isabelle: src/HOL/Analysis/Convex.thy@fcf5ee85743d (annotated)

70086 72c52a897de2 First tranche of the Homology development: Simplices paulson <lp15@cam.ac.uk> parents: 69802 diff changeset	1	(* Title: HOL/Analysis/Convex.thy
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2	Author: L C Paulson, University of Cambridge
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	3	Author: Robert Himmelmann, TU Muenchen
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	4	Author: Bogdan Grechuk, University of Edinburgh
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	5	Author: Armin Heller, TU Muenchen
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	6	Author: Johannes Hoelzl, TU Muenchen
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	7	*)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	8
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	9	section \<open>Convex Sets and Functions\<close>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	10
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	11	theory Convex
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	12	imports
71242 ec5090faf541 separated Affine theory from Convex nipkow parents: 71240 diff changeset	13	Affine
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	14	"HOL-Library.Set_Algebras"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	15	begin
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	16
71044 cb504351d058 tuned nipkow parents: 71040 diff changeset	17	subsection \<open>Convex Sets\<close>
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	18
70136 f03a01a18c6e modernized tags: default scope excludes proof; wenzelm parents: 70097 diff changeset	19	definition\<^marker>\<open>tag important\<close> convex :: "'a::real_vector set \<Rightarrow> bool"
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	20	where "convex s \<longleftrightarrow> (\<forall>x\<in>s. \<forall>y\<in>s. \<forall>u\<ge>0. \<forall>v\<ge>0. u + v = 1 \<longrightarrow> u \<^sub>R x + v \<^sub>R y \<in> s)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	21
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	22	lemma convexI:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	23	assumes "\<And>x y u v. x \<in> s \<Longrightarrow> y \<in> s \<Longrightarrow> 0 \<le> u \<Longrightarrow> 0 \<le> v \<Longrightarrow> u + v = 1 \<Longrightarrow> u \<^sub>R x + v \<^sub>R y \<in> s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	24	shows "convex s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	25	using assms unfolding convex_def by fast
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	26
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	27	lemma convexD:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	28	assumes "convex s" and "x \<in> s" and "y \<in> s" and "0 \<le> u" and "0 \<le> v" and "u + v = 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	29	shows "u \<^sub>R x + v \<^sub>R y \<in> s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	30	using assms unfolding convex_def by fast
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	31
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	32	lemma convex_alt: "convex s \<longleftrightarrow> (\<forall>x\<in>s. \<forall>y\<in>s. \<forall>u. 0 \<le> u \<and> u \<le> 1 \<longrightarrow> ((1 - u) \<^sub>R x + u \<^sub>R y) \<in> s)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	33	(is "_ \<longleftrightarrow> ?alt")
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	34	proof
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	35	show "convex s" if alt: ?alt
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	36	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	37	{
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	38	fix x y and u v :: real
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	39	assume mem: "x \<in> s" "y \<in> s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	40	assume "0 \<le> u" "0 \<le> v"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	41	moreover
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	42	assume "u + v = 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	43	then have "u = 1 - v" by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	44	ultimately have "u \<^sub>R x + v \<^sub>R y \<in> s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	45	using alt [rule_format, OF mem] by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	46	}
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	47	then show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	48	unfolding convex_def by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	49	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	50	show ?alt if "convex s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	51	using that by (auto simp: convex_def)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	52	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	53
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	54	lemma convexD_alt:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	55	assumes "convex s" "a \<in> s" "b \<in> s" "0 \<le> u" "u \<le> 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	56	shows "((1 - u) \<^sub>R a + u \<^sub>R b) \<in> s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	57	using assms unfolding convex_alt by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	58
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	59	lemma mem_convex_alt:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	60	assumes "convex S" "x \<in> S" "y \<in> S" "u \<ge> 0" "v \<ge> 0" "u + v > 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	61	shows "((u/(u+v)) \<^sub>R x + (v/(u+v)) \<^sub>R y) \<in> S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	62	apply (rule convexD)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	63	using assms
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	64	apply (simp_all add: zero_le_divide_iff add_divide_distrib [symmetric])
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	65	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	66
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	67	lemma convex_empty[intro,simp]: "convex {}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	68	unfolding convex_def by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	69
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	70	lemma convex_singleton[intro,simp]: "convex {a}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	71	unfolding convex_def by (auto simp: scaleR_left_distrib[symmetric])
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	72
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	73	lemma convex_UNIV[intro,simp]: "convex UNIV"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	74	unfolding convex_def by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	75
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	76	lemma convex_Inter: "(\<And>s. s\<in>f \<Longrightarrow> convex s) \<Longrightarrow> convex(\<Inter>f)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	77	unfolding convex_def by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	78
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	79	lemma convex_Int: "convex s \<Longrightarrow> convex t \<Longrightarrow> convex (s \<inter> t)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	80	unfolding convex_def by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	81
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	82	lemma convex_INT: "(\<And>i. i \<in> A \<Longrightarrow> convex (B i)) \<Longrightarrow> convex (\<Inter>i\<in>A. B i)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	83	unfolding convex_def by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	84
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	85	lemma convex_Times: "convex s \<Longrightarrow> convex t \<Longrightarrow> convex (s \<times> t)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	86	unfolding convex_def by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	87
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	88	lemma convex_halfspace_le: "convex {x. inner a x \<le> b}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	89	unfolding convex_def
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	90	by (auto simp: inner_add intro!: convex_bound_le)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	91
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	92	lemma convex_halfspace_ge: "convex {x. inner a x \<ge> b}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	93	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	94	have *: "{x. inner a x \<ge> b} = {x. inner (-a) x \<le> -b}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	95	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	96	show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	97	unfolding * using convex_halfspace_le[of "-a" "-b"] by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	98	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	99
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	100	lemma convex_halfspace_abs_le: "convex {x. \<bar>inner a x\<bar> \<le> b}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	101	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	102	have *: "{x. \<bar>inner a x\<bar> \<le> b} = {x. inner a x \<le> b} \<inter> {x. -b \<le> inner a x}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	103	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	104	show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	105	unfolding * by (simp add: convex_Int convex_halfspace_ge convex_halfspace_le)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	106	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	107
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	108	lemma convex_hyperplane: "convex {x. inner a x = b}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	109	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	110	have *: "{x. inner a x = b} = {x. inner a x \<le> b} \<inter> {x. inner a x \<ge> b}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	111	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	112	show ?thesis using convex_halfspace_le convex_halfspace_ge
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	113	by (auto intro!: convex_Int simp: *)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	114	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	115
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	116	lemma convex_halfspace_lt: "convex {x. inner a x < b}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	117	unfolding convex_def
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	118	by (auto simp: convex_bound_lt inner_add)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	119
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	120	lemma convex_halfspace_gt: "convex {x. inner a x > b}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	121	using convex_halfspace_lt[of "-a" "-b"] by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	122
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	123	lemma convex_halfspace_Re_ge: "convex {x. Re x \<ge> b}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	124	using convex_halfspace_ge[of b "1::complex"] by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	125
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	126	lemma convex_halfspace_Re_le: "convex {x. Re x \<le> b}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	127	using convex_halfspace_le[of "1::complex" b] by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	128
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	129	lemma convex_halfspace_Im_ge: "convex {x. Im x \<ge> b}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	130	using convex_halfspace_ge[of b \<i>] by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	131
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	132	lemma convex_halfspace_Im_le: "convex {x. Im x \<le> b}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	133	using convex_halfspace_le[of \<i> b] by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	134
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	135	lemma convex_halfspace_Re_gt: "convex {x. Re x > b}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	136	using convex_halfspace_gt[of b "1::complex"] by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	137
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	138	lemma convex_halfspace_Re_lt: "convex {x. Re x < b}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	139	using convex_halfspace_lt[of "1::complex" b] by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	140
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	141	lemma convex_halfspace_Im_gt: "convex {x. Im x > b}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	142	using convex_halfspace_gt[of b \<i>] by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	143
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	144	lemma convex_halfspace_Im_lt: "convex {x. Im x < b}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	145	using convex_halfspace_lt[of \<i> b] by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	146
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	147	lemma convex_real_interval [iff]:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	148	fixes a b :: "real"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	149	shows "convex {a..}" and "convex {..b}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	150	and "convex {a<..}" and "convex {..<b}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	151	and "convex {a..b}" and "convex {a<..b}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	152	and "convex {a..<b}" and "convex {a<..<b}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	153	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	154	have "{a..} = {x. a \<le> inner 1 x}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	155	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	156	then show 1: "convex {a..}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	157	by (simp only: convex_halfspace_ge)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	158	have "{..b} = {x. inner 1 x \<le> b}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	159	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	160	then show 2: "convex {..b}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	161	by (simp only: convex_halfspace_le)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	162	have "{a<..} = {x. a < inner 1 x}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	163	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	164	then show 3: "convex {a<..}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	165	by (simp only: convex_halfspace_gt)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	166	have "{..<b} = {x. inner 1 x < b}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	167	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	168	then show 4: "convex {..<b}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	169	by (simp only: convex_halfspace_lt)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	170	have "{a..b} = {a..} \<inter> {..b}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	171	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	172	then show "convex {a..b}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	173	by (simp only: convex_Int 1 2)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	174	have "{a<..b} = {a<..} \<inter> {..b}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	175	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	176	then show "convex {a<..b}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	177	by (simp only: convex_Int 3 2)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	178	have "{a..<b} = {a..} \<inter> {..<b}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	179	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	180	then show "convex {a..<b}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	181	by (simp only: convex_Int 1 4)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	182	have "{a<..<b} = {a<..} \<inter> {..<b}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	183	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	184	then show "convex {a<..<b}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	185	by (simp only: convex_Int 3 4)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	186	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	187
