z))"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2587	unfolding continuous_on by (rule ballI) (intro tendsto_intros)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2588	thus ?thesis unfolding *
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2589	apply (rule compact_continuous_image)
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	2590	apply (intro compact_Times compact_interval assms)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2591	done
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2592	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2593
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	2594	lemma compact_convex_hull: fixes s::"('a::euclidean_space) set"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2595	assumes "compact s" shows "compact(convex hull s)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2596	proof(cases "s={}")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2597	case True thus ?thesis using compact_empty by simp
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2598	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2599	case False then obtain w where "w\<in>s" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2600	show ?thesis unfolding caratheodory[of s]
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	2601	proof(induct ("DIM('a) + 1"))
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2602	have *:"{x.\<exists>sa. finite sa \<and> sa \<subseteq> s \<and> card sa \<le> 0 \<and> x \<in> convex hull sa} = {}"
36362 06475a1547cb fix lots of looping simp calls and other warnings huffman parents: 36341 diff changeset	2603	using compact_empty by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2604	case 0 thus ?case unfolding * by simp
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2605	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2606	case (Suc n)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2607	show ?case proof(cases "n=0")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2608	case True have "{x. \<exists>t. finite t \<and> t \<subseteq> s \<and> card t \<le> Suc n \<and> x \<in> convex hull t} = s"
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	2609	unfolding set_eq_iff and mem_Collect_eq proof(rule, rule)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2610	fix x assume "\<exists>t. finite t \<and> t \<subseteq> s \<and> card t \<le> Suc n \<and> x \<in> convex hull t"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2611	then obtain t where t:"finite t" "t \<subseteq> s" "card t \<le> Suc n" "x \<in> convex hull t" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2612	show "x\<in>s" proof(cases "card t = 0")
36362 06475a1547cb fix lots of looping simp calls and other warnings huffman parents: 36341 diff changeset	2613	case True thus ?thesis using t(4) unfolding card_0_eq[OF t(1)] by simp
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2614	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2615	case False hence "card t = Suc 0" using t(3) `n=0` by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2616	then obtain a where "t = {a}" unfolding card_Suc_eq by auto
36362 06475a1547cb fix lots of looping simp calls and other warnings huffman parents: 36341 diff changeset	2617	thus ?thesis using t(2,4) by simp
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2618	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2619	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2620	fix x assume "x\<in>s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2621	thus "\<exists>t. finite t \<and> t \<subseteq> s \<and> card t \<le> Suc n \<and> x \<in> convex hull t"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2622	apply(rule_tac x="{x}" in exI) unfolding convex_hull_singleton by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2623	qed thus ?thesis using assms by simp
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2624	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2625	case False have "{x. \<exists>t. finite t \<and> t \<subseteq> s \<and> card t \<le> Suc n \<and> x \<in> convex hull t} =
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2626	{ (1 - u) \<^sub>R x + u \<^sub>R y \| x y u.
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2627	0 \<le> u \<and> u \<le> 1 \<and> x \<in> s \<and> y \<in> {x. \<exists>t. finite t \<and> t \<subseteq> s \<and> card t \<le> n \<and> x \<in> convex hull t}}"
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	2628	unfolding set_eq_iff and mem_Collect_eq proof(rule,rule)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2629	fix x assume "\<exists>u v c. x = (1 - c) \<^sub>R u + c \<^sub>R v \<and>
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2630	0 \<le> c \<and> c \<le> 1 \<and> u \<in> s \<and> (\<exists>t. finite t \<and> t \<subseteq> s \<and> card t \<le> n \<and> v \<in> convex hull t)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2631	then obtain u v c t where obt:"x = (1 - c) \<^sub>R u + c \<^sub>R v"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2632	"0 \<le> c \<and> c \<le> 1" "u \<in> s" "finite t" "t \<subseteq> s" "card t \<le> n" "v \<in> convex hull t" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2633	moreover have "(1 - c) \<^sub>R u + c \<^sub>R v \<in> convex hull insert u t"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2634	apply(rule mem_convex) using obt(2) and convex_convex_hull and hull_subset[of "insert u t" convex]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2635	using obt(7) and hull_mono[of t "insert u t"] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2636	ultimately show "\<exists>t. finite t \<and> t \<subseteq> s \<and> card t \<le> Suc n \<and> x \<in> convex hull t"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2637	apply(rule_tac x="insert u t" in exI) by (auto simp add: card_insert_if)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2638	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2639	fix x assume "\<exists>t. finite t \<and> t \<subseteq> s \<and> card t \<le> Suc n \<and> x \<in> convex hull t"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2640	then obtain t where t:"finite t" "t \<subseteq> s" "card t \<le> Suc n" "x \<in> convex hull t" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2641	let ?P = "\<exists>u v c. x = (1 - c) \<^sub>R u + c \<^sub>R v \<and>
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2642	0 \<le> c \<and> c \<le> 1 \<and> u \<in> s \<and> (\<exists>t. finite t \<and> t \<subseteq> s \<and> card t \<le> n \<and> v \<in> convex hull t)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2643	show ?P proof(cases "card t = Suc n")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2644	case False hence "card t \<le> n" using t(3) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2645	thus ?P apply(rule_tac x=w in exI, rule_tac x=x in exI, rule_tac x=1 in exI) using `w\<in>s` and t
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2646	by(auto intro!: exI[where x=t])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2647	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2648	case True then obtain a u where au:"t = insert a u" "a\<notin>u" apply(drule_tac card_eq_SucD) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2649	show ?P proof(cases "u={}")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2650	case True hence "x=a" using t(4)[unfolded au] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2651	show ?P unfolding `x=a` apply(rule_tac x=a in exI, rule_tac x=a in exI, rule_tac x=1 in exI)
36362 06475a1547cb fix lots of looping simp calls and other warnings huffman parents: 36341 diff changeset	2652	using t and `n\<noteq>0` unfolding au by(auto intro!: exI[where x="{a}"])
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2653	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2654	case False obtain ux vx b where obt:"ux\<ge>0" "vx\<ge>0" "ux + vx = 1" "b \<in> convex hull u" "x = ux \<^sub>R a + vx \<^sub>R b"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2655	using t(4)[unfolded au convex_hull_insert[OF False]] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2656	have *:"1 - vx = ux" using obt(3) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2657	show ?P apply(rule_tac x=a in exI, rule_tac x=b in exI, rule_tac x=vx in exI)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2658	using obt and t(1-3) unfolding au and * using card_insert_disjoint[OF _ au(2)]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2659	by(auto intro!: exI[where x=u])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2660	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2661	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2662	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2663	thus ?thesis using compact_convex_combinations[OF assms Suc] by simp
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2664	qed
36362 06475a1547cb fix lots of looping simp calls and other warnings huffman parents: 36341 diff changeset	2665	qed
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2666	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2667
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2668	lemma finite_imp_compact_convex_hull:
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	2669	fixes s :: "('a::euclidean_space) set"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2670	shows "finite s \<Longrightarrow> compact(convex hull s)"
36071 c8ae8e56d42e tuned many proofs a bit nipkow parents: 35577 diff changeset	2671	by (metis compact_convex_hull finite_imp_compact)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2672
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2673	subsection {* Extremal points of a simplex are some vertices. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2674
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2675	lemma dist_increases_online:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2676	fixes a b d :: "'a::real_inner"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2677	assumes "d \<noteq> 0"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2678	shows "dist a (b + d) > dist a b \<or> dist a (b - d) > dist a b"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2679	proof(cases "inner a d - inner b d > 0")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2680	case True hence "0 < inner d d + (inner a d * 2 - inner b d * 2)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2681	apply(rule_tac add_pos_pos) using assms by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2682	thus ?thesis apply(rule_tac disjI2) unfolding dist_norm and norm_eq_sqrt_inner and real_sqrt_less_iff
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2683	by (simp add: algebra_simps inner_commute)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2684	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2685	case False hence "0 < inner d d + (inner b d * 2 - inner a d * 2)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2686	apply(rule_tac add_pos_nonneg) using assms by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2687	thus ?thesis apply(rule_tac disjI1) unfolding dist_norm and norm_eq_sqrt_inner and real_sqrt_less_iff
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2688	by (simp add: algebra_simps inner_commute)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2689	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2690
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2691	lemma norm_increases_online:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2692	fixes d :: "'a::real_inner"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2693	shows "d \<noteq> 0 \<Longrightarrow> norm(a + d) > norm a \<or> norm(a - d) > norm a"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2694	using dist_increases_online[of d a 0] unfolding dist_norm by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2695
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2696	lemma simplex_furthest_lt:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2697	fixes s::"'a::real_inner set" assumes "finite s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2698	shows "\<forall>x \<in> (convex hull s). x \<notin> s \<longrightarrow> (\<exists>y\<in>(convex hull s). norm(x - a) < norm(y - a))"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2699	proof(induct_tac rule: finite_induct[of s])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2700	fix x s assume as:"finite s" "x\<notin>s" "\<forall>x\<in>convex hull s. x \<notin> s \<longrightarrow> (\<exists>y\<in>convex hull s. norm (x - a) < norm (y - a))"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2701	show "\<forall>xa\<in>convex hull insert x s. xa \<notin> insert x s \<longrightarrow> (\<exists>y\<in>convex hull insert x s. norm (xa - a) < norm (y - a))"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2702	proof(rule,rule,cases "s = {}")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2703	case False fix y assume y:"y \<in> convex hull insert x s" "y \<notin> insert x s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2704	obtain u v b where obt:"u\<ge>0" "v\<ge>0" "u + v = 1" "b \<in> convex hull s" "y = u \<^sub>R x + v \<^sub>R b"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2705	using y(1)[unfolded convex_hull_insert[OF False]] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2706	show "\<exists>z\<in>convex hull insert x s. norm (y - a) < norm (z - a)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2707	proof(cases "y\<in>convex hull s")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2708	case True then obtain z where "z\<in>convex hull s" "norm (y - a) < norm (z - a)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2709	using as(3)[THEN bspec[where x=y]] and y(2) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2710	thus ?thesis apply(rule_tac x=z in bexI) unfolding convex_hull_insert[OF False] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2711	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2712	case False show ?thesis using obt(3) proof(cases "u=0", case_tac[!] "v=0")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2713	assume "u=0" "v\<noteq>0" hence "y = b" using obt by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2714	thus ?thesis using False and obt(4) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2715	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2716	assume "u\<noteq>0" "v=0" hence "y = x" using obt by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2717	thus ?thesis using y(2) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2718	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2719	assume "u\<noteq>0" "v\<noteq>0"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2720	then obtain w where w:"w>0" "w<u" "w<v" using real_lbound_gt_zero[of u v] and obt(1,2) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2721	have "x\<noteq>b" proof(rule ccontr)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2722	assume "\<not> x\<noteq>b" hence "y=b" unfolding obt(5)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2723	using obt(3) by(auto simp add: scaleR_left_distrib[THEN sym])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2724	thus False using obt(4) and False by simp qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2725	hence :"w \<^sub>R (x - b) \<noteq> 0" using w(1) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2726	show ?thesis using dist_increases_online[OF *, of a y]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2727	proof(erule_tac disjE)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2728	assume "dist a y < dist a (y + w *\<^sub>R (x - b))"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2729	hence "norm (y - a) < norm ((u + w) \<^sub>R x + (v - w) \<^sub>R b - a)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2730	unfolding dist_commute[of a] unfolding dist_norm obt(5) by (simp add: algebra_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2731	moreover have "(u + w) \<^sub>R x + (v - w) \<^sub>R b \<in> convex hull insert x s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2732	unfolding convex_hull_insert[OF `s\<noteq>{}`] and mem_Collect_eq
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2733	apply(rule_tac x="u + w" in exI) apply rule defer
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2734	apply(rule_tac x="v - w" in exI) using `u\<ge>0` and w and obt(3,4) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2735	ultimately show ?thesis by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2736	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2737	assume "dist a y < dist a (y - w *\<^sub>R (x - b))"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2738	hence "norm (y - a) < norm ((u - w) \<^sub>R x + (v + w) \<^sub>R b - a)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2739	unfolding dist_commute[of a] unfolding dist_norm obt(5) by (simp add: algebra_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2740	moreover have "(u - w) \<^sub>R x + (v + w) \<^sub>R b \<in> convex hull insert x s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2741	unfolding convex_hull_insert[OF `s\<noteq>{}`] and mem_Collect_eq
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2742	apply(rule_tac x="u - w" in exI) apply rule defer
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2743	apply(rule_tac x="v + w" in exI) using `u\<ge>0` and w and obt(3,4) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2744	ultimately show ?thesis by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2745	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2746	qed auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2747	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2748	qed auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2749	qed (auto simp add: assms)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2750
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2751	lemma simplex_furthest_le:
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	2752	fixes s :: "('a::euclidean_space) set"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2753	assumes "finite s" "s \<noteq> {}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2754	shows "\<exists>y\<in>s. \<forall>x\<in>(convex hull s). norm(x - a) \<le> norm(y - a)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2755	proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2756	have "convex hull s \<noteq> {}" using hull_subset[of s convex] and assms(2) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2757	then obtain x where x:"x\<in>convex hull s" "\<forall>y\<in>convex hull s. norm (y - a) \<le> norm (x - a)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2758	using distance_attains_sup[OF finite_imp_compact_convex_hull[OF assms(1)], of a]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2759	unfolding dist_commute[of a] unfolding dist_norm by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2760	thus ?thesis proof(cases "x\<in>s")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2761	case False then obtain y where "y\<in>convex hull s" "norm (x - a) < norm (y - a)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2762	using simplex_furthest_lt[OF assms(1), THEN bspec[where x=x]] and x(1) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2763	thus ?thesis using x(2)[THEN bspec[where x=y]] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2764	qed auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2765	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2766
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2767	lemma simplex_furthest_le_exists:
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	2768	fixes s :: "('a::euclidean_space) set"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2769	shows "finite s \<Longrightarrow> (\<forall>x\<in>(convex hull s). \<exists>y\<in>s. norm(x - a) \<le> norm(y - a))"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2770	using simplex_furthest_le[of s] by (cases "s={}")auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2771
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2772	lemma simplex_extremal_le:
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	2773	fixes s :: "('a::euclidean_space) set"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2774	assumes "finite s" "s \<noteq> {}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2775	shows "\<exists>u\<in>s. \<exists>v\<in>s. \<forall>x\<in>convex hull s. \<forall>y \<in> convex hull s. norm(x - y) \<le> norm(u - v)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2776	proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2777	have "convex hull s \<noteq> {}" using hull_subset[of s convex] and assms(2) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2778	then obtain u v where obt:"u\<in>convex hull s" "v\<in>convex hull s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2779	"\<forall>x\<in>convex hull s. \<forall>y\<in>convex hull s. norm (x - y) \<le> norm (u - v)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2780	using compact_sup_maxdistance[OF finite_imp_compact_convex_hull[OF assms(1)]] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2781	thus ?thesis proof(cases "u\<notin>s \<or> v\<notin>s", erule_tac disjE)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2782	assume "u\<notin>s" then obtain y where "y\<in>convex hull s" "norm (u - v) < norm (y - v)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2783	using simplex_furthest_lt[OF assms(1), THEN bspec[where x=u]] and obt(1) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2784	thus ?thesis using obt(3)[THEN bspec[where x=y], THEN bspec[where x=v]] and obt(2) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2785	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2786	assume "v\<notin>s" then obtain y where "y\<in>convex hull s" "norm (v - u) < norm (y - u)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2787	using simplex_furthest_lt[OF assms(1), THEN bspec[where x=v]] and obt(2) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2788	thus ?thesis using obt(3)[THEN bspec[where x=u], THEN bspec[where x=y]] and obt(1)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2789	by (auto simp add: norm_minus_commute)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2790	qed auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2791	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2792
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2793	lemma simplex_extremal_le_exists:
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	2794	fixes s :: "('a::euclidean_space) set"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2795	shows "finite s \<Longrightarrow> x \<in> convex hull s \<Longrightarrow> y \<in> convex hull s
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2796	\<Longrightarrow> (\<exists>u\<in>s. \<exists>v\<in>s. norm(x - y) \<le> norm(u - v))"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2797	using convex_hull_empty simplex_extremal_le[of s] by(cases "s={}")auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2798
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2799	subsection {* Closest point of a convex set is unique, with a continuous projection. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2800
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2801	definition
36337 87b6c83d7ed7 generalize constant closest_point huffman parents: 36071 diff changeset	2802	closest_point :: "'a::{real_inner,heine_borel} set \<Rightarrow> 'a \<Rightarrow> 'a" where
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2803	"closest_point s a = (SOME x. x \<in> s \<and> (\<forall>y\<in>s. dist a x \<le> dist a y))"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2804
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2805	lemma closest_point_exists:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2806	assumes "closed s" "s \<noteq> {}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2807	shows "closest_point s a \<in> s" "\<forall>y\<in>s. dist a (closest_point s a) \<le> dist a y"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2808	unfolding closest_point_def apply(rule_tac[!] someI2_ex)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2809	using distance_attains_inf[OF assms(1,2), of a] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2810
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2811	lemma closest_point_in_set:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2812	"closed s \<Longrightarrow> s \<noteq> {} \<Longrightarrow> (closest_point s a) \<in> s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2813	by(meson closest_point_exists)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2814
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2815	lemma closest_point_le:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2816	"closed s \<Longrightarrow> x \<in> s \<Longrightarrow> dist a (closest_point s a) \<le> dist a x"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2817	using closest_point_exists[of s] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2818
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2819	lemma closest_point_self:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2820	assumes "x \<in> s" shows "closest_point s x = x"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2821	unfolding closest_point_def apply(rule some1_equality, rule ex1I[of _ x])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2822	using assms by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2823
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2824	lemma closest_point_refl:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2825	"closed s \<Longrightarrow> s \<noteq> {} \<Longrightarrow> (closest_point s x = x \<longleftrightarrow> x \<in> s)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2826	using closest_point_in_set[of s x] closest_point_self[of x s] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2827
36337 87b6c83d7ed7 generalize constant closest_point huffman parents: 36071 diff changeset	2828	lemma closer_points_lemma:
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2829	assumes "inner y z > 0"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2830	shows "\<exists>u>0. \<forall>v>0. v \<le> u \<longrightarrow> norm(v *\<^sub>R z - y) < norm y"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2831	proof- have z:"inner z z > 0" unfolding inner_gt_zero_iff using assms by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2832	thus ?thesis using assms apply(rule_tac x="inner y z / inner z z" in exI) apply(rule) defer proof(rule+)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2833	fix v assume "0<v" "v \<le> inner y z / inner z z"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2834	thus "norm (v *\<^sub>R z - y) < norm y" unfolding norm_lt using z and assms
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2835	by (simp add: field_simps inner_diff inner_commute mult_strict_left_mono[OF _ `0<v`])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2836	qed(rule divide_pos_pos, auto) qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2837
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2838	lemma closer_point_lemma:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2839	assumes "inner (y - x) (z - x) > 0"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2840	shows "\<exists>u>0. u \<le> 1 \<and> dist (x + u *\<^sub>R (z - x)) y < dist x y"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2841	proof- obtain u where "u>0" and u:"\<forall>v>0. v \<le> u \<longrightarrow> norm (v *\<^sub>R (z - x) - (y - x)) < norm (y - x)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2842	using closer_points_lemma[OF assms] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2843	show ?thesis apply(rule_tac x="min u 1" in exI) using u[THEN spec[where x="min u 1"]] and `u>0`
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2844	unfolding dist_norm by(auto simp add: norm_minus_commute field_simps) qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2845
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2846	lemma any_closest_point_dot:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2847	assumes "convex s" "closed s" "x \<in> s" "y \<in> s" "\<forall>z\<in>s. dist a x \<le> dist a z"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2848	shows "inner (a - x) (y - x) \<le> 0"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2849	proof(rule ccontr) assume "\<not> inner (a - x) (y - x) \<le> 0"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2850	then obtain u where u:"u>0" "u\<le>1" "dist (x + u *\<^sub>R (y - x)) a < dist x a" using closer_point_lemma[of a x y] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2851	let ?z = "(1 - u) \<^sub>R x + u \<^sub>R y" have "?z \<in> s" using mem_convex[OF assms(1,3,4), of u] using u by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2852	thus False using assms(5)[THEN bspec[where x="?z"]] and u(3) by (auto simp add: dist_commute algebra_simps) qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2853
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2854	lemma any_closest_point_unique:
36337 87b6c83d7ed7 generalize constant closest_point huffman parents: 36071 diff changeset	2855	fixes x :: "'a::real_inner"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2856	assumes "convex s" "closed s" "x \<in> s" "y \<in> s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2857	"\<forall>z\<in>s. dist a x \<le> dist a z" "\<forall>z\<in>s. dist a y \<le> dist a z"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2858	shows "x = y" using any_closest_point_dot[OF assms(1-4,5)] and any_closest_point_dot[OF assms(1-2,4,3,6)]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2859	unfolding norm_pths(1) and norm_le_square
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2860	by (auto simp add: algebra_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2861
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2862	lemma closest_point_unique:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2863	assumes "convex s" "closed s" "x \<in> s" "\<forall>z\<in>s. dist a x \<le> dist a z"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2864	shows "x = closest_point s a"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2865	using any_closest_point_unique[OF assms(1-3) _ assms(4), of "closest_point s a"]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2866	using closest_point_exists[OF assms(2)] and assms(3) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2867
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2868	lemma closest_point_dot:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2869	assumes "convex s" "closed s" "x \<in> s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2870	shows "inner (a - closest_point s a) (x - closest_point s a) \<le> 0"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2871	apply(rule any_closest_point_dot[OF assms(1,2) _ assms(3)])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2872	using closest_point_exists[OF assms(2)] and assms(3) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2873
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2874	lemma closest_point_lt:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2875	assumes "convex s" "closed s" "x \<in> s" "x \<noteq> closest_point s a"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2876	shows "dist a (closest_point s a) < dist a x"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2877	apply(rule ccontr) apply(rule_tac notE[OF assms(4)])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2878	apply(rule closest_point_unique[OF assms(1-3), of a])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2879	using closest_point_le[OF assms(2), of _ a] by fastsimp
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2880
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2881	lemma closest_point_lipschitz:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2882	assumes "convex s" "closed s" "s \<noteq> {}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2883	shows "dist (closest_point s x) (closest_point s y) \<le> dist x y"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2884	proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2885	have "inner (x - closest_point s x) (closest_point s y - closest_point s x) \<le> 0"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2886	"inner (y - closest_point s y) (closest_point s x - closest_point s y) \<le> 0"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2887	apply(rule_tac[!] any_closest_point_dot[OF assms(1-2)])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2888	using closest_point_exists[OF assms(2-3)] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2889	thus ?thesis unfolding dist_norm and norm_le
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2890	using inner_ge_zero[of "(x - closest_point s x) - (y - closest_point s y)"]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2891	by (simp add: inner_add inner_diff inner_commute) qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2892
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2893	lemma continuous_at_closest_point:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2894	assumes "convex s" "closed s" "s \<noteq> {}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2895	shows "continuous (at x) (closest_point s)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2896	unfolding continuous_at_eps_delta
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2897	using le_less_trans[OF closest_point_lipschitz[OF assms]] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2898
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2899	lemma continuous_on_closest_point:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2900	assumes "convex s" "closed s" "s \<noteq> {}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2901	shows "continuous_on t (closest_point s)"
36071 c8ae8e56d42e tuned many proofs a bit nipkow parents: 35577 diff changeset	2902	by(metis continuous_at_imp_continuous_on continuous_at_closest_point[OF assms])
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2903
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2904	subsection {* Various point-to-set separating/supporting hyperplane theorems. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2905
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2906	lemma supporting_hyperplane_closed_point:
36337 87b6c83d7ed7 generalize constant closest_point huffman parents: 36071 diff changeset	2907	fixes z :: "'a::{real_inner,heine_borel}"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2908	assumes "convex s" "closed s" "s \<noteq> {}" "z \<notin> s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2909	shows "\<exists>a b. \<exists>y\<in>s. inner a z < b \<and> (inner a y = b) \<and> (\<forall>x\<in>s. inner a x \<ge> b)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2910	proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2911	from distance_attains_inf[OF assms(2-3)] obtain y where "y\<in>s" and y:"\<forall>x\<in>s. dist z y \<le> dist z x" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2912	show ?thesis apply(rule_tac x="y - z" in exI, rule_tac x="inner (y - z) y" in exI, rule_tac x=y in bexI)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2913	apply rule defer apply rule defer apply(rule, rule ccontr) using `y\<in>s` proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2914	show "inner (y - z) z < inner (y - z) y" apply(subst diff_less_iff(1)[THEN sym])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2915	unfolding inner_diff_right[THEN sym] and inner_gt_zero_iff using `y\<in>s` `z\<notin>s` by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2916	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2917	fix x assume "x\<in>s" have :"\<forall>u. 0 \<le> u \<and> u \<le> 1 \<longrightarrow> dist z y \<le> dist z ((1 - u) \<^sub>R y + u *\<^sub>R x)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2918	using assms(1)[unfolded convex_alt] and y and `x\<in>s` and `y\<in>s` by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2919	assume "\<not> inner (y - z) y \<le> inner (y - z) x" then obtain v where
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2920	"v>0" "v\<le>1" "dist (y + v *\<^sub>R (x - y)) z < dist y z" using closer_point_lemma[of z y x] apply - by (auto simp add: inner_diff)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2921	thus False using *[THEN spec[where x=v]] by(auto simp add: dist_commute algebra_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2922	qed auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2923	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2924
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2925	lemma separating_hyperplane_closed_point:
36337 87b6c83d7ed7 generalize constant closest_point huffman parents: 36071 diff changeset	2926	fixes z :: "'a::{real_inner,heine_borel}"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2927	assumes "convex s" "closed s" "z \<notin> s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2928	shows "\<exists>a b. inner a z < b \<and> (\<forall>x\<in>s. inner a x > b)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2929	proof(cases "s={}")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2930	case True thus ?thesis apply(rule_tac x="-z" in exI, rule_tac x=1 in exI)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2931	using less_le_trans[OF _ inner_ge_zero[of z]] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2932	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2933	case False obtain y where "y\<in>s" and y:"\<forall>x\<in>s. dist z y \<le> dist z x"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2934	using distance_attains_inf[OF assms(2) False] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2935	show ?thesis apply(rule_tac x="y - z" in exI, rule_tac x="inner (y - z) z + (norm(y - z))\<twosuperior> / 2" in exI)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2936	apply rule defer apply rule proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2937	fix x assume "x\<in>s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2938	have "\<not> 0 < inner (z - y) (x - y)" apply(rule_tac notI) proof(drule closer_point_lemma)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2939	assume "\<exists>u>0. u \<le> 1 \<and> dist (y + u *\<^sub>R (x - y)) z < dist y z"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2940	then obtain u where "u>0" "u\<le>1" "dist (y + u *\<^sub>R (x - y)) z < dist y z" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2941	thus False using y[THEN bspec[where x="y + u *\<^sub>R (x - y)"]]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2942	using assms(1)[unfolded convex_alt, THEN bspec[where x=y]]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2943	using `x\<in>s` `y\<in>s` by (auto simp add: dist_commute algebra_simps) qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2944	moreover have "0 < norm (y - z) ^ 2" using `y\<in>s` `z\<notin>s` by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2945	hence "0 < inner (y - z) (y - z)" unfolding power2_norm_eq_inner by simp
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2946	ultimately show "inner (y - z) z + (norm (y - z))\<twosuperior> / 2 < inner (y - z) x"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2947	unfolding power2_norm_eq_inner and not_less by (auto simp add: field_simps inner_commute inner_diff)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2948	qed(insert `y\<in>s` `z\<notin>s`, auto)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2949	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2950
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2951	lemma separating_hyperplane_closed_0:
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	2952	assumes "convex (s::('a::euclidean_space) set)" "closed s" "0 \<notin> s"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2953	shows "\<exists>a b. a \<noteq> 0 \<and> 0 < b \<and> (\<forall>x\<in>s. inner a x > b)"
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	2954	proof(cases "s={}")
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	2955	case True have "norm ((basis 0)::'a) = 1" by auto
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	2956	hence "norm ((basis 0)::'a) = 1" "basis 0 \<noteq> (0::'a)" defer
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	2957	apply(subst norm_le_zero_iff[THEN sym]) by auto
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	2958	thus ?thesis apply(rule_tac x="basis 0" in exI, rule_tac x=1 in exI)
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	2959	using True using DIM_positive[where 'a='a] by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2960	next case False thus ?thesis using False using separating_hyperplane_closed_point[OF assms]
35542 8f97d8caabfd replaced \<bullet> with inner himmelma parents: 34964 diff changeset	2961	apply - apply(erule exE)+ unfolding inner.zero_right apply(rule_tac x=a in exI, rule_tac x=b in exI) by auto qed
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2962
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2963	subsection {* Now set-to-set for closed/compact sets. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2964
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2965	lemma separating_hyperplane_closed_compact:
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	2966	assumes "convex (s::('a::euclidean_space) set)" "closed s" "convex t" "compact t" "t \<noteq> {}" "s \<inter> t = {}"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2967	shows "\<exists>a b. (\<forall>x\<in>s. inner a x < b) \<and> (\<forall>x\<in>t. inner a x > b)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2968	proof(cases "s={}")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2969	case True
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2970	obtain b where b:"b>0" "\<forall>x\<in>t. norm x \<le> b" using compact_imp_bounded[OF assms(4)] unfolding bounded_pos by auto
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	2971	obtain z::"'a" where z:"norm z = b + 1" using vector_choose_size[of "b + 1"] and b(1) by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2972	hence "z\<notin>t" using b(2)[THEN bspec[where x=z]] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2973	then obtain a b where ab:"inner a z < b" "\<forall>x\<in>t. b < inner a x"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2974	using separating_hyperplane_closed_point[OF assms(3) compact_imp_closed[OF assms(4)], of z] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2975	thus ?thesis using True by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2976	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2977	case False then obtain y where "y\<in>s" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2978	obtain a b where "0 < b" "\<forall>x\<in>{x - y \|x y. x \<in> s \<and> y \<in> t}. b < inner a x"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2979	using separating_hyperplane_closed_point[OF convex_differences[OF assms(1,3)], of 0]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2980	using closed_compact_differences[OF assms(2,4)] using assms(6) by(auto, blast)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2981	hence ab:"\<forall>x\<in>s. \<forall>y\<in>t. b + inner a y < inner a x" apply- apply(rule,rule) apply(erule_tac x="x - y" in ballE) by (auto simp add: inner_diff)
33270 320a1d67b9ae merged paulson parents: 33175 diff changeset	2982	def k \<equiv> "Sup ((\<lambda>x. inner a x) ` t)"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2983	show ?thesis apply(rule_tac x="-a" in exI, rule_tac x="-(k + b / 2)" in exI)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2984	apply(rule,rule) defer apply(rule) unfolding inner_minus_left and neg_less_iff_less proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2985	from ab have "((\<lambda>x. inner a x) ` t) *<= (inner a y - b)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2986	apply(erule_tac x=y in ballE) apply(rule setleI) using `y\<in>s` by auto
33270 320a1d67b9ae merged paulson parents: 33175 diff changeset	2987	hence k:"isLub UNIV ((\<lambda>x. inner a x) ` t) k" unfolding k_def apply(rule_tac Sup) using assms(5) by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2988	fix x assume "x\<in>t" thus "inner a x < (k + b / 2)" using `0<b` and isLubD2[OF k, of "inner a x"] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2989	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2990	fix x assume "x\<in>s"
33270 320a1d67b9ae merged paulson parents: 33175 diff changeset	2991	hence "k \<le> inner a x - b" unfolding k_def apply(rule_tac Sup_least) using assms(5)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2992	using ab[THEN bspec[where x=x]] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2993	thus "k + b / 2 < inner a x" using `0 < b` by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2994	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2995	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2996
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2997	lemma separating_hyperplane_compact_closed:
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	2998	fixes s :: "('a::euclidean_space) set"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	2999	assumes "convex s" "compact s" "s \<noteq> {}" "convex t" "closed t" "s \<inter> t = {}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3000	shows "\<exists>a b. (\<forall>x\<in>s. inner a x < b) \<and> (\<forall>x\<in>t. inner a x > b)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3001	proof- obtain a b where "(\<forall>x\<in>t. inner a x < b) \<and> (\<forall>x\<in>s. b < inner a x)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3002	using separating_hyperplane_closed_compact[OF assms(4-5,1-2,3)] and assms(6) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3003	thus ?thesis apply(rule_tac x="-a" in exI, rule_tac x="-b" in exI) by auto qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3004
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3005	subsection {* General case without assuming closure and getting non-strict separation. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3006
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3007	lemma separating_hyperplane_set_0:
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3008	assumes "convex s" "(0::'a::euclidean_space) \<notin> s"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3009	shows "\<exists>a. a \<noteq> 0 \<and> (\<forall>x\<in>s. 0 \<le> inner a x)"
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3010	proof- let ?k = "\<lambda>c. {x::'a. 0 \<le> inner c x}"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3011	have "frontier (cball 0 1) \<inter> (\<Inter> (?k ` s)) \<noteq> {}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3012	apply(rule compact_imp_fip) apply(rule compact_frontier[OF compact_cball])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3013	defer apply(rule,rule,erule conjE) proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3014	fix f assume as:"f \<subseteq> ?k ` s" "finite f"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3015	obtain c where c:"f = ?k ` c" "c\<subseteq>s" "finite c" using finite_subset_image[OF as(2,1)] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3016	then obtain a b where ab:"a \<noteq> 0" "0 < b" "\<forall>x\<in>convex hull c. b < inner a x"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3017	using separating_hyperplane_closed_0[OF convex_convex_hull, of c]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3018	using finite_imp_compact_convex_hull[OF c(3), THEN compact_imp_closed] and assms(2)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3019	using subset_hull[unfolded mem_def, of convex, OF assms(1), THEN sym, of c] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3020	hence "\<exists>x. norm x = 1 \<and> (\<forall>y\<in>c. 0 \<le> inner y x)" apply(rule_tac x="inverse(norm a) *\<^sub>R a" in exI)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3021	using hull_subset[of c convex] unfolding subset_eq and inner_scaleR
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3022	apply- apply rule defer apply rule apply(rule mult_nonneg_nonneg)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3023	by(auto simp add: inner_commute elim!: ballE)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3024	thus "frontier (cball 0 1) \<inter> \<Inter>f \<noteq> {}" unfolding c(1) frontier_cball dist_norm by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3025	qed(insert closed_halfspace_ge, auto)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3026	then obtain x where "norm x = 1" "\<forall>y\<in>s. x\<in>?k y" unfolding frontier_cball dist_norm by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3027	thus ?thesis apply(rule_tac x=x in exI) by(auto simp add: inner_commute) qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3028
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3029	lemma separating_hyperplane_sets:
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3030	assumes "convex s" "convex (t::('a::euclidean_space) set)" "s \<noteq> {}" "t \<noteq> {}" "s \<inter> t = {}"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3031	shows "\<exists>a b. a \<noteq> 0 \<and> (\<forall>x\<in>s. inner a x \<le> b) \<and> (\<forall>x\<in>t. inner a x \<ge> b)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3032	proof- from separating_hyperplane_set_0[OF convex_differences[OF assms(2,1)]]
33270 320a1d67b9ae merged paulson parents: 33175 diff changeset	3033	obtain a where "a\<noteq>0" "\<forall>x\<in>{x - y \|x y. x \<in> t \<and> y \<in> s}. 0 \<le> inner a x"
320a1d67b9ae merged paulson parents: 33175 diff changeset	3034	using assms(3-5) by auto
320a1d67b9ae merged paulson parents: 33175 diff changeset	3035	hence "\<forall>x\<in>t. \<forall>y\<in>s. inner a y \<le> inner a x"
320a1d67b9ae merged paulson parents: 33175 diff changeset	3036	by (force simp add: inner_diff)
320a1d67b9ae merged paulson parents: 33175 diff changeset	3037	thus ?thesis
320a1d67b9ae merged paulson parents: 33175 diff changeset	3038	apply(rule_tac x=a in exI, rule_tac x="Sup ((\<lambda>x. inner a x) ` s)" in exI) using `a\<noteq>0`
320a1d67b9ae merged paulson parents: 33175 diff changeset	3039	apply auto
320a1d67b9ae merged paulson parents: 33175 diff changeset	3040	apply (rule Sup[THEN isLubD2])
320a1d67b9ae merged paulson parents: 33175 diff changeset	3041	prefer 4
320a1d67b9ae merged paulson parents: 33175 diff changeset	3042	apply (rule Sup_least)
320a1d67b9ae merged paulson parents: 33175 diff changeset	3043	using assms(3-5) apply (auto simp add: setle_def)
36071 c8ae8e56d42e tuned many proofs a bit nipkow parents: 35577 diff changeset	3044	apply metis
33270 320a1d67b9ae merged paulson parents: 33175 diff changeset	3045	done
320a1d67b9ae merged paulson parents: 33175 diff changeset	3046	qed
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3047
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3048	subsection {* More convexity generalities. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3049
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3050	lemma convex_closure:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3051	fixes s :: "'a::real_normed_vector set"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3052	assumes "convex s" shows "convex(closure s)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3053	unfolding convex_def Ball_def closure_sequential
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3054	apply(rule,rule,rule,rule,rule,rule,rule,rule,rule) apply(erule_tac exE)+
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3055	apply(rule_tac x="\<lambda>n. u \<^sub>R xb n + v \<^sub>R xc n" in exI) apply(rule,rule)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3056	apply(rule assms[unfolded convex_def, rule_format]) prefer 6
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3057	apply(rule Lim_add) apply(rule_tac [1-2] Lim_cmul) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3058
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3059	lemma convex_interior:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3060	fixes s :: "'a::real_normed_vector set"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3061	assumes "convex s" shows "convex(interior s)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3062	unfolding convex_alt Ball_def mem_interior apply(rule,rule,rule,rule,rule,rule) apply(erule exE \| erule conjE)+ proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3063	fix x y u assume u:"0 \<le> u" "u \<le> (1::real)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3064	fix e d assume ed:"ball x e \<subseteq> s" "ball y d \<subseteq> s" "0<d" "0<e"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3065	show "\<exists>e>0. ball ((1 - u) \<^sub>R x + u \<^sub>R y) e \<subseteq> s" apply(rule_tac x="min d e" in exI)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3066	apply rule unfolding subset_eq defer apply rule proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3067	fix z assume "z \<in> ball ((1 - u) \<^sub>R x + u \<^sub>R y) (min d e)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3068	hence "(1- u) \<^sub>R (z - u \<^sub>R (y - x)) + u \<^sub>R (z + (1 - u) \<^sub>R (y - x)) \<in> s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3069	apply(rule_tac assms[unfolded convex_alt, rule_format])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3070	using ed(1,2) and u unfolding subset_eq mem_ball Ball_def dist_norm by(auto simp add: algebra_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3071	thus "z \<in> s" using u by (auto simp add: algebra_simps) qed(insert u ed(3-4), auto) qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3072
34964 4e8be3c04d37 Replaced vec1 and dest_vec1 by abbreviation. hoelzl parents: 34915 diff changeset	3073	lemma convex_hull_eq_empty[simp]: "convex hull s = {} \<longleftrightarrow> s = {}"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3074	using hull_subset[of s convex] convex_hull_empty by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3075
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3076	subsection {* Moving and scaling convex hulls. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3077
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3078	lemma convex_hull_translation_lemma:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3079	"convex hull ((\<lambda>x. a + x) ` s) \<subseteq> (\<lambda>x. a + x) ` (convex hull s)"
36071 c8ae8e56d42e tuned many proofs a bit nipkow parents: 35577 diff changeset	3080	by (metis convex_convex_hull convex_translation hull_minimal hull_subset image_mono mem_def)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3081
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3082	lemma convex_hull_bilemma: fixes neg
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3083	assumes "(\<forall>s a. (convex hull (up a s)) \<subseteq> up a (convex hull s))"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3084	shows "(\<forall>s. up a (up (neg a) s) = s) \<and> (\<forall>s. up (neg a) (up a s) = s) \<and> (\<forall>s t a. s \<subseteq> t \<longrightarrow> up a s \<subseteq> up a t)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3085	\<Longrightarrow> \<forall>s. (convex hull (up a s)) = up a (convex hull s)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3086	using assms by(metis subset_antisym)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3087
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3088	lemma convex_hull_translation:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3089	"convex hull ((\<lambda>x. a + x) ` s) = (\<lambda>x. a + x) ` (convex hull s)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3090	apply(rule convex_hull_bilemma[rule_format, of _ _ "\<lambda>a. -a"], rule convex_hull_translation_lemma) unfolding image_image by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3091
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3092	lemma convex_hull_scaling_lemma:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3093	"(convex hull ((\<lambda>x. c \<^sub>R x) ` s)) \<subseteq> (\<lambda>x. c \<^sub>R x) ` (convex hull s)"
36071 c8ae8e56d42e tuned many proofs a bit nipkow parents: 35577 diff changeset	3094	by (metis convex_convex_hull convex_scaling hull_subset mem_def subset_hull subset_image_iff)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3095
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3096	lemma convex_hull_scaling:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3097	"convex hull ((\<lambda>x. c \<^sub>R x) ` s) = (\<lambda>x. c \<^sub>R x) ` (convex hull s)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3098	apply(cases "c=0") defer apply(rule convex_hull_bilemma[rule_format, of _ _ inverse]) apply(rule convex_hull_scaling_lemma)
36362 06475a1547cb fix lots of looping simp calls and other warnings huffman parents: 36341 diff changeset	3099	unfolding image_image scaleR_scaleR by(auto simp add:image_constant_conv)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3100
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3101	lemma convex_hull_affinity:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3102	"convex hull ((\<lambda>x. a + c \<^sub>R x) ` s) = (\<lambda>x. a + c \<^sub>R x) ` (convex hull s)"
36071 c8ae8e56d42e tuned many proofs a bit nipkow parents: 35577 diff changeset	3103	by(simp only: image_image[THEN sym] convex_hull_scaling convex_hull_translation)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3104
40377 0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3105	subsection {* Convexity of cone hulls *}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3106
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3107	lemma convex_cone_hull:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3108	fixes S :: "('m::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3109	assumes "convex S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3110	shows "convex (cone hull S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3111	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3112	{ fix x y assume xy_def: "x : cone hull S & y : cone hull S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3113	hence "S ~= {}" using cone_hull_empty_iff[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3114	fix u v assume uv_def: "u>=0 & v>=0 & (u :: real)+v=1"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3115	hence : "u \<^sub>R x : cone hull S & v *\<^sub>R y : cone hull S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3116	using cone_cone_hull[of S] xy_def cone_def[of "cone hull S"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3117	from * obtain cx xx where x_def: "u \<^sub>R x = cx \<^sub>R xx & (cx :: real)>=0 & xx : S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3118	using cone_hull_expl[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3119	from * obtain cy yy where y_def: "v \<^sub>R y = cy \<^sub>R yy & (cy :: real)>=0 & yy : S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3120	using cone_hull_expl[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3121	{ assume "cx+cy<=0" hence "u \<^sub>R x=0 & v \<^sub>R y=0" using x_def y_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3122	hence "u \<^sub>R x+ v \<^sub>R y = 0" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3123	hence "u \<^sub>R x+ v \<^sub>R y : cone hull S" using cone_hull_contains_0[of S] `S ~= {}` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3124	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3125	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3126	{ assume "cx+cy>0"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3127	hence "(cx/(cx+cy)) \<^sub>R xx + (cy/(cx+cy)) \<^sub>R yy : S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3128	using assms mem_convex_alt[of S xx yy cx cy] x_def y_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3129	hence "cx \<^sub>R xx + cy \<^sub>R yy : cone hull S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3130	using mem_cone_hull[of "(cx/(cx+cy)) \<^sub>R xx + (cy/(cx+cy)) \<^sub>R yy" S "cx+cy"]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3131	`cx+cy>0` by (auto simp add: scaleR_right_distrib)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3132	hence "u \<^sub>R x+ v \<^sub>R y : cone hull S" using x_def y_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3133	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3134	moreover have "(cx+cy<=0) \| (cx+cy>0)" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3135	ultimately have "u \<^sub>R x+ v \<^sub>R y : cone hull S" by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3136	} from this show ?thesis unfolding convex_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3137	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3138
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3139	lemma cone_convex_hull:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3140	fixes S :: "('m::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3141	assumes "cone S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3142	shows "cone (convex hull S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3143	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3144	{ assume "S = {}" hence ?thesis by auto }
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3145	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3146	{ assume "S ~= {}" hence : "0:S & (!c. c>0 --> op \<^sub>R c ` S = S)" using cone_iff[of S] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3147	{ fix c assume "(c :: real)>0"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3148	hence "op \<^sub>R c ` (convex hull S) = convex hull (op \<^sub>R c ` S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3149	using convex_hull_scaling[of _ S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3150	also have "...=convex hull S" using * `c>0` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3151	finally have "op *\<^sub>R c ` (convex hull S) = convex hull S" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3152	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3153	hence "0 : convex hull S & (!c. c>0 --> (op *\<^sub>R c ` (convex hull S)) = (convex hull S))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3154	using * hull_subset[of S convex] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3155	hence ?thesis using `S ~= {}` cone_iff[of "convex hull S"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3156	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3157	ultimately show ?thesis by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3158	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	3159
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3160	subsection {* Convex set as intersection of halfspaces. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3161
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3162	lemma convex_halfspace_intersection:
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3163	fixes s :: "('a::euclidean_space) set"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3164	assumes "closed s" "convex s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3165	shows "s = \<Inter> {h. s \<subseteq> h \<and> (\<exists>a b. h = {x. inner a x \<le> b})}"
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	3166	apply(rule set_eqI, rule) unfolding Inter_iff Ball_def mem_Collect_eq apply(rule,rule,erule conjE) proof-
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3167	fix x assume "\<forall>xa. s \<subseteq> xa \<and> (\<exists>a b. xa = {x. inner a x \<le> b}) \<longrightarrow> x \<in> xa"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3168	hence "\<forall>a b. s \<subseteq> {x. inner a x \<le> b} \<longrightarrow> x \<in> {x. inner a x \<le> b}" by blast
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3169	thus "x\<in>s" apply(rule_tac ccontr) apply(drule separating_hyperplane_closed_point[OF assms(2,1)])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3170	apply(erule exE)+ apply(erule_tac x="-a" in allE, erule_tac x="-b" in allE) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3171	qed auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3172
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3173	subsection {* Radon's theorem (from Lars Schewe). *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3174
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3175	lemma radon_ex_lemma:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3176	assumes "finite c" "affine_dependent c"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3177	shows "\<exists>u. setsum u c = 0 \<and> (\<exists>v\<in>c. u v \<noteq> 0) \<and> setsum (\<lambda>v. u v *\<^sub>R v) c = 0"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3178	proof- from assms(2)[unfolded affine_dependent_explicit] guess s .. then guess u ..
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3179	thus ?thesis apply(rule_tac x="\<lambda>v. if v\<in>s then u v else 0" in exI) unfolding if_smult scaleR_zero_left
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3180	and setsum_restrict_set[OF assms(1), THEN sym] by(auto simp add: Int_absorb1) qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3181
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3182	lemma radon_s_lemma:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3183	assumes "finite s" "setsum f s = (0::real)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3184	shows "setsum f {x\<in>s. 0 < f x} = - setsum f {x\<in>s. f x < 0}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3185	proof- have *:"\<And>x. (if f x < 0 then f x else 0) + (if 0 < f x then f x else 0) = f x" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3186	show ?thesis unfolding real_add_eq_0_iff[THEN sym] and setsum_restrict_set''[OF assms(1)] and setsum_addf[THEN sym] and *
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3187	using assms(2) by assumption qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3188
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3189	lemma radon_v_lemma:
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3190	assumes "finite s" "setsum f s = 0" "\<forall>x. g x = (0::real) \<longrightarrow> f x = (0::'a::euclidean_space)"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3191	shows "(setsum f {x\<in>s. 0 < g x}) = - setsum f {x\<in>s. g x < 0}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3192	proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3193	have *:"\<And>x. (if 0 < g x then f x else 0) + (if g x < 0 then f x else 0) = f x" using assms(3) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3194	show ?thesis unfolding eq_neg_iff_add_eq_0 and setsum_restrict_set''[OF assms(1)] and setsum_addf[THEN sym] and *
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3195	using assms(2) by assumption qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3196
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3197	lemma radon_partition:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3198	assumes "finite c" "affine_dependent c"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3199	shows "\<exists>m p. m \<inter> p = {} \<and> m \<union> p = c \<and> (convex hull m) \<inter> (convex hull p) \<noteq> {}" proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3200	obtain u v where uv:"setsum u c = 0" "v\<in>c" "u v \<noteq> 0" "(\<Sum>v\<in>c. u v *\<^sub>R v) = 0" using radon_ex_lemma[OF assms] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3201	have fin:"finite {x \<in> c. 0 < u x}" "finite {x \<in> c. 0 > u x}" using assms(1) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3202	def z \<equiv> "(inverse (setsum u {x\<in>c. u x > 0})) \<^sub>R setsum (\<lambda>x. u x \<^sub>R x) {x\<in>c. u x > 0}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3203	have "setsum u {x \<in> c. 0 < u x} \<noteq> 0" proof(cases "u v \<ge> 0")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3204	case False hence "u v < 0" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3205	thus ?thesis proof(cases "\<exists>w\<in>{x \<in> c. 0 < u x}. u w > 0")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3206	case True thus ?thesis using setsum_nonneg_eq_0_iff[of _ u, OF fin(1)] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3207	next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3208	case False hence "setsum u c \<le> setsum (\<lambda>x. if x=v then u v else 0) c" apply(rule_tac setsum_mono) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3209	thus ?thesis unfolding setsum_delta[OF assms(1)] using uv(2) and `u v < 0` and uv(1) by auto qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3210	qed (insert setsum_nonneg_eq_0_iff[of _ u, OF fin(1)] uv(2-3), auto)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3211
36778 739a9379e29b avoid using real-specific versions of generic lemmas huffman parents: 36725 diff changeset	3212	hence *:"setsum u {x\<in>c. u x > 0} > 0" unfolding less_le apply(rule_tac conjI, rule_tac setsum_nonneg) by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3213	moreover have "setsum u ({x \<in> c. 0 < u x} \<union> {x \<in> c. u x < 0}) = setsum u c"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3214	"(\<Sum>x\<in>{x \<in> c. 0 < u x} \<union> {x \<in> c. u x < 0}. u x \<^sub>R x) = (\<Sum>x\<in>c. u x \<^sub>R x)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3215	using assms(1) apply(rule_tac[!] setsum_mono_zero_left) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3216	hence "setsum u {x \<in> c. 0 < u x} = - setsum u {x \<in> c. 0 > u x}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3217	"(\<Sum>x\<in>{x \<in> c. 0 < u x}. u x \<^sub>R x) = - (\<Sum>x\<in>{x \<in> c. 0 > u x}. u x \<^sub>R x)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3218	unfolding eq_neg_iff_add_eq_0 using uv(1,4) by (auto simp add: setsum_Un_zero[OF fin, THEN sym])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3219	moreover have "\<forall>x\<in>{v \<in> c. u v < 0}. 0 \<le> inverse (setsum u {x \<in> c. 0 < u x}) * - u x"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3220	apply (rule) apply (rule mult_nonneg_nonneg) using * by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3221
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3222	ultimately have "z \<in> convex hull {v \<in> c. u v \<le> 0}" unfolding convex_hull_explicit mem_Collect_eq
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3223	apply(rule_tac x="{v \<in> c. u v < 0}" in exI, rule_tac x="\<lambda>y. inverse (setsum u {x\<in>c. u x > 0}) * - u y" in exI)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3224	using assms(1) unfolding scaleR_scaleR[THEN sym] scaleR_right.setsum [symmetric] and z_def
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3225	by(auto simp add: setsum_negf mult_right.setsum[THEN sym])
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3226	moreover have "\<forall>x\<in>{v \<in> c. 0 < u v}. 0 \<le> inverse (setsum u {x \<in> c. 0 < u x}) * u x"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3227	apply (rule) apply (rule mult_nonneg_nonneg) using * by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3228	hence "z \<in> convex hull {v \<in> c. u v > 0}" unfolding convex_hull_explicit mem_Collect_eq
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3229	apply(rule_tac x="{v \<in> c. 0 < u v}" in exI, rule_tac x="\<lambda>y. inverse (setsum u {x\<in>c. u x > 0}) * u y" in exI)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3230	using assms(1) unfolding scaleR_scaleR[THEN sym] scaleR_right.setsum [symmetric] and z_def using *
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3231	by(auto simp add: setsum_negf mult_right.setsum[THEN sym])
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3232	ultimately show ?thesis apply(rule_tac x="{v\<in>c. u v \<le> 0}" in exI, rule_tac x="{v\<in>c. u v > 0}" in exI) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3233	qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3234
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3235	lemma radon: assumes "affine_dependent c"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3236	obtains m p where "m\<subseteq>c" "p\<subseteq>c" "m \<inter> p = {}" "(convex hull m) \<inter> (convex hull p) \<noteq> {}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3237	proof- from assms[unfolded affine_dependent_explicit] guess s .. then guess u ..
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3238	hence *:"finite s" "affine_dependent s" and s:"s \<subseteq> c" unfolding affine_dependent_explicit by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3239	from radon_partition[OF *] guess m .. then guess p ..
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3240	thus ?thesis apply(rule_tac that[of p m]) using s by auto qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3241
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3242	subsection {* Helly's theorem. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3243
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3244	lemma helly_induct: fixes f::"('a::euclidean_space) set set"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3245	assumes "card f = n" "n \<ge> DIM('a) + 1"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3246	"\<forall>s\<in>f. convex s" "\<forall>t\<subseteq>f. card t = DIM('a) + 1 \<longrightarrow> \<Inter> t \<noteq> {}"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3247	shows "\<Inter> f \<noteq> {}"
33715 8cce3a34c122 removed hassize predicate hoelzl parents: 33714 diff changeset	3248	using assms proof(induct n arbitrary: f)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3249	case (Suc n)
33715 8cce3a34c122 removed hassize predicate hoelzl parents: 33714 diff changeset	3250	have "finite f" using `card f = Suc n` by (auto intro: card_ge_0_finite)
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3251	show "\<Inter> f \<noteq> {}" apply(cases "n = DIM('a)") apply(rule Suc(5)[rule_format])
33715 8cce3a34c122 removed hassize predicate hoelzl parents: 33714 diff changeset	3252	unfolding `card f = Suc n` proof-
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3253	assume ng:"n \<noteq> DIM('a)" hence "\<exists>X. \<forall>s\<in>f. X s \<in> \<Inter>(f - {s})" apply(rule_tac bchoice) unfolding ex_in_conv
33715 8cce3a34c122 removed hassize predicate hoelzl parents: 33714 diff changeset	3254	apply(rule, rule Suc(1)[rule_format]) unfolding card_Diff_singleton_if[OF `finite f`] `card f = Suc n`
8cce3a34c122 removed hassize predicate hoelzl parents: 33714 diff changeset	3255	defer defer apply(rule Suc(4)[rule_format]) defer apply(rule Suc(5)[rule_format]) using Suc(3) `finite f` by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3256	then obtain X where X:"\<forall>s\<in>f. X s \<in> \<Inter>(f - {s})" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3257	show ?thesis proof(cases "inj_on X f")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3258	case False then obtain s t where st:"s\<noteq>t" "s\<in>f" "t\<in>f" "X s = X t" unfolding inj_on_def by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3259	hence *:"\<Inter> f = \<Inter> (f - {s}) \<inter> \<Inter> (f - {t})" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3260	show ?thesis unfolding * unfolding ex_in_conv[THEN sym] apply(rule_tac x="X s" in exI)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3261	apply(rule, rule X[rule_format]) using X st by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3262	next case True then obtain m p where mp:"m \<inter> p = {}" "m \<union> p = X ` f" "convex hull m \<inter> convex hull p \<noteq> {}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3263	using radon_partition[of "X ` f"] and affine_dependent_biggerset[of "X ` f"]
33715 8cce3a34c122 removed hassize predicate hoelzl parents: 33714 diff changeset	3264	unfolding card_image[OF True] and `card f = Suc n` using Suc(3) `finite f` and ng by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3265	have "m \<subseteq> X ` f" "p \<subseteq> X ` f" using mp(2) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3266	then obtain g h where gh:"m = X ` g" "p = X ` h" "g \<subseteq> f" "h \<subseteq> f" unfolding subset_image_iff by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3267	hence "f \<union> (g \<union> h) = f" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3268	hence f:"f = g \<union> h" using inj_on_Un_image_eq_iff[of X f "g \<union> h"] and True
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3269	unfolding mp(2)[unfolded image_Un[THEN sym] gh] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3270	have *:"g \<inter> h = {}" using mp(1) unfolding gh using inj_on_image_Int[OF True gh(3,4)] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3271	have "convex hull (X ` h) \<subseteq> \<Inter> g" "convex hull (X ` g) \<subseteq> \<Inter> h"
33715 8cce3a34c122 removed hassize predicate hoelzl parents: 33714 diff changeset	3272	apply(rule_tac [!] hull_minimal) using Suc gh(3-4) unfolding mem_def unfolding subset_eq
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3273	apply(rule_tac [2] convex_Inter, rule_tac [4] convex_Inter) apply rule prefer 3 apply rule proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3274	fix x assume "x\<in>X ` g" then guess y unfolding image_iff ..
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3275	thus "x\<in>\<Inter>h" using X[THEN bspec[where x=y]] using * f by auto next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3276	fix x assume "x\<in>X ` h" then guess y unfolding image_iff ..