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	188	lemma convex_Reals: "convex \<real>"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	189	by (simp add: convex_def scaleR_conv_of_real)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	190
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	191
70136 f03a01a18c6e modernized tags: default scope excludes proof; wenzelm parents: 70097 diff changeset	192	subsection\<^marker>\<open>tag unimportant\<close> \<open>Explicit expressions for convexity in terms of arbitrary sums\<close>
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	193
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	194	lemma convex_sum:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	195	fixes C :: "'a::real_vector set"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	196	assumes "finite s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	197	and "convex C"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	198	and "(\<Sum> i \<in> s. a i) = 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	199	assumes "\<And>i. i \<in> s \<Longrightarrow> a i \<ge> 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	200	and "\<And>i. i \<in> s \<Longrightarrow> y i \<in> C"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	201	shows "(\<Sum> j \<in> s. a j *\<^sub>R y j) \<in> C"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	202	using assms(1,3,4,5)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	203	proof (induct arbitrary: a set: finite)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	204	case empty
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	205	then show ?case by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	206	next
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	207	case (insert i s) note IH = this(3)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	208	have "a i + sum a s = 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	209	and "0 \<le> a i"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	210	and "\<forall>j\<in>s. 0 \<le> a j"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	211	and "y i \<in> C"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	212	and "\<forall>j\<in>s. y j \<in> C"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	213	using insert.hyps(1,2) insert.prems by simp_all
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	214	then have "0 \<le> sum a s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	215	by (simp add: sum_nonneg)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	216	have "a i \<^sub>R y i + (\<Sum>j\<in>s. a j \<^sub>R y j) \<in> C"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	217	proof (cases "sum a s = 0")
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	218	case True
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	219	with \<open>a i + sum a s = 1\<close> have "a i = 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	220	by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	221	from sum_nonneg_0 [OF \<open>finite s\<close> _ True] \<open>\<forall>j\<in>s. 0 \<le> a j\<close> have "\<forall>j\<in>s. a j = 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	222	by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	223	show ?thesis using \<open>a i = 1\<close> and \<open>\<forall>j\<in>s. a j = 0\<close> and \<open>y i \<in> C\<close>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	224	by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	225	next
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	226	case False
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	227	with \<open>0 \<le> sum a s\<close> have "0 < sum a s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	228	by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	229	then have "(\<Sum>j\<in>s. (a j / sum a s) *\<^sub>R y j) \<in> C"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	230	using \<open>\<forall>j\<in>s. 0 \<le> a j\<close> and \<open>\<forall>j\<in>s. y j \<in> C\<close>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	231	by (simp add: IH sum_divide_distrib [symmetric])
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	232	from \<open>convex C\<close> and \<open>y i \<in> C\<close> and this and \<open>0 \<le> a i\<close>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	233	and \<open>0 \<le> sum a s\<close> and \<open>a i + sum a s = 1\<close>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	234	have "a i \<^sub>R y i + sum a s \<^sub>R (\<Sum>j\<in>s. (a j / sum a s) *\<^sub>R y j) \<in> C"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	235	by (rule convexD)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	236	then show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	237	by (simp add: scaleR_sum_right False)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	238	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	239	then show ?case using \<open>finite s\<close> and \<open>i \<notin> s\<close>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	240	by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	241	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	242
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	243	lemma convex:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	244	"convex s \<longleftrightarrow> (\<forall>(k::nat) u x. (\<forall>i. 1\<le>i \<and> i\<le>k \<longrightarrow> 0 \<le> u i \<and> x i \<in>s) \<and> (sum u {1..k} = 1)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	245	\<longrightarrow> sum (\<lambda>i. u i *\<^sub>R x i) {1..k} \<in> s)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	246	proof safe
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	247	fix k :: nat
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	248	fix u :: "nat \<Rightarrow> real"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	249	fix x
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	250	assume "convex s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	251	"\<forall>i. 1 \<le> i \<and> i \<le> k \<longrightarrow> 0 \<le> u i \<and> x i \<in> s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	252	"sum u {1..k} = 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	253	with convex_sum[of "{1 .. k}" s] show "(\<Sum>j\<in>{1 .. k}. u j *\<^sub>R x j) \<in> s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	254	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	255	next
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	256	assume *: "\<forall>k u x. (\<forall> i :: nat. 1 \<le> i \<and> i \<le> k \<longrightarrow> 0 \<le> u i \<and> x i \<in> s) \<and> sum u {1..k} = 1
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	257	\<longrightarrow> (\<Sum>i = 1..k. u i *\<^sub>R (x i :: 'a)) \<in> s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	258	{
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	259	fix \<mu> :: real
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	260	fix x y :: 'a
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	261	assume xy: "x \<in> s" "y \<in> s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	262	assume mu: "\<mu> \<ge> 0" "\<mu> \<le> 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	263	let ?u = "\<lambda>i. if (i :: nat) = 1 then \<mu> else 1 - \<mu>"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	264	let ?x = "\<lambda>i. if (i :: nat) = 1 then x else y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	265	have "{1 :: nat .. 2} \<inter> - {x. x = 1} = {2}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	266	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	267	then have card: "card ({1 :: nat .. 2} \<inter> - {x. x = 1}) = 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	268	by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	269	then have "sum ?u {1 .. 2} = 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	270	using sum.If_cases[of "{(1 :: nat) .. 2}" "\<lambda> x. x = 1" "\<lambda> x. \<mu>" "\<lambda> x. 1 - \<mu>"]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	271	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	272	with [rule_format, of "2" ?u ?x] have s: "(\<Sum>j \<in> {1..2}. ?u j \<^sub>R ?x j) \<in> s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	273	using mu xy by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	274	have grarr: "(\<Sum>j \<in> {Suc (Suc 0)..2}. ?u j \<^sub>R ?x j) = (1 - \<mu>) \<^sub>R y"
70097 4005298550a6 The last big tranche of Homology material: invariance of domain; renamings to use generic sum/prod lemmas from their locale paulson <lp15@cam.ac.uk> parents: 70086 diff changeset	275	using sum.atLeast_Suc_atMost[of "Suc (Suc 0)" 2 "\<lambda> j. (1 - \<mu>) *\<^sub>R y"] by auto
4005298550a6 The last big tranche of Homology material: invariance of domain; renamings to use generic sum/prod lemmas from their locale paulson <lp15@cam.ac.uk> parents: 70086 diff changeset	276	from sum.atLeast_Suc_atMost[of "Suc 0" 2 "\<lambda> j. ?u j *\<^sub>R ?x j", simplified this]
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	277	have "(\<Sum>j \<in> {1..2}. ?u j \<^sub>R ?x j) = \<mu> \<^sub>R x + (1 - \<mu>) *\<^sub>R y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	278	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	279	then have "(1 - \<mu>) \<^sub>R y + \<mu> \<^sub>R x \<in> s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	280	using s by (auto simp: add.commute)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	281	}
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	282	then show "convex s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	283	unfolding convex_alt by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	284	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	285
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	286
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	287	lemma convex_explicit:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	288	fixes s :: "'a::real_vector set"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	289	shows "convex s \<longleftrightarrow>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	290	(\<forall>t u. finite t \<and> t \<subseteq> s \<and> (\<forall>x\<in>t. 0 \<le> u x) \<and> sum u t = 1 \<longrightarrow> sum (\<lambda>x. u x *\<^sub>R x) t \<in> s)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	291	proof safe
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	292	fix t
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	293	fix u :: "'a \<Rightarrow> real"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	294	assume "convex s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	295	and "finite t"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	296	and "t \<subseteq> s" "\<forall>x\<in>t. 0 \<le> u x" "sum u t = 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	297	then show "(\<Sum>x\<in>t. u x *\<^sub>R x) \<in> s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	298	using convex_sum[of t s u "\<lambda> x. x"] by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	299	next
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	300	assume *: "\<forall>t. \<forall> u. finite t \<and> t \<subseteq> s \<and> (\<forall>x\<in>t. 0 \<le> u x) \<and>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	301	sum u t = 1 \<longrightarrow> (\<Sum>x\<in>t. u x *\<^sub>R x) \<in> s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	302	show "convex s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	303	unfolding convex_alt
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	304	proof safe
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	305	fix x y
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	306	fix \<mu> :: real
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	307	assume **: "x \<in> s" "y \<in> s" "0 \<le> \<mu>" "\<mu> \<le> 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	308	show "(1 - \<mu>) \<^sub>R x + \<mu> \<^sub>R y \<in> s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	309	proof (cases "x = y")
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	310	case False
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	311	then show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	312	using [rule_format, of "{x, y}" "\<lambda> z. if z = x then 1 - \<mu> else \<mu>"] *
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	313	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	314	next
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	315	case True
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	316	then show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	317	using [rule_format, of "{x, y}" "\<lambda> z. 1"] *
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	318	by (auto simp: field_simps real_vector.scale_left_diff_distrib)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	319	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	320	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	321	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	322
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	323	lemma convex_finite:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	324	assumes "finite s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	325	shows "convex s \<longleftrightarrow> (\<forall>u. (\<forall>x\<in>s. 0 \<le> u x) \<and> sum u s = 1 \<longrightarrow> sum (\<lambda>x. u x *\<^sub>R x) s \<in> s)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	326	unfolding convex_explicit
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	327	apply safe
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	328	subgoal for u by (erule allE [where x=s], erule allE [where x=u]) auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	329	subgoal for t u
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	330	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	331	have if_distrib_arg: "\<And>P f g x. (if P then f else g) x = (if P then f x else g x)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	332	by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	333	assume sum: "\<forall>u. (\<forall>x\<in>s. 0 \<le> u x) \<and> sum u s = 1 \<longrightarrow> (\<Sum>x\<in>s. u x *\<^sub>R x) \<in> s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	334	assume *: "\<forall>x\<in>t. 0 \<le> u x" "sum u t = 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	335	assume "t \<subseteq> s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	336	then have "s \<inter> t = t" by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	337	with sum[THEN spec[where x="\<lambda>x. if x\<in>t then u x else 0"]] * show "(\<Sum>x\<in>t. u x *\<^sub>R x) \<in> s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	338	by (auto simp: assms sum.If_cases if_distrib if_distrib_arg)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	339	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	340	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	341
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	342
71044 cb504351d058 tuned nipkow parents: 71040 diff changeset	343	subsection \<open>Convex Functions on a Set\<close>
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	344
70136 f03a01a18c6e modernized tags: default scope excludes proof; wenzelm parents: 70097 diff changeset	345	definition\<^marker>\<open>tag important\<close> convex_on :: "'a::real_vector set \<Rightarrow> ('a \<Rightarrow> real) \<Rightarrow> bool"
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	346	where "convex_on s f \<longleftrightarrow>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	347	(\<forall>x\<in>s. \<forall>y\<in>s. \<forall>u\<ge>0. \<forall>v\<ge>0. u + v = 1 \<longrightarrow> f (u \<^sub>R x + v \<^sub>R y) \<le> u * f x + v * f y)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	348