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3277	thus "x\<in>\<Inter>g" using X[THEN bspec[where x=y]] using * f by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3278	qed(auto)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3279	thus ?thesis unfolding f using mp(3)[unfolded gh] by blast qed
37647 a5400b94d2dd minimize dependencies on Numeral_Type huffman parents: 37489 diff changeset	3280	qed(auto) qed(auto)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3281
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3282	lemma helly: fixes f::"('a::euclidean_space) set set"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3283	assumes "card f \<ge> DIM('a) + 1" "\<forall>s\<in>f. convex s"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3284	"\<forall>t\<subseteq>f. card t = DIM('a) + 1 \<longrightarrow> \<Inter> t \<noteq> {}"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3285	shows "\<Inter> f \<noteq>{}"
33715 8cce3a34c122 removed hassize predicate hoelzl parents: 33714 diff changeset	3286	apply(rule helly_induct) using assms by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3287
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3288	subsection {* Homeomorphism of all convex compact sets with nonempty interior. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3289
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3290	lemma compact_frontier_line_lemma:
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3291	fixes s :: "('a::euclidean_space) set"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3292	assumes "compact s" "0 \<in> s" "x \<noteq> 0"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3293	obtains u where "0 \<le> u" "(u \<^sub>R x) \<in> frontier s" "\<forall>v>u. (v \<^sub>R x) \<notin> s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3294	proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3295	obtain b where b:"b>0" "\<forall>x\<in>s. norm x \<le> b" using compact_imp_bounded[OF assms(1), unfolded bounded_pos] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3296	let ?A = "{y. \<exists>u. 0 \<le> u \<and> u \<le> b / norm(x) \<and> (y = u *\<^sub>R x)}"
36431 340755027840 move definitions and theorems for type real^1 to separate theory file huffman parents: 36365 diff changeset	3297	have A:"?A = (\<lambda>u. u *\<^sub>R x) ` {0 .. b / norm x}"
340755027840 move definitions and theorems for type real^1 to separate theory file huffman parents: 36365 diff changeset	3298	by auto
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3299	have *:"\<And>x A B. x\<in>A \<Longrightarrow> x\<in>B \<Longrightarrow> A\<inter>B \<noteq> {}" by blast
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3300	have "compact ?A" unfolding A apply(rule compact_continuous_image, rule continuous_at_imp_continuous_on)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3301	apply(rule, rule continuous_vmul)
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3302	apply(rule continuous_at_id) by(rule compact_interval)
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3303	moreover have "{y. \<exists>u\<ge>0. u \<le> b / norm x \<and> y = u \<^sub>R x} \<inter> s \<noteq> {}" apply(rule [OF _ assms(2)])
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3304	unfolding mem_Collect_eq using `b>0` assms(3) by(auto intro!: divide_nonneg_pos)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3305	ultimately obtain u y where obt: "u\<ge>0" "u \<le> b / norm x" "y = u *\<^sub>R x"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3306	"y\<in>?A" "y\<in>s" "\<forall>z\<in>?A \<inter> s. dist 0 z \<le> dist 0 y" using distance_attains_sup[OF compact_inter[OF _ assms(1), of ?A], of 0] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3307
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3308	have "norm x > 0" using assms(3)[unfolded zero_less_norm_iff[THEN sym]] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3309	{ fix v assume as:"v > u" "v *\<^sub>R x \<in> s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3310	hence "v \<le> b / norm x" using b(2)[rule_format, OF as(2)]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3311	using `u\<ge>0` unfolding pos_le_divide_eq[OF `norm x > 0`] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3312	hence "norm (v *\<^sub>R x) \<le> norm y" apply(rule_tac obt(6)[rule_format, unfolded dist_0_norm]) apply(rule IntI) defer
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3313	apply(rule as(2)) unfolding mem_Collect_eq apply(rule_tac x=v in exI)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3314	using as(1) `u\<ge>0` by(auto simp add:field_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3315	hence False unfolding obt(3) using `u\<ge>0` `norm x > 0` `v>u` by(auto simp add:field_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3316	} note u_max = this
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3317
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3318	have "u \<^sub>R x \<in> frontier s" unfolding frontier_straddle apply(rule,rule,rule) apply(rule_tac x="u \<^sub>R x" in bexI) unfolding obt(3)[THEN sym]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3319	prefer 3 apply(rule_tac x="(u + (e / 2) / norm x) *\<^sub>R x" in exI) apply(rule, rule) proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3320	fix e assume "0 < e" and as:"(u + e / 2 / norm x) *\<^sub>R x \<in> s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3321	hence "u + e / 2 / norm x > u" using`norm x > 0` by(auto simp del:zero_less_norm_iff intro!: divide_pos_pos)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3322	thus False using u_max[OF _ as] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3323	qed(insert `y\<in>s`, auto simp add: dist_norm scaleR_left_distrib obt(3))
36071 c8ae8e56d42e tuned many proofs a bit nipkow parents: 35577 diff changeset	3324	thus ?thesis by(metis that[of u] u_max obt(1))
c8ae8e56d42e tuned many proofs a bit nipkow parents: 35577 diff changeset	3325	qed
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3326
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3327	lemma starlike_compact_projective:
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3328	assumes "compact s" "cball (0::'a::euclidean_space) 1 \<subseteq> s "
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3329	"\<forall>x\<in>s. \<forall>u. 0 \<le> u \<and> u < 1 \<longrightarrow> (u *\<^sub>R x) \<in> (s - frontier s )"
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3330	shows "s homeomorphic (cball (0::'a::euclidean_space) 1)"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3331	proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3332	have fs:"frontier s \<subseteq> s" apply(rule frontier_subset_closed) using compact_imp_closed[OF assms(1)] by simp
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3333	def pi \<equiv> "\<lambda>x::'a. inverse (norm x) *\<^sub>R x"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3334	have "0 \<notin> frontier s" unfolding frontier_straddle apply(rule ccontr) unfolding not_not apply(erule_tac x=1 in allE)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3335	using assms(2)[unfolded subset_eq Ball_def mem_cball] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3336	have injpi:"\<And>x y. pi x = pi y \<and> norm x = norm y \<longleftrightarrow> x = y" unfolding pi_def by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3337
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3338	have contpi:"continuous_on (UNIV - {0}) pi" apply(rule continuous_at_imp_continuous_on)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3339	apply rule unfolding pi_def
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3340	apply (rule continuous_mul)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3341	apply (rule continuous_at_inv[unfolded o_def])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3342	apply (rule continuous_at_norm)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3343	apply simp
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3344	apply (rule continuous_at_id)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3345	done
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3346	def sphere \<equiv> "{x::'a. norm x = 1}"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3347	have pi:"\<And>x. x \<noteq> 0 \<Longrightarrow> pi x \<in> sphere" "\<And>x u. u>0 \<Longrightarrow> pi (u *\<^sub>R x) = pi x" unfolding pi_def sphere_def by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3348
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3349	have "0\<in>s" using assms(2) and centre_in_cball[of 0 1] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3350	have front_smul:"\<forall>x\<in>frontier s. \<forall>u\<ge>0. u *\<^sub>R x \<in> s \<longleftrightarrow> u \<le> 1" proof(rule,rule,rule)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3351	fix x u assume x:"x\<in>frontier s" and "(0::real)\<le>u"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3352	hence "x\<noteq>0" using `0\<notin>frontier s` by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3353	obtain v where v:"0 \<le> v" "v \<^sub>R x \<in> frontier s" "\<forall>w>v. w \<^sub>R x \<notin> s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3354	using compact_frontier_line_lemma[OF assms(1) `0\<in>s` `x\<noteq>0`] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3355	have "v=1" apply(rule ccontr) unfolding neq_iff apply(erule disjE) proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3356	assume "v<1" thus False using v(3)[THEN spec[where x=1]] using x and fs by auto next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3357	assume "v>1" thus False using assms(3)[THEN bspec[where x="v *\<^sub>R x"], THEN spec[where x="inverse v"]]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3358	using v and x and fs unfolding inverse_less_1_iff by auto qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3359	show "u *\<^sub>R x \<in> s \<longleftrightarrow> u \<le> 1" apply rule using v(3)[unfolded `v=1`, THEN spec[where x=u]] proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3360	assume "u\<le>1" thus "u *\<^sub>R x \<in> s" apply(cases "u=1")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3361	using assms(3)[THEN bspec[where x=x], THEN spec[where x=u]] using `0\<le>u` and x and fs by auto qed auto qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3362
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3363	have "\<exists>surf. homeomorphism (frontier s) sphere pi surf"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3364	apply(rule homeomorphism_compact) apply(rule compact_frontier[OF assms(1)])
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	3365	apply(rule continuous_on_subset[OF contpi]) defer apply(rule set_eqI,rule)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3366	unfolding inj_on_def prefer 3 apply(rule,rule,rule)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3367	proof- fix x assume "x\<in>pi ` frontier s" then obtain y where "y\<in>frontier s" "x = pi y" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3368	thus "x \<in> sphere" using pi(1)[of y] and `0 \<notin> frontier s` by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3369	next fix x assume "x\<in>sphere" hence "norm x = 1" "x\<noteq>0" unfolding sphere_def by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3370	then obtain u where "0 \<le> u" "u \<^sub>R x \<in> frontier s" "\<forall>v>u. v \<^sub>R x \<notin> s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3371	using compact_frontier_line_lemma[OF assms(1) `0\<in>s`, of x] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3372	thus "x \<in> pi ` frontier s" unfolding image_iff le_less pi_def apply(rule_tac x="u *\<^sub>R x" in bexI) using `norm x = 1` `0\<notin>frontier s` by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3373	next fix x y assume as:"x \<in> frontier s" "y \<in> frontier s" "pi x = pi y"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3374	hence xys:"x\<in>s" "y\<in>s" using fs by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3375	from as(1,2) have nor:"norm x \<noteq> 0" "norm y \<noteq> 0" using `0\<notin>frontier s` by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3376	from nor have x:"x = norm x \<^sub>R ((inverse (norm y)) \<^sub>R y)" unfolding as(3)[unfolded pi_def, THEN sym] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3377	from nor have y:"y = norm y \<^sub>R ((inverse (norm x)) \<^sub>R x)" unfolding as(3)[unfolded pi_def] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3378	have "0 \<le> norm y * inverse (norm x)" "0 \<le> norm x * inverse (norm y)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3379	unfolding divide_inverse[THEN sym] apply(rule_tac[!] divide_nonneg_pos) using nor by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3380	hence "norm x = norm y" apply(rule_tac ccontr) unfolding neq_iff
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3381	using x y and front_smul[THEN bspec, OF as(1), THEN spec[where x="norm y * (inverse (norm x))"]]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3382	using front_smul[THEN bspec, OF as(2), THEN spec[where x="norm x * (inverse (norm y))"]]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3383	using xys nor by(auto simp add:field_simps divide_le_eq_1 divide_inverse[THEN sym])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3384	thus "x = y" apply(subst injpi[THEN sym]) using as(3) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3385	qed(insert `0 \<notin> frontier s`, auto)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3386	then obtain surf where surf:"\<forall>x\<in>frontier s. surf (pi x) = x" "pi ` frontier s = sphere" "continuous_on (frontier s) pi"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3387	"\<forall>y\<in>sphere. pi (surf y) = y" "surf ` sphere = frontier s" "continuous_on sphere surf" unfolding homeomorphism_def by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3388
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3389	have cont_surfpi:"continuous_on (UNIV - {0}) (surf \<circ> pi)" apply(rule continuous_on_compose, rule contpi)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3390	apply(rule continuous_on_subset[of sphere], rule surf(6)) using pi(1) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3391
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3392	{ fix x assume as:"x \<in> cball (0::'a) 1"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3393	have "norm x *\<^sub>R surf (pi x) \<in> s" proof(cases "x=0 \<or> norm x = 1")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3394	case False hence "pi x \<in> sphere" "norm x < 1" using pi(1)[of x] as by(auto simp add: dist_norm)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3395	thus ?thesis apply(rule_tac assms(3)[rule_format, THEN DiffD1])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3396	apply(rule_tac fs[unfolded subset_eq, rule_format])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3397	unfolding surf(5)[THEN sym] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3398	next case True thus ?thesis apply rule defer unfolding pi_def apply(rule fs[unfolded subset_eq, rule_format])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3399	unfolding surf(5)[unfolded sphere_def, THEN sym] using `0\<in>s` by auto qed } note hom = this
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3400
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3401	{ fix x assume "x\<in>s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3402	hence "x \<in> (\<lambda>x. norm x *\<^sub>R surf (pi x)) ` cball 0 1" proof(cases "x=0")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3403	case True show ?thesis unfolding image_iff True apply(rule_tac x=0 in bexI) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3404	next let ?a = "inverse (norm (surf (pi x)))"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3405	case False hence invn:"inverse (norm x) \<noteq> 0" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3406	from False have pix:"pi x\<in>sphere" using pi(1) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3407	hence "pi (surf (pi x)) = pi x" apply(rule_tac surf(4)[rule_format]) by assumption
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3408	hence *:"norm x \<^sub>R (?a *\<^sub>R surf (pi x)) = x" apply(rule_tac scaleR_left_imp_eq[OF invn]) unfolding pi_def using invn by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3409	hence :"?a norm x > 0" and"?a > 0" "?a \<noteq> 0" using surf(5) `0\<notin>frontier s` apply -
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3410	apply(rule_tac mult_pos_pos) using False[unfolded zero_less_norm_iff[THEN sym]] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3411	have "norm (surf (pi x)) \<noteq> 0" using ** False by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3412	hence "norm x = norm ((?a * norm x) *\<^sub>R surf (pi x))"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3413	unfolding norm_scaleR abs_mult abs_norm_cancel abs_of_pos[OF `?a > 0`] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3414	moreover have "pi x = pi ((inverse (norm (surf (pi x))) * norm x) *\<^sub>R surf (pi x))"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3415	unfolding pi(2)[OF *] surf(4)[rule_format, OF pix] ..
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3416	moreover have "surf (pi x) \<in> frontier s" using surf(5) pix by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3417	hence "dist 0 (inverse (norm (surf (pi x))) *\<^sub>R x) \<le> 1" unfolding dist_norm
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3418	using ** and * using front_smul[THEN bspec[where x="surf (pi x)"], THEN spec[where x="norm x * ?a"]]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3419	using False `x\<in>s` by(auto simp add:field_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3420	ultimately show ?thesis unfolding image_iff apply(rule_tac x="inverse (norm (surf(pi x))) *\<^sub>R x" in bexI)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3421	apply(subst injpi[THEN sym]) unfolding abs_mult abs_norm_cancel abs_of_pos[OF `?a > 0`]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3422	unfolding pi(2)[OF `?a > 0`] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3423	qed } note hom2 = this
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3424
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3425	show ?thesis apply(subst homeomorphic_sym) apply(rule homeomorphic_compact[where f="\<lambda>x. norm x *\<^sub>R surf (pi x)"])
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	3426	apply(rule compact_cball) defer apply(rule set_eqI, rule, erule imageE, drule hom)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3427	prefer 4 apply(rule continuous_at_imp_continuous_on, rule) apply(rule_tac [3] hom2) proof-
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3428	fix x::"'a" assume as:"x \<in> cball 0 1"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3429	thus "continuous (at x) (\<lambda>x. norm x *\<^sub>R surf (pi x))" proof(cases "x=0")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3430	case False thus ?thesis apply(rule_tac continuous_mul, rule_tac continuous_at_norm)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3431	using cont_surfpi unfolding continuous_on_eq_continuous_at[OF open_delete[OF open_UNIV]] o_def by auto
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3432	next obtain B where B:"\<forall>x\<in>s. norm x \<le> B" using compact_imp_bounded[OF assms(1)] unfolding bounded_iff by auto
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3433	hence "B > 0" using assms(2) unfolding subset_eq apply(erule_tac x="basis 0" in ballE) defer
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3434	apply(erule_tac x="basis 0" in ballE)
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3435	unfolding Ball_def mem_cball dist_norm using DIM_positive[where 'a='a]
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3436	by(auto simp add:norm_basis[unfolded One_nat_def])
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3437	case True show ?thesis unfolding True continuous_at Lim_at apply(rule,rule) apply(rule_tac x="e / B" in exI)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3438	apply(rule) apply(rule divide_pos_pos) prefer 3 apply(rule,rule,erule conjE)
36586 4fa71a69d5b2 remove redundant lemma norm_0 huffman parents: 36583 diff changeset	3439	unfolding norm_zero scaleR_zero_left dist_norm diff_0_right norm_scaleR abs_norm_cancel proof-
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3440	fix e and x::"'a" assume as:"norm x < e / B" "0 < norm x" "0<e"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3441	hence "surf (pi x) \<in> frontier s" using pi(1)[of x] unfolding surf(5)[THEN sym] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3442	hence "norm (surf (pi x)) \<le> B" using B fs by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3443	hence "norm x * norm (surf (pi x)) \<le> norm x * B" using as(2) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3444	also have "\<dots> < e / B * B" apply(rule mult_strict_right_mono) using as(1) `B>0` by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3445	also have "\<dots> = e" using `B>0` by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3446	finally show "norm x * norm (surf (pi x)) < e" by assumption
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3447	qed(insert `B>0`, auto) qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3448	next { fix x assume as:"surf (pi x) = 0"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3449	have "x = 0" proof(rule ccontr)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3450	assume "x\<noteq>0" hence "pi x \<in> sphere" using pi(1) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3451	hence "surf (pi x) \<in> frontier s" using surf(5) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3452	thus False using `0\<notin>frontier s` unfolding as by simp qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3453	} note surf_0 = this
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3454	show "inj_on (\<lambda>x. norm x *\<^sub>R surf (pi x)) (cball 0 1)" unfolding inj_on_def proof(rule,rule,rule)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3455	fix x y assume as:"x \<in> cball 0 1" "y \<in> cball 0 1" "norm x \<^sub>R surf (pi x) = norm y \<^sub>R surf (pi y)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3456	thus "x=y" proof(cases "x=0 \<or> y=0")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3457	case True thus ?thesis using as by(auto elim: surf_0) next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3458	case False
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3459	hence "pi (surf (pi x)) = pi (surf (pi y))" using as(3)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3460	using pi(2)[of "norm x" "surf (pi x)"] pi(2)[of "norm y" "surf (pi y)"] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3461	moreover have "pi x \<in> sphere" "pi y \<in> sphere" using pi(1) False by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3462	ultimately have *:"pi x = pi y" using surf(4)[THEN bspec[where x="pi x"]] surf(4)[THEN bspec[where x="pi y"]] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3463	moreover have "norm x = norm y" using as(3)[unfolded *] using False by(auto dest:surf_0)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3464	ultimately show ?thesis using injpi by auto qed qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3465	qed auto qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3466
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3467	lemma homeomorphic_convex_compact_lemma: fixes s::"('a::euclidean_space) set"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3468	assumes "convex s" "compact s" "cball 0 1 \<subseteq> s"
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3469	shows "s homeomorphic (cball (0::'a) 1)"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3470	apply(rule starlike_compact_projective[OF assms(2-3)]) proof(rule,rule,rule,erule conjE)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3471	fix x u assume as:"x \<in> s" "0 \<le> u" "u < (1::real)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3472	hence "u *\<^sub>R x \<in> interior s" unfolding interior_def mem_Collect_eq
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3473	apply(rule_tac x="ball (u *\<^sub>R x) (1 - u)" in exI) apply(rule, rule open_ball)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3474	unfolding centre_in_ball apply rule defer apply(rule) unfolding mem_ball proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3475	fix y assume "dist (u *\<^sub>R x) y < 1 - u"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3476	hence "inverse (1 - u) \<^sub>R (y - u \<^sub>R x) \<in> s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3477	using assms(3) apply(erule_tac subsetD) unfolding mem_cball dist_commute dist_norm
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3478	unfolding group_add_class.diff_0 group_add_class.diff_0_right norm_minus_cancel norm_scaleR
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3479	apply (rule mult_left_le_imp_le[of "1 - u"])
36844 5f9385ecc1a7 Removed usage of normalizating locales. hoelzl parents: 36778 diff changeset	3480	unfolding mult_assoc[symmetric] using `u<1` by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3481	thus "y \<in> s" using assms(1)[unfolded convex_def, rule_format, of "inverse(1 - u) \<^sub>R (y - u \<^sub>R x)" x "1 - u" u]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3482	using as unfolding scaleR_scaleR by auto qed auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3483	thus "u *\<^sub>R x \<in> s - frontier s" using frontier_def and interior_subset by auto qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3484
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3485	lemma homeomorphic_convex_compact_cball: fixes e::real and s::"('a::euclidean_space) set"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3486	assumes "convex s" "compact s" "interior s \<noteq> {}" "0 < e"
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3487	shows "s homeomorphic (cball (b::'a) e)"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3488	proof- obtain a where "a\<in>interior s" using assms(3) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3489	then obtain d where "d>0" and d:"cball a d \<subseteq> s" unfolding mem_interior_cball by auto
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3490	let ?d = "inverse d" and ?n = "0::'a"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3491	have "cball ?n 1 \<subseteq> (\<lambda>x. inverse d *\<^sub>R (x - a)) ` s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3492	apply(rule, rule_tac x="d *\<^sub>R x + a" in image_eqI) defer
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3493	apply(rule d[unfolded subset_eq, rule_format]) using `d>0` unfolding mem_cball dist_norm
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3494	by(auto simp add: mult_right_le_one_le)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3495	hence "(\<lambda>x. inverse d *\<^sub>R (x - a)) ` s homeomorphic cball ?n 1"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3496	using homeomorphic_convex_compact_lemma[of "(\<lambda>x. ?d \<^sub>R -a + ?d \<^sub>R x) ` s", OF convex_affinity compact_affinity]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3497	using assms(1,2) by(auto simp add: uminus_add_conv_diff scaleR_right_diff_distrib)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3498	thus ?thesis apply(rule_tac homeomorphic_trans[OF _ homeomorphic_balls(2)[of 1 _ ?n]])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3499	apply(rule homeomorphic_trans[OF homeomorphic_affinity[of "?d" s "?d *\<^sub>R -a"]])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3500	using `d>0` `e>0` by(auto simp add: uminus_add_conv_diff scaleR_right_diff_distrib) qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3501
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3502	lemma homeomorphic_convex_compact: fixes s::"('a::euclidean_space) set" and t::"('a) set"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3503	assumes "convex s" "compact s" "interior s \<noteq> {}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3504	"convex t" "compact t" "interior t \<noteq> {}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3505	shows "s homeomorphic t"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3506	using assms by(meson zero_less_one homeomorphic_trans homeomorphic_convex_compact_cball homeomorphic_sym)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3507
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3508	subsection {* Epigraphs of convex functions. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3509
36338 7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3510	definition "epigraph s (f::_ \<Rightarrow> real) = {xy. fst xy \<in> s \<and> f (fst xy) \<le> snd xy}"
7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3511
7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3512	lemma mem_epigraph: "(x, y) \<in> epigraph s f \<longleftrightarrow> x \<in> s \<and> f x \<le> y" unfolding epigraph_def by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3513
34964 4e8be3c04d37 Replaced vec1 and dest_vec1 by abbreviation. hoelzl parents: 34915 diff changeset	3514	( This might break sooner or later. In fact it did already once. )
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3515	lemma convex_epigraph:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3516	"convex(epigraph s f) \<longleftrightarrow> convex_on s f \<and> convex s"
36338 7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3517	unfolding convex_def convex_on_def
7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3518	unfolding Ball_def split_paired_All epigraph_def
7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3519	unfolding mem_Collect_eq fst_conv snd_conv fst_add snd_add fst_scaleR snd_scaleR Ball_def[symmetric]
34964 4e8be3c04d37 Replaced vec1 and dest_vec1 by abbreviation. hoelzl parents: 34915 diff changeset	3520	apply safe defer apply(erule_tac x=x in allE,erule_tac x="f x" in allE) apply safe
4e8be3c04d37 Replaced vec1 and dest_vec1 by abbreviation. hoelzl parents: 34915 diff changeset	3521	apply(erule_tac x=xa in allE,erule_tac x="f xa" in allE) prefer 3
36338 7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3522	apply(rule_tac y="u * f a + v * f aa" in order_trans) defer by(auto intro!:mult_left_mono add_mono)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3523
36071 c8ae8e56d42e tuned many proofs a bit nipkow parents: 35577 diff changeset	3524	lemma convex_epigraphI:
c8ae8e56d42e tuned many proofs a bit nipkow parents: 35577 diff changeset	3525	"convex_on s f \<Longrightarrow> convex s \<Longrightarrow> convex(epigraph s f)"
c8ae8e56d42e tuned many proofs a bit nipkow parents: 35577 diff changeset	3526	unfolding convex_epigraph by auto
c8ae8e56d42e tuned many proofs a bit nipkow parents: 35577 diff changeset	3527
c8ae8e56d42e tuned many proofs a bit nipkow parents: 35577 diff changeset	3528	lemma convex_epigraph_convex:
c8ae8e56d42e tuned many proofs a bit nipkow parents: 35577 diff changeset	3529	"convex s \<Longrightarrow> convex_on s f \<longleftrightarrow> convex(epigraph s f)"
c8ae8e56d42e tuned many proofs a bit nipkow parents: 35577 diff changeset	3530	by(simp add: convex_epigraph)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3531
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3532	subsection {* Use this to derive general bound property of convex function. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3533
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3534	lemma convex_on:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3535	assumes "convex s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3536	shows "convex_on s f \<longleftrightarrow> (\<forall>k u x. (\<forall>i\<in>{1..k::nat}. 0 \<le> u i \<and> x i \<in> s) \<and> setsum u {1..k} = 1 \<longrightarrow>
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3537	f (setsum (\<lambda>i. u i \<^sub>R x i) {1..k} ) \<le> setsum (\<lambda>i. u i f(x i)) {1..k} ) "
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3538	unfolding convex_epigraph_convex[OF assms] convex epigraph_def Ball_def mem_Collect_eq
36338 7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3539	unfolding fst_setsum snd_setsum fst_scaleR snd_scaleR
7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3540	apply safe
7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3541	apply (drule_tac x=k in spec)
7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3542	apply (drule_tac x=u in spec)
7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3543	apply (drule_tac x="\<lambda>i. (x i, f (x i))" in spec)
7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3544	apply simp
7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3545	using assms[unfolded convex] apply simp
36778 739a9379e29b avoid using real-specific versions of generic lemmas huffman parents: 36725 diff changeset	3546	apply(rule_tac y="\<Sum>i = 1..k. u i * f (fst (x i))" in order_trans)
36338 7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3547	defer apply(rule setsum_mono) apply(erule_tac x=i in allE) unfolding real_scaleR_def
34964 4e8be3c04d37 Replaced vec1 and dest_vec1 by abbreviation. hoelzl parents: 34915 diff changeset	3548	apply(rule mult_left_mono)using assms[unfolded convex] by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3549
36338 7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3550
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3551	subsection {* Convexity of general and special intervals. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3552
37732 6432bf0d7191 generalize type of is_interval to class euclidean_space huffman parents: 37673 diff changeset	3553	lemma convexI: (* TODO: move to Library/Convex.thy *)
6432bf0d7191 generalize type of is_interval to class euclidean_space huffman parents: 37673 diff changeset	3554	assumes "\<And>x y u v. \<lbrakk>x \<in> s; y \<in> s; 0 \<le> u; 0 \<le> v; u + v = 1\<rbrakk> \<Longrightarrow> u \<^sub>R x + v \<^sub>R y \<in> s"
6432bf0d7191 generalize type of is_interval to class euclidean_space huffman parents: 37673 diff changeset	3555	shows "convex s"
6432bf0d7191 generalize type of is_interval to class euclidean_space huffman parents: 37673 diff changeset	3556	using assms unfolding convex_def by fast
6432bf0d7191 generalize type of is_interval to class euclidean_space huffman parents: 37673 diff changeset	3557
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3558	lemma is_interval_convex:
37732 6432bf0d7191 generalize type of is_interval to class euclidean_space huffman parents: 37673 diff changeset	3559	fixes s :: "('a::euclidean_space) set"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3560	assumes "is_interval s" shows "convex s"
37732 6432bf0d7191 generalize type of is_interval to class euclidean_space huffman parents: 37673 diff changeset	3561	proof (rule convexI)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3562	fix x y u v assume as:"x \<in> s" "y \<in> s" "0 \<le> u" "0 \<le> v" "u + v = (1::real)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3563	hence :"u = 1 - v" "1 - v \<ge> 0" and *:"v = 1 - u" "1 - u \<ge> 0" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3564	{ fix a b assume "\<not> b \<le> u * a + v * b"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3565	hence "u * a < (1 - v) * b" unfolding not_le using as(4) by(auto simp add: field_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3566	hence "a < b" unfolding * using as(4) *(2) apply(rule_tac mult_left_less_imp_less[of "1 - v"]) by(auto simp add: field_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3567	hence "a \<le> u * a + v * b" unfolding * using as(4) by (auto simp add: field_simps intro!:mult_right_mono)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3568	} moreover
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3569	{ fix a b assume "\<not> u * a + v * b \<le> a"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3570	hence "v * b > (1 - u) * a" unfolding not_le using as(4) by(auto simp add: field_simps)
36350 bc7982c54e37 dropped group_simps, ring_simps, field_eq_simps haftmann parents: 36341 diff changeset	3571	hence "a < b" unfolding * using as(4) apply(rule_tac mult_left_less_imp_less) by(auto simp add: field_simps)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3572	hence "u * a + v * b \<le> b" unfolding using (2) as(3) by(auto simp add: field_simps intro!:mult_right_mono) }
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3573	ultimately show "u \<^sub>R x + v \<^sub>R y \<in> s" apply- apply(rule assms[unfolded is_interval_def, rule_format, OF as(1,2)])
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3574	using as(3-) DIM_positive[where 'a='a] by(auto simp add:euclidean_simps) qed
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3575
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3576	lemma is_interval_connected:
37732 6432bf0d7191 generalize type of is_interval to class euclidean_space huffman parents: 37673 diff changeset	3577	fixes s :: "('a::euclidean_space) set"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3578	shows "is_interval s \<Longrightarrow> connected s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3579	using is_interval_convex convex_connected by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3580
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3581	lemma convex_interval: "convex {a .. b}" "convex {a<..<b::'a::ordered_euclidean_space}"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3582	apply(rule_tac[!] is_interval_convex) using is_interval_interval by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3583
36431 340755027840 move definitions and theorems for type real^1 to separate theory file huffman parents: 36365 diff changeset	3584	(* FIXME: rewrite these lemmas without using vec1
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3585	subsection {* On @{text "real^1"}, @{text "is_interval"}, @{text "convex"} and @{text "connected"} are all equivalent. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3586
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3587	lemma is_interval_1:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3588	"is_interval s \<longleftrightarrow> (\<forall>a\<in>s. \<forall>b\<in>s. \<forall> x. dest_vec1 a \<le> dest_vec1 x \<and> dest_vec1 x \<le> dest_vec1 b \<longrightarrow> x \<in> s)"
34964 4e8be3c04d37 Replaced vec1 and dest_vec1 by abbreviation. hoelzl parents: 34915 diff changeset	3589	unfolding is_interval_def forall_1 by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3590
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3591	lemma is_interval_connected_1: "is_interval s \<longleftrightarrow> connected (s::(real^1) set)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3592	apply(rule, rule is_interval_connected, assumption) unfolding is_interval_1
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3593	apply(rule,rule,rule,rule,erule conjE,rule ccontr) proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3594	fix a b x assume as:"connected s" "a \<in> s" "b \<in> s" "dest_vec1 a \<le> dest_vec1 x" "dest_vec1 x \<le> dest_vec1 b" "x\<notin>s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3595	hence *:"dest_vec1 a < dest_vec1 x" "dest_vec1 x < dest_vec1 b" apply(rule_tac [!] ccontr) unfolding not_less by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3596	let ?halfl = "{z. inner (basis 1) z < dest_vec1 x} " and ?halfr = "{z. inner (basis 1) z > dest_vec1 x} "
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3597	{ fix y assume "y \<in> s" have "y \<in> ?halfr \<union> ?halfl" apply(rule ccontr)
36362 06475a1547cb fix lots of looping simp calls and other warnings huffman parents: 36341 diff changeset	3598	using as(6) `y\<in>s` by (auto simp add: inner_vector_def) }
34964 4e8be3c04d37 Replaced vec1 and dest_vec1 by abbreviation. hoelzl parents: 34915 diff changeset	3599	moreover have "a\<in>?halfl" "b\<in>?halfr" using * by (auto simp add: inner_vector_def)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3600	hence "?halfl \<inter> s \<noteq> {}" "?halfr \<inter> s \<noteq> {}" using as(2-3) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3601	ultimately show False apply(rule_tac notE[OF as(1)[unfolded connected_def]])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3602	apply(rule_tac x="?halfl" in exI, rule_tac x="?halfr" in exI)
36071 c8ae8e56d42e tuned many proofs a bit nipkow parents: 35577 diff changeset	3603	apply(rule, rule open_halfspace_lt, rule, rule open_halfspace_gt)
c8ae8e56d42e tuned many proofs a bit nipkow parents: 35577 diff changeset	3604	by(auto simp add: field_simps) qed
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3605
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3606	lemma is_interval_convex_1:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3607	"is_interval s \<longleftrightarrow> convex (s::(real^1) set)"
36071 c8ae8e56d42e tuned many proofs a bit nipkow parents: 35577 diff changeset	3608	by(metis is_interval_convex convex_connected is_interval_connected_1)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3609
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3610	lemma convex_connected_1:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3611	"connected s \<longleftrightarrow> convex (s::(real^1) set)"
36071 c8ae8e56d42e tuned many proofs a bit nipkow parents: 35577 diff changeset	3612	by(metis is_interval_convex convex_connected is_interval_connected_1)
36431 340755027840 move definitions and theorems for type real^1 to separate theory file huffman parents: 36365 diff changeset	3613	*)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3614	subsection {* Another intermediate value theorem formulation. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3615
37673 f69f4b079275 generalize more lemmas from ordered_euclidean_space to euclidean_space huffman parents: 37647 diff changeset	3616	lemma ivt_increasing_component_on_1: fixes f::"real \<Rightarrow> 'a::euclidean_space"
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3617	assumes "a \<le> b" "continuous_on {a .. b} f" "(f a)$$k \<le> y" "y \<le> (f b)$$k"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3618	shows "\<exists>x\<in>{a..b}. (f x)$$k = y"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3619	proof- have "f a \<in> f ` {a..b}" "f b \<in> f ` {a..b}" apply(rule_tac[!] imageI)
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3620	using assms(1) by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3621	thus ?thesis using connected_ivt_component[of "f ` {a..b}" "f a" "f b" k y]
36431 340755027840 move definitions and theorems for type real^1 to separate theory file huffman parents: 36365 diff changeset	3622	using connected_continuous_image[OF assms(2) convex_connected[OF convex_real_interval(5)]]
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3623	using assms by(auto intro!: imageI) qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3624
37673 f69f4b079275 generalize more lemmas from ordered_euclidean_space to euclidean_space huffman parents: 37647 diff changeset	3625	lemma ivt_increasing_component_1: fixes f::"real \<Rightarrow> 'a::euclidean_space"
36431 340755027840 move definitions and theorems for type real^1 to separate theory file huffman parents: 36365 diff changeset	3626	shows "a \<le> b \<Longrightarrow> \<forall>x\<in>{a .. b}. continuous (at x) f
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3627	\<Longrightarrow> f a$$k \<le> y \<Longrightarrow> y \<le> f b$$k \<Longrightarrow> \<exists>x\<in>{a..b}. (f x)$$k = y"
36071 c8ae8e56d42e tuned many proofs a bit nipkow parents: 35577 diff changeset	3628	by(rule ivt_increasing_component_on_1)
c8ae8e56d42e tuned many proofs a bit nipkow parents: 35577 diff changeset	3629	(auto simp add: continuous_at_imp_continuous_on)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3630
37673 f69f4b079275 generalize more lemmas from ordered_euclidean_space to euclidean_space huffman parents: 37647 diff changeset	3631	lemma ivt_decreasing_component_on_1: fixes f::"real \<Rightarrow> 'a::euclidean_space"
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3632	assumes "a \<le> b" "continuous_on {a .. b} f" "(f b)$$k \<le> y" "y \<le> (f a)$$k"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3633	shows "\<exists>x\<in>{a..b}. (f x)$$k = y"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3634	apply(subst neg_equal_iff_equal[THEN sym])
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3635	using ivt_increasing_component_on_1[of a b "\<lambda>x. - f x" k "- y"] using assms using continuous_on_neg
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3636	by (auto simp add:euclidean_simps)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3637
37673 f69f4b079275 generalize more lemmas from ordered_euclidean_space to euclidean_space huffman parents: 37647 diff changeset	3638	lemma ivt_decreasing_component_1: fixes f::"real \<Rightarrow> 'a::euclidean_space"
36431 340755027840 move definitions and theorems for type real^1 to separate theory file huffman parents: 36365 diff changeset	3639	shows "a \<le> b \<Longrightarrow> \<forall>x\<in>{a .. b}. continuous (at x) f
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3640	\<Longrightarrow> f b$$k \<le> y \<Longrightarrow> y \<le> f a$$k \<Longrightarrow> \<exists>x\<in>{a..b}. (f x)$$k = y"
36071 c8ae8e56d42e tuned many proofs a bit nipkow parents: 35577 diff changeset	3641	by(rule ivt_decreasing_component_on_1)
c8ae8e56d42e tuned many proofs a bit nipkow parents: 35577 diff changeset	3642	(auto simp: continuous_at_imp_continuous_on)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3643
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3644	subsection {* A bound within a convex hull, and so an interval. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3645
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3646	lemma convex_on_convex_hull_bound:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3647	assumes "convex_on (convex hull s) f" "\<forall>x\<in>s. f x \<le> b"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3648	shows "\<forall>x\<in> convex hull s. f x \<le> b" proof
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3649	fix x assume "x\<in>convex hull s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3650	then obtain k u v where obt:"\<forall>i\<in>{1..k::nat}. 0 \<le> u i \<and> v i \<in> s" "setsum u {1..k} = 1" "(\<Sum>i = 1..k. u i *\<^sub>R v i) = x"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3651	unfolding convex_hull_indexed mem_Collect_eq by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3652	have "(\<Sum>i = 1..k. u i * f (v i)) \<le> b" using setsum_mono[of "{1..k}" "\<lambda>i. u i * f (v i)" "\<lambda>i. u i * b"]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3653	unfolding setsum_left_distrib[THEN sym] obt(2) mult_1 apply(drule_tac meta_mp) apply(rule mult_left_mono)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3654	using assms(2) obt(1) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3655	thus "f x \<le> b" using assms(1)[unfolded convex_on[OF convex_convex_hull], rule_format, of k u v]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3656	unfolding obt(2-3) using obt(1) and hull_subset[unfolded subset_eq, rule_format, of _ s] by auto qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3657
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3658	lemma unit_interval_convex_hull:
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3659	"{0::'a::ordered_euclidean_space .. (\<chi>\<chi> i. 1)} = convex hull {x. \<forall>i<DIM('a). (x$$i = 0) \<or> (x$$i = 1)}"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3660	(is "?int = convex hull ?points")
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3661	proof- have 01:"{0,(\<chi>\<chi> i. 1)} \<subseteq> convex hull ?points" apply rule apply(rule_tac hull_subset[unfolded subset_eq, rule_format]) by auto
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3662	{ fix n x assume "x\<in>{0::'a::ordered_euclidean_space .. \<chi>\<chi> i. 1}" "n \<le> DIM('a)" "card {i. i<DIM('a) \<and> x$$i \<noteq> 0} \<le> n"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3663	hence "x\<in>convex hull ?points" proof(induct n arbitrary: x)
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3664	case 0 hence "x = 0" apply(subst euclidean_eq) apply rule by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3665	thus "x\<in>convex hull ?points" using 01 by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3666	next
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3667	case (Suc n) show "x\<in>convex hull ?points" proof(cases "{i. i<DIM('a) \<and> x$$i \<noteq> 0} = {}")
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3668	case True hence "x = 0" apply(subst euclidean_eq) by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3669	thus "x\<in>convex hull ?points" using 01 by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3670	next
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3671	case False def xi \<equiv> "Min ((\<lambda>i. x$$i) ` {i. i<DIM('a) \<and> x$$i \<noteq> 0})"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3672	have "xi \<in> (\<lambda>i. x$$i) ` {i. i<DIM('a) \<and> x$$i \<noteq> 0}" unfolding xi_def apply(rule Min_in) using False by auto
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3673	then obtain i where i':"x$$i = xi" "x$$i \<noteq> 0" "i<DIM('a)" by auto
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3674	have i:"\<And>j. j<DIM('a) \<Longrightarrow> x$$j > 0 \<Longrightarrow> x$$i \<le> x$$j"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3675	unfolding i'(1) xi_def apply(rule_tac Min_le) unfolding image_iff
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3676	defer apply(rule_tac x=j in bexI) using i' by auto
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3677	have i01:"x$$i \<le> 1" "x$$i > 0" using Suc(2)[unfolded mem_interval,rule_format,of i]
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3678	using i'(2-) `x$$i \<noteq> 0` by auto
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3679	show ?thesis proof(cases "x$$i=1")
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3680	case True have "\<forall>j\<in>{i. i<DIM('a) \<and> x$$i \<noteq> 0}. x$$j = 1" apply(rule, rule ccontr) unfolding mem_Collect_eq
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3681	proof(erule conjE) fix j assume as:"x $$ j \<noteq> 0" "x $$ j \<noteq> 1" "j<DIM('a)"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3682	hence j:"x$$j \<in> {0<..<1}" using Suc(2) by(auto simp add: eucl_le[where 'a='a] elim!:allE[where x=j])
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3683	hence "x$$j \<in> op $$ x ` {i. i<DIM('a) \<and> x $$ i \<noteq> 0}" using as(3) by auto
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3684	hence "x$$j \<ge> x$$i" unfolding i'(1) xi_def apply(rule_tac Min_le) by auto
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3685	thus False using True Suc(2) j by(auto simp add: elim!:ballE[where x=j]) qed
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3686	thus "x\<in>convex hull ?points" apply(rule_tac hull_subset[unfolded subset_eq, rule_format])
36362 06475a1547cb fix lots of looping simp calls and other warnings huffman parents: 36341 diff changeset	3687	by auto
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3688	next let ?y = "\<lambda>j. if x$$j = 0 then 0 else (x$$j - x$$i) / (1 - x$$i)"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3689	case False hence :"x = x$$i \<^sub>R (\<chi>\<chi> j. if x$$j = 0 then 0 else 1) + (1 - x$$i) *\<^sub>R (\<chi>\<chi> j. ?y j)"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3690	apply(subst euclidean_eq) by(auto simp add: field_simps euclidean_simps)
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3691	{ fix j assume j:"j<DIM('a)"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3692	have "x$$j \<noteq> 0 \<Longrightarrow> 0 \<le> (x $$ j - x $$ i) / (1 - x $$ i)" "(x $$ j - x $$ i) / (1 - x $$ i) \<le> 1"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3693	apply(rule_tac divide_nonneg_pos) using i(1)[of j] using False i01
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3694	using Suc(2)[unfolded mem_interval, rule_format, of j] using j
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3695	by(auto simp add:field_simps euclidean_simps)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3696	hence "0 \<le> ?y j \<and> ?y j \<le> 1" by auto }
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3697	moreover have "i\<in>{j. j<DIM('a) \<and> x$$j \<noteq> 0} - {j. j<DIM('a) \<and> ((\<chi>\<chi> j. ?y j)::'a) $$ j \<noteq> 0}"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3698	using i01 using i'(3) by auto
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3699	hence "{j. j<DIM('a) \<and> x$$j \<noteq> 0} \<noteq> {j. j<DIM('a) \<and> ((\<chi>\<chi> j. ?y j)::'a) $$ j \<noteq> 0}" using i'(3) by blast
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3700	hence **:"{j. j<DIM('a) \<and> ((\<chi>\<chi> j. ?y j)::'a) $$ j \<noteq> 0} \<subset> {j. j<DIM('a) \<and> x$$j \<noteq> 0}" apply - apply rule
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3701	by( auto simp add:euclidean_simps)
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3702	have "card {j. j<DIM('a) \<and> ((\<chi>\<chi> j. ?y j)::'a) $$ j \<noteq> 0} \<le> n"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3703	using less_le_trans[OF psubset_card_mono[OF _ **] Suc(4)] by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3704	ultimately show ?thesis apply(subst *) apply(rule convex_convex_hull[unfolded convex_def, rule_format])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3705	apply(rule_tac hull_subset[unfolded subset_eq, rule_format]) defer apply(rule Suc(1))
36362 06475a1547cb fix lots of looping simp calls and other warnings huffman parents: 36341 diff changeset	3706	unfolding mem_interval using i01 Suc(3) by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3707	qed qed qed } note * = this
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3708	have **:"DIM('a) = card {..<DIM('a)}" by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3709	show ?thesis apply rule defer apply(rule hull_minimal) unfolding subset_eq prefer 3 apply rule
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3710	apply(rule_tac n2="DIM('a)" in ) prefer 3 apply(subst(2) *)
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3711	apply(rule card_mono) using 01 and convex_interval(1) prefer 5 apply - apply rule
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3712	unfolding mem_interval apply rule unfolding mem_Collect_eq apply(erule_tac x=i in allE)
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3713	by(auto simp add: mem_def[of _ convex]) qed
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3714
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3715	subsection {* And this is a finite set of vertices. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3716
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3717	lemma unit_cube_convex_hull: obtains s where "finite s" "{0 .. (\<chi>\<chi> i. 1)::'a::ordered_euclidean_space} = convex hull s"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3718	apply(rule that[of "{x::'a. \<forall>i<DIM('a). x$$i=0 \<or> x$$i=1}"])
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3719	apply(rule finite_subset[of _ "(\<lambda>s. (\<chi>\<chi> i. if i\<in>s then 1::real else 0)::'a) ` Pow {..<DIM('a)}"])
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3720	prefer 3 apply(rule unit_interval_convex_hull) apply rule unfolding mem_Collect_eq proof-
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3721	fix x::"'a" assume as:"\<forall>i<DIM('a). x $$ i = 0 \<or> x $$ i = 1"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3722	show "x \<in> (\<lambda>s. \<chi>\<chi> i. if i \<in> s then 1 else 0) ` Pow {..<DIM('a)}"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3723	apply(rule image_eqI[where x="{i. i<DIM('a) \<and> x$$i = 1}"])
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3724	using as apply(subst euclidean_eq) by auto qed auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3725
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3726	subsection {* Hence any cube (could do any nonempty interval). *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3727
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3728	lemma cube_convex_hull:
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3729	assumes "0 < d" obtains s::"('a::ordered_euclidean_space) set" where
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3730	"finite s" "{x - (\<chi>\<chi> i. d) .. x + (\<chi>\<chi> i. d)} = convex hull s" proof-
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3731	let ?d = "(\<chi>\<chi> i. d)::'a"
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	3732	have :"{x - ?d .. x + ?d} = (\<lambda>y. x - ?d + (2 d) *\<^sub>R y) ` {0 .. \<chi>\<chi> i. 1}" apply(rule set_eqI, rule)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3733	unfolding image_iff defer apply(erule bexE) proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3734	fix y assume as:"y\<in>{x - ?d .. x + ?d}"
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3735	{ fix i assume i:"i<DIM('a)" have "x $$ i \<le> d + y $$ i" "y $$ i \<le> d + x $$ i"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3736	using as[unfolded mem_interval, THEN spec[where x=i]] i
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3737	by(auto simp add:euclidean_simps)
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3738	hence "1 \<ge> inverse d * (x $$ i - y $$ i)" "1 \<ge> inverse d * (y $$ i - x $$ i)"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3739	apply(rule_tac[!] mult_left_le_imp_le[OF _ assms]) unfolding mult_assoc[THEN sym]
36362 06475a1547cb fix lots of looping simp calls and other warnings huffman parents: 36341 diff changeset	3740	using assms by(auto simp add: field_simps)
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3741	hence "inverse d * (x $$ i * 2) \<le> 2 + inverse d * (y $$ i * 2)"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3742	"inverse d * (y $$ i * 2) \<le> 2 + inverse d * (x $$ i * 2)" by(auto simp add:field_simps) }
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3743	hence "inverse (2 * d) *\<^sub>R (y - (x - ?d)) \<in> {0..\<chi>\<chi> i.1}" unfolding mem_interval using assms
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3744	by(auto simp add: euclidean_simps field_simps)
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3745	thus "\<exists>z\<in>{0..\<chi>\<chi> i.1}. y = x - ?d + (2 * d) \<^sub>R z" apply- apply(rule_tac x="inverse (2 d) *\<^sub>R (y - (x - ?d))" in bexI)
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3746	using assms by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3747	next
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3748	fix y z assume as:"z\<in>{0..\<chi>\<chi> i.1}" "y = x - ?d + (2d) \<^sub>R z"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3749	have "\<And>i. i<DIM('a) \<Longrightarrow> 0 \<le> d * z $$ i \<and> d * z $$ i \<le> d"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3750	using assms as(1)[unfolded mem_interval] apply(erule_tac x=i in allE)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3751	apply rule apply(rule mult_nonneg_nonneg) prefer 3 apply(rule mult_right_le_one_le)
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3752	using assms by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3753	thus "y \<in> {x - ?d..x + ?d}" unfolding as(2) mem_interval apply- apply rule using as(1)[unfolded mem_interval]
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3754	apply(erule_tac x=i in allE) using assms by(auto simp add: euclidean_simps) qed
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3755	obtain s where "finite s" "{0::'a..\<chi>\<chi> i.1} = convex hull s" using unit_cube_convex_hull by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3756	thus ?thesis apply(rule_tac that[of "(\<lambda>y. x - ?d + (2 * d) \<^sub>R y)` s"]) unfolding and convex_hull_affinity by auto qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3757
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3758	subsection {* Bounded convex function on open set is continuous. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3759
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3760	lemma convex_on_bounded_continuous:
36338 7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3761	fixes s :: "('a::real_normed_vector) set"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3762	assumes "open s" "convex_on s f" "\<forall>x\<in>s. abs(f x) \<le> b"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3763	shows "continuous_on s f"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3764	apply(rule continuous_at_imp_continuous_on) unfolding continuous_at_real_range proof(rule,rule,rule)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3765	fix x e assume "x\<in>s" "(0::real) < e"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3766	def B \<equiv> "abs b + 1"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3767	have B:"0 < B" "\<And>x. x\<in>s \<Longrightarrow> abs (f x) \<le> B"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3768	unfolding B_def defer apply(drule assms(3)[rule_format]) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3769	obtain k where "k>0"and k:"cball x k \<subseteq> s" using assms(1)[unfolded open_contains_cball, THEN bspec[where x=x]] using `x\<in>s` by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3770	show "\<exists>d>0. \<forall>x'. norm (x' - x) < d \<longrightarrow> \<bar>f x' - f x\<bar> < e"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3771	apply(rule_tac x="min (k / 2) (e / (2 * B) * k)" in exI) apply rule defer proof(rule,rule)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3772	fix y assume as:"norm (y - x) < min (k / 2) (e / (2 * B) * k)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3773	show "\<bar>f y - f x\<bar> < e" proof(cases "y=x")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3774	case False def t \<equiv> "k / norm (y - x)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3775	have "2 < t" "0<t" unfolding t_def using as False and `k>0` by(auto simp add:field_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3776	have "y\<in>s" apply(rule k[unfolded subset_eq,rule_format]) unfolding mem_cball dist_norm
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3777	apply(rule order_trans[of _ "2 * norm (x - y)"]) using as by(auto simp add: field_simps norm_minus_commute)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3778	{ def w \<equiv> "x + t *\<^sub>R (y - x)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3779	have "w\<in>s" unfolding w_def apply(rule k[unfolded subset_eq,rule_format]) unfolding mem_cball dist_norm
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3780	unfolding t_def using `k>0` by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3781	have "(1 / t) \<^sub>R x + - x + ((t - 1) / t) \<^sub>R x = (1 / t - 1 + (t - 1) / t) *\<^sub>R x" by (auto simp add: algebra_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3782	also have "\<dots> = 0" using `t>0` by(auto simp add:field_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3783	finally have w:"(1 / t) \<^sub>R w + ((t - 1) / t) \<^sub>R x = y" unfolding w_def using False and `t>0` by (auto simp add: algebra_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3784	have "2 * B < e * t" unfolding t_def using `0<e` `0<k` `B>0` and as and False by (auto simp add:field_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3785	hence "(f w - f x) / t < e"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3786	using B(2)[OF `w\<in>s`] and B(2)[OF `x\<in>s`] using `t>0` by(auto simp add:field_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3787	hence th1:"f y - f x < e" apply- apply(rule le_less_trans) defer apply assumption
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3788	using assms(2)[unfolded convex_on_def,rule_format,of w x "1/t" "(t - 1)/t", unfolded w]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3789	using `0<t` `2<t` and `x\<in>s` `w\<in>s` by(auto simp add:field_simps) }
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3790	moreover
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3791	{ def w \<equiv> "x - t *\<^sub>R (y - x)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3792	have "w\<in>s" unfolding w_def apply(rule k[unfolded subset_eq,rule_format]) unfolding mem_cball dist_norm
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3793	unfolding t_def using `k>0` by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3794	have "(1 / (1 + t)) \<^sub>R x + (t / (1 + t)) \<^sub>R x = (1 / (1 + t) + t / (1 + t)) *\<^sub>R x" by (auto simp add: algebra_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3795	also have "\<dots>=x" using `t>0` by (auto simp add:field_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3796	finally have w:"(1 / (1+t)) \<^sub>R w + (t / (1 + t)) \<^sub>R y = x" unfolding w_def using False and `t>0` by (auto simp add: algebra_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3797	have "2 * B < e * t" unfolding t_def using `0<e` `0<k` `B>0` and as and False by (auto simp add:field_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3798	hence *:"(f w - f y) / t < e" using B(2)[OF `w\<in>s`] and B(2)[OF `y\<in>s`] using `t>0` by(auto simp add:field_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3799	have "f x \<le> 1 / (1 + t) * f w + (t / (1 + t)) * f y"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3800	using assms(2)[unfolded convex_on_def,rule_format,of w y "1/(1+t)" "t / (1+t)",unfolded w]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3801	using `0<t` `2<t` and `y\<in>s` `w\<in>s` by (auto simp add:field_simps)
36778 739a9379e29b avoid using real-specific versions of generic lemmas huffman parents: 36725 diff changeset	3802	also have "\<dots> = (f w + t * f y) / (1 + t)" using `t>0` unfolding divide_inverse by (auto simp add:field_simps)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3803	also have "\<dots> < e + f y" using `t>0` * `e>0` by(auto simp add:field_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3804	finally have "f x - f y < e" by auto }
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3805	ultimately show ?thesis by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3806	qed(insert `0<e`, auto)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3807	qed(insert `0<e` `0<k` `0<B`, auto simp add:field_simps intro!:mult_pos_pos) qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3808
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3809	subsection {* Upper bound on a ball implies upper and lower bounds. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3810
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3811	lemma convex_bounds_lemma:
36338 7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3812	fixes x :: "'a::real_normed_vector"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3813	assumes "convex_on (cball x e) f" "\<forall>y \<in> cball x e. f y \<le> b"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3814	shows "\<forall>y \<in> cball x e. abs(f y) \<le> b + 2 * abs(f x)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3815	apply(rule) proof(cases "0 \<le> e") case True
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3816	fix y assume y:"y\<in>cball x e" def z \<equiv> "2 *\<^sub>R x - y"
36338 7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3817	have :"x - (2 \<^sub>R x - y) = y - x" by (simp add: scaleR_2)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3818	have z:"z\<in>cball x e" using y unfolding z_def mem_cball dist_norm * by(auto simp add: norm_minus_commute)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3819	have "(1 / 2) \<^sub>R y + (1 / 2) \<^sub>R z = x" unfolding z_def by (auto simp add: algebra_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3820	thus "\<bar>f y\<bar> \<le> b + 2 * \<bar>f x\<bar>" using assms(1)[unfolded convex_on_def,rule_format, OF y z, of "1/2" "1/2"]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3821	using assms(2)[rule_format,OF y] assms(2)[rule_format,OF z] by(auto simp add:field_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3822	next case False fix y assume "y\<in>cball x e"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3823	hence "dist x y < 0" using False unfolding mem_cball not_le by (auto simp del: dist_not_less_zero)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3824	thus "\<bar>f y\<bar> \<le> b + 2 * \<bar>f x\<bar>" using zero_le_dist[of x y] by auto qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3825
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3826	subsection {* Hence a convex function on an open set is continuous. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3827
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3828	lemma convex_on_continuous:
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3829	assumes "open (s::('a::ordered_euclidean_space) set)" "convex_on s f"
37673 f69f4b079275 generalize more lemmas from ordered_euclidean_space to euclidean_space huffman parents: 37647 diff changeset	3830	(* FIXME: generalize to euclidean_space *)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3831	shows "continuous_on s f"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3832	unfolding continuous_on_eq_continuous_at[OF assms(1)] proof
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3833	note dimge1 = DIM_positive[where 'a='a]
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3834	fix x assume "x\<in>s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3835	then obtain e where e:"cball x e \<subseteq> s" "e>0" using assms(1) unfolding open_contains_cball by auto
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3836	def d \<equiv> "e / real DIM('a)"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3837	have "0 < d" unfolding d_def using `e>0` dimge1 by(rule_tac divide_pos_pos, auto)
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3838	let ?d = "(\<chi>\<chi> i. d)::'a"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3839	obtain c where c:"finite c" "{x - ?d..x + ?d} = convex hull c" using cube_convex_hull[OF `d>0`, of x] by auto
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3840	have "x\<in>{x - ?d..x + ?d}" using `d>0` unfolding mem_interval by(auto simp add:euclidean_simps)
36362 06475a1547cb fix lots of looping simp calls and other warnings huffman parents: 36341 diff changeset	3841	hence "c\<noteq>{}" using c by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3842	def k \<equiv> "Max (f ` c)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3843	have "convex_on {x - ?d..x + ?d} f" apply(rule convex_on_subset[OF assms(2)])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3844	apply(rule subset_trans[OF _ e(1)]) unfolding subset_eq mem_cball proof
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3845	fix z assume z:"z\<in>{x - ?d..x + ?d}"
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3846	have e:"e = setsum (\<lambda>i. d) {..<DIM('a)}" unfolding setsum_constant d_def using dimge1
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3847	unfolding real_eq_of_nat by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3848	show "dist x z \<le> e" unfolding dist_norm e apply(rule_tac order_trans[OF norm_le_l1], rule setsum_mono)
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3849	using z[unfolded mem_interval] apply(erule_tac x=i in allE) by(auto simp add:euclidean_simps) qed
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3850	hence k:"\<forall>y\<in>{x - ?d..x + ?d}. f y \<le> k" unfolding c(2) apply(rule_tac convex_on_convex_hull_bound) apply assumption
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3851	unfolding k_def apply(rule, rule Max_ge) using c(1) by auto
37647 a5400b94d2dd minimize dependencies on Numeral_Type huffman parents: 37489 diff changeset	3852	have "d \<le> e" unfolding d_def apply(rule mult_imp_div_pos_le) using `e>0` dimge1 unfolding mult_le_cancel_left1 by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3853	hence dsube:"cball x d \<subseteq> cball x e" unfolding subset_eq Ball_def mem_cball by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3854	have conv:"convex_on (cball x d) f" apply(rule convex_on_subset, rule convex_on_subset[OF assms(2)]) apply(rule e(1)) using dsube by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3855	hence "\<forall>y\<in>cball x d. abs (f y) \<le> k + 2 * abs (f x)" apply(rule_tac convex_bounds_lemma) apply assumption proof
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3856	fix y assume y:"y\<in>cball x d"
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3857	{ fix i assume "i<DIM('a)" hence "x $$ i - d \<le> y $$ i" "y $$ i \<le> x $$ i + d"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3858	using order_trans[OF component_le_norm y[unfolded mem_cball dist_norm], of i] by(auto simp add:euclidean_simps) }
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3859	thus "f y \<le> k" apply(rule_tac k[rule_format]) unfolding mem_cball mem_interval dist_norm
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3860	by(auto simp add:euclidean_simps) qed
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3861	hence "continuous_on (ball x d) f" apply(rule_tac convex_on_bounded_continuous)
33270 320a1d67b9ae merged paulson parents: 33175 diff changeset	3862	apply(rule open_ball, rule convex_on_subset[OF conv], rule ball_subset_cball)
320a1d67b9ae merged paulson parents: 33175 diff changeset	3863	apply force
320a1d67b9ae merged paulson parents: 33175 diff changeset	3864	done
320a1d67b9ae merged paulson parents: 33175 diff changeset	3865	thus "continuous (at x) f" unfolding continuous_on_eq_continuous_at[OF open_ball]
320a1d67b9ae merged paulson parents: 33175 diff changeset	3866	using `d>0` by auto
320a1d67b9ae merged paulson parents: 33175 diff changeset	3867	qed
320a1d67b9ae merged paulson parents: 33175 diff changeset	3868
320a1d67b9ae merged paulson parents: 33175 diff changeset	3869	subsection {* Line segments, Starlike Sets, etc.*}
320a1d67b9ae merged paulson parents: 33175 diff changeset	3870
320a1d67b9ae merged paulson parents: 33175 diff changeset	3871	(* Use the same overloading tricks as for intervals, so that
320a1d67b9ae merged paulson parents: 33175 diff changeset	3872	segment[a,b] is closed and segment(a,b) is open relative to affine hull. *)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3873
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3874	definition
36338 7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3875	midpoint :: "'a::real_vector \<Rightarrow> 'a \<Rightarrow> 'a" where
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3876	"midpoint a b = (inverse (2::real)) *\<^sub>R (a + b)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3877
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3878	definition
36341 2623a1987e1d generalize more constants and lemmas huffman parents: 36340 diff changeset	3879	open_segment :: "'a::real_vector \<Rightarrow> 'a \<Rightarrow> 'a set" where
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3880	"open_segment a b = {(1 - u) \<^sub>R a + u \<^sub>R b \| u::real. 0 < u \<and> u < 1}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3881
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3882	definition
36341 2623a1987e1d generalize more constants and lemmas huffman parents: 36340 diff changeset	3883	closed_segment :: "'a::real_vector \<Rightarrow> 'a \<Rightarrow> 'a set" where
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3884	"closed_segment a b = {(1 - u) \<^sub>R a + u \<^sub>R b \| u::real. 0 \<le> u \<and> u \<le> 1}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3885
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3886	definition "between = (\<lambda> (a,b). closed_segment a b)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3887
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3888	lemmas segment = open_segment_def closed_segment_def
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3889
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3890	definition "starlike s \<longleftrightarrow> (\<exists>a\<in>s. \<forall>x\<in>s. closed_segment a x \<subseteq> s)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3891
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3892	lemma midpoint_refl: "midpoint x x = x"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3893	unfolding midpoint_def unfolding scaleR_right_distrib unfolding scaleR_left_distrib[THEN sym] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3894
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3895	lemma midpoint_sym: "midpoint a b = midpoint b a" unfolding midpoint_def by (auto simp add: scaleR_right_distrib)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3896
36338 7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3897	lemma midpoint_eq_iff: "midpoint a b = c \<longleftrightarrow> a + b = c + c"
7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3898	proof -
7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3899	have "midpoint a b = c \<longleftrightarrow> scaleR 2 (midpoint a b) = scaleR 2 c"
7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3900	by simp
7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3901	thus ?thesis
7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3902	unfolding midpoint_def scaleR_2 [symmetric] by simp
7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3903	qed
7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3904
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3905	lemma dist_midpoint:
36338 7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3906	fixes a b :: "'a::real_normed_vector" shows
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3907	"dist a (midpoint a b) = (dist a b) / 2" (is ?t1)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3908	"dist b (midpoint a b) = (dist a b) / 2" (is ?t2)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3909	"dist (midpoint a b) a = (dist a b) / 2" (is ?t3)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3910	"dist (midpoint a b) b = (dist a b) / 2" (is ?t4)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3911	proof-
36338 7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3912	have : "\<And>x y::'a. 2 \<^sub>R x = - y \<Longrightarrow> norm x = (norm y) / 2" unfolding equation_minus_iff by auto
7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3913	have *:"\<And>x y::'a. 2 \<^sub>R x = y \<Longrightarrow> norm x = (norm y) / 2" by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3914	note scaleR_right_distrib [simp]
36338 7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3915	show ?t1 unfolding midpoint_def dist_norm apply (rule **)
7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3916	by (simp add: scaleR_right_diff_distrib, simp add: scaleR_2)
7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3917	show ?t2 unfolding midpoint_def dist_norm apply (rule *)
7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3918	by (simp add: scaleR_right_diff_distrib, simp add: scaleR_2)
7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3919	show ?t3 unfolding midpoint_def dist_norm apply (rule *)
7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3920	by (simp add: scaleR_right_diff_distrib, simp add: scaleR_2)
7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3921	show ?t4 unfolding midpoint_def dist_norm apply (rule **)
7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3922	by (simp add: scaleR_right_diff_distrib, simp add: scaleR_2)
7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3923	qed
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3924
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3925	lemma midpoint_eq_endpoint:
36338 7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3926	"midpoint a b = a \<longleftrightarrow> a = b"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3927	"midpoint a b = b \<longleftrightarrow> a = b"
36338 7808fbc9c3b4 generalize more constants and lemmas huffman parents: 36337 diff changeset	3928	unfolding midpoint_eq_iff by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3929
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3930	lemma convex_contains_segment:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3931	"convex s \<longleftrightarrow> (\<forall>a\<in>s. \<forall>b\<in>s. closed_segment a b \<subseteq> s)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3932	unfolding convex_alt closed_segment_def by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3933
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3934	lemma convex_imp_starlike:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3935	"convex s \<Longrightarrow> s \<noteq> {} \<Longrightarrow> starlike s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3936	unfolding convex_contains_segment starlike_def by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3937
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3938	lemma segment_convex_hull:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3939	"closed_segment a b = convex hull {a,b}" proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3940	have *:"\<And>x. {x} \<noteq> {}" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3941	have **:"\<And>u v. u + v = 1 \<longleftrightarrow> u = 1 - (v::real)" by auto
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	3942	show ?thesis unfolding segment convex_hull_insert[OF *] convex_hull_singleton apply(rule set_eqI)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3943	unfolding mem_Collect_eq apply(rule,erule exE)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3944	apply(rule_tac x="1 - u" in exI) apply rule defer apply(rule_tac x=u in exI) defer
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3945	apply(erule exE, (erule conjE)?)+ apply(rule_tac x="1 - u" in exI) unfolding ** by auto qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3946
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3947	lemma convex_segment: "convex (closed_segment a b)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3948	unfolding segment_convex_hull by(rule convex_convex_hull)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3949
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3950	lemma ends_in_segment: "a \<in> closed_segment a b" "b \<in> closed_segment a b"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3951	unfolding segment_convex_hull apply(rule_tac[!] hull_subset[unfolded subset_eq, rule_format]) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3952
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3953	lemma segment_furthest_le:
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3954	fixes a b x y :: "'a::euclidean_space"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3955	assumes "x \<in> closed_segment a b" shows "norm(y - x) \<le> norm(y - a) \<or> norm(y - x) \<le> norm(y - b)" proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3956	obtain z where "z\<in>{a, b}" "norm (x - y) \<le> norm (z - y)" using simplex_furthest_le[of "{a, b}" y]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3957	using assms[unfolded segment_convex_hull] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3958	thus ?thesis by(auto simp add:norm_minus_commute) qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3959
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3960	lemma segment_bound:
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3961	fixes x a b :: "'a::euclidean_space"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3962	assumes "x \<in> closed_segment a b"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3963	shows "norm(x - a) \<le> norm(b - a)" "norm(x - b) \<le> norm(b - a)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3964	using segment_furthest_le[OF assms, of a]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3965	using segment_furthest_le[OF assms, of b]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3966	by (auto simp add:norm_minus_commute)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3967
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3968	lemma segment_refl:"closed_segment a a = {a}" unfolding segment by (auto simp add: algebra_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3969
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3970	lemma between_mem_segment: "between (a,b) x \<longleftrightarrow> x \<in> closed_segment a b"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3971	unfolding between_def mem_def by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3972
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3973	lemma between:"between (a,b) (x::'a::euclidean_space) \<longleftrightarrow> dist a b = (dist a x) + (dist x b)"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3974	proof(cases "a = b")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3975	case True thus ?thesis unfolding between_def split_conv mem_def[of x, symmetric]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3976	by(auto simp add:segment_refl dist_commute) next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3977	case False hence Fal:"norm (a - b) \<noteq> 0" and Fal2: "norm (a - b) > 0" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3978	have :"\<And>u. a - ((1 - u) \<^sub>R a + u \<^sub>R b) = u \<^sub>R (a - b)" by (auto simp add: algebra_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3979	show ?thesis unfolding between_def split_conv mem_def[of x, symmetric] closed_segment_def mem_Collect_eq
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3980	apply rule apply(erule exE, (erule conjE)+) apply(subst dist_triangle_eq) proof-
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3981	fix u assume as:"x = (1 - u) \<^sub>R a + u \<^sub>R b" "0 \<le> u" "u \<le> 1"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3982	hence :"a - x = u \<^sub>R (a - b)" "x - b = (1 - u) *\<^sub>R (a - b)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3983	unfolding as(1) by(auto simp add:algebra_simps)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3984	show "norm (a - x) \<^sub>R (x - b) = norm (x - b) \<^sub>R (a - x)"
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3985	unfolding norm_minus_commute[of x a] * using as(2,3)
36362 06475a1547cb fix lots of looping simp calls and other warnings huffman parents: 36341 diff changeset	3986	by(auto simp add: field_simps)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3987	next assume as:"dist a b = dist a x + dist x b"
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3988	have "norm (a - x) / norm (a - b) \<le> 1" unfolding divide_le_eq_1_pos[OF Fal2]
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3989	unfolding as[unfolded dist_norm] norm_ge_zero by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	3990	thus "\<exists>u. x = (1 - u) \<^sub>R a + u \<^sub>R b \<and> 0 \<le> u \<and> u \<le> 1" apply(rule_tac x="dist a x / dist a b" in exI)
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3991	unfolding dist_norm apply(subst euclidean_eq) apply rule defer apply(rule, rule divide_nonneg_pos) prefer 4
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3992	proof(rule,rule) fix i assume i:"i<DIM('a)"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3993	have "((1 - norm (a - x) / norm (a - b)) \<^sub>R a + (norm (a - x) / norm (a - b)) \<^sub>R b) $$ i =
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3994	((norm (a - b) - norm (a - x)) * (a $$ i) + norm (a - x) * (b $$ i)) / norm (a - b)"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3995	using Fal by(auto simp add: field_simps euclidean_simps)
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3996	also have "\<dots> = x$$i" apply(rule divide_eq_imp[OF Fal])
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3997	unfolding as[unfolded dist_norm] using as[unfolded dist_triangle_eq] apply-
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3998	apply(subst (asm) euclidean_eq) using i apply(erule_tac x=i in allE) by(auto simp add:field_simps euclidean_simps)
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	3999	finally show "x $$ i = ((1 - norm (a - x) / norm (a - b)) \<^sub>R a + (norm (a - x) / norm (a - b)) \<^sub>R b) $$ i"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4000	by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4001	qed(insert Fal2, auto) qed qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4002
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4003	lemma between_midpoint: fixes a::"'a::euclidean_space" shows
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4004	"between (a,b) (midpoint a b)" (is ?t1)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4005	"between (b,a) (midpoint a b)" (is ?t2)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4006	proof- have :"\<And>x y z. x = (1/2::real) \<^sub>R z \<Longrightarrow> y = (1/2) *\<^sub>R z \<Longrightarrow> norm z = norm x + norm y" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4007	show ?t1 ?t2 unfolding between midpoint_def dist_norm apply(rule_tac[!] *)
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4008	unfolding euclidean_eq[where 'a='a]
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4009	by(auto simp add:field_simps euclidean_simps) qed
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4010
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4011	lemma between_mem_convex_hull:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4012	"between (a,b) x \<longleftrightarrow> x \<in> convex hull {a,b}"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4013	unfolding between_mem_segment segment_convex_hull ..