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	349	lemma convex_onI [intro?]:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	350	assumes "\<And>t x y. t > 0 \<Longrightarrow> t < 1 \<Longrightarrow> x \<in> A \<Longrightarrow> y \<in> A \<Longrightarrow>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	351	f ((1 - t) \<^sub>R x + t \<^sub>R y) \<le> (1 - t) * f x + t * f y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	352	shows "convex_on A f"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	353	unfolding convex_on_def
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	354	proof clarify
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	355	fix x y
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	356	fix u v :: real
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	357	assume A: "x \<in> A" "y \<in> A" "u \<ge> 0" "v \<ge> 0" "u + v = 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	358	from A(5) have [simp]: "v = 1 - u"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	359	by (simp add: algebra_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	360	from A(1-4) show "f (u \<^sub>R x + v \<^sub>R y) \<le> u * f x + v * f y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	361	using assms[of u y x]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	362	by (cases "u = 0 \<or> u = 1") (auto simp: algebra_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	363	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	364
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	365	lemma convex_on_linorderI [intro?]:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	366	fixes A :: "('a::{linorder,real_vector}) set"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	367	assumes "\<And>t x y. t > 0 \<Longrightarrow> t < 1 \<Longrightarrow> x \<in> A \<Longrightarrow> y \<in> A \<Longrightarrow> x < y \<Longrightarrow>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	368	f ((1 - t) \<^sub>R x + t \<^sub>R y) \<le> (1 - t) * f x + t * f y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	369	shows "convex_on A f"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	370	proof
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	371	fix x y
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	372	fix t :: real
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	373	assume A: "x \<in> A" "y \<in> A" "t > 0" "t < 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	374	with assms [of t x y] assms [of "1 - t" y x]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	375	show "f ((1 - t) \<^sub>R x + t \<^sub>R y) \<le> (1 - t) * f x + t * f y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	376	by (cases x y rule: linorder_cases) (auto simp: algebra_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	377	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	378
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	379	lemma convex_onD:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	380	assumes "convex_on A f"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	381	shows "\<And>t x y. t \<ge> 0 \<Longrightarrow> t \<le> 1 \<Longrightarrow> x \<in> A \<Longrightarrow> y \<in> A \<Longrightarrow>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	382	f ((1 - t) \<^sub>R x + t \<^sub>R y) \<le> (1 - t) * f x + t * f y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	383	using assms by (auto simp: convex_on_def)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	384
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	385	lemma convex_onD_Icc:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	386	assumes "convex_on {x..y} f" "x \<le> (y :: _ :: {real_vector,preorder})"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	387	shows "\<And>t. t \<ge> 0 \<Longrightarrow> t \<le> 1 \<Longrightarrow>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	388	f ((1 - t) \<^sub>R x + t \<^sub>R y) \<le> (1 - t) * f x + t * f y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	389	using assms(2) by (intro convex_onD [OF assms(1)]) simp_all
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	390
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	391	lemma convex_on_subset: "convex_on t f \<Longrightarrow> s \<subseteq> t \<Longrightarrow> convex_on s f"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	392	unfolding convex_on_def by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	393
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	394	lemma convex_on_add [intro]:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	395	assumes "convex_on s f"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	396	and "convex_on s g"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	397	shows "convex_on s (\<lambda>x. f x + g x)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	398	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	399	{
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	400	fix x y
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	401	assume "x \<in> s" "y \<in> s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	402	moreover
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	403	fix u v :: real
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	404	assume "0 \<le> u" "0 \<le> v" "u + v = 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	405	ultimately
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	406	have "f (u \<^sub>R x + v \<^sub>R y) + g (u \<^sub>R x + v \<^sub>R y) \<le> (u * f x + v * f y) + (u * g x + v * g y)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	407	using assms unfolding convex_on_def by (auto simp: add_mono)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	408	then have "f (u \<^sub>R x + v \<^sub>R y) + g (u \<^sub>R x + v \<^sub>R y) \<le> u * (f x + g x) + v * (f y + g y)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	409	by (simp add: field_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	410	}
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	411	then show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	412	unfolding convex_on_def by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	413	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	414
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	415	lemma convex_on_cmul [intro]:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	416	fixes c :: real
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	417	assumes "0 \<le> c"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	418	and "convex_on s f"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	419	shows "convex_on s (\<lambda>x. c * f x)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	420	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	421	have : "u (c * fx) + v * (c * fy) = c * (u * fx + v * fy)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	422	for u c fx v fy :: real
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	423	by (simp add: field_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	424	show ?thesis using assms(2) and mult_left_mono [OF _ assms(1)]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	425	unfolding convex_on_def and * by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	426	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	427
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	428	lemma convex_lower:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	429	assumes "convex_on s f"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	430	and "x \<in> s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	431	and "y \<in> s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	432	and "0 \<le> u"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	433	and "0 \<le> v"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	434	and "u + v = 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	435	shows "f (u \<^sub>R x + v \<^sub>R y) \<le> max (f x) (f y)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	436	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	437	let ?m = "max (f x) (f y)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	438	have "u * f x + v * f y \<le> u * max (f x) (f y) + v * max (f x) (f y)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	439	using assms(4,5) by (auto simp: mult_left_mono add_mono)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	440	also have "\<dots> = max (f x) (f y)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	441	using assms(6) by (simp add: distrib_right [symmetric])
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	442	finally show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	443	using assms unfolding convex_on_def by fastforce
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	444	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	445
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	446	lemma convex_on_dist [intro]:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	447	fixes s :: "'a::real_normed_vector set"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	448	shows "convex_on s (\<lambda>x. dist a x)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	449	proof (auto simp: convex_on_def dist_norm)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	450	fix x y
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	451	assume "x \<in> s" "y \<in> s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	452	fix u v :: real
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	453	assume "0 \<le> u"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	454	assume "0 \<le> v"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	455	assume "u + v = 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	456	have "a = u \<^sub>R a + v \<^sub>R a"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	457	unfolding scaleR_left_distrib[symmetric] and \<open>u + v = 1\<close> by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	458	then have : "a - (u \<^sub>R x + v \<^sub>R y) = (u \<^sub>R (a - x)) + (v *\<^sub>R (a - y))"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	459	by (auto simp: algebra_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	460	show "norm (a - (u \<^sub>R x + v \<^sub>R y)) \<le> u * norm (a - x) + v * norm (a - y)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	461	unfolding * using norm_triangle_ineq[of "u \<^sub>R (a - x)" "v \<^sub>R (a - y)"]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	462	using \<open>0 \<le> u\<close> \<open>0 \<le> v\<close> by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	463	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	464
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	465
70136 f03a01a18c6e modernized tags: default scope excludes proof; wenzelm parents: 70097 diff changeset	466	subsection\<^marker>\<open>tag unimportant\<close> \<open>Arithmetic operations on sets preserve convexity\<close>
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	467
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	468	lemma convex_linear_image:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	469	assumes "linear f"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	470	and "convex s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	471	shows "convex (f ` s)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	472	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	473	interpret f: linear f by fact
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	474	from \<open>convex s\<close> show "convex (f ` s)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	475	by (simp add: convex_def f.scaleR [symmetric] f.add [symmetric])
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	476	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	477
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	478	lemma convex_linear_vimage:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	479	assumes "linear f"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	480	and "convex s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	481	shows "convex (f -` s)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	482	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	483	interpret f: linear f by fact
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	484	from \<open>convex s\<close> show "convex (f -` s)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	485	by (simp add: convex_def f.add f.scaleR)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	486	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	487
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	488	lemma convex_scaling:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	489	assumes "convex s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	490	shows "convex ((\<lambda>x. c *\<^sub>R x) ` s)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	491	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	492	have "linear (\<lambda>x. c *\<^sub>R x)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	493	by (simp add: linearI scaleR_add_right)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	494	then show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	495	using \<open>convex s\<close> by (rule convex_linear_image)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	496	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	497
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	498	lemma convex_scaled:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	499	assumes "convex S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	500	shows "convex ((\<lambda>x. x *\<^sub>R c) ` S)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	501	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	502	have "linear (\<lambda>x. x *\<^sub>R c)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	503	by (simp add: linearI scaleR_add_left)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	504	then show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	505	using \<open>convex S\<close> by (rule convex_linear_image)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	506	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	507
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	508	lemma convex_negations:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	509	assumes "convex S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	510	shows "convex ((\<lambda>x. - x) ` S)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	511	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	512	have "linear (\<lambda>x. - x)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	513	by (simp add: linearI)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	514	then show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	515	using \<open>convex S\<close> by (rule convex_linear_image)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	516	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	517
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	518	lemma convex_sums:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	519	assumes "convex S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	520	and "convex T"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	521	shows "convex (\<Union>x\<in> S. \<Union>y \<in> T. {x + y})"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	522	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	523	have "linear (\<lambda>(x, y). x + y)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	524	by (auto intro: linearI simp: scaleR_add_right)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	525	with assms have "convex ((\<lambda>(x, y). x + y) ` (S \<times> T))"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	526	by (intro convex_linear_image convex_Times)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	527	also have "((\<lambda>(x, y). x + y) ` (S \<times> T)) = (\<Union>x\<in> S. \<Union>y \<in> T. {x + y})"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	528	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	529	finally show ?thesis .