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4014
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4015	subsection {* Shrinking towards the interior of a convex set. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4016
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4017	lemma mem_interior_convex_shrink:
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4018	fixes s :: "('a::euclidean_space) set"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4019	assumes "convex s" "c \<in> interior s" "x \<in> s" "0 < e" "e \<le> 1"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4020	shows "x - e *\<^sub>R (x - c) \<in> interior s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4021	proof- obtain d where "d>0" and d:"ball c d \<subseteq> s" using assms(2) unfolding mem_interior by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4022	show ?thesis unfolding mem_interior apply(rule_tac x="e*d" in exI)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4023	apply(rule) defer unfolding subset_eq Ball_def mem_ball proof(rule,rule)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4024	fix y assume as:"dist (x - e \<^sub>R (x - c)) y < e d"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4025	have :"y = (1 - (1 - e)) \<^sub>R ((1 / e) \<^sub>R y - ((1 - e) / e) \<^sub>R x) + (1 - e) *\<^sub>R x" using `e>0` by (auto simp add: scaleR_left_diff_distrib scaleR_right_diff_distrib)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4026	have "dist c ((1 / e) \<^sub>R y - ((1 - e) / e) \<^sub>R x) = abs(1/e) * norm (e \<^sub>R c - y + (1 - e) \<^sub>R x)"
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4027	unfolding dist_norm unfolding norm_scaleR[THEN sym] apply(rule arg_cong[where f=norm]) using `e>0`
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4028	by(auto simp add: euclidean_simps euclidean_eq[where 'a='a] field_simps)
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4029	also have "\<dots> = abs(1/e) * norm (x - e *\<^sub>R (x - c) - y)" by(auto intro!:arg_cong[where f=norm] simp add: algebra_simps)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4030	also have "\<dots> < d" using as[unfolded dist_norm] and `e>0`
36778 739a9379e29b avoid using real-specific versions of generic lemmas huffman parents: 36725 diff changeset	4031	by(auto simp add:pos_divide_less_eq[OF `e>0`] mult_commute)
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4032	finally show "y \<in> s" apply(subst *) apply(rule assms(1)[unfolded convex_alt,rule_format])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4033	apply(rule d[unfolded subset_eq,rule_format]) unfolding mem_ball using assms(3-5) by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4034	qed(rule mult_pos_pos, insert `e>0` `d>0`, auto) qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4035
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4036	lemma mem_interior_closure_convex_shrink:
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4037	fixes s :: "('a::euclidean_space) set"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4038	assumes "convex s" "c \<in> interior s" "x \<in> closure s" "0 < e" "e \<le> 1"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4039	shows "x - e *\<^sub>R (x - c) \<in> interior s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4040	proof- obtain d where "d>0" and d:"ball c d \<subseteq> s" using assms(2) unfolding mem_interior by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4041	have "\<exists>y\<in>s. norm (y - x) * (1 - e) < e * d" proof(cases "x\<in>s")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4042	case True thus ?thesis using `e>0` `d>0` by(rule_tac bexI[where x=x], auto intro!: mult_pos_pos) next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4043	case False hence x:"x islimpt s" using assms(3)[unfolded closure_def] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4044	show ?thesis proof(cases "e=1")
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4045	case True obtain y where "y\<in>s" "y \<noteq> x" "dist y x < 1"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4046	using x[unfolded islimpt_approachable,THEN spec[where x=1]] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4047	thus ?thesis apply(rule_tac x=y in bexI) unfolding True using `d>0` by auto next
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4048	case False hence "0 < e * d / (1 - e)" and *:"1 - e > 0"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4049	using `e\<le>1` `e>0` `d>0` by(auto intro!:mult_pos_pos divide_pos_pos)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4050	then obtain y where "y\<in>s" "y \<noteq> x" "dist y x < e * d / (1 - e)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4051	using x[unfolded islimpt_approachable,THEN spec[where x="e*d / (1 - e)"]] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4052	thus ?thesis apply(rule_tac x=y in bexI) unfolding dist_norm using pos_less_divide_eq[OF *] by auto qed qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4053	then obtain y where "y\<in>s" and y:"norm (y - x) * (1 - e) < e * d" by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4054	def z \<equiv> "c + ((1 - e) / e) *\<^sub>R (x - y)"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4055	have :"x - e \<^sub>R (x - c) = y - e *\<^sub>R (y - z)" unfolding z_def using `e>0` by (auto simp add: scaleR_right_diff_distrib scaleR_right_distrib scaleR_left_diff_distrib)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4056	have "z\<in>interior s" apply(rule subset_interior[OF d,unfolded subset_eq,rule_format])
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4057	unfolding interior_open[OF open_ball] mem_ball z_def dist_norm using y and assms(4,5)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4058	by(auto simp add:field_simps norm_minus_commute)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4059	thus ?thesis unfolding * apply - apply(rule mem_interior_convex_shrink)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4060	using assms(1,4-5) `y\<in>s` by auto qed
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4061
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4062	subsection {* Some obvious but surprisingly hard simplex lemmas. *}
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4063
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4064	lemma simplex:
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4065	assumes "finite s" "0 \<notin> s"
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4066	shows "convex hull (insert 0 s) = { y. (\<exists>u. (\<forall>x\<in>s. 0 \<le> u x) \<and> setsum u s \<le> 1 \<and> setsum (\<lambda>x. u x *\<^sub>R x) s = y)}"
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	4067	unfolding convex_hull_finite[OF finite.insertI[OF assms(1)]] apply(rule set_eqI, rule) unfolding mem_Collect_eq
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4068	apply(erule_tac[!] exE) apply(erule_tac[!] conjE)+ unfolding setsum_clauses(2)[OF assms(1)]
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4069	apply(rule_tac x=u in exI) defer apply(rule_tac x="\<lambda>x. if x = 0 then 1 - setsum u s else u x" in exI) using assms(2)
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4070	unfolding if_smult and setsum_delta_notmem[OF assms(2)] by auto
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4071
40377 0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4072	lemma substd_simplex: assumes "d\<subseteq>{..<DIM('a::euclidean_space)}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4073	shows "convex hull (insert 0 { basis i \| i. i : d}) =
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4074	{x::'a::euclidean_space . (!i<DIM('a). 0 <= x$$i) & setsum (%i. x$$i) d <= 1 &
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4075	(!i<DIM('a). i ~: d --> x$$i = 0)}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4076	(is "convex hull (insert 0 ?p) = ?s")
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4077	(* Proof is a modified copy of the proof of similar lemma std_simplex in Convex_Euclidean_Space.thy *)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4078	proof- let ?D = d ("{..<DIM('a::euclidean_space)}")
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4079	have "0 ~: ?p" using assms by (auto simp: image_def)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4080	have "{(basis i)::'n::euclidean_space \|i. i \<in> ?D} = basis ` ?D" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4081	note sumbas = this setsum_reindex[OF basis_inj_on[of d], unfolded o_def, OF assms]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4082	show ?thesis unfolding simplex[OF finite_substdbasis `0 ~: ?p`]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4083	apply(rule set_eqI) unfolding mem_Collect_eq apply rule
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4084	apply(erule exE, (erule conjE)+) apply(erule_tac[2] conjE)+ proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4085	fix x::"'a::euclidean_space" and u assume as: "\<forall>x\<in>{basis i \|i. i \<in>?D}. 0 \<le> u x"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4086	"setsum u {basis i \|i. i \<in> ?D} \<le> 1" "(\<Sum>x\<in>{basis i \|i. i \<in>?D}. u x *\<^sub>R x) = x"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4087	have *:"\<forall>i<DIM('a). i:d --> u (basis i) = x$$i" and "(!i<DIM('a). i ~: d --> x $$ i = 0)" using as(3)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4088	unfolding sumbas unfolding substdbasis_expansion_unique[OF assms] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4089	hence **:"setsum u {basis i \|i. i \<in> ?D} = setsum (op $$ x) ?D" unfolding sumbas
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4090	apply-apply(rule setsum_cong2) using assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4091	have " (\<forall>i<DIM('a). 0 \<le> x$$i) \<and> setsum (op $$ x) ?D \<le> 1"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4092	apply - proof(rule,rule,rule)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4093	fix i assume i:"i<DIM('a)" have "i : d ==> 0 \<le> x$$i" unfolding *[rule_format,OF i,THEN sym]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4094	apply(rule_tac as(1)[rule_format]) by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4095	moreover have "i ~: d ==> 0 \<le> x$$i"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4096	using `(!i<DIM('a). i ~: d --> x $$ i = 0)`[rule_format, OF i] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4097	ultimately show "0 \<le> x$$i" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4098	qed(insert as(2)[unfolded **], auto)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4099	from this show " (\<forall>i<DIM('a). 0 \<le> x$$i) \<and> setsum (op $$ x) ?D \<le> 1 & (!i<DIM('a). i ~: d --> x $$ i = 0)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4100	using `(!i<DIM('a). i ~: d --> x $$ i = 0)` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4101	next fix x::"'a::euclidean_space" assume as:"\<forall>i<DIM('a). 0 \<le> x $$ i" "setsum (op $$ x) ?D \<le> 1"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4102	"(!i<DIM('a). i ~: d --> x $$ i = 0)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4103	show "\<exists>u. (\<forall>x\<in>{basis i \|i. i \<in> ?D}. 0 \<le> u x) \<and>
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4104	setsum u {basis i \|i. i \<in> ?D} \<le> 1 \<and> (\<Sum>x\<in>{basis i \|i. i \<in> ?D}. u x *\<^sub>R x) = x"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4105	apply(rule_tac x="\<lambda>y. inner y x" in exI) apply(rule,rule) unfolding mem_Collect_eq apply(erule exE)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4106	using as(1) apply(erule_tac x=i in allE) unfolding sumbas apply safe unfolding not_less basis_zero
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4107	unfolding substdbasis_expansion_unique[OF assms] euclidean_component_def[THEN sym]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4108	using as(2,3) by(auto simp add:dot_basis not_less basis_zero)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4109	qed qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4110
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4111	lemma std_simplex:
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4112	"convex hull (insert 0 { basis i \| i. i<DIM('a)}) =
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4113	{x::'a::euclidean_space . (\<forall>i<DIM('a). 0 \<le> x$$i) \<and> setsum (\<lambda>i. x$$i) {..<DIM('a)} \<le> 1 }"
40377 0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4114	using substd_simplex[of "{..<DIM('a)}"] by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4115
2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4116	lemma interior_std_simplex:
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4117	"interior (convex hull (insert 0 { basis i\| i. i<DIM('a)})) =
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4118	{x::'a::euclidean_space. (\<forall>i<DIM('a). 0 < x$$i) \<and> setsum (\<lambda>i. x$$i) {..<DIM('a)} < 1 }"
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	4119	apply(rule set_eqI) unfolding mem_interior std_simplex unfolding subset_eq mem_Collect_eq Ball_def mem_ball
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4120	unfolding Ball_def[symmetric] apply rule apply(erule exE, (erule conjE)+) defer apply(erule conjE) proof-
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4121	fix x::"'a" and e assume "0<e" and as:"\<forall>xa. dist x xa < e \<longrightarrow> (\<forall>x<DIM('a). 0 \<le> xa $$ x) \<and> setsum (op $$ xa) {..<DIM('a)} \<le> 1"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4122	show "(\<forall>xa<DIM('a). 0 < x $$ xa) \<and> setsum (op $$ x) {..<DIM('a)} < 1" apply(safe) proof-
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4123	fix i assume i:"i<DIM('a)" thus "0 < x $$ i" using as[THEN spec[where x="x - (e / 2) *\<^sub>R basis i"]] and `e>0`
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4124	unfolding dist_norm by(auto simp add: inner_simps euclidean_component_def dot_basis elim!:allE[where x=i])
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4125	next have *:"dist x (x + (e / 2) \<^sub>R basis 0) < e" using `e>0`
38642 8fa437809c67 dropped type classes mult_mono and mult_mono1; tuned names of technical rule duplicates haftmann parents: 37732 diff changeset	4126	unfolding dist_norm by(auto intro!: mult_strict_left_mono)
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4127	have "\<And>i. i<DIM('a) \<Longrightarrow> (x + (e / 2) *\<^sub>R basis 0) $$ i = x$$i + (if i = 0 then e/2 else 0)"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4128	unfolding euclidean_component_def by(auto simp add:inner_simps dot_basis)
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4129	hence :"setsum (op $$ (x + (e / 2) \<^sub>R basis 0)) {..<DIM('a)} = setsum (\<lambda>i. x$$i + (if 0 = i then e/2 else 0)) {..<DIM('a)}"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4130	apply(rule_tac setsum_cong) by auto
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4131	have "setsum (op $$ x) {..<DIM('a)} < setsum (op $$ (x + (e / 2) \<^sub>R basis 0)) {..<DIM('a)}" unfolding setsum_addf
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4132	using `0<e` DIM_positive[where 'a='a] apply(subst setsum_delta') by auto
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4133	also have "\<dots> \<le> 1" using ** apply(drule_tac as[rule_format]) by auto
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4134	finally show "setsum (op $$ x) {..<DIM('a)} < 1" by auto qed
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4135	next fix x::"'a" assume as:"\<forall>i<DIM('a). 0 < x $$ i" "setsum (op $$ x) {..<DIM('a)} < 1"
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4136	guess a using UNIV_witness[where 'a='b] ..
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4137	let ?d = "(1 - setsum (op $$ x) {..<DIM('a)}) / real (DIM('a))"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4138	have "Min ((op $$ x) ` {..<DIM('a)}) > 0" apply(rule Min_grI) using as(1) by auto
37647 a5400b94d2dd minimize dependencies on Numeral_Type huffman parents: 37489 diff changeset	4139	moreover have"?d > 0" apply(rule divide_pos_pos) using as(2) by(auto simp add: Suc_le_eq)
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4140	ultimately show "\<exists>e>0. \<forall>y. dist x y < e \<longrightarrow> (\<forall>i<DIM('a). 0 \<le> y $$ i) \<and> setsum (op $$ y) {..<DIM('a)} \<le> 1"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4141	apply(rule_tac x="min (Min ((op $$ x) ` {..<DIM('a)})) ?D" in exI) apply rule defer apply(rule,rule) proof-
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4142	fix y assume y:"dist x y < min (Min (op $$ x ` {..<DIM('a)})) ?d"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4143	have "setsum (op $$ y) {..<DIM('a)} \<le> setsum (\<lambda>i. x$$i + ?d) {..<DIM('a)}" proof(rule setsum_mono)
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4144	fix i assume "i\<in>{..<DIM('a)}" hence "abs (y$$i - x$$i) < ?d" apply-apply(rule le_less_trans)
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4145	using component_le_norm[of "y - x" i]
36362 06475a1547cb fix lots of looping simp calls and other warnings huffman parents: 36341 diff changeset	4146	using y[unfolded min_less_iff_conj dist_norm, THEN conjunct2] by(auto simp add: norm_minus_commute)
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4147	thus "y $$ i \<le> x $$ i + ?d" by auto qed
37647 a5400b94d2dd minimize dependencies on Numeral_Type huffman parents: 37489 diff changeset	4148	also have "\<dots> \<le> 1" unfolding setsum_addf setsum_constant card_enum real_eq_of_nat by(auto simp add: Suc_le_eq)
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4149	finally show "(\<forall>i<DIM('a). 0 \<le> y $$ i) \<and> setsum (op $$ y) {..<DIM('a)} \<le> 1"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4150	proof safe fix i assume i:"i<DIM('a)"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4151	have "norm (x - y) < x$$i" apply(rule less_le_trans)
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4152	apply(rule y[unfolded min_less_iff_conj dist_norm, THEN conjunct1]) using i by auto
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4153	thus "0 \<le> y$$i" using component_le_norm[of "x - y" i] and as(1)[rule_format, of i] by auto
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4154	qed qed auto qed
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4155
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4156	lemma interior_std_simplex_nonempty: obtains a::"'a::euclidean_space" where
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4157	"a \<in> interior(convex hull (insert 0 {basis i \| i . i<DIM('a)}))" proof-
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4158	let ?D = "{..<DIM('a)}" let ?a = "setsum (\<lambda>b::'a. inverse (2 * real DIM('a)) *\<^sub>R b) {(basis i) \| i. i<DIM('a)}"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4159	have *:"{basis i :: 'a \| i. i<DIM('a)} = basis ` ?D" by auto
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4160	{ fix i assume i:"i<DIM('a)" have "?a $$ i = inverse (2 * real DIM('a))"
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4161	unfolding euclidean_component.setsum * and setsum_reindex[OF basis_inj] and o_def
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4162	apply(rule trans[of _ "setsum (\<lambda>j. if i = j then inverse (2 * real DIM('a)) else 0) ?D"]) apply(rule setsum_cong2)
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4163	defer apply(subst setsum_delta') unfolding euclidean_component_def using i by(auto simp add:dot_basis) }
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4164	note ** = this
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4165	show ?thesis apply(rule that[of ?a]) unfolding interior_std_simplex mem_Collect_eq proof safe
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4166	fix i assume i:"i<DIM('a)" show "0 < ?a $$ i" unfolding **[OF i] by(auto simp add: Suc_le_eq)
44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4167	next have "setsum (op $$ ?a) ?D = setsum (\<lambda>i. inverse (2 * real DIM('a))) ?D" apply(rule setsum_cong2, rule **) by auto
36778 739a9379e29b avoid using real-specific versions of generic lemmas huffman parents: 36725 diff changeset	4168	also have "\<dots> < 1" unfolding setsum_constant card_enum real_eq_of_nat divide_inverse[THEN sym] by (auto simp add:field_simps)
37489 44e42d392c6e Introduce a type class for euclidean spaces, port most lemmas from real^'n to this type class. hoelzl parents: 36844 diff changeset	4169	finally show "setsum (op $$ ?a) ?D < 1" by auto qed qed
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	4170
40377 0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4171	lemma rel_interior_substd_simplex: assumes "d\<subseteq>{..<DIM('a::euclidean_space)}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4172	shows "rel_interior (convex hull (insert 0 { basis i\| i. i : d})) =
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4173	{x::'a::euclidean_space. (\<forall>i\<in>d. 0 < x$$i) & setsum (%i. x$$i) d < 1 & (!i<DIM('a). i ~: d --> x$$i = 0)}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4174	(is "rel_interior (convex hull (insert 0 ?p)) = ?s")
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4175	(* Proof is a modified copy of the proof of similar lemma interior_std_simplex in Convex_Euclidean_Space.thy *)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4176	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4177	have "finite d" apply(rule finite_subset) using assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4178	{ assume "d={}" hence ?thesis using rel_interior_sing using euclidean_eq[of _ 0] by auto }
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4179	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4180	{ assume "d~={}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4181	have h0: "affine hull (convex hull (insert 0 ?p))={x::'a::euclidean_space. (!i<DIM('a). i ~: d --> x$$i = 0)}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4182	using affine_hull_convex_hull affine_hull_substd_basis assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4183	have aux: "!x::'n::euclidean_space. !i. ((! i:d. 0 <= x$$i) & (!i. i ~: d --> x$$i = 0))--> 0 <= x$$i" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4184	{ fix x::"'a::euclidean_space" assume x_def: "x : rel_interior (convex hull (insert 0 ?p))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4185	from this obtain e where e0: "e>0" and
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4186	"ball x e Int {xa. (!i<DIM('a). i ~: d --> xa$$i = 0)} <= convex hull (insert 0 ?p)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4187	using mem_rel_interior_ball[of x "convex hull (insert 0 ?p)"] h0 by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4188	hence as: "ALL xa. (dist x xa < e & (!i<DIM('a). i ~: d --> xa$$i = 0)) -->
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4189	(!i : d. 0 <= xa $$ i) & setsum (op $$ xa) d <= 1"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4190	unfolding ball_def unfolding substd_simplex[OF assms] using assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4191	have x0: "(!i<DIM('a). i ~: d --> x$$i = 0)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4192	using x_def rel_interior_subset substd_simplex[OF assms] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4193	have "(!i : d. 0 < x $$ i) & setsum (op $$ x) d < 1 & (!i<DIM('a). i ~: d --> x$$i = 0)" apply(rule,rule)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4194	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4195	fix i::nat assume "i:d"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4196	hence "\<forall>ia\<in>d. 0 \<le> (x - (e / 2) *\<^sub>R basis i) $$ ia" apply-apply(rule as[rule_format,THEN conjunct1])
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4197	unfolding dist_norm using assms `e>0` x0 by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4198	thus "0 < x $$ i" apply(erule_tac x=i in ballE) using `e>0` `i\<in>d` assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4199	next obtain a where a:"a:d" using `d ~= {}` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4200	have *:"dist x (x + (e / 2) \<^sub>R basis a) < e"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4201	using `e>0` and Euclidean_Space.norm_basis[of a]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4202	unfolding dist_norm by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4203	have "\<And>i. (x + (e / 2) *\<^sub>R basis a) $$ i = x$$i + (if i = a then e/2 else 0)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4204	unfolding euclidean_simps using a assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4205	hence :"setsum (op $$ (x + (e / 2) \<^sub>R basis a)) d =
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4206	setsum (\<lambda>i. x$$i + (if a = i then e/2 else 0)) d" by(rule_tac setsum_cong, auto)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4207	have h1: "(ALL i<DIM('a). i ~: d --> (x + (e / 2) *\<^sub>R basis a) $$ i = 0)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4208	using as[THEN spec[where x="x + (e / 2) *\<^sub>R basis a"]] `a:d` using x0
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4209	by(auto simp add: norm_basis elim:allE[where x=a])
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4210	have "setsum (op $$ x) d < setsum (op $$ (x + (e / 2) \<^sub>R basis a)) d" unfolding setsum_addf
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4211	using `0<e` `a:d` using `finite d` by(auto simp add: setsum_delta')
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4212	also have "\<dots> \<le> 1" using ** h1 as[rule_format, of "x + (e / 2) *\<^sub>R basis a"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4213	finally show "setsum (op $$ x) d < 1 & (!i<DIM('a). i ~: d --> x$$i = 0)" using x0 by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4214	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4215	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4216	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4217	{
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4218	fix x::"'a::euclidean_space" assume as: "x : ?s"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4219	have "!i. ((0<x$$i) \| (0=x$$i) --> 0<=x$$i)" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4220	moreover have "!i. (i:d) \| (i ~: d)" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4221	ultimately
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4222	have "!i. ( (ALL i:d. 0 < x$$i) & (ALL i. i ~: d --> x$$i = 0) ) --> 0 <= x$$i" by metis
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4223	hence h2: "x : convex hull (insert 0 ?p)" using as assms
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4224	unfolding substd_simplex[OF assms] by fastsimp
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4225	obtain a where a:"a:d" using `d ~= {}` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4226	let ?d = "(1 - setsum (op $$ x) d) / real (card d)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4227	have "card d >= 1" using `d ~={}` card_ge1[of d] using `finite d` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4228	have "Min ((op $$ x) ` d) > 0" apply(rule Min_grI) using as `card d >= 1` `finite d` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4229	moreover have "?d > 0" apply(rule divide_pos_pos) using as using `card d >= 1` by(auto simp add: Suc_le_eq)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4230	ultimately have h3: "min (Min ((op $$ x) ` d)) ?d > 0" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4231
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4232	have "x : rel_interior (convex hull (insert 0 ?p))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4233	unfolding rel_interior_ball mem_Collect_eq h0 apply(rule,rule h2)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4234	unfolding substd_simplex[OF assms]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4235	apply(rule_tac x="min (Min ((op $$ x) ` d)) ?d" in exI) apply(rule,rule h3) apply safe unfolding mem_ball
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4236	proof- fix y::'a assume y:"dist x y < min (Min (op $$ x ` d)) ?d" and y2:"(!i<DIM('a). i ~: d --> y$$i = 0)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4237	have "setsum (op $$ y) d \<le> setsum (\<lambda>i. x$$i + ?d) d" proof(rule setsum_mono)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4238	fix i assume i:"i\<in>d"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4239	have "abs (y$$i - x$$i) < ?d" apply(rule le_less_trans) using component_le_norm[of "y - x" i]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4240	using y[unfolded min_less_iff_conj dist_norm, THEN conjunct2]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4241	by(auto simp add: norm_minus_commute)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4242	thus "y $$ i \<le> x $$ i + ?d" by auto qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4243	also have "\<dots> \<le> 1" unfolding setsum_addf setsum_constant card_enum real_eq_of_nat
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4244	using `card d >= 1` by(auto simp add: Suc_le_eq)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4245	finally show "setsum (op $$ y) d \<le> 1" .