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	530	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	531
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	532	lemma convex_differences:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	533	assumes "convex S" "convex T"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	534	shows "convex (\<Union>x\<in> S. \<Union>y \<in> T. {x - y})"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	535	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	536	have "{x - y\| x y. x \<in> S \<and> y \<in> T} = {x + y \|x y. x \<in> S \<and> y \<in> uminus ` T}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	537	by (auto simp: diff_conv_add_uminus simp del: add_uminus_conv_diff)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	538	then show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	539	using convex_sums[OF assms(1) convex_negations[OF assms(2)]] by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	540	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	541
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	542	lemma convex_translation:
69661 a03a63b81f44 tuned proofs haftmann parents: 69619 diff changeset	543	"convex ((+) a ` S)" if "convex S"
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	544	proof -
69661 a03a63b81f44 tuned proofs haftmann parents: 69619 diff changeset	545	have "(\<Union> x\<in> {a}. \<Union>y \<in> S. {x + y}) = (+) a ` S"
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	546	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	547	then show ?thesis
69661 a03a63b81f44 tuned proofs haftmann parents: 69619 diff changeset	548	using convex_sums [OF convex_singleton [of a] that] by auto
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	549	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	550
69661 a03a63b81f44 tuned proofs haftmann parents: 69619 diff changeset	551	lemma convex_translation_subtract:
a03a63b81f44 tuned proofs haftmann parents: 69619 diff changeset	552	"convex ((\<lambda>b. b - a) ` S)" if "convex S"
a03a63b81f44 tuned proofs haftmann parents: 69619 diff changeset	553	using convex_translation [of S "- a"] that by (simp cong: image_cong_simp)
a03a63b81f44 tuned proofs haftmann parents: 69619 diff changeset	554
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	555	lemma convex_affinity:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	556	assumes "convex S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	557	shows "convex ((\<lambda>x. a + c *\<^sub>R x) ` S)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	558	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	559	have "(\<lambda>x. a + c \<^sub>R x) ` S = (+) a ` (\<^sub>R) c ` S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	560	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	561	then show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	562	using convex_translation[OF convex_scaling[OF assms], of a c] by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	563	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	564
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	565	lemma convex_on_sum:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	566	fixes a :: "'a \<Rightarrow> real"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	567	and y :: "'a \<Rightarrow> 'b::real_vector"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	568	and f :: "'b \<Rightarrow> real"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	569	assumes "finite s" "s \<noteq> {}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	570	and "convex_on C f"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	571	and "convex C"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	572	and "(\<Sum> i \<in> s. a i) = 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	573	and "\<And>i. i \<in> s \<Longrightarrow> a i \<ge> 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	574	and "\<And>i. i \<in> s \<Longrightarrow> y i \<in> C"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	575	shows "f (\<Sum> i \<in> s. a i \<^sub>R y i) \<le> (\<Sum> i \<in> s. a i f (y i))"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	576	using assms
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	577	proof (induct s arbitrary: a rule: finite_ne_induct)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	578	case (singleton i)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	579	then have ai: "a i = 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	580	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	581	then show ?case
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	582	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	583	next
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	584	case (insert i s)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	585	then have "convex_on C f"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	586	by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	587	from this[unfolded convex_on_def, rule_format]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	588	have conv: "\<And>x y \<mu>. x \<in> C \<Longrightarrow> y \<in> C \<Longrightarrow> 0 \<le> \<mu> \<Longrightarrow> \<mu> \<le> 1 \<Longrightarrow>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	589	f (\<mu> \<^sub>R x + (1 - \<mu>) \<^sub>R y) \<le> \<mu> * f x + (1 - \<mu>) * f y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	590	by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	591	show ?case
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	592	proof (cases "a i = 1")
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	593	case True
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	594	then have "(\<Sum> j \<in> s. a j) = 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	595	using insert by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	596	then have "\<And>j. j \<in> s \<Longrightarrow> a j = 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	597	using insert by (fastforce simp: sum_nonneg_eq_0_iff)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	598	then show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	599	using insert by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	600	next
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	601	case False
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	602	from insert have yai: "y i \<in> C" "a i \<ge> 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	603	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	604	have fis: "finite (insert i s)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	605	using insert by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	606	then have ai1: "a i \<le> 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	607	using sum_nonneg_leq_bound[of "insert i s" a] insert by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	608	then have "a i < 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	609	using False by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	610	then have i0: "1 - a i > 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	611	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	612	let ?a = "\<lambda>j. a j / (1 - a i)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	613	have a_nonneg: "?a j \<ge> 0" if "j \<in> s" for j
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	614	using i0 insert that by fastforce
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	615	have "(\<Sum> j \<in> insert i s. a j) = 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	616	using insert by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	617	then have "(\<Sum> j \<in> s. a j) = 1 - a i"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	618	using sum.insert insert by fastforce
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	619	then have "(\<Sum> j \<in> s. a j) / (1 - a i) = 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	620	using i0 by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	621	then have a1: "(\<Sum> j \<in> s. ?a j) = 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	622	unfolding sum_divide_distrib by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	623	have "convex C" using insert by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	624	then have asum: "(\<Sum> j \<in> s. ?a j *\<^sub>R y j) \<in> C"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	625	using insert convex_sum [OF \<open>finite s\<close> \<open>convex C\<close> a1 a_nonneg] by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	626	have asum_le: "f (\<Sum> j \<in> s. ?a j \<^sub>R y j) \<le> (\<Sum> j \<in> s. ?a j f (y j))"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	627	using a_nonneg a1 insert by blast
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	628	have "f (\<Sum> j \<in> insert i s. a j \<^sub>R y j) = f ((\<Sum> j \<in> s. a j \<^sub>R y j) + a i *\<^sub>R y i)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	629	using sum.insert[of s i "\<lambda> j. a j *\<^sub>R y j", OF \<open>finite s\<close> \<open>i \<notin> s\<close>] insert
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	630	by (auto simp only: add.commute)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	631	also have "\<dots> = f (((1 - a i) * inverse (1 - a i)) \<^sub>R (\<Sum> j \<in> s. a j \<^sub>R y j) + a i *\<^sub>R y i)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	632	using i0 by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	633	also have "\<dots> = f ((1 - a i) \<^sub>R (\<Sum> j \<in> s. (a j inverse (1 - a i)) \<^sub>R y j) + a i \<^sub>R y i)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	634	using scaleR_right.sum[of "inverse (1 - a i)" "\<lambda> j. a j *\<^sub>R y j" s, symmetric]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	635	by (auto simp: algebra_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	636	also have "\<dots> = f ((1 - a i) \<^sub>R (\<Sum> j \<in> s. ?a j \<^sub>R y j) + a i *\<^sub>R y i)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	637	by (auto simp: divide_inverse)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	638	also have "\<dots> \<le> (1 - a i) \<^sub>R f ((\<Sum> j \<in> s. ?a j \<^sub>R y j)) + a i * f (y i)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	639	using conv[of "y i" "(\<Sum> j \<in> s. ?a j *\<^sub>R y j)" "a i", OF yai(1) asum yai(2) ai1]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	640	by (auto simp: add.commute)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	641	also have "\<dots> \<le> (1 - a i) * (\<Sum> j \<in> s. ?a j * f (y j)) + a i * f (y i)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	642	using add_right_mono [OF mult_left_mono [of _ _ "1 - a i",
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	643	OF asum_le less_imp_le[OF i0]], of "a i * f (y i)"]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	644	by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	645	also have "\<dots> = (\<Sum> j \<in> s. (1 - a i) * ?a j * f (y j)) + a i * f (y i)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	646	unfolding sum_distrib_left[of "1 - a i" "\<lambda> j. ?a j * f (y j)"]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	647	using i0 by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	648	also have "\<dots> = (\<Sum> j \<in> s. a j * f (y j)) + a i * f (y i)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	649	using i0 by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	650	also have "\<dots> = (\<Sum> j \<in> insert i s. a j * f (y j))"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	651	using insert by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	652	finally show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	653	by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	654	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	655	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	656
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	657	lemma convex_on_alt:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	658	fixes C :: "'a::real_vector set"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	659	assumes "convex C"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	660	shows "convex_on C f \<longleftrightarrow>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	661	(\<forall>x \<in> C. \<forall> y \<in> C. \<forall> \<mu> :: real. \<mu> \<ge> 0 \<and> \<mu> \<le> 1 \<longrightarrow>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	662	f (\<mu> \<^sub>R x + (1 - \<mu>) \<^sub>R y) \<le> \<mu> * f x + (1 - \<mu>) * f y)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	663	proof safe
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	664	fix x y
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	665	fix \<mu> :: real