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4246
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4247	fix i assume "i<DIM('a)" thus "0 \<le> y$$i"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4248	proof(cases "i\<in>d") case True
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4249	have "norm (x - y) < x$$i" using y[unfolded min_less_iff_conj dist_norm, THEN conjunct1]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4250	using Min_gr_iff[of "op $$ x ` d" "norm (x - y)"] `card d >= 1` `i:d`
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4251	apply auto by (metis Suc_n_not_le_n True card_eq_0_iff finite_imageI)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4252	thus "0 \<le> y$$i" using component_le_norm[of "x - y" i] and as(1)[rule_format] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4253	qed(insert y2, auto)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4254	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4255	} ultimately have
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4256	"!!x :: 'a::euclidean_space. (x : rel_interior (convex hull insert 0 {basis i \|i. i : d})) =
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4257	(x : {x. (ALL i:d. 0 < x $$ i) &
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4258	setsum (op $$ x) d < 1 & (ALL i<DIM('a). i ~: d --> x $$ i = 0)})" by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4259	from this have ?thesis by (rule set_eqI)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4260	} ultimately show ?thesis by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4261	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4262
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4263	lemma rel_interior_substd_simplex_nonempty: assumes "d ~={}" "d\<subseteq>{..<DIM('a::euclidean_space)}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4264	obtains a::"'a::euclidean_space" where
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4265	"a : rel_interior(convex hull (insert 0 {basis i \| i . i : d}))" proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4266	(* Proof is a modified copy of the proof of similar lemma interior_std_simplex_nonempty in Convex_Euclidean_Space.thy *)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4267	let ?D = d let ?a = "setsum (\<lambda>b::'a::euclidean_space. inverse (2 * real (card d)) *\<^sub>R b) {(basis i) \| i. i \<in> ?D}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4268	have *:"{basis i :: 'a \| i. i \<in> ?D} = basis ` ?D" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4269	have "finite d" apply(rule finite_subset) using assms(2) by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4270	hence d1: "real(card d) >= 1" using `d ~={}` card_ge1[of d] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4271	{ fix i assume "i:d" have "?a $$ i = inverse (2 * real (card d))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4272	unfolding * setsum_reindex[OF basis_inj_on, OF assms(2)] o_def
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4273	apply(rule trans[of _ "setsum (\<lambda>j. if i = j then inverse (2 * real (card d)) else 0) ?D"])
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4274	unfolding euclidean_component.setsum
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4275	apply(rule setsum_cong2)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4276	using `i:d` `finite d` setsum_delta'[of d i "(%k. inverse (2 * real (card d)))"] d1 assms(2)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4277	by (auto simp add: Euclidean_Space.basis_component[of i])}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4278	note ** = this
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4279	show ?thesis apply(rule that[of ?a]) unfolding rel_interior_substd_simplex[OF assms(2)] mem_Collect_eq
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4280	proof safe fix i assume "i:d"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4281	have "0 < inverse (2 * real (card d))" using d1 by(auto simp add: Suc_le_eq)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4282	also have "...=?a $$ i" using **[of i] `i:d` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4283	finally show "0 < ?a $$ i" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4284	next have "setsum (op $$ ?a) ?D = setsum (\<lambda>i. inverse (2 * real (card d))) ?D"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4285	by(rule setsum_cong2, rule **)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4286	also have "\<dots> < 1" unfolding setsum_constant card_enum real_eq_of_nat real_divide_def[THEN sym]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4287	by (auto simp add:field_simps)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4288	finally show "setsum (op $$ ?a) ?D < 1" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4289	next fix i assume "i<DIM('a)" and "i~:d"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4290	have "?a : (span {basis i \| i. i : d})"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4291	apply (rule span_setsum[of "{basis i \|i. i : d}" "(%b. b /\<^sub>R (2 * real (card d)))" "{basis i \|i. i : d}"])
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4292	using finite_substdbasis[of d] apply blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4293	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4294	{ fix x assume "(x :: 'a::euclidean_space): {basis i \|i. i : d}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4295	hence "x : span {basis i \|i. i : d}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4296	using span_superset[of _ "{basis i \|i. i : d}"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4297	hence "(x /\<^sub>R (2 * real (card d))) : (span {basis i \|i. i : d})"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4298	using span_mul[of x "{basis i \|i. i : d}" "(inverse (real (card d)) / 2)"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4299	} thus "\<forall>x\<in>{basis i \|i. i \<in> d}. x /\<^sub>R (2 * real (card d)) \<in> span {basis i ::'a \|i. i \<in> d}" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4300	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4301	thus "?a $$ i = 0 " using `i~:d` unfolding span_substd_basis[OF assms(2)] using `i<DIM('a)` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4302	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4303	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4304
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4305	subsection{* Relative Interior of Convex Set *}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4306
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4307	lemma rel_interior_convex_nonempty_aux:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4308	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4309	assumes "convex S" and "0 : S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4310	shows "rel_interior S ~= {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4311	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4312	{ assume "S = {0}" hence ?thesis using rel_interior_sing by auto }
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4313	moreover {
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4314	assume "S ~= {0}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4315	obtain B where B_def: "independent B & B<=S & (S <= span B) & card B = dim S" using basis_exists[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4316	hence "B~={}" using B_def assms `S ~= {0}` span_empty by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4317	have "insert 0 B <= span B" using subspace_span[of B] subspace_0[of "span B"] span_inc by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4318	hence "span (insert 0 B) <= span B"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4319	using span_span[of B] span_mono[of "insert 0 B" "span B"] by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4320	hence "convex hull insert 0 B <= span B"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4321	using convex_hull_subset_span[of "insert 0 B"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4322	hence "span (convex hull insert 0 B) <= span B"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4323	using span_span[of B] span_mono[of "convex hull insert 0 B" "span B"] by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4324	hence *: "span (convex hull insert 0 B) = span B"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4325	using span_mono[of B "convex hull insert 0 B"] hull_subset[of "insert 0 B"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4326	hence "span (convex hull insert 0 B) = span S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4327	using B_def span_mono[of B S] span_mono[of S "span B"] span_span[of B] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4328	moreover have "0 : affine hull (convex hull insert 0 B)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4329	using hull_subset[of "convex hull insert 0 B"] hull_subset[of "insert 0 B"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4330	ultimately have **: "affine hull (convex hull insert 0 B) = affine hull S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4331	using affine_hull_span_0[of "convex hull insert 0 B"] affine_hull_span_0[of "S"]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4332	assms hull_subset[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4333	obtain d and f::"'n=>'n" where fd: "card d = card B & linear f & f ` B = {basis i \|i. i : (d :: nat set)} &
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4334	f ` span B = {x. ALL i<DIM('n). i ~: d --> x $$ i = (0::real)} & inj_on f (span B)" and d:"d\<subseteq>{..<DIM('n)}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4335	using basis_to_substdbasis_subspace_isomorphism[of B,OF _ ] B_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4336	hence "bounded_linear f" using linear_conv_bounded_linear by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4337	have "d ~={}" using fd B_def `B ~={}` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4338	have "(insert 0 {basis i \|i. i : d}) = f ` (insert 0 B)" using fd linear_0 by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4339	hence "(convex hull (insert 0 {basis i \|i. i : d})) = f ` (convex hull (insert 0 B))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4340	using convex_hull_linear_image[of f "(insert 0 {basis i \|i. i : d})"]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4341	convex_hull_linear_image[of f "(insert 0 B)"] `bounded_linear f` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4342	moreover have "rel_interior (f ` (convex hull insert 0 B)) =
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4343	f ` rel_interior (convex hull insert 0 B)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4344	apply (rule rel_interior_injective_on_span_linear_image[of f "(convex hull insert 0 B)"])
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4345	using `bounded_linear f` fd * by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4346	ultimately have "rel_interior (convex hull insert 0 B) ~= {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4347	using rel_interior_substd_simplex_nonempty[OF `d~={}` d] apply auto by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4348	moreover have "convex hull (insert 0 B) <= S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4349	using B_def assms hull_mono[of "insert 0 B" "S" "convex"] convex_hull_eq by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4350	ultimately have ?thesis using subset_rel_interior[of "convex hull insert 0 B" S] ** by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4351	} ultimately show ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4352	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4353
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4354	lemma rel_interior_convex_nonempty:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4355	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4356	assumes "convex S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4357	shows "rel_interior S = {} <-> S = {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4358	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4359	{ assume "S ~= {}" from this obtain a where "a : S" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4360	hence "0 : op + (-a) ` S" using assms exI[of "(%x. x:S & -a+x=0)" a] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4361	hence "rel_interior (op + (-a) ` S) ~= {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4362	using rel_interior_convex_nonempty_aux[of "op + (-a) ` S"]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4363	convex_translation[of S "-a"] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4364	hence "rel_interior S ~= {}" using rel_interior_translation by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4365	} from this show ?thesis using rel_interior_empty by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4366	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4367
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4368	lemma convex_rel_interior:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4369	fixes S :: "(_::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4370	assumes "convex S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4371	shows "convex (rel_interior S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4372	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4373	{ fix "x" "y" "u"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4374	assume assm: "x:rel_interior S" "y:rel_interior S" "0<=u" "(u :: real) <= 1"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4375	hence "x:S" using rel_interior_subset by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4376	have "x - u *\<^sub>R (x-y) : rel_interior S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4377	proof(cases "0=u")
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4378	case False hence "0<u" using assm by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4379	thus ?thesis
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4380	using assm rel_interior_convex_shrink[of S y x u] assms `x:S` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4381	next
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4382	case True thus ?thesis using assm by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4383	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4384	hence "(1-u) \<^sub>R x + u \<^sub>R y : rel_interior S" by (simp add: algebra_simps)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4385	} from this show ?thesis unfolding convex_alt by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4386	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4387
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4388	lemma convex_closure_rel_interior:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4389	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4390	assumes "convex S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4391	shows "closure(rel_interior S) = closure S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4392	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4393	have h1: "closure(rel_interior S) <= closure S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4394	using subset_closure[of "rel_interior S" S] rel_interior_subset[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4395	{ assume "S ~= {}" from this obtain a where a_def: "a : rel_interior S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4396	using rel_interior_convex_nonempty assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4397	{ fix x assume x_def: "x : closure S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4398	{ assume "x=a" hence "x : closure(rel_interior S)" using a_def unfolding closure_def by auto }
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4399	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4400	{ assume "x ~= a"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4401	{ fix e :: real assume e_def: "e>0"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4402	def e1 == "min 1 (e/norm (x - a))" hence e1_def: "e1>0 & e1<=1 & e1*norm(x-a)<=e"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4403	using `x ~= a` `e>0` divide_pos_pos[of e] le_divide_eq[of e1 e "norm(x-a)"] by simp
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4404	hence : "x - e1 \<^sub>R (x - a) : rel_interior S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4405	using rel_interior_closure_convex_shrink[of S a x e1] assms x_def a_def e1_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4406	have "EX y. y:rel_interior S & y ~= x & (dist y x) <= e"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4407	apply (rule_tac x="x - e1 *\<^sub>R (x - a)" in exI)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4408	using * e1_def dist_norm[of "x - e1 *\<^sub>R (x - a)" x] `x ~= a` by simp
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4409	} hence "x islimpt rel_interior S" unfolding islimpt_approachable_le by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4410	hence "x : closure(rel_interior S)" unfolding closure_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4411	} ultimately have "x : closure(rel_interior S)" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4412	} hence ?thesis using h1 by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4413	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4414	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4415	{ assume "S = {}" hence "rel_interior S = {}" using rel_interior_empty by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4416	hence "closure(rel_interior S) = {}" using closure_empty by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4417	hence ?thesis using `S={}` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4418	} ultimately show ?thesis by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4419	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4420
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4421	lemma rel_interior_same_affine_hull:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4422	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4423	assumes "convex S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4424	shows "affine hull (rel_interior S) = affine hull S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4425	by (metis assms closure_same_affine_hull convex_closure_rel_interior)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4426
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4427	lemma rel_interior_aff_dim:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4428	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4429	assumes "convex S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4430	shows "aff_dim (rel_interior S) = aff_dim S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4431	by (metis aff_dim_affine_hull2 assms rel_interior_same_affine_hull)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4432
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4433	lemma rel_interior_rel_interior:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4434	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4435	assumes "convex S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4436	shows "rel_interior (rel_interior S) = rel_interior S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4437	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4438	have "openin (subtopology euclidean (affine hull (rel_interior S))) (rel_interior S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4439	using opein_rel_interior[of S] rel_interior_same_affine_hull[of S] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4440	from this show ?thesis using rel_interior_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4441	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4442
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4443	lemma rel_interior_rel_open:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4444	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4445	assumes "convex S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4446	shows "rel_open (rel_interior S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4447	unfolding rel_open_def using rel_interior_rel_interior assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4448
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4449	lemma convex_rel_interior_closure_aux:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4450	fixes x y z :: "_::euclidean_space"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4451	assumes "0 < a" "0 < b" "(a+b) \<^sub>R z = a \<^sub>R x + b *\<^sub>R y"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4452	obtains e where "0 < e" "e <= 1" "z = y - e *\<^sub>R (y-x)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4453	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4454	def e == "a/(a+b)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4455	have "z = (1 / (a + b)) \<^sub>R ((a + b) \<^sub>R z)" apply auto using assms by simp
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4456	also have "... = (1 / (a + b)) \<^sub>R (a \<^sub>R x + b *\<^sub>R y)" using assms
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4457	scaleR_cancel_left[of "1/(a+b)" "(a + b) \<^sub>R z" "a \<^sub>R x + b *\<^sub>R y"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4458	also have "... = y - e *\<^sub>R (y-x)" using e_def apply (simp add: algebra_simps)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4459	using scaleR_left_distrib[of "a/(a+b)" "b/(a+b)" y] assms add_divide_distrib[of a b "a+b"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4460	finally have "z = y - e *\<^sub>R (y-x)" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4461	moreover have "0<e" using e_def assms divide_pos_pos[of a "a+b"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4462	moreover have "e<=1" using e_def assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4463	ultimately show ?thesis using that[of e] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4464	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4465
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4466	lemma convex_rel_interior_closure:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4467	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4468	assumes "convex S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4469	shows "rel_interior (closure S) = rel_interior S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4470	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4471	{ assume "S={}" hence ?thesis using assms rel_interior_convex_nonempty by auto }
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4472	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4473	{ assume "S ~= {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4474	have "rel_interior (closure S) >= rel_interior S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4475	using subset_rel_interior[of S "closure S"] closure_same_affine_hull closure_subset by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4476	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4477	{ fix z assume z_def: "z : rel_interior (closure S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4478	obtain x where x_def: "x : rel_interior S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4479	using `S ~= {}` assms rel_interior_convex_nonempty by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4480	{ assume "x=z" hence "z : rel_interior S" using x_def by auto }
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4481	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4482	{ assume "x ~= z"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4483	obtain e where e_def: "e > 0 & cball z e Int affine hull closure S <= closure S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4484	using z_def rel_interior_cball[of "closure S"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4485	hence *: "0 < e/norm(z-x)" using e_def `x ~= z` divide_pos_pos[of e "norm(z-x)"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4486	def y == "z + (e/norm(z-x)) *\<^sub>R (z-x)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4487	have yball: "y : cball z e"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4488	using mem_cball y_def dist_norm[of z y] e_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4489	have "x : affine hull closure S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4490	using x_def rel_interior_subset_closure hull_inc[of x "closure S"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4491	moreover have "z : affine hull closure S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4492	using z_def rel_interior_subset hull_subset[of "closure S"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4493	ultimately have "y : affine hull closure S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4494	using y_def affine_affine_hull[of "closure S"]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4495	mem_affine_3_minus [of "affine hull closure S" z z x "e/norm(z-x)"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4496	hence "y : closure S" using e_def yball by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4497	have "(1+(e/norm(z-x))) \<^sub>R z = (e/norm(z-x)) \<^sub>R x + y"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4498	using y_def by (simp add: algebra_simps)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4499	from this obtain e1 where "0 < e1 & e1 <= 1 & z = y - e1 *\<^sub>R (y - x)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4500	using * convex_rel_interior_closure_aux[of "e / norm (z - x)" 1 z x y]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4501	by (auto simp add: algebra_simps)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4502	hence "z : rel_interior S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4503	using rel_interior_closure_convex_shrink assms x_def `y : closure S` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4504	} ultimately have "z : rel_interior S" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4505	} ultimately have ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4506	} ultimately show ?thesis by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4507	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4508
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4509	lemma convex_interior_closure:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4510	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4511	assumes "convex S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4512	shows "interior (closure S) = interior S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4513	using closure_aff_dim[of S] interior_rel_interior_gen[of S] interior_rel_interior_gen[of "closure S"]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4514	convex_rel_interior_closure[of S] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4515
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4516	lemma closure_eq_rel_interior_eq:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4517	fixes S1 S2 :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4518	assumes "convex S1" "convex S2"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4519	shows "(closure S1 = closure S2) <-> (rel_interior S1 = rel_interior S2)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4520	by (metis convex_rel_interior_closure convex_closure_rel_interior assms)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4521
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4522
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4523	lemma closure_eq_between:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4524	fixes S1 S2 :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4525	assumes "convex S1" "convex S2"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4526	shows "(closure S1 = closure S2) <->
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4527	((rel_interior S1 <= S2) & (S2 <= closure S1))" (is "?A <-> ?B")
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4528	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4529	have "?A --> ?B" by (metis assms closure_subset convex_rel_interior_closure rel_interior_subset)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4530	moreover have "?B --> (closure S1 <= closure S2)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4531	by (metis assms(1) convex_closure_rel_interior subset_closure)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4532	moreover have "?B --> (closure S1 >= closure S2)" by (metis closed_closure closure_minimal)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4533	ultimately show ?thesis by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4534	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4535
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4536	lemma open_inter_closure_rel_interior:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4537	fixes S A :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4538	assumes "convex S" "open A"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4539	shows "((A Int closure S) = {}) <-> ((A Int rel_interior S) = {})"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4540	by (metis assms convex_closure_rel_interior open_inter_closure_eq_empty)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4541
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4542	definition "rel_frontier S = closure S - rel_interior S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4543
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4544	lemma closed_affine_hull: "closed (affine hull ((S :: ('n::euclidean_space) set)))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4545	by (metis affine_affine_hull affine_closed)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4546
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4547	lemma closed_rel_frontier: "closed(rel_frontier (S :: ('n::euclidean_space) set))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4548	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4549	have *: "closedin (subtopology euclidean (affine hull S)) (closure S - rel_interior S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4550	apply (rule closedin_diff[of "subtopology euclidean (affine hull S)""closure S" "rel_interior S"]) using closed_closedin_trans[of "affine hull S" "closure S"] closed_affine_hull[of S]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4551	closure_affine_hull[of S] opein_rel_interior[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4552	show ?thesis apply (rule closedin_closed_trans[of "affine hull S" "rel_frontier S"])
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4553	unfolding rel_frontier_def using * closed_affine_hull by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4554	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4555
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4556
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4557	lemma convex_rel_frontier_aff_dim:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4558	fixes S1 S2 :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4559	assumes "convex S1" "convex S2" "S2 ~= {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4560	assumes "S1 <= rel_frontier S2"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4561	shows "aff_dim S1 < aff_dim S2"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4562	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4563	have "S1 <= closure S2" using assms unfolding rel_frontier_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4564	hence *: "affine hull S1 <= affine hull S2"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4565	using hull_mono[of "S1" "closure S2"] closure_same_affine_hull[of S2] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4566	hence "aff_dim S1 <= aff_dim S2" using * aff_dim_affine_hull[of S1] aff_dim_affine_hull[of S2]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4567	aff_dim_subset[of "affine hull S1" "affine hull S2"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4568	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4569	{ assume eq: "aff_dim S1 = aff_dim S2"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4570	hence "S1 ~= {}" using aff_dim_empty[of S1] aff_dim_empty[of S2] `S2 ~= {}` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4571	have **: "affine hull S1 = affine hull S2"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4572	apply (rule affine_dim_equal) using * affine_affine_hull apply auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4573	using `S1 ~= {}` hull_subset[of S1] apply auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4574	using eq aff_dim_affine_hull[of S1] aff_dim_affine_hull[of S2] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4575	obtain a where a_def: "a : rel_interior S1"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4576	using `S1 ~= {}` rel_interior_convex_nonempty assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4577	obtain T where T_def: "open T & a : T Int S1 & T Int affine hull S1 <= S1"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4578	using mem_rel_interior[of a S1] a_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4579	hence "a : T Int closure S2" using a_def assms unfolding rel_frontier_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4580	from this obtain b where b_def: "b : T Int rel_interior S2"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4581	using open_inter_closure_rel_interior[of S2 T] assms T_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4582	hence "b : affine hull S1" using rel_interior_subset hull_subset[of S2] ** by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4583	hence "b : S1" using T_def b_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4584	hence False using b_def assms unfolding rel_frontier_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4585	} ultimately show ?thesis using zless_le by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4586	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4587
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4588
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4589	lemma convex_rel_interior_if:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4590	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4591	assumes "convex S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4592	assumes "z : rel_interior S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4593	shows "(!x:affine hull S. EX m. m>1 & (!e. (e>1 & e<=m) --> (1-e)\<^sub>R x+ e \<^sub>R z : S ))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4594	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4595	obtain e1 where e1_def: "e1>0 & cball z e1 Int affine hull S <= S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4596	using mem_rel_interior_cball[of z S] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4597	{ fix x assume x_def: "x:affine hull S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4598	{ assume "x ~= z"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4599	def m == "1+e1/norm(x-z)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4600	hence "m>1" using e1_def `x ~= z` divide_pos_pos[of e1 "norm (x - z)"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4601	{ fix e assume e_def: "e>1 & e<=m"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4602	have "z : affine hull S" using assms rel_interior_subset hull_subset[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4603	hence : "(1-e)\<^sub>R x+ e *\<^sub>R z : affine hull S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4604	using mem_affine[of "affine hull S" x z "(1-e)" e] affine_affine_hull[of S] x_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4605	have "norm (z + e \<^sub>R x - (x + e \<^sub>R z)) = norm ((e - 1) *\<^sub>R (x-z))" by (simp add: algebra_simps)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4606	also have "...= (e - 1) * norm(x-z)" using norm_scaleR e_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4607	also have "...<=(m - 1) * norm(x-z)" using e_def mult_right_mono[of _ _ "norm(x-z)"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4608	also have "...= (e1 / norm (x - z)) * norm (x - z)" using m_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4609	also have "...=e1" using `x ~= z` e1_def by simp
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4610	finally have *: "norm (z + e \<^sub>R x - (x + e *\<^sub>R z)) <= e1" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4611	have "(1-e)\<^sub>R x+ e \<^sub>R z : cball z e1"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4612	using m_def ** unfolding cball_def dist_norm by (auto simp add: algebra_simps)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4613	hence "(1-e)\<^sub>R x+ e \<^sub>R z : S" using e_def * e1_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4614	} hence "EX m. m>1 & (!e. (e>1 & e<=m) --> (1-e)\<^sub>R x+ e \<^sub>R z : S )" using `m>1` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4615	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4616	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4617	{ assume "x=z" def m == "1+e1" hence "m>1" using e1_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4618	{ fix e assume e_def: "e>1 & e<=m"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4619	hence "(1-e)\<^sub>R x+ e \<^sub>R z : S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4620	using e1_def x_def `x=z` by (auto simp add: algebra_simps)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4621	hence "(1-e)\<^sub>R x+ e \<^sub>R z : S" using e_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4622	} hence "EX m. m>1 & (!e. (e>1 & e<=m) --> (1-e)\<^sub>R x+ e \<^sub>R z : S )" using `m>1` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4623	} ultimately have "EX m. m>1 & (!e. (e>1 & e<=m) --> (1-e)\<^sub>R x+ e \<^sub>R z : S )" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4624	} from this show ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4625	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4626
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4627	lemma convex_rel_interior_if2:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4628	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4629	assumes "convex S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4630	assumes "z : rel_interior S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4631	shows "(!x:affine hull S. EX e. e>1 & (1-e)\<^sub>R x+ e \<^sub>R z : S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4632	using convex_rel_interior_if[of S z] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4633
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4634	lemma convex_rel_interior_only_if:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4635	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4636	assumes "convex S" "S ~= {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4637	assumes "(!x:S. EX e. e>1 & (1-e)\<^sub>R x+ e \<^sub>R z : S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4638	shows "z : rel_interior S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4639	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4640	obtain x where x_def: "x : rel_interior S" using rel_interior_convex_nonempty assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4641	hence "x:S" using rel_interior_subset by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4642	from this obtain e where e_def: "e>1 & (1 - e) \<^sub>R x + e \<^sub>R z : S" using assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4643	def y == "(1 - e) \<^sub>R x + e \<^sub>R z" hence "y:S" using e_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4644	def e1 == "1/e" hence "0<e1 & e1<1" using e_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4645	hence "z=y-(1-e1)*\<^sub>R (y-x)" using e1_def y_def by (auto simp add: algebra_simps)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4646	from this show ?thesis
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4647	using rel_interior_convex_shrink[of S x y "1-e1"] `0<e1 & e1<1` `y:S` x_def assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4648	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4649
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4650	lemma convex_rel_interior_iff:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4651	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4652	assumes "convex S" "S ~= {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4653	shows "z : rel_interior S <-> (!x:S. EX e. e>1 & (1-e)\<^sub>R x+ e \<^sub>R z : S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4654	using assms hull_subset[of S "affine"]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4655	convex_rel_interior_if[of S z] convex_rel_interior_only_if[of S z] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4656
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4657	lemma convex_rel_interior_iff2:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4658	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4659	assumes "convex S" "S ~= {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4660	shows "z : rel_interior S <-> (!x:affine hull S. EX e. e>1 & (1-e)\<^sub>R x+ e \<^sub>R z : S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4661	using assms hull_subset[of S]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4662	convex_rel_interior_if2[of S z] convex_rel_interior_only_if[of S z] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4663
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4664
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4665	lemma convex_interior_iff:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4666	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4667	assumes "convex S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4668	shows "z : interior S <-> (!x. EX e. e>0 & z+ e *\<^sub>R x : S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4669	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4670	{ assume a: "~(aff_dim S = int DIM('n))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4671	{ assume "z : interior S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4672	hence False using a interior_rel_interior_gen[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4673	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4674	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4675	{ assume r: "!x. EX e. e>0 & z+ e *\<^sub>R x : S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4676	{ fix x obtain e1 where e1_def: "e1>0 & z+ e1 *\<^sub>R (x-z) : S" using r by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4677	obtain e2 where e2_def: "e2>0 & z+ e2 *\<^sub>R (z-x) : S" using r by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4678	def x1 == "z+ e1 *\<^sub>R (x-z)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4679	hence x1: "x1 : affine hull S" using e1_def hull_subset[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4680	def x2 == "z+ e2 *\<^sub>R (z-x)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4681	hence x2: "x2 : affine hull S" using e2_def hull_subset[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4682	have *: "e1/(e1+e2) + e2/(e1+e2) = 1" using divide.add[of e1 e2 "e1+e2"] e1_def e2_def by simp
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4683	hence "z = (e2/(e1+e2)) \<^sub>R x1 + (e1/(e1+e2)) \<^sub>R x2"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4684	using x1_def x2_def apply (auto simp add: algebra_simps)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4685	using scaleR_left_distrib[of "e1/(e1+e2)" "e2/(e1+e2)" z] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4686	hence z: "z : affine hull S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4687	using mem_affine[of "affine hull S" x1 x2 "e2/(e1+e2)" "e1/(e1+e2)"]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4688	x1 x2 affine_affine_hull[of S] * by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4689	have "x1-x2 = (e1+e2) *\<^sub>R (x-z)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4690	using x1_def x2_def by (auto simp add: algebra_simps)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4691	hence "x=z+(1/(e1+e2)) *\<^sub>R (x1-x2)" using e1_def e2_def by simp
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4692	hence "x : affine hull S" using mem_affine_3_minus[of "affine hull S" z x1 x2 "1/(e1+e2)"]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4693	x1 x2 z affine_affine_hull[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4694	} hence "affine hull S = UNIV" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4695	hence "aff_dim S = int DIM('n)" using aff_dim_affine_hull[of S] by (simp add: aff_dim_univ)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4696	hence False using a by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4697	} ultimately have ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4698	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4699	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4700	{ assume a: "aff_dim S = int DIM('n)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4701	hence "S ~= {}" using aff_dim_empty[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4702	have *: "affine hull S=UNIV" using a affine_hull_univ by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4703	{ assume "z : interior S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4704	hence "z : rel_interior S" using a interior_rel_interior_gen[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4705	hence *: "(!x. EX e. e>1 & (1-e)\<^sub>R x+ e *\<^sub>R z : S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4706	using convex_rel_interior_iff2[of S z] assms `S~={}` * by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4707	fix x obtain e1 where e1_def: "e1>1 & (1-e1)\<^sub>R (z-x)+ e1 \<^sub>R z : S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4708	using **[rule_format, of "z-x"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4709	def e == "e1 - 1"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4710	hence "(1-e1)\<^sub>R (z-x)+ e1 \<^sub>R z = z+ e *\<^sub>R x" by (simp add: algebra_simps)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4711	hence "e>0 & z+ e *\<^sub>R x : S" using e1_def e_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4712	hence "EX e. e>0 & z+ e *\<^sub>R x : S" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4713	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4714	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4715	{ assume r: "(!x. EX e. e>0 & z+ e *\<^sub>R x : S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4716	{ fix x obtain e1 where e1_def: "e1>0 & z + e1*\<^sub>R (z-x) : S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4717	using r[rule_format, of "z-x"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4718	def e == "e1 + 1"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4719	hence "z + e1\<^sub>R (z-x) = (1-e)\<^sub>R x+ e *\<^sub>R z" by (simp add: algebra_simps)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4720	hence "e > 1 & (1-e)\<^sub>R x+ e \<^sub>R z : S" using e1_def e_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4721	hence "EX e. e>1 & (1-e)\<^sub>R x+ e \<^sub>R z : S" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4722	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4723	hence "z : rel_interior S" using convex_rel_interior_iff2[of S z] assms `S~={}` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4724	hence "z : interior S" using a interior_rel_interior_gen[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4725	} ultimately have ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4726	} ultimately show ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4727	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4728
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4729	subsection{* Relative interior and closure under commom operations *}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4730
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4731	lemma rel_interior_inter_aux: "Inter {rel_interior S \|S. S : I} <= Inter I"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4732	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4733	{ fix y assume "y : Inter {rel_interior S \|S. S : I}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4734	hence y_def: "!S : I. y : rel_interior S" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4735	{ fix S assume "S : I" hence "y : S" using rel_interior_subset y_def by auto }
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4736	hence "y : Inter I" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4737	} thus ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4738	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4739
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4740	lemma closure_inter: "closure (Inter I) <= Inter {closure S \|S. S : I}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4741	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4742	{ fix y assume "y : Inter I" hence y_def: "!S : I. y : S" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4743	{ fix S assume "S : I" hence "y : closure S" using closure_subset y_def by auto }
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4744	hence "y : Inter {closure S \|S. S : I}" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4745	} hence "Inter I <= Inter {closure S \|S. S : I}" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4746	moreover have "Inter {closure S \|S. S : I} : closed"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4747	unfolding mem_def closed_Inter closed_closure by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4748	ultimately show ?thesis using closure_hull[of "Inter I"]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4749	hull_minimal[of "Inter I" "Inter {closure S \|S. S : I}" "closed"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4750	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4751
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4752	lemma convex_closure_rel_interior_inter:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4753	assumes "!S : I. convex (S :: ('n::euclidean_space) set)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4754	assumes "Inter {rel_interior S \|S. S : I} ~= {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4755	shows "Inter {closure S \|S. S : I} <= closure (Inter {rel_interior S \|S. S : I})"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4756	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4757	obtain x where x_def: "!S : I. x : rel_interior S" using assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4758	{ fix y assume "y : Inter {closure S \|S. S : I}" hence y_def: "!S : I. y : closure S" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4759	{ assume "y = x"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4760	hence "y : closure (Inter {rel_interior S \|S. S : I})"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4761	using x_def closure_subset[of "Inter {rel_interior S \|S. S : I}"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4762	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4763	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4764	{ assume "y ~= x"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4765	{ fix e :: real assume e_def: "0 < e"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4766	def e1 == "min 1 (e/norm (y - x))" hence e1_def: "e1>0 & e1<=1 & e1*norm(y-x)<=e"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4767	using `y ~= x` `e>0` divide_pos_pos[of e] le_divide_eq[of e1 e "norm(y-x)"] by simp
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4768	def z == "y - e1 *\<^sub>R (y - x)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4769	{ fix S assume "S : I"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4770	hence "z : rel_interior S" using rel_interior_closure_convex_shrink[of S x y e1]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4771	assms x_def y_def e1_def z_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4772	} hence *: "z : Inter {rel_interior S \|S. S : I}" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4773	have "EX z. z:Inter {rel_interior S \|S. S : I} & z ~= y & (dist z y) <= e"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4774	apply (rule_tac x="z" in exI) using `y ~= x` z_def * e1_def e_def dist_norm[of z y] by simp
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4775	} hence "y islimpt Inter {rel_interior S \|S. S : I}" unfolding islimpt_approachable_le by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4776	hence "y : closure (Inter {rel_interior S \|S. S : I})" unfolding closure_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4777	} ultimately have "y : closure (Inter {rel_interior S \|S. S : I})" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4778	} from this show ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4779	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4780
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4781
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4782	lemma convex_closure_inter:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4783	assumes "!S : I. convex (S :: ('n::euclidean_space) set)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4784	assumes "Inter {rel_interior S \|S. S : I} ~= {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4785	shows "closure (Inter I) = Inter {closure S \|S. S : I}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4786	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4787	have "Inter {closure S \|S. S : I} <= closure (Inter {rel_interior S \|S. S : I})"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4788	using convex_closure_rel_interior_inter assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4789	moreover have "closure (Inter {rel_interior S \|S. S : I}) <= closure (Inter I)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4790	using rel_interior_inter_aux
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4791	subset_closure[of "Inter {rel_interior S \|S. S : I}" "Inter I"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4792	ultimately show ?thesis using closure_inter[of I] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4793	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4794
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4795	lemma convex_inter_rel_interior_same_closure:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4796	assumes "!S : I. convex (S :: ('n::euclidean_space) set)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4797	assumes "Inter {rel_interior S \|S. S : I} ~= {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4798	shows "closure (Inter {rel_interior S \|S. S : I}) = closure (Inter I)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4799	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4800	have "Inter {closure S \|S. S : I} <= closure (Inter {rel_interior S \|S. S : I})"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4801	using convex_closure_rel_interior_inter assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4802	moreover have "closure (Inter {rel_interior S \|S. S : I}) <= closure (Inter I)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4803	using rel_interior_inter_aux
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4804	subset_closure[of "Inter {rel_interior S \|S. S : I}" "Inter I"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4805	ultimately show ?thesis using closure_inter[of I] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4806	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4807
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4808	lemma convex_rel_interior_inter:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4809	assumes "!S : I. convex (S :: ('n::euclidean_space) set)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4810	assumes "Inter {rel_interior S \|S. S : I} ~= {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4811	shows "rel_interior (Inter I) <= Inter {rel_interior S \|S. S : I}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4812	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4813	have "convex(Inter I)" using assms convex_Inter by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4814	moreover have "convex(Inter {rel_interior S \|S. S : I})" apply (rule convex_Inter)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4815	using assms convex_rel_interior by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4816	ultimately have "rel_interior (Inter {rel_interior S \|S. S : I}) = rel_interior (Inter I)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4817	using convex_inter_rel_interior_same_closure assms
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4818	closure_eq_rel_interior_eq[of "Inter {rel_interior S \|S. S : I}" "Inter I"] by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4819	from this show ?thesis using rel_interior_subset[of "Inter {rel_interior S \|S. S : I}"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4820	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4821
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4822	lemma convex_rel_interior_finite_inter:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4823	assumes "!S : I. convex (S :: ('n::euclidean_space) set)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4824	assumes "Inter {rel_interior S \|S. S : I} ~= {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4825	assumes "finite I"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4826	shows "rel_interior (Inter I) = Inter {rel_interior S \|S. S : I}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4827	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4828	have "Inter I ~= {}" using assms rel_interior_inter_aux[of I] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4829	have "convex (Inter I)" using convex_Inter assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4830	{ assume "I={}" hence ?thesis using Inter_empty rel_interior_univ2 by auto }
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4831	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4832	{ assume "I ~= {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4833	{ fix z assume z_def: "z : Inter {rel_interior S \|S. S : I}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4834	{ fix x assume x_def: "x : Inter I"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4835	{ fix S assume S_def: "S : I" hence "z : rel_interior S" "x : S" using z_def x_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4836	(from this obtain e where e_def: "e>1 & (1 - e) \<^sub>R x + e \<^sub>R z : S")
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4837	hence "EX m. m>1 & (!e. (e>1 & e<=m) --> (1-e)\<^sub>R x+ e \<^sub>R z : S )"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4838	using convex_rel_interior_if[of S z] S_def assms hull_subset[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4839	} from this obtain mS where mS_def: "!S : I. (mS(S) > (1 :: real) &
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4840	(!e. (e>1 & e<=mS(S)) --> (1-e)\<^sub>R x+ e \<^sub>R z : S))" by metis
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4841	obtain e where e_def: "e=Min (mS ` I)" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4842	have "e : (mS ` I)" using e_def assms `I ~= {}` by (simp add: Min_in)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4843	hence "e>(1 :: real)" using mS_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4844	moreover have "!S : I. e<=mS(S)" using e_def assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4845	ultimately have "EX e>1. (1 - e) \<^sub>R x + e \<^sub>R z : Inter I" using mS_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4846	} hence "z : rel_interior (Inter I)" using convex_rel_interior_iff[of "Inter I" z]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4847	`Inter I ~= {}` `convex (Inter I)` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4848	} from this have ?thesis using convex_rel_interior_inter[of I] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4849	} ultimately show ?thesis by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4850	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4851
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4852	lemma convex_closure_inter_two:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4853	fixes S T :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4854	assumes "convex S" "convex T"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4855	assumes "(rel_interior S) Int (rel_interior T) ~= {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4856	shows "closure (S Int T) = (closure S) Int (closure T)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4857	using convex_closure_inter[of "{S,T}"] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4858
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4859	lemma convex_rel_interior_inter_two:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4860	fixes S T :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4861	assumes "convex S" "convex T"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4862	assumes "(rel_interior S) Int (rel_interior T) ~= {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4863	shows "rel_interior (S Int T) = (rel_interior S) Int (rel_interior T)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4864	using convex_rel_interior_finite_inter[of "{S,T}"] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4865
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4866
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4867	lemma convex_affine_closure_inter:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4868	fixes S T :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4869	assumes "convex S" "affine T"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4870	assumes "(rel_interior S) Int T ~= {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4871	shows "closure (S Int T) = (closure S) Int T"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4872	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4873	have "affine hull T = T" using assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4874	hence "rel_interior T = T" using rel_interior_univ[of T] by metis
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4875	moreover have "closure T = T" using assms affine_closed[of T] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4876	ultimately show ?thesis using convex_closure_inter_two[of S T] assms affine_imp_convex by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4877	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4878
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4879	lemma convex_affine_rel_interior_inter:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4880	fixes S T :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4881	assumes "convex S" "affine T"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4882	assumes "(rel_interior S) Int T ~= {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4883	shows "rel_interior (S Int T) = (rel_interior S) Int T"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4884	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4885	have "affine hull T = T" using assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4886	hence "rel_interior T = T" using rel_interior_univ[of T] by metis
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4887	moreover have "closure T = T" using assms affine_closed[of T] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4888	ultimately show ?thesis using convex_rel_interior_inter_two[of S T] assms affine_imp_convex by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4889	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4890
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4891	lemma subset_rel_interior_convex:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4892	fixes S T :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4893	assumes "convex S" "convex T"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4894	assumes "S <= closure T"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4895	assumes "~(S <= rel_frontier T)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4896	shows "rel_interior S <= rel_interior T"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4897	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4898	have *: "S Int closure T = S" using assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4899	have "~(rel_interior S <= rel_frontier T)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4900	using subset_closure[of "rel_interior S" "rel_frontier T"] closed_rel_frontier[of T]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4901	closure_closed convex_closure_rel_interior[of S] closure_subset[of S] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4902	hence "(rel_interior S) Int (rel_interior (closure T)) ~= {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4903	using assms rel_frontier_def[of T] rel_interior_subset convex_rel_interior_closure[of T] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4904	hence "rel_interior S Int rel_interior T = rel_interior (S Int closure T)" using assms convex_closure
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4905	convex_rel_interior_inter_two[of S "closure T"] convex_rel_interior_closure[of T] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4906	also have "...=rel_interior (S)" using * by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4907	finally show ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4908	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4909
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4910
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4911	lemma rel_interior_convex_linear_image:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4912	fixes f :: "('m::euclidean_space) => ('n::euclidean_space)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4913	assumes "linear f"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4914	assumes "convex S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4915	shows "f ` (rel_interior S) = rel_interior (f ` S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4916	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4917	{ assume "S = {}" hence ?thesis using assms rel_interior_empty rel_interior_convex_nonempty by auto }
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4918	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4919	{ assume "S ~= {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4920	have *: "f ` (rel_interior S) <= f ` S" unfolding image_mono using rel_interior_subset by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4921	have "f ` S <= f ` (closure S)" unfolding image_mono using closure_subset by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4922	also have "... = f ` (closure (rel_interior S))" using convex_closure_rel_interior assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4923	also have "... <= closure (f ` (rel_interior S))" using closure_linear_image assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4924	finally have "closure (f ` S) = closure (f ` rel_interior S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4925	using subset_closure[of "f ` S" "closure (f ` rel_interior S)"] closure_closure
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4926	subset_closure[of "f ` rel_interior S" "f ` S"] * by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4927	hence "rel_interior (f ` S) = rel_interior (f ` rel_interior S)" using assms convex_rel_interior
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4928	linear_conv_bounded_linear[of f] convex_linear_image[of S] convex_linear_image[of "rel_interior S"]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4929	closure_eq_rel_interior_eq[of "f ` S" "f ` rel_interior S"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4930	hence "rel_interior (f ` S) <= f ` rel_interior S" using rel_interior_subset by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4931	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4932	{ fix z assume z_def: "z : f ` rel_interior S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4933	from this obtain z1 where z1_def: "z1 : rel_interior S & (f z1 = z)" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4934	{ fix x assume "x : f ` S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4935	from this obtain x1 where x1_def: "x1 : S & (f x1 = x)" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4936	from this obtain e where e_def: "e>1 & (1 - e) \<^sub>R x1 + e \<^sub>R z1 : S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4937	using convex_rel_interior_iff[of S z1] `convex S` x1_def z1_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4938	moreover have "f ((1 - e) \<^sub>R x1 + e \<^sub>R z1) = (1 - e) \<^sub>R x + e \<^sub>R z"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4939	using x1_def z1_def `linear f` by (simp add: linear_add_cmul)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4940	ultimately have "(1 - e) \<^sub>R x + e \<^sub>R z : f ` S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4941	using imageI[of "(1 - e) \<^sub>R x1 + e \<^sub>R z1" S f] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4942	hence "EX e. (e>1 & (1 - e) \<^sub>R x + e \<^sub>R z : f ` S)" using e_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4943	} from this have "z : rel_interior (f ` S)" using convex_rel_interior_iff[of "f ` S" z] `convex S`
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4944	`linear f` `S ~= {}` convex_linear_image[of S f] linear_conv_bounded_linear[of f] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4945	} ultimately have ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4946	} ultimately show ?thesis by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4947	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4948
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4949
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4950	lemma convex_linear_preimage:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4951	assumes c:"convex S" and l:"bounded_linear f"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4952	shows "convex(f -` S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4953	proof(auto simp add: convex_def)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4954	interpret f: bounded_linear f by fact
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4955	fix x y assume xy:"f x : S" "f y : S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4956	fix u v ::real assume uv:"0 <= u" "0 <= v" "u + v = 1"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4957	show "f (u \<^sub>R x + v \<^sub>R y) : S" unfolding image_iff
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4958	using bexI[of _ "u \<^sub>R x + v \<^sub>R y"] f.add f.scaleR
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4959	c[unfolded convex_def] xy uv by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4960	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4961
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4962
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4963	lemma rel_interior_convex_linear_preimage:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4964	fixes f :: "('m::euclidean_space) => ('n::euclidean_space)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4965	assumes "linear f"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4966	assumes "convex S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4967	assumes "f -` (rel_interior S) ~= {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4968	shows "rel_interior (f -` S) = f -` (rel_interior S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4969	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4970	have "S ~= {}" using assms rel_interior_empty by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4971	have nonemp: "f -` S ~= {}" by (metis assms(3) rel_interior_subset subset_empty vimage_mono)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4972	hence "S Int (range f) ~= {}" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4973	have conv: "convex (f -` S)" using convex_linear_preimage assms linear_conv_bounded_linear by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4974	hence "convex (S Int (range f))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4975	by (metis assms(1) assms(2) convex_Int subspace_UNIV subspace_imp_convex subspace_linear_image)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4976	{ fix z assume "z : f -` (rel_interior S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4977	hence z_def: "f z : rel_interior S" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4978	{ fix x assume "x : f -` S" from this have x_def: "f x : S" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4979	from this obtain e where e_def: "e>1 & (1-e)\<^sub>R (f x)+ e \<^sub>R (f z) : S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4980	using convex_rel_interior_iff[of S "f z"] z_def assms `S ~= {}` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4981	moreover have "(1-e)\<^sub>R (f x)+ e \<^sub>R (f z) = f ((1-e)\<^sub>R x + e \<^sub>R z)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4982	using `linear f` by (simp add: linear_def)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4983	ultimately have "EX e. e>1 & (1-e)\<^sub>R x + e \<^sub>R z : f -` S" using e_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4984	} hence "z : rel_interior (f -` S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4985	using convex_rel_interior_iff[of "f -` S" z] conv nonemp by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4986	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4987	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4988	{ fix z assume z_def: "z : rel_interior (f -` S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4989	{ fix x assume x_def: "x: S Int (range f)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4990	from this obtain y where y_def: "(f y = x) & (y : f -` S)" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4991	from this obtain e where e_def: "e>1 & (1-e)\<^sub>R y+ e \<^sub>R z : f -` S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4992	using convex_rel_interior_iff[of "f -` S" z] z_def conv by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4993	moreover have "(1-e)\<^sub>R x+ e \<^sub>R (f z) = f ((1-e)\<^sub>R y + e \<^sub>R z)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4994	using `linear f` y_def by (simp add: linear_def)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4995	ultimately have "EX e. e>1 & (1-e)\<^sub>R x + e \<^sub>R (f z) : S Int (range f)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4996	using e_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4997	} hence "f z : rel_interior (S Int (range f))" using `convex (S Int (range f))`
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4998	`S Int (range f) ~= {}` convex_rel_interior_iff[of "S Int (range f)" "f z"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	4999	moreover have "affine (range f)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5000	by (metis assms(1) subspace_UNIV subspace_imp_affine subspace_linear_image)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5001	ultimately have "f z : rel_interior S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5002	using convex_affine_rel_interior_inter[of S "range f"] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5003	hence "z : f -` (rel_interior S)" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5004	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5005	ultimately show ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5006	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5007
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5008
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5009	lemma convex_direct_sum:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5010	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5011	fixes T :: "('m::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5012	assumes "convex S" "convex T"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5013	shows "convex (S <*> T)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5014	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5015	{
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5016	fix x assume "x : S <*> T"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5017	from this obtain xs xt where xst_def: "xs : S & xt : T & (xs,xt) = x" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5018	fix y assume "y : S <*> T"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5019	from this obtain ys yt where yst_def: "ys : S & yt : T & (ys,yt) = y" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5020	fix u v assume uv_def: "(u :: real)>=0 & (v :: real)>=0 & u+v=1"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5021	have "u \<^sub>R x + v \<^sub>R y = (u \<^sub>R xs + v \<^sub>R ys, u \<^sub>R xt + v \<^sub>R yt)" using xst_def yst_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5022	moreover have "u \<^sub>R xs + v \<^sub>R ys : S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5023	using uv_def xst_def yst_def convex_def[of S] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5024	moreover have "u \<^sub>R xt + v \<^sub>R yt : T"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5025	using uv_def xst_def yst_def convex_def[of T] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5026	ultimately have "u \<^sub>R x + v \<^sub>R y : S <*> T" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5027	} from this show ?thesis unfolding convex_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5028	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5029
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5030
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5031	lemma convex_hull_direct_sum:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5032	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5033	fixes T :: "('m::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5034	shows "convex hull (S <> T) = (convex hull S) <> (convex hull T)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5035	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5036	{ fix x assume "x : (convex hull S) <*> (convex hull T)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5037	from this obtain xs xt where xst_def: "xs : convex hull S & xt : convex hull T & (xs,xt) = x" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5038	from xst_def obtain sI su where s: "finite sI & sI <= S & (ALL x:sI. 0 <= su x) & setsum su sI = 1
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5039	& (SUM v:sI. su v *\<^sub>R v) = xs" using convex_hull_explicit[of S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5040	from xst_def obtain tI tu where t: "finite tI & tI <= T & (ALL x:tI. 0 <= tu x) & setsum tu tI = 1
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5041	& (SUM v:tI. tu v *\<^sub>R v) = xt" using convex_hull_explicit[of T] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5042	def I == "(sI <*> tI)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5043	def u == "(%i. (su (fst i))*(tu(snd i)))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5044	have "fst (SUM v:sI <> tI. (su (fst v) tu (snd v)) *\<^sub>R v)=
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5045	(SUM vs:sI. SUM vt:tI. (su vs * tu vt) *\<^sub>R vs)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5046	using fst_setsum[of "(%v. (su (fst v) * tu (snd v)) \<^sub>R v)" "sI <> tI"]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5047	by (simp add: split_def scaleR_prod_def setsum_cartesian_product)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5048	also have "...=(SUM vt:tI. tu vt \<^sub>R (SUM vs:sI. su vs \<^sub>R vs))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5049	using setsum_commute[of "(%vt vs. (su vs * tu vt) *\<^sub>R vs)" sI tI]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5050	by (simp add: mult_commute scaleR_right.setsum)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5051	also have "...=(SUM vt:tI. tu vt *\<^sub>R xs)" using s by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5052	also have "...=(SUM vt:tI. tu vt) *\<^sub>R xs" by (simp add: scaleR_left.setsum)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5053	also have "...=xs" using t by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5054	finally have h1: "fst (SUM v:sI <> tI. (su (fst v) tu (snd v)) *\<^sub>R v)=xs" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5055	have "snd (SUM v:sI <> tI. (su (fst v) tu (snd v)) *\<^sub>R v)=
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5056	(SUM vs:sI. SUM vt:tI. (su vs * tu vt) *\<^sub>R vt)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5057	using snd_setsum[of "(%v. (su (fst v) * tu (snd v)) \<^sub>R v)" "sI <> tI"]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5058	by (simp add: split_def scaleR_prod_def setsum_cartesian_product)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5059	also have "...=(SUM vs:sI. su vs \<^sub>R (SUM vt:tI. tu vt \<^sub>R vt))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5060	by (simp add: mult_commute scaleR_right.setsum)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5061	also have "...=(SUM vs:sI. su vs *\<^sub>R xt)" using t by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5062	also have "...=(SUM vs:sI. su vs) *\<^sub>R xt" by (simp add: scaleR_left.setsum)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5063	also have "...=xt" using s by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5064	finally have h2: "snd (SUM v:sI <> tI. (su (fst v) tu (snd v)) *\<^sub>R v)=xt" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5065	from h1 h2 have "(SUM v:sI <> tI. (su (fst v) tu (snd v)) *\<^sub>R v) = x" using xst_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5066
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5067	moreover have "finite I & (I <= S <*> T)" using s t I_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5068	moreover have "!i:I. 0 <= u i" using s t I_def u_def by (simp add: mult_nonneg_nonneg)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5069	moreover have "setsum u I = 1" using u_def I_def setsum_cartesian_product[of "(% x y. (su x)*(tu y))"]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5070	s t setsum_product[of su sI tu tI] by (auto simp add: split_def)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5071	ultimately have "x : convex hull (S <*> T)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5072	apply (subst convex_hull_explicit[of "S <*> T"]) apply rule
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5073	apply (rule_tac x="I" in exI) apply (rule_tac x="u" in exI)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5074	using I_def u_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5075	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5076	hence "convex hull (S <> T) >= (convex hull S) <> (convex hull T)" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5077	moreover have "(convex hull S) <*> (convex hull T) : convex"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5078	unfolding mem_def by (simp add: convex_direct_sum convex_convex_hull)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5079	ultimately show ?thesis
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5080	using hull_minimal[of "S <> T" "(convex hull S) <> (convex hull T)" "convex"]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5081	hull_subset[of S convex] hull_subset[of T convex] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5082	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5083
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5084	lemma rel_interior_direct_sum:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5085	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5086	fixes T :: "('m::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5087	assumes "convex S" "convex T"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5088	shows "rel_interior (S <> T) = rel_interior S <> rel_interior T"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5089	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5090	{ assume "S={}" hence ?thesis apply auto using rel_interior_empty by auto }
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5091	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5092	{ assume "T={}" hence ?thesis apply auto using rel_interior_empty by auto }
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5093	moreover {
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5094	assume "S ~={}" "T ~={}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5095	hence ri: "rel_interior S ~= {}" "rel_interior T ~= {}" using rel_interior_convex_nonempty assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5096	hence "fst -` rel_interior S ~= {}" using fst_vimage_eq_Times[of "rel_interior S"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5097	hence "rel_interior ((fst :: 'n * 'm => 'n) -` S) = fst -` rel_interior S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5098	using fst_linear `convex S` rel_interior_convex_linear_preimage[of fst S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5099	hence s: "rel_interior (S <> (UNIV :: 'm set)) = rel_interior S <> UNIV" by (simp add: fst_vimage_eq_Times)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5100	from ri have "snd -` rel_interior T ~= {}" using snd_vimage_eq_Times[of "rel_interior T"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5101	hence "rel_interior ((snd :: 'n * 'm => 'm) -` T) = snd -` rel_interior T"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5102	using snd_linear `convex T` rel_interior_convex_linear_preimage[of snd T] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5103	hence t: "rel_interior ((UNIV :: 'n set) <> T) = UNIV <> rel_interior T" by (simp add: snd_vimage_eq_Times)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5104	from s t have : "rel_interior (S <> (UNIV :: 'm set)) Int rel_interior ((UNIV :: 'n set) <*> T)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5105	= rel_interior S <*> rel_interior T" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5106	have "(S <> T) = (S <> (UNIV :: 'm set)) Int ((UNIV :: 'n set) <*> T)" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5107	hence "rel_interior (S <> T) = rel_interior ((S <> (UNIV :: 'm set)) Int ((UNIV :: 'n set) <*> T))" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5108	also have "...=rel_interior (S <> (UNIV :: 'm set)) Int rel_interior ((UNIV :: 'n set) <> T)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5109	apply (subst convex_rel_interior_inter_two[of "S <> (UNIV :: 'm set)" "(UNIV :: 'n set) <> T"])
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5110	using * ri assms convex_direct_sum by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5111	finally have ?thesis using * by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5112	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5113	ultimately show ?thesis by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5114	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5115
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5116	lemma rel_interior_scaleR:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5117	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5118	assumes "c ~= 0"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5119	shows "(op \<^sub>R c) ` (rel_interior S) = rel_interior ((op \<^sub>R c) ` S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5120	using rel_interior_injective_linear_image[of "(op *\<^sub>R c)" S]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5121	linear_conv_bounded_linear[of "op *\<^sub>R c"] linear_scaleR injective_scaleR[of c] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5122
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5123	lemma rel_interior_convex_scaleR:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5124	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5125	assumes "convex S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5126	shows "(op \<^sub>R c) ` (rel_interior S) = rel_interior ((op \<^sub>R c) ` S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5127	by (metis assms linear_scaleR rel_interior_convex_linear_image)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5128
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5129	lemma convex_rel_open_scaleR:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5130	fixes S :: "('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5131	assumes "convex S" "rel_open S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5132	shows "convex ((op \<^sub>R c) ` S) & rel_open ((op \<^sub>R c) ` S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5133	by (metis assms convex_scaling rel_interior_convex_scaleR rel_open_def)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5134
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5135
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5136	lemma convex_rel_open_finite_inter:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5137	assumes "!S : I. (convex (S :: ('n::euclidean_space) set) & rel_open S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5138	assumes "finite I"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5139	shows "convex (Inter I) & rel_open (Inter I)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5140	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5141	{ assume "Inter {rel_interior S \|S. S : I} = {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5142	hence "Inter I = {}" using assms unfolding rel_open_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5143	hence ?thesis unfolding rel_open_def using rel_interior_empty by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5144	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5145	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5146	{ assume "Inter {rel_interior S \|S. S : I} ~= {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5147	hence "rel_open (Inter I)" using assms unfolding rel_open_def
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5148	using convex_rel_interior_finite_inter[of I] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5149	hence ?thesis using convex_Inter assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5150	} ultimately show ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5151	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5152
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5153	lemma convex_rel_open_linear_image:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5154	fixes f :: "('m::euclidean_space) => ('n::euclidean_space)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5155	assumes "linear f"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5156	assumes "convex S" "rel_open S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5157	shows "convex (f ` S) & rel_open (f ` S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5158	by (metis assms convex_linear_image rel_interior_convex_linear_image
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5159	linear_conv_bounded_linear rel_open_def)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5160
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5161	lemma convex_rel_open_linear_preimage:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5162	fixes f :: "('m::euclidean_space) => ('n::euclidean_space)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5163	assumes "linear f"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5164	assumes "convex S" "rel_open S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5165	shows "convex (f -` S) & rel_open (f -` S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5166	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5167	{ assume "f -` (rel_interior S) = {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5168	hence "f -` S = {}" using assms unfolding rel_open_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5169	hence ?thesis unfolding rel_open_def using rel_interior_empty by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5170	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5171	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5172	{ assume "f -` (rel_interior S) ~= {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5173	hence "rel_open (f -` S)" using assms unfolding rel_open_def
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5174	using rel_interior_convex_linear_preimage[of f S] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5175	hence ?thesis using convex_linear_preimage assms linear_conv_bounded_linear by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5176	} ultimately show ?thesis by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5177	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5178