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	666	assume *: "convex_on C f" "x \<in> C" "y \<in> C" "0 \<le> \<mu>" "\<mu> \<le> 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	667	from this[unfolded convex_on_def, rule_format]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	668	have "0 \<le> u \<Longrightarrow> 0 \<le> v \<Longrightarrow> u + v = 1 \<Longrightarrow> f (u \<^sub>R x + v \<^sub>R y) \<le> u * f x + v * f y" for u v
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	669	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	670	from this [of "\<mu>" "1 - \<mu>", simplified] *
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	671	show "f (\<mu> \<^sub>R x + (1 - \<mu>) \<^sub>R y) \<le> \<mu> * f x + (1 - \<mu>) * f y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	672	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	673	next
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	674	assume *: "\<forall>x\<in>C. \<forall>y\<in>C. \<forall>\<mu>. 0 \<le> \<mu> \<and> \<mu> \<le> 1 \<longrightarrow>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	675	f (\<mu> \<^sub>R x + (1 - \<mu>) \<^sub>R y) \<le> \<mu> * f x + (1 - \<mu>) * f y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	676	{
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	677	fix x y
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	678	fix u v :: real
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	679	assume **: "x \<in> C" "y \<in> C" "u \<ge> 0" "v \<ge> 0" "u + v = 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	680	then have[simp]: "1 - u = v" by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	681	from *[rule_format, of x y u]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	682	have "f (u \<^sub>R x + v \<^sub>R y) \<le> u * f x + v * f y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	683	using ** by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	684	}
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	685	then show "convex_on C f"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	686	unfolding convex_on_def by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	687	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	688
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	689	lemma convex_on_diff:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	690	fixes f :: "real \<Rightarrow> real"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	691	assumes f: "convex_on I f"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	692	and I: "x \<in> I" "y \<in> I"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	693	and t: "x < t" "t < y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	694	shows "(f x - f t) / (x - t) \<le> (f x - f y) / (x - y)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	695	and "(f x - f y) / (x - y) \<le> (f t - f y) / (t - y)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	696	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	697	define a where "a \<equiv> (t - y) / (x - y)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	698	with t have "0 \<le> a" "0 \<le> 1 - a"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	699	by (auto simp: field_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	700	with f \<open>x \<in> I\<close> \<open>y \<in> I\<close> have cvx: "f (a * x + (1 - a) * y) \<le> a * f x + (1 - a) * f y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	701	by (auto simp: convex_on_def)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	702	have "a * x + (1 - a) * y = a * (x - y) + y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	703	by (simp add: field_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	704	also have "\<dots> = t"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	705	unfolding a_def using \<open>x < t\<close> \<open>t < y\<close> by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	706	finally have "f t \<le> a * f x + (1 - a) * f y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	707	using cvx by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	708	also have "\<dots> = a * (f x - f y) + f y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	709	by (simp add: field_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	710	finally have "f t - f y \<le> a * (f x - f y)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	711	by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	712	with t show "(f x - f t) / (x - t) \<le> (f x - f y) / (x - y)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	713	by (simp add: le_divide_eq divide_le_eq field_simps a_def)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	714	with t show "(f x - f y) / (x - y) \<le> (f t - f y) / (t - y)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	715	by (simp add: le_divide_eq divide_le_eq field_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	716	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	717
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	718	lemma pos_convex_function:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	719	fixes f :: "real \<Rightarrow> real"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	720	assumes "convex C"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	721	and leq: "\<And>x y. x \<in> C \<Longrightarrow> y \<in> C \<Longrightarrow> f' x * (y - x) \<le> f y - f x"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	722	shows "convex_on C f"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	723	unfolding convex_on_alt[OF assms(1)]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	724	using assms
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	725	proof safe
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	726	fix x y \<mu> :: real
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	727	let ?x = "\<mu> \<^sub>R x + (1 - \<mu>) \<^sub>R y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	728	assume *: "convex C" "x \<in> C" "y \<in> C" "\<mu> \<ge> 0" "\<mu> \<le> 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	729	then have "1 - \<mu> \<ge> 0" by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	730	then have xpos: "?x \<in> C"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	731	using * unfolding convex_alt by fastforce
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	732	have geq: "\<mu> * (f x - f ?x) + (1 - \<mu>) * (f y - f ?x) \<ge>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	733	\<mu> * f' ?x * (x - ?x) + (1 - \<mu>) * f' ?x * (y - ?x)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	734	using add_mono [OF mult_left_mono [OF leq [OF xpos *(2)] \<open>\<mu> \<ge> 0\<close>]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	735	mult_left_mono [OF leq [OF xpos *(3)] \<open>1 - \<mu> \<ge> 0\<close>]]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	736	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	737	then have "\<mu> * f x + (1 - \<mu>) * f y - f ?x \<ge> 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	738	by (auto simp: field_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	739	then show "f (\<mu> \<^sub>R x + (1 - \<mu>) \<^sub>R y) \<le> \<mu> * f x + (1 - \<mu>) * f y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	740	using convex_on_alt by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	741	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	742
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	743	lemma atMostAtLeast_subset_convex:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	744	fixes C :: "real set"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	745	assumes "convex C"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	746	and "x \<in> C" "y \<in> C" "x < y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	747	shows "{x .. y} \<subseteq> C"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	748	proof safe
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	749	fix z assume z: "z \<in> {x .. y}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	750	have less: "z \<in> C" if *: "x < z" "z < y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	751	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	752	let ?\<mu> = "(y - z) / (y - x)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	753	have "0 \<le> ?\<mu>" "?\<mu> \<le> 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	754	using assms * by (auto simp: field_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	755	then have comb: "?\<mu> * x + (1 - ?\<mu>) * y \<in> C"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	756	using assms iffD1[OF convex_alt, rule_format, of C y x ?\<mu>]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	757	by (simp add: algebra_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	758	have "?\<mu> * x + (1 - ?\<mu>) * y = (y - z) * x / (y - x) + (1 - (y - z) / (y - x)) * y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	759	by (auto simp: field_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	760	also have "\<dots> = ((y - z) * x + (y - x - (y - z)) * y) / (y - x)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	761	using assms by (simp only: add_divide_distrib) (auto simp: field_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	762	also have "\<dots> = z"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	763	using assms by (auto simp: field_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	764	finally show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	765	using comb by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	766	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	767	show "z \<in> C"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	768	using z less assms by (auto simp: le_less)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	769	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	770
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	771	lemma f''_imp_f':
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	772	fixes f :: "real \<Rightarrow> real"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	773	assumes "convex C"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	774	and f': "\<And>x. x \<in> C \<Longrightarrow> DERIV f x :> (f' x)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	775	and f'': "\<And>x. x \<in> C \<Longrightarrow> DERIV f' x :> (f'' x)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	776	and pos: "\<And>x. x \<in> C \<Longrightarrow> f'' x \<ge> 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	777	and x: "x \<in> C"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	778	and y: "y \<in> C"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	779	shows "f' x * (y - x) \<le> f y - f x"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	780	using assms
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	781	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	782	have less_imp: "f y - f x \<ge> f' x * (y - x)" "f' y * (x - y) \<le> f x - f y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	783	if *: "x \<in> C" "y \<in> C" "y > x" for x y :: real
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	784	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	785	from * have ge: "y - x > 0" "y - x \<ge> 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	786	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	787	from * have le: "x - y < 0" "x - y \<le> 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	788	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	789	then obtain z1 where z1: "z1 > x" "z1 < y" "f y - f x = (y - x) * f' z1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	790	using subsetD[OF atMostAtLeast_subset_convex[OF \<open>convex C\<close> \<open>x \<in> C\<close> \<open>y \<in> C\<close> \<open>x < y\<close>],
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	791	THEN f', THEN MVT2[OF \<open>x < y\<close>, rule_format, unfolded atLeastAtMost_iff[symmetric]]]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	792	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	793	then have "z1 \<in> C"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	794	using atMostAtLeast_subset_convex \<open>convex C\<close> \<open>x \<in> C\<close> \<open>y \<in> C\<close> \<open>x < y\<close>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	795	by fastforce
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	796	from z1 have z1': "f x - f y = (x - y) * f' z1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	797	by (simp add: field_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	798	obtain z2 where z2: "z2 > x" "z2 < z1" "f' z1 - f' x = (z1 - x) * f'' z2"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	799	using subsetD[OF atMostAtLeast_subset_convex[OF \<open>convex C\<close> \<open>x \<in> C\<close> \<open>z1 \<in> C\<close> \<open>x < z1\<close>],
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	800	THEN f'', THEN MVT2[OF \<open>x < z1\<close>, rule_format, unfolded atLeastAtMost_iff[symmetric]]] z1