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5179	lemma rel_interior_projection:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5180	fixes S :: "('m::euclidean_space*'n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5181	fixes f :: "'m::euclidean_space => ('n::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5182	assumes "convex S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5183	assumes "f = (%y. {z. (y,z) : S})"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5184	shows "(y,z) : rel_interior S <-> (y : rel_interior {y. (f y ~= {})} & z : rel_interior (f y))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5185	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5186	{ fix y assume "y : {y. (f y ~= {})}" from this obtain z where "(y,z) : S" using assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5187	hence "EX x. x : S & y = fst x" apply (rule_tac x="(y,z)" in exI) by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5188	from this obtain x where "x : S & y = fst x" by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5189	hence "y : fst ` S" unfolding image_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5190	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5191	hence "fst ` S = {y. (f y ~= {})}" unfolding fst_def using assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5192	hence h1: "fst ` rel_interior S = rel_interior {y. (f y ~= {})}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5193	using rel_interior_convex_linear_image[of fst S] assms fst_linear by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5194	{ fix y assume "y : rel_interior {y. (f y ~= {})}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5195	hence "y : fst ` rel_interior S" using h1 by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5196	hence *: "rel_interior S Int fst -` {y} ~= {}" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5197	moreover have aff: "affine (fst -` {y})" unfolding affine_alt by (simp add: algebra_simps)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5198	ultimately have **: "rel_interior (S Int fst -` {y}) = rel_interior S Int fst -` {y}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5199	using convex_affine_rel_interior_inter[of S "fst -` {y}"] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5200	have conv: "convex (S Int fst -` {y})" using convex_Int assms aff affine_imp_convex by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5201	{ fix x assume "x : f y"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5202	hence "(y,x) : S Int (fst -` {y})" using assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5203	moreover have "x = snd (y,x)" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5204	ultimately have "x : snd ` (S Int fst -` {y})" by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5205	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5206	hence "snd ` (S Int fst -` {y}) = f y" using assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5207	hence ***: "rel_interior (f y) = snd ` rel_interior (S Int fst -` {y})"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5208	using rel_interior_convex_linear_image[of snd "S Int fst -` {y}"] snd_linear conv by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5209	{ fix z assume "z : rel_interior (f y)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5210	hence "z : snd ` rel_interior (S Int fst -` {y})" using *** by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5211	moreover have "{y} = fst ` rel_interior (S Int fst -` {y})" using * ** rel_interior_subset by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5212	ultimately have "(y,z) : rel_interior (S Int fst -` {y})" by force
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5213	hence "(y,z) : rel_interior S" using ** by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5214	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5215	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5216	{ fix z assume "(y,z) : rel_interior S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5217	hence "(y,z) : rel_interior (S Int fst -` {y})" using ** by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5218	hence "z : snd ` rel_interior (S Int fst -` {y})" by (metis Range_iff snd_eq_Range)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5219	hence "z : rel_interior (f y)" using *** by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5220	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5221	ultimately have "!!z. (y,z) : rel_interior S <-> z : rel_interior (f y)" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5222	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5223	hence h2: "!!y z. y : rel_interior {t. f t ~= {}} ==> ((y, z) : rel_interior S) = (z : rel_interior (f y))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5224	by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5225	{ fix y z assume asm: "(y, z) : rel_interior S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5226	hence "y : fst ` rel_interior S" by (metis Domain_iff fst_eq_Domain)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5227	hence "y : rel_interior {t. f t ~= {}}" using h1 by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5228	hence "y : rel_interior {t. f t ~= {}} & (z : rel_interior (f y))" using h2 asm by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5229	} from this show ?thesis using h2 by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5230	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5231
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5232	subsection{* Relative interior of convex cone *}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5233
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5234	lemma cone_rel_interior:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5235	fixes S :: "('m::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5236	assumes "cone S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5237	shows "cone ({0} Un (rel_interior S))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5238	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5239	{ assume "S = {}" hence ?thesis by (simp add: rel_interior_empty cone_0) }
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5240	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5241	{ assume "S ~= {}" hence : "0:S & (!c. c>0 --> op \<^sub>R c ` S = S)" using cone_iff[of S] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5242	hence *: "0:({0} Un (rel_interior S)) &
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5243	(!c. c>0 --> op *\<^sub>R c ` ({0} Un rel_interior S) = ({0} Un rel_interior S))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5244	by (auto simp add: rel_interior_scaleR)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5245	hence ?thesis using cone_iff[of "{0} Un rel_interior S"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5246	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5247	ultimately show ?thesis by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5248	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5249
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5250	lemma rel_interior_convex_cone_aux:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5251	fixes S :: "('m::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5252	assumes "convex S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5253	shows "(c,x) : rel_interior (cone hull ({(1 :: real)} <*> S)) <->
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5254	c>0 & x : ((op *\<^sub>R c) ` (rel_interior S))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5255	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5256	{ assume "S={}" hence ?thesis by (simp add: rel_interior_empty cone_hull_empty) }
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5257	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5258	{ assume "S ~= {}" from this obtain s where "s : S" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5259	have conv: "convex ({(1 :: real)} <*> S)" using convex_direct_sum[of "{(1 :: real)}" S]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5260	assms convex_singleton[of "1 :: real"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5261	def f == "(%y. {z. (y,z) : cone hull ({(1 :: real)} <*> S)})"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5262	hence : "(c, x) : rel_interior (cone hull ({(1 :: real)} <> S)) =
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5263	(c : rel_interior {y. f y ~= {}} & x : rel_interior (f c))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5264	apply (subst rel_interior_projection[of "cone hull ({(1 :: real)} <*> S)" f c x])
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5265	using convex_cone_hull[of "{(1 :: real)} <*> S"] conv by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5266	{ fix y assume "(y :: real)>=0"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5267	hence "y \<^sub>R (1,s) : cone hull ({(1 :: real)} <> S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5268	using cone_hull_expl[of "{(1 :: real)} <*> S"] `s:S` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5269	hence "f y ~= {}" using f_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5270	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5271	hence "{y. f y ~= {}} = {0..}" using f_def cone_hull_expl[of "{(1 :: real)} <*> S"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5272	hence **: "rel_interior {y. f y ~= {}} = {0<..}" using rel_interior_real_semiline by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5273	{ fix c assume "c>(0 :: real)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5274	hence "f c = (op \<^sub>R c ` S)" using f_def cone_hull_expl[of "{(1 :: real)} <> S"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5275	hence "rel_interior (f c)= (op *\<^sub>R c ` rel_interior S)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5276	using rel_interior_convex_scaleR[of S c] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5277	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5278	hence ?thesis using * ** by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5279	} ultimately show ?thesis by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5280	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5281
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5282
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5283	lemma rel_interior_convex_cone:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5284	fixes S :: "('m::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5285	assumes "convex S"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5286	shows "rel_interior (cone hull ({(1 :: real)} <*> S)) =
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5287	{(c,c *\<^sub>R x) \|c x. c>0 & x : (rel_interior S)}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5288	(is "?lhs=?rhs")
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5289	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5290	{ fix z assume "z:?lhs"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5291	have *: "z=(fst z,snd z)" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5292	have "z:?rhs" using rel_interior_convex_cone_aux[of S "fst z" "snd z"] assms `z:?lhs` apply auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5293	apply (rule_tac x="fst z" in exI) apply (rule_tac x="x" in exI) using * by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5294	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5295	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5296	{ fix z assume "z:?rhs" hence "z:?lhs"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5297	using rel_interior_convex_cone_aux[of S "fst z" "snd z"] assms by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5298	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5299	ultimately show ?thesis by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5300	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5301
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5302	lemma convex_hull_finite_union:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5303	assumes "finite I"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5304	assumes "!i:I. (convex (S i) & (S i) ~= {})"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5305	shows "convex hull (Union (S ` I)) =
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5306	{setsum (%i. c i *\<^sub>R s i) I \|c s. (!i:I. c i >= 0) & (setsum c I = 1) & (!i:I. s i : S i)}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5307	(is "?lhs = ?rhs")
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5308	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5309	{ fix x assume "x : ?rhs"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5310	from this obtain c s
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5311	where : "setsum (%i. c i \<^sub>R s i) I=x" "(setsum c I = 1)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5312	"(!i:I. c i >= 0) & (!i:I. s i : S i)" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5313	hence "!i:I. s i : convex hull (Union (S ` I))" using hull_subset[of "Union (S ` I)" convex] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5314	hence "x : ?lhs" unfolding *(1)[THEN sym]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5315	apply (subst convex_setsum[of I "convex hull Union (S ` I)" c s])
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5316	using * assms convex_convex_hull by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5317	} hence "?lhs >= ?rhs" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5318
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5319	{ fix i assume "i:I"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5320	from this assms have "EX p. p : S i" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5321	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5322	from this obtain p where p_def: "!i:I. p i : S i" by metis
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5323
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5324	{ fix i assume "i:I"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5325	{ fix x assume "x : S i"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5326	def c == "(%j. if (j=i) then (1::real) else 0)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5327	hence *: "setsum c I = 1" using `finite I` `i:I` setsum_delta[of I i "(%(j::'a). (1::real))"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5328	def s == "(%j. if (j=i) then x else p j)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5329	hence "!j. c j *\<^sub>R s j = (if (j=i) then x else 0)" using c_def by (auto simp add: algebra_simps)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5330	hence "x = setsum (%i. c i *\<^sub>R s i) I"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5331	using s_def c_def `finite I` `i:I` setsum_delta[of I i "(%(j::'a). x)"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5332	hence "x : ?rhs" apply auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5333	apply (rule_tac x="c" in exI)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5334	apply (rule_tac x="s" in exI) using * c_def s_def p_def `x : S i` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5335	} hence "?rhs >= S i" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5336	} hence *: "?rhs >= Union (S ` I)" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5337
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5338	{ fix u v assume uv: "(u :: real)>=0 & v>=0 & u+v=1"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5339	fix x y assume xy: "(x : ?rhs) & (y : ?rhs)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5340	from xy obtain c s where xc: "x=setsum (%i. c i *\<^sub>R s i) I &
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5341	(!i:I. c i >= 0) & (setsum c I = 1) & (!i:I. s i : S i)" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5342	from xy obtain d t where yc: "y=setsum (%i. d i *\<^sub>R t i) I &
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5343	(!i:I. d i >= 0) & (setsum d I = 1) & (!i:I. t i : S i)" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5344	def e == "(%i. u * (c i)+v * (d i))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5345	have ge0: "!i:I. e i >= 0" using e_def xc yc uv by (simp add: mult_nonneg_nonneg)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5346	have "setsum (%i. u * c i) I = u * setsum c I" by (simp add: setsum_right_distrib)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5347	moreover have "setsum (%i. v * d i) I = v * setsum d I" by (simp add: setsum_right_distrib)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5348	ultimately have sum1: "setsum e I = 1" using e_def xc yc uv by (simp add: setsum_addf)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5349	def q == "(%i. if (e i = 0) then (p i)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5350	else (u * (c i)/(e i))\<^sub>R (s i)+(v (d i)/(e i))*\<^sub>R (t i))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5351	{ fix i assume "i:I"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5352	{ assume "e i = 0" hence "q i : S i" using `i:I` p_def q_def by auto }
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5353	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5354	{ assume "e i ~= 0"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5355	hence "q i : S i" using mem_convex_alt[of "S i" "s i" "t i" "u * (c i)" "v * (d i)"]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5356	mult_nonneg_nonneg[of u "c i"] mult_nonneg_nonneg[of v "d i"]
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5357	assms q_def e_def `i:I` `e i ~= 0` xc yc uv by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5358	} ultimately have "q i : S i" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5359	} hence qs: "!i:I. q i : S i" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5360	{ fix i assume "i:I"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5361	{ assume "e i = 0"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5362	have ge: "u * (c i) >= 0 & v * (d i) >= 0" using xc yc uv `i:I` by (simp add: mult_nonneg_nonneg)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5363	moreover hence "u * (c i) <= 0 & v * (d i) <= 0" using `e i = 0` e_def `i:I` by simp
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5364	ultimately have "u * (c i) = 0 & v * (d i) = 0" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5365	hence "(u * (c i))\<^sub>R (s i)+(v (d i))\<^sub>R (t i) = (e i) \<^sub>R (q i)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5366	using `e i = 0` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5367	}
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5368	moreover
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5369	{ assume "e i ~= 0"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5370	hence "(u * (c i)/(e i))\<^sub>R (s i)+(v (d i)/(e i))*\<^sub>R (t i) = q i"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5371	using q_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5372	hence "e i \<^sub>R ((u (c i)/(e i))\<^sub>R (s i)+(v (d i)/(e i))*\<^sub>R (t i))
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5373	= (e i) *\<^sub>R (q i)" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5374	hence "(u * (c i))\<^sub>R (s i)+(v (d i))\<^sub>R (t i) = (e i) \<^sub>R (q i)"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5375	using `e i ~= 0` by (simp add: algebra_simps)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5376	} ultimately have
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5377	"(u * (c i))\<^sub>R (s i)+(v (d i))\<^sub>R (t i) = (e i) \<^sub>R (q i)" by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5378	} hence *: "!i:I.
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5379	(u * (c i))\<^sub>R (s i)+(v (d i))\<^sub>R (t i) = (e i) \<^sub>R (q i)" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5380	have "u \<^sub>R x + v \<^sub>R y =
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5381	setsum (%i. (u * (c i))\<^sub>R (s i)+(v (d i))*\<^sub>R (t i)) I"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5382	using xc yc by (simp add: algebra_simps scaleR_right.setsum setsum_addf)
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5383	also have "...=setsum (%i. (e i) \<^sub>R (q i)) I" using by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5384	finally have "u \<^sub>R x + v \<^sub>R y = setsum (%i. (e i) *\<^sub>R (q i)) I" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5385	hence "u \<^sub>R x + v \<^sub>R y : ?rhs" using ge0 sum1 qs by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5386	} hence "convex ?rhs" unfolding convex_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5387	hence "?rhs : convex" unfolding mem_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5388	from this show ?thesis using `?lhs >= ?rhs` *
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5389	hull_minimal[of "Union (S ` I)" "?rhs" "convex"] by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5390	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5391
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5392	lemma convex_hull_union_two:
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5393	fixes S T :: "('m::euclidean_space) set"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5394	assumes "convex S" "S ~= {}" "convex T" "T ~= {}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5395	shows "convex hull (S Un T) = {u \<^sub>R s + v \<^sub>R t \|u v s t. u>=0 & v>=0 & u+v=1 & s:S & t:T}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5396	(is "?lhs = ?rhs")
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5397	proof-
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5398	def I == "{(1::nat),2}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5399	def s == "(%i. (if i=(1::nat) then S else T))"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5400	have "Union (s ` I) = S Un T" using s_def I_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5401	hence "convex hull (Union (s ` I)) = convex hull (S Un T)" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5402	moreover have "convex hull Union (s ` I) =
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5403	{SUM i:I. c i *\<^sub>R sa i \|c sa. (ALL i:I. 0 <= c i) & setsum c I = 1 & (ALL i:I. sa i : s i)}"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5404	apply (subst convex_hull_finite_union[of I s]) using assms s_def I_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5405	moreover have
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5406	"{SUM i:I. c i *\<^sub>R sa i \|c sa. (ALL i:I. 0 <= c i) & setsum c I = 1 & (ALL i:I. sa i : s i)} <=
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5407	?rhs"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5408	using s_def I_def by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5409	ultimately have "?lhs<=?rhs" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5410	{ fix x assume "x : ?rhs"
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5411	from this obtain u v s t
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5412	where : "x=u \<^sub>R s + v *\<^sub>R t & u>=0 & v>=0 & u+v=1 & s:S & t:T" by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5413	hence "x : convex hull {s,t}" using convex_hull_2[of s t] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5414	hence "x : convex hull (S Un T)" using * hull_mono[of "{s, t}" "S Un T"] by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5415	} hence "?lhs >= ?rhs" by blast
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5416	from this show ?thesis using `?lhs<=?rhs` by auto
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5417	qed
0e5d48096f58 Extend convex analysis by Bogdan Grechuk hoelzl parents: 39302 diff changeset	5418
40887 ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5419	subsection {* Convexity on direct sums *}
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5420
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5421	lemma closure_sum:
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5422	fixes S T :: "('n::euclidean_space) set"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5423	shows "closure S \<oplus> closure T \<subseteq> closure (S \<oplus> T)"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5424	proof-
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5425	have "(closure S) \<oplus> (closure T) = (\<lambda>(x,y). x + y) ` (closure S \<times> closure T)"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5426	by (simp add: set_plus_image)
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5427	also have "... = (\<lambda>(x,y). x + y) ` closure (S \<times> T)"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5428	using closure_direct_sum by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5429	also have "... \<subseteq> closure (S \<oplus> T)"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5430	using fst_snd_linear closure_linear_image[of "(\<lambda>(x,y). x + y)" "S \<times> T"]
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5431	by (auto simp: set_plus_image)
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5432	finally show ?thesis
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5433	by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5434	qed
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5435
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5436	lemma convex_oplus:
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5437	fixes S T :: "('n::euclidean_space) set"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5438	assumes "convex S" "convex T"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5439	shows "convex (S \<oplus> T)"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5440	proof-
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5441	have "{x + y \|x y. x : S & y : T} = {c. EX a:S. EX b:T. c = a + b}" by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5442	thus ?thesis unfolding set_plus_def using convex_sums[of S T] assms by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5443	qed
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5444
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5445	lemma convex_hull_sum:
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5446	fixes S T :: "('n::euclidean_space) set"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5447	shows "convex hull (S \<oplus> T) = (convex hull S) \<oplus> (convex hull T)"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5448	proof-
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5449	have "(convex hull S) \<oplus> (convex hull T) =
40897 1eb1b2f9d062 adapt proofs to changed set_plus_image (cf. ee8d0548c148); hoelzl parents: 40887 diff changeset	5450	(%(x,y). x + y) ` ((convex hull S) <*> (convex hull T))"
40887 ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5451	by (simp add: set_plus_image)
40897 1eb1b2f9d062 adapt proofs to changed set_plus_image (cf. ee8d0548c148); hoelzl parents: 40887 diff changeset	5452	also have "... = (%(x,y). x + y) ` (convex hull (S <*> T))" using convex_hull_direct_sum by auto
40887 ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5453	also have "...= convex hull (S \<oplus> T)" using fst_snd_linear linear_conv_bounded_linear
40897 1eb1b2f9d062 adapt proofs to changed set_plus_image (cf. ee8d0548c148); hoelzl parents: 40887 diff changeset	5454	convex_hull_linear_image[of "(%(x,y). x + y)" "S <*> T"] by (auto simp add: set_plus_image)
40887 ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5455	finally show ?thesis by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5456	qed
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5457
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5458	lemma rel_interior_sum:
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5459	fixes S T :: "('n::euclidean_space) set"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5460	assumes "convex S" "convex T"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5461	shows "rel_interior (S \<oplus> T) = (rel_interior S) \<oplus> (rel_interior T)"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5462	proof-
40897 1eb1b2f9d062 adapt proofs to changed set_plus_image (cf. ee8d0548c148); hoelzl parents: 40887 diff changeset	5463	have "(rel_interior S) \<oplus> (rel_interior T) = (%(x,y). x + y) ` (rel_interior S <*> rel_interior T)"
40887 ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5464	by (simp add: set_plus_image)
40897 1eb1b2f9d062 adapt proofs to changed set_plus_image (cf. ee8d0548c148); hoelzl parents: 40887 diff changeset	5465	also have "... = (%(x,y). x + y) ` rel_interior (S <*> T)" using rel_interior_direct_sum assms by auto
40887 ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5466	also have "...= rel_interior (S \<oplus> T)" using fst_snd_linear convex_direct_sum assms
40897 1eb1b2f9d062 adapt proofs to changed set_plus_image (cf. ee8d0548c148); hoelzl parents: 40887 diff changeset	5467	rel_interior_convex_linear_image[of "(%(x,y). x + y)" "S <*> T"] by (auto simp add: set_plus_image)
40887 ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5468	finally show ?thesis by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5469	qed
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5470
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5471	lemma convex_sum_gen:
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5472	fixes S :: "'a \<Rightarrow> 'n::euclidean_space set"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5473	assumes "\<And>i. i \<in> I \<Longrightarrow> (convex (S i))"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5474	shows "convex (setsum_set S I)"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5475	proof cases
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5476	assume "finite I" from this assms show ?thesis
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5477	by induct (auto simp: convex_oplus)
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5478	qed auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5479
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5480	lemma convex_hull_sum_gen:
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5481	fixes S :: "'a => ('n::euclidean_space) set"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5482	shows "convex hull (setsum_set S I) = setsum_set (%i. (convex hull (S i))) I"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5483	apply (subst setsum_set_linear) using convex_hull_sum convex_hull_singleton by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5484
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5485
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5486	lemma rel_interior_sum_gen:
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5487	fixes S :: "'a => ('n::euclidean_space) set"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5488	assumes "!i:I. (convex (S i))"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5489	shows "rel_interior (setsum_set S I) = setsum_set (%i. (rel_interior (S i))) I"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5490	apply (subst setsum_set_cond_linear[of convex])
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5491	using rel_interior_sum rel_interior_sing[of "0"] assms by (auto simp add: convex_oplus)
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5492
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5493	lemma convex_rel_open_direct_sum:
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5494	fixes S T :: "('n::euclidean_space) set"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5495	assumes "convex S" "rel_open S" "convex T" "rel_open T"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5496	shows "convex (S <> T) & rel_open (S <> T)"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5497	by (metis assms convex_direct_sum rel_interior_direct_sum rel_open_def)
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5498
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5499	lemma convex_rel_open_sum:
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5500	fixes S T :: "('n::euclidean_space) set"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5501	assumes "convex S" "rel_open S" "convex T" "rel_open T"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5502	shows "convex (S \<oplus> T) & rel_open (S \<oplus> T)"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5503	by (metis assms convex_oplus rel_interior_sum rel_open_def)
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5504
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5505	lemma convex_hull_finite_union_cones:
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5506	assumes "finite I" "I ~= {}"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5507	assumes "!i:I. (convex (S i) & cone (S i) & (S i) ~= {})"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5508	shows "convex hull (Union (S ` I)) = setsum_set S I"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5509	(is "?lhs = ?rhs")
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5510	proof-
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5511	{ fix x assume "x : ?lhs"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5512	from this obtain c xs where x_def: "x=setsum (%i. c i *\<^sub>R xs i) I &
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5513	(!i:I. c i >= 0) & (setsum c I = 1) & (!i:I. xs i : S i)"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5514	using convex_hull_finite_union[of I S] assms by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5515	def s == "(%i. c i *\<^sub>R xs i)"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5516	{ fix i assume "i:I"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5517	hence "s i : S i" using s_def x_def assms mem_cone[of "S i" "xs i" "c i"] by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5518	} hence "!i:I. s i : S i" by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5519	moreover have "x = setsum s I" using x_def s_def by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5520	ultimately have "x : ?rhs" using set_setsum_alt[of I S] assms by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5521	}
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5522	moreover
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5523	{ fix x assume "x : ?rhs"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5524	from this obtain s where x_def: "x=setsum s I & (!i:I. s i : S i)"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5525	using set_setsum_alt[of I S] assms by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5526	def xs == "(%i. of_nat(card I) *\<^sub>R s i)"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5527	hence "x=setsum (%i. ((1 :: real)/of_nat(card I)) *\<^sub>R xs i) I" using x_def assms by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5528	moreover have "!i:I. xs i : S i" using x_def xs_def assms by (simp add: cone_def)
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5529	moreover have "(!i:I. (1 :: real)/of_nat(card I) >= 0)" by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5530	moreover have "setsum (%i. (1 :: real)/of_nat(card I)) I = 1" using assms by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5531	ultimately have "x : ?lhs" apply (subst convex_hull_finite_union[of I S])
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5532	using assms apply blast
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5533	using assms apply blast
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5534	apply rule apply (rule_tac x="(%i. (1 :: real)/of_nat(card I))" in exI) by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5535	} ultimately show ?thesis by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5536	qed
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5537
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5538	lemma convex_hull_union_cones_two:
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5539	fixes S T :: "('m::euclidean_space) set"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5540	assumes "convex S" "cone S" "S ~= {}"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5541	assumes "convex T" "cone T" "T ~= {}"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5542	shows "convex hull (S Un T) = S \<oplus> T"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5543	proof-
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5544	def I == "{(1::nat),2}"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5545	def A == "(%i. (if i=(1::nat) then S else T))"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5546	have "Union (A ` I) = S Un T" using A_def I_def by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5547	hence "convex hull (Union (A ` I)) = convex hull (S Un T)" by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5548	moreover have "convex hull Union (A ` I) = setsum_set A I"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5549	apply (subst convex_hull_finite_union_cones[of I A]) using assms A_def I_def by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5550	moreover have
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5551	"setsum_set A I = S \<oplus> T" using A_def I_def
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5552	unfolding set_plus_def apply auto unfolding set_plus_def by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5553	ultimately show ?thesis by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5554	qed
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5555
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5556	lemma rel_interior_convex_hull_union:
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5557	fixes S :: "'a => ('n::euclidean_space) set"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5558	assumes "finite I"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5559	assumes "!i:I. convex (S i) & (S i) ~= {}"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5560	shows "rel_interior (convex hull (Union (S ` I))) = {setsum (%i. c i *\<^sub>R s i) I
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5561	\|c s. (!i:I. c i > 0) & (setsum c I = 1) & (!i:I. s i : rel_interior(S i))}"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5562	(is "?lhs=?rhs")
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5563	proof-
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5564	{ assume "I={}" hence ?thesis using convex_hull_empty rel_interior_empty by auto }
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5565	moreover
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5566	{ assume "I ~= {}"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5567	def C0 == "convex hull (Union (S ` I))"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5568	have "!i:I. C0 >= S i" unfolding C0_def using hull_subset[of "Union (S ` I)"] by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5569	def K0 == "cone hull ({(1 :: real)} <*> C0)"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5570	def K == "(%i. cone hull ({(1 :: real)} <*> (S i)))"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5571	have "!i:I. K i ~= {}" unfolding K_def using assms by (simp add: cone_hull_empty_iff[symmetric])
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5572	{ fix i assume "i:I"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5573	hence "convex (K i)" unfolding K_def apply (subst convex_cone_hull) apply (subst convex_direct_sum)
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5574	using assms by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5575	}
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5576	hence convK: "!i:I. convex (K i)" by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5577	{ fix i assume "i:I"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5578	hence "K0 >= K i" unfolding K0_def K_def apply (subst hull_mono) using `!i:I. C0 >= S i` by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5579	}
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5580	hence "K0 >= Union (K ` I)" by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5581	moreover have "K0 : convex" unfolding mem_def K0_def
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5582	apply (subst convex_cone_hull) apply (subst convex_direct_sum)
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5583	unfolding C0_def using convex_convex_hull by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5584	ultimately have geq: "K0 >= convex hull (Union (K ` I))" using hull_minimal[of _ "K0" "convex"] by blast
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5585	have "!i:I. K i >= {(1 :: real)} <*> (S i)" using K_def by (simp add: hull_subset)
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5586	hence "Union (K ` I) >= {(1 :: real)} <*> Union (S ` I)" by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5587	hence "convex hull Union (K ` I) >= convex hull ({(1 :: real)} <*> Union (S ` I))" by (simp add: hull_mono)
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5588	hence "convex hull Union (K ` I) >= {(1 :: real)} <*> C0" unfolding C0_def
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5589	using convex_hull_direct_sum[of "{(1 :: real)}" "Union (S ` I)"] convex_hull_singleton by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5590	moreover have "convex hull(Union (K ` I)) : cone" unfolding mem_def apply (subst cone_convex_hull)
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5591	using cone_Union[of "K ` I"] apply auto unfolding K_def using cone_cone_hull by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5592	ultimately have "convex hull (Union (K ` I)) >= K0"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5593	unfolding K0_def using hull_minimal[of _ "convex hull (Union (K ` I))" "cone"] by blast
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5594	hence "K0 = convex hull (Union (K ` I))" using geq by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5595	also have "...=setsum_set K I"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5596	apply (subst convex_hull_finite_union_cones[of I K])
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5597	using assms apply blast
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5598	using `I ~= {}` apply blast
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5599	unfolding K_def apply rule
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5600	apply (subst convex_cone_hull) apply (subst convex_direct_sum)
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5601	using assms cone_cone_hull `!i:I. K i ~= {}` K_def by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5602	finally have "K0 = setsum_set K I" by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5603	hence *: "rel_interior K0 = setsum_set (%i. (rel_interior (K i))) I"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5604	using rel_interior_sum_gen[of I K] convK by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5605	{ fix x assume "x : ?lhs"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5606	hence "((1::real),x) : rel_interior K0" using K0_def C0_def
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5607	rel_interior_convex_cone_aux[of C0 "(1::real)" x] convex_convex_hull by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5608	from this obtain k where k_def: "((1::real),x) = setsum k I & (!i:I. k i : rel_interior (K i))"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5609	using `finite I` * set_setsum_alt[of I "(%i. rel_interior (K i))"] by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5610	{ fix i assume "i:I"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5611	hence "(convex (S i)) & k i : rel_interior (cone hull {1} <*> S i)" using k_def K_def assms by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5612	hence "EX ci si. k i = (ci, ci *\<^sub>R si) & 0 < ci & si : rel_interior (S i)"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5613	using rel_interior_convex_cone[of "S i"] by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5614	}
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5615	from this obtain c s where cs_def: "!i:I. (k i = (c i, c i *\<^sub>R s i) & 0 < c i
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5616	& s i : rel_interior (S i))" by metis
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5617	hence "x = (SUM i:I. c i *\<^sub>R s i) & setsum c I = 1" using k_def by (simp add: setsum_prod)
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5618	hence "x : ?rhs" using k_def apply auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5619	apply (rule_tac x="c" in exI) apply (rule_tac x="s" in exI) using cs_def by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5620	}
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5621	moreover
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5622	{ fix x assume "x : ?rhs"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5623	from this obtain c s where cs_def: "x=setsum (%i. c i *\<^sub>R s i) I &
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5624	(!i:I. c i > 0) & (setsum c I = 1) & (!i:I. s i : rel_interior(S i))" by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5625	def k == "(%i. (c i, c i *\<^sub>R s i))"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5626	{ fix i assume "i:I"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5627	hence "k i : rel_interior (K i)"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5628	using k_def K_def assms cs_def rel_interior_convex_cone[of "S i"] by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5629	}
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5630	hence "((1::real),x) : rel_interior K0"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5631	using K0_def * set_setsum_alt[of I "(%i. rel_interior (K i))"] assms k_def cs_def
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5632	apply auto apply (rule_tac x="k" in exI) by (simp add: setsum_prod)
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5633	hence "x : ?lhs" using K0_def C0_def
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5634	rel_interior_convex_cone_aux[of C0 "(1::real)" x] by (auto simp add: convex_convex_hull)
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5635	}
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5636	ultimately have ?thesis by blast
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5637	} ultimately show ?thesis by blast
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5638	qed
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 40719 diff changeset	5639
33175 2083bde13ce1 distinguished session for multivariate analysis himmelma parents: diff changeset	5640	end

author	haftmann
	Sat, 30 Jul 2011 08:24:46 +0200
changeset 44008	2e09299ce807
parent 43969	8adc47768db0
child 44125	230a8665c919
permissions	-rw-r--r--