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	801	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	802	obtain z3 where z3: "z3 > z1" "z3 < y" "f' y - f' z1 = (y - z1) * f'' z3"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	803	using subsetD[OF atMostAtLeast_subset_convex[OF \<open>convex C\<close> \<open>z1 \<in> C\<close> \<open>y \<in> C\<close> \<open>z1 < y\<close>],
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	804	THEN f'', THEN MVT2[OF \<open>z1 < y\<close>, rule_format, unfolded atLeastAtMost_iff[symmetric]]] z1
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	805	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	806	have "f' y - (f x - f y) / (x - y) = f' y - f' z1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	807	using * z1' by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	808	also have "\<dots> = (y - z1) * f'' z3"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	809	using z3 by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	810	finally have cool': "f' y - (f x - f y) / (x - y) = (y - z1) * f'' z3"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	811	by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	812	have A': "y - z1 \<ge> 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	813	using z1 by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	814	have "z3 \<in> C"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	815	using z3 * atMostAtLeast_subset_convex \<open>convex C\<close> \<open>x \<in> C\<close> \<open>z1 \<in> C\<close> \<open>x < z1\<close>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	816	by fastforce
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	817	then have B': "f'' z3 \<ge> 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	818	using assms by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	819	from A' B' have "(y - z1) * f'' z3 \<ge> 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	820	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	821	from cool' this have "f' y - (f x - f y) / (x - y) \<ge> 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	822	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	823	from mult_right_mono_neg[OF this le(2)]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	824	have "f' y * (x - y) - (f x - f y) / (x - y) * (x - y) \<le> 0 * (x - y)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	825	by (simp add: algebra_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	826	then have "f' y * (x - y) - (f x - f y) \<le> 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	827	using le by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	828	then have res: "f' y * (x - y) \<le> f x - f y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	829	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	830	have "(f y - f x) / (y - x) - f' x = f' z1 - f' x"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	831	using * z1 by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	832	also have "\<dots> = (z1 - x) * f'' z2"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	833	using z2 by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	834	finally have cool: "(f y - f x) / (y - x) - f' x = (z1 - x) * f'' z2"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	835	by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	836	have A: "z1 - x \<ge> 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	837	using z1 by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	838	have "z2 \<in> C"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	839	using z2 z1 * atMostAtLeast_subset_convex \<open>convex C\<close> \<open>z1 \<in> C\<close> \<open>y \<in> C\<close> \<open>z1 < y\<close>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	840	by fastforce
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	841	then have B: "f'' z2 \<ge> 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	842	using assms by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	843	from A B have "(z1 - x) * f'' z2 \<ge> 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	844	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	845	with cool have "(f y - f x) / (y - x) - f' x \<ge> 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	846	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	847	from mult_right_mono[OF this ge(2)]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	848	have "(f y - f x) / (y - x) * (y - x) - f' x * (y - x) \<ge> 0 * (y - x)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	849	by (simp add: algebra_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	850	then have "f y - f x - f' x * (y - x) \<ge> 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	851	using ge by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	852	then show "f y - f x \<ge> f' x * (y - x)" "f' y * (x - y) \<le> f x - f y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	853	using res by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	854	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	855	show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	856	proof (cases "x = y")
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	857	case True
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	858	with x y show ?thesis by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	859	next
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	860	case False
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	861	with less_imp x y show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	862	by (auto simp: neq_iff)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	863	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	864	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	865
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	866	lemma f''_ge0_imp_convex:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	867	fixes f :: "real \<Rightarrow> real"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	868	assumes conv: "convex C"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	869	and f': "\<And>x. x \<in> C \<Longrightarrow> DERIV f x :> (f' x)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	870	and f'': "\<And>x. x \<in> C \<Longrightarrow> DERIV f' x :> (f'' x)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	871	and pos: "\<And>x. x \<in> C \<Longrightarrow> f'' x \<ge> 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	872	shows "convex_on C f"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	873	using f''_imp_f'[OF conv f' f'' pos] assms pos_convex_function
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	874	by fastforce
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	875
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	876	lemma minus_log_convex:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	877	fixes b :: real
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	878	assumes "b > 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	879	shows "convex_on {0 <..} (\<lambda> x. - log b x)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	880	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	881	have "\<And>z. z > 0 \<Longrightarrow> DERIV (log b) z :> 1 / (ln b * z)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	882	using DERIV_log by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	883	then have f': "\<And>z. z > 0 \<Longrightarrow> DERIV (\<lambda> z. - log b z) z :> - 1 / (ln b * z)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	884	by (auto simp: DERIV_minus)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	885	have "\<And>z::real. z > 0 \<Longrightarrow> DERIV inverse z :> - (inverse z ^ Suc (Suc 0))"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	886	using less_imp_neq[THEN not_sym, THEN DERIV_inverse] by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	887	from this[THEN DERIV_cmult, of _ "- 1 / ln b"]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	888	have "\<And>z::real. z > 0 \<Longrightarrow>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	889	DERIV (\<lambda> z. (- 1 / ln b) * inverse z) z :> (- 1 / ln b) * (- (inverse z ^ Suc (Suc 0)))"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	890	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	891	then have f''0: "\<And>z::real. z > 0 \<Longrightarrow>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	892	DERIV (\<lambda> z. - 1 / (ln b * z)) z :> 1 / (ln b * z * z)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	893	unfolding inverse_eq_divide by (auto simp: mult.assoc)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	894	have f''_ge0: "\<And>z::real. z > 0 \<Longrightarrow> 1 / (ln b * z * z) \<ge> 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	895	using \<open>b > 1\<close> by (auto intro!: less_imp_le)
71244 38457af660bc cleaning nipkow parents: 71242 diff changeset	896	from f''_ge0_imp_convex[OF convex_real_interval(3), unfolded greaterThan_iff, OF f' f''0 f''_ge0]
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	897	show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	898	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	899	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	900
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	901
70136 f03a01a18c6e modernized tags: default scope excludes proof; wenzelm parents: 70097 diff changeset	902	subsection\<^marker>\<open>tag unimportant\<close> \<open>Convexity of real functions\<close>
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	903
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	904	lemma convex_on_realI:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	905	assumes "connected A"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	906	and "\<And>x. x \<in> A \<Longrightarrow> (f has_real_derivative f' x) (at x)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	907	and "\<And>x y. x \<in> A \<Longrightarrow> y \<in> A \<Longrightarrow> x \<le> y \<Longrightarrow> f' x \<le> f' y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	908	shows "convex_on A f"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	909	proof (rule convex_on_linorderI)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	910	fix t x y :: real
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	911	assume t: "t > 0" "t < 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	912	assume xy: "x \<in> A" "y \<in> A" "x < y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	913	define z where "z = (1 - t) * x + t * y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	914	with \<open>connected A\<close> and xy have ivl: "{x..y} \<subseteq> A"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	915	using connected_contains_Icc by blast
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	916
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	917	from xy t have xz: "z > x"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	918	by (simp add: z_def algebra_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	919	have "y - z = (1 - t) * (y - x)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	920	by (simp add: z_def algebra_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	921	also from xy t have "\<dots> > 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	922	by (intro mult_pos_pos) simp_all
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	923	finally have yz: "z < y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	924	by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	925
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	926	from assms xz yz ivl t have "\<exists>\<xi>. \<xi> > x \<and> \<xi> < z \<and> f z - f x = (z - x) * f' \<xi>"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	927	by (intro MVT2) (auto intro!: assms(2))
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	928	then obtain \<xi> where \<xi>: "\<xi> > x" "\<xi> < z" "f' \<xi> = (f z - f x) / (z - x)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	929	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	930	from assms xz yz ivl t have "\<exists>\<eta>. \<eta> > z \<and> \<eta> < y \<and> f y - f z = (y - z) * f' \<eta>"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	931	by (intro MVT2) (auto intro!: assms(2))
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	932	then obtain \<eta> where \<eta>: "\<eta> > z" "\<eta> < y" "f' \<eta> = (f y - f z) / (y - z)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	933	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	934
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	935	from \<eta>(3) have "(f y - f z) / (y - z) = f' \<eta>" ..
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	936	also from \<xi> \<eta> ivl have "\<xi> \<in> A" "\<eta> \<in> A"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	937	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	938	with \<xi> \<eta> have "f' \<eta> \<ge> f' \<xi>"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	939	by (intro assms(3)) auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	940	also from \<xi>(3) have "f' \<xi> = (f z - f x) / (z - x)" .
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	941	finally have "(f y - f z) * (z - x) \<ge> (f z - f x) * (y - z)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	942	using xz yz by (simp add: field_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	943	also have "z - x = t * (y - x)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	944	by (simp add: z_def algebra_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	945	also have "y - z = (1 - t) * (y - x)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	946	by (simp add: z_def algebra_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	947	finally have "(f y - f z) * t \<ge> (f z - f x) * (1 - t)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	948	using xy by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	949	then show "(1 - t) * f x + t * f y \<ge> f ((1 - t) \<^sub>R x + t \<^sub>R y)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	950	by (simp add: z_def algebra_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	951	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	952
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	953	lemma convex_on_inverse:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	954	assumes "A \<subseteq> {0<..}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	955	shows "convex_on A (inverse :: real \<Rightarrow> real)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	956	proof (rule convex_on_subset[OF _ assms], intro convex_on_realI[of _ _ "\<lambda>x. -inverse (x^2)"])
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	957	fix u v :: real
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	958	assume "u \<in> {0<..}" "v \<in> {0<..}" "u \<le> v"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	959	with assms show "-inverse (u^2) \<le> -inverse (v^2)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	960	by (intro le_imp_neg_le le_imp_inverse_le power_mono) (simp_all)
70817 dd675800469d dedicated fact collections for algebraic simplification rules potentially splitting goals haftmann parents: 70136 diff changeset	961	qed (insert assms, auto intro!: derivative_eq_intros simp: field_split_simps power2_eq_square)
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	962
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	963	lemma convex_onD_Icc':
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	964	assumes "convex_on {x..y} f" "c \<in> {x..y}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	965	defines "d \<equiv> y - x"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	966	shows "f c \<le> (f y - f x) / d * (c - x) + f x"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	967	proof (cases x y rule: linorder_cases)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	968	case less
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	969	then have d: "d > 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	970	by (simp add: d_def)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	971	from assms(2) less have A: "0 \<le> (c - x) / d" "(c - x) / d \<le> 1"
70817 dd675800469d dedicated fact collections for algebraic simplification rules potentially splitting goals haftmann parents: 70136 diff changeset	972	by (simp_all add: d_def field_split_simps)
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	973	have "f c = f (x + (c - x) * 1)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	974	by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	975	also from less have "1 = ((y - x) / d)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	976	by (simp add: d_def)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	977	also from d have "x + (c - x) * \<dots> = (1 - (c - x) / d) \<^sub>R x + ((c - x) / d) \<^sub>R y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	978	by (simp add: field_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	979	also have "f \<dots> \<le> (1 - (c - x) / d) * f x + (c - x) / d * f y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	980	using assms less by (intro convex_onD_Icc) simp_all
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	981	also from d have "\<dots> = (f y - f x) / d * (c - x) + f x"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	982	by (simp add: field_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	983	finally show ?thesis .
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	984	qed (insert assms(2), simp_all)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	985
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	986	lemma convex_onD_Icc'':
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	987	assumes "convex_on {x..y} f" "c \<in> {x..y}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	988	defines "d \<equiv> y - x"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	989	shows "f c \<le> (f x - f y) / d * (y - c) + f y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	990	proof (cases x y rule: linorder_cases)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	991	case less
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	992	then have d: "d > 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	993	by (simp add: d_def)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	994	from assms(2) less have A: "0 \<le> (y - c) / d" "(y - c) / d \<le> 1"
70817 dd675800469d dedicated fact collections for algebraic simplification rules potentially splitting goals haftmann parents: 70136 diff changeset	995	by (simp_all add: d_def field_split_simps)
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	996	have "f c = f (y - (y - c) * 1)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	997	by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	998	also from less have "1 = ((y - x) / d)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	999	by (simp add: d_def)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1000	also from d have "y - (y - c) * \<dots> = (1 - (1 - (y - c) / d)) \<^sub>R x + (1 - (y - c) / d) \<^sub>R y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1001	by (simp add: field_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1002	also have "f \<dots> \<le> (1 - (1 - (y - c) / d)) * f x + (1 - (y - c) / d) * f y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1003	using assms less by (intro convex_onD_Icc) (simp_all add: field_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1004	also from d have "\<dots> = (f x - f y) / d * (y - c) + f y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1005	by (simp add: field_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1006	finally show ?thesis .
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1007	qed (insert assms(2), simp_all)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1008
69661 a03a63b81f44 tuned proofs haftmann parents: 69619 diff changeset	1009	lemma convex_translation_eq [simp]:
a03a63b81f44 tuned proofs haftmann parents: 69619 diff changeset	1010	"convex ((+) a ` s) \<longleftrightarrow> convex s"
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1011	by (metis convex_translation translation_galois)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1012
69661 a03a63b81f44 tuned proofs haftmann parents: 69619 diff changeset	1013	lemma convex_translation_subtract_eq [simp]:
a03a63b81f44 tuned proofs haftmann parents: 69619 diff changeset	1014	"convex ((\<lambda>b. b - a) ` s) \<longleftrightarrow> convex s"
a03a63b81f44 tuned proofs haftmann parents: 69619 diff changeset	1015	using convex_translation_eq [of "- a"] by (simp cong: image_cong_simp)
a03a63b81f44 tuned proofs haftmann parents: 69619 diff changeset	1016
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1017	lemma convex_linear_image_eq [simp]:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1018	fixes f :: "'a::real_vector \<Rightarrow> 'b::real_vector"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1019	shows "\<lbrakk>linear f; inj f\<rbrakk> \<Longrightarrow> convex (f ` s) \<longleftrightarrow> convex s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1020	by (metis (no_types) convex_linear_image convex_linear_vimage inj_vimage_image_eq)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1021
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1022	lemma fst_snd_linear: "linear (\<lambda>(x,y). x + y)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1023	unfolding linear_iff by (simp add: algebra_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1024
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1025	lemma vector_choose_size:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1026	assumes "0 \<le> c"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1027	obtains x :: "'a::{real_normed_vector, perfect_space}" where "norm x = c"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1028	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1029	obtain a::'a where "a \<noteq> 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1030	using UNIV_not_singleton UNIV_eq_I set_zero singletonI by fastforce
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1031	then show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1032	by (rule_tac x="scaleR (c / norm a) a" in that) (simp add: assms)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1033	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1034
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1035	lemma vector_choose_dist:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1036	assumes "0 \<le> c"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1037	obtains y :: "'a::{real_normed_vector, perfect_space}" where "dist x y = c"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1038	by (metis add_diff_cancel_left' assms dist_commute dist_norm vector_choose_size)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1039
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1040	lemma sum_delta'':
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1041	fixes s::"'a::real_vector set"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1042	assumes "finite s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1043	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)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1044	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1045	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)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1046	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1047	show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1048	unfolding * using sum.delta[OF assms, of y "\<lambda>x. f x *\<^sub>R x"] by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1049	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1050
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1051	lemma dist_triangle_eq:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1052	fixes x y z :: "'a::real_inner"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1053	shows "dist x z = dist x y + dist y z \<longleftrightarrow>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1054	norm (x - y) \<^sub>R (y - z) = norm (y - z) \<^sub>R (x - y)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1055	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1056	have *: "x - y + (y - z) = x - z" by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1057	show ?thesis unfolding dist_norm norm_triangle_eq[of "x - y" "y - z", unfolded *]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1058	by (auto simp:norm_minus_commute)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1059	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1060
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1061
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1062
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1063
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1064	subsection \<open>Cones\<close>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1065
70136 f03a01a18c6e modernized tags: default scope excludes proof; wenzelm parents: 70097 diff changeset	1066	definition\<^marker>\<open>tag important\<close> cone :: "'a::real_vector set \<Rightarrow> bool"
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1067	where "cone s \<longleftrightarrow> (\<forall>x\<in>s. \<forall>c\<ge>0. c *\<^sub>R x \<in> s)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1068
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1069	lemma cone_empty[intro, simp]: "cone {}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1070	unfolding cone_def by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1071
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1072	lemma cone_univ[intro, simp]: "cone UNIV"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1073	unfolding cone_def by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1074
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1075	lemma cone_Inter[intro]: "\<forall>s\<in>f. cone s \<Longrightarrow> cone (\<Inter>f)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1076	unfolding cone_def by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1077
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1078	lemma subspace_imp_cone: "subspace S \<Longrightarrow> cone S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1079	by (simp add: cone_def subspace_scale)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1080
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1081
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1082	subsubsection \<open>Conic hull\<close>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1083
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1084	lemma cone_cone_hull: "cone (cone hull s)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1085	unfolding hull_def by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1086
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1087	lemma cone_hull_eq: "cone hull s = s \<longleftrightarrow> cone s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1088	apply (rule hull_eq)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1089	using cone_Inter
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1090	unfolding subset_eq
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1091	apply auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1092	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1093
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1094	lemma mem_cone:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1095	assumes "cone S" "x \<in> S" "c \<ge> 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1096	shows "c *\<^sub>R x \<in> S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1097	using assms cone_def[of S] by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1098
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1099	lemma cone_contains_0:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1100	assumes "cone S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1101	shows "S \<noteq> {} \<longleftrightarrow> 0 \<in> S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1102	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1103	{
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1104	assume "S \<noteq> {}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1105	then obtain a where "a \<in> S" by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1106	then have "0 \<in> S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1107	using assms mem_cone[of S a 0] by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1108	}
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1109	then show ?thesis by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1110	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1111
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1112	lemma cone_0: "cone {0}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1113	unfolding cone_def by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1114
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1115	lemma cone_Union[intro]: "(\<forall>s\<in>f. cone s) \<longrightarrow> cone (\<Union>f)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1116	unfolding cone_def by blast
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1117
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1118	lemma cone_iff:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1119	assumes "S \<noteq> {}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1120	shows "cone S \<longleftrightarrow> 0 \<in> S \<and> (\<forall>c. c > 0 \<longrightarrow> ((*\<^sub>R) c) ` S = S)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1121	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1122	{
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1123	assume "cone S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1124	{
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1125	fix c :: real
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1126	assume "c > 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1127	{
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1128	fix x
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1129	assume "x \<in> S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1130	then have "x \<in> ((*\<^sub>R) c) ` S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1131	unfolding image_def
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1132	using \<open>cone S\<close> \<open>c>0\<close> mem_cone[of S x "1/c"]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1133	exI[of "(\<lambda>t. t \<in> S \<and> x = c \<^sub>R t)" "(1 / c) \<^sub>R x"]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1134	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1135	}
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1136	moreover
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1137	{
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1138	fix x
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1139	assume "x \<in> ((*\<^sub>R) c) ` S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1140	then have "x \<in> S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1141	using \<open>cone S\<close> \<open>c > 0\<close>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1142	unfolding cone_def image_def \<open>c > 0\<close> by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1143	}
69768 7e4966eaf781 proper congruence rule for image operator haftmann parents: 69675 diff changeset	1144	ultimately have "((*\<^sub>R) c) ` S = S" by blast
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1145	}
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1146	then have "0 \<in> S \<and> (\<forall>c. c > 0 \<longrightarrow> ((*\<^sub>R) c) ` S = S)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1147	using \<open>cone S\<close> cone_contains_0[of S] assms by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1148	}
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1149	moreover
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1150	{
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1151	assume a: "0 \<in> S \<and> (\<forall>c. c > 0 \<longrightarrow> ((*\<^sub>R) c) ` S = S)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1152	{
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1153	fix x
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1154	assume "x \<in> S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1155	fix c1 :: real
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1156	assume "c1 \<ge> 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1157	then have "c1 = 0 \<or> c1 > 0" by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1158	then have "c1 *\<^sub>R x \<in> S" using a \<open>x \<in> S\<close> by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1159	}
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1160	then have "cone S" unfolding cone_def by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1161	}
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1162	ultimately show ?thesis by blast
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1163	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1164
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1165	lemma cone_hull_empty: "cone hull {} = {}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1166	by (metis cone_empty cone_hull_eq)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1167
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1168	lemma cone_hull_empty_iff: "S = {} \<longleftrightarrow> cone hull S = {}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1169	by (metis bot_least cone_hull_empty hull_subset xtrans(5))
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1170
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1171	lemma cone_hull_contains_0: "S \<noteq> {} \<longleftrightarrow> 0 \<in> cone hull S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1172	using cone_cone_hull[of S] cone_contains_0[of "cone hull S"] cone_hull_empty_iff[of S]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1173	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1174
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1175	lemma mem_cone_hull:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1176	assumes "x \<in> S" "c \<ge> 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1177	shows "c *\<^sub>R x \<in> cone hull S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1178	by (metis assms cone_cone_hull hull_inc mem_cone)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1179
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1180	proposition cone_hull_expl: "cone hull S = {c *\<^sub>R x \| c x. c \<ge> 0 \<and> x \<in> S}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1181	(is "?lhs = ?rhs")
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1182	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1183	{
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1184	fix x
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1185	assume "x \<in> ?rhs"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1186	then obtain cx :: real and xx where x: "x = cx *\<^sub>R xx" "cx \<ge> 0" "xx \<in> S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1187	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1188	fix c :: real
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1189	assume c: "c \<ge> 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1190	then have "c \<^sub>R x = (c cx) *\<^sub>R xx"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1191	using x by (simp add: algebra_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1192	moreover
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1193	have "c * cx \<ge> 0" using c x by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1194	ultimately
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1195	have "c *\<^sub>R x \<in> ?rhs" using x by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1196	}
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1197	then have "cone ?rhs"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1198	unfolding cone_def by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1199	then have "?rhs \<in> Collect cone"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1200	unfolding mem_Collect_eq by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1201	{
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1202	fix x
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1203	assume "x \<in> S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1204	then have "1 *\<^sub>R x \<in> ?rhs"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1205	apply auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1206	apply (rule_tac x = 1 in exI, auto)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1207	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1208	then have "x \<in> ?rhs" by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1209	}
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1210	then have "S \<subseteq> ?rhs" by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1211	then have "?lhs \<subseteq> ?rhs"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1212	using \<open>?rhs \<in> Collect cone\<close> hull_minimal[of S "?rhs" "cone"] by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1213	moreover
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1214	{
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1215	fix x
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1216	assume "x \<in> ?rhs"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1217	then obtain cx :: real and xx where x: "x = cx *\<^sub>R xx" "cx \<ge> 0" "xx \<in> S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1218	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1219	then have "xx \<in> cone hull S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1220	using hull_subset[of S] by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1221	then have "x \<in> ?lhs"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1222	using x cone_cone_hull[of S] cone_def[of "cone hull S"] by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1223	}
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1224	ultimately show ?thesis by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1225	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1226
71242 ec5090faf541 separated Affine theory from Convex nipkow parents: 71240 diff changeset	1227	lemma convex_cone:
ec5090faf541 separated Affine theory from Convex nipkow parents: 71240 diff changeset	1228	"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)"
ec5090faf541 separated Affine theory from Convex nipkow parents: 71240 diff changeset	1229	(is "?lhs = ?rhs")
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1230	proof -
71242 ec5090faf541 separated Affine theory from Convex nipkow parents: 71240 diff changeset	1231	{
ec5090faf541 separated Affine theory from Convex nipkow parents: 71240 diff changeset	1232	fix x y
ec5090faf541 separated Affine theory from Convex nipkow parents: 71240 diff changeset	1233	assume "x\<in>s" "y\<in>s" and ?lhs
ec5090faf541 separated Affine theory from Convex nipkow parents: 71240 diff changeset	1234	then have "2 \<^sub>R x \<in>s" "2 \<^sub>R y \<in> s"
ec5090faf541 separated Affine theory from Convex nipkow parents: 71240 diff changeset	1235	unfolding cone_def by auto
ec5090faf541 separated Affine theory from Convex nipkow parents: 71240 diff changeset	1236	then have "x + y \<in> s"
ec5090faf541 separated Affine theory from Convex nipkow parents: 71240 diff changeset	1237	using \<open>?lhs\<close>[unfolded convex_def, THEN conjunct1]
ec5090faf541 separated Affine theory from Convex nipkow parents: 71240 diff changeset	1238	apply (erule_tac x="2*\<^sub>R x" in ballE)
ec5090faf541 separated Affine theory from Convex nipkow parents: 71240 diff changeset	1239	apply (erule_tac x="2*\<^sub>R y" in ballE)
ec5090faf541 separated Affine theory from Convex nipkow parents: 71240 diff changeset	1240	apply (erule_tac x="1/2" in allE, simp)
ec5090faf541 separated Affine theory from Convex nipkow parents: 71240 diff changeset	1241	apply (erule_tac x="1/2" in allE, auto)
ec5090faf541 separated Affine theory from Convex nipkow parents: 71240 diff changeset	1242	done
ec5090faf541 separated Affine theory from Convex nipkow parents: 71240 diff changeset	1243	}
ec5090faf541 separated Affine theory from Convex nipkow parents: 71240 diff changeset	1244	then show ?thesis
ec5090faf541 separated Affine theory from Convex nipkow parents: 71240 diff changeset	1245	unfolding convex_def cone_def by blast
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1246	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1247
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1248
70136 f03a01a18c6e modernized tags: default scope excludes proof; wenzelm parents: 70097 diff changeset	1249	subsection\<^marker>\<open>tag unimportant\<close> \<open>Connectedness of convex sets\<close>
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1250
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1251	lemma convex_connected:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1252	fixes S :: "'a::real_normed_vector set"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1253	assumes "convex S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1254	shows "connected S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1255	proof (rule connectedI)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1256	fix A B
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1257	assume "open A" "open B" "A \<inter> B \<inter> S = {}" "S \<subseteq> A \<union> B"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1258	moreover
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1259	assume "A \<inter> S \<noteq> {}" "B \<inter> S \<noteq> {}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1260	then obtain a b where a: "a \<in> A" "a \<in> S" and b: "b \<in> B" "b \<in> S" by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1261	define f where [abs_def]: "f u = u \<^sub>R a + (1 - u) \<^sub>R b" for u
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1262	then have "continuous_on {0 .. 1} f"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1263	by (auto intro!: continuous_intros)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1264	then have "connected (f ` {0 .. 1})"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1265	by (auto intro!: connected_continuous_image)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1266	note connectedD[OF this, of A B]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1267	moreover have "a \<in> A \<inter> f ` {0 .. 1}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1268	using a by (auto intro!: image_eqI[of _ _ 1] simp: f_def)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1269	moreover have "b \<in> B \<inter> f ` {0 .. 1}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1270	using b by (auto intro!: image_eqI[of _ _ 0] simp: f_def)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1271	moreover have "f ` {0 .. 1} \<subseteq> S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1272	using \<open>convex S\<close> a b unfolding convex_def f_def by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1273	ultimately show False by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1274	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1275
71136 f636d31f3616 tuned nipkow parents: 71044 diff changeset	1276	corollary%unimportant connected_UNIV[intro]: "connected (UNIV :: 'a::real_normed_vector set)"
f636d31f3616 tuned nipkow parents: 71044 diff changeset	1277	by (simp add: convex_connected)
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1278
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1279	lemma convex_prod:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1280	assumes "\<And>i. i \<in> Basis \<Longrightarrow> convex {x. P i x}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1281	shows "convex {x. \<forall>i\<in>Basis. P i (x\<bullet>i)}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1282	using assms unfolding convex_def
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1283	by (auto simp: inner_add_left)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1284
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1285	lemma convex_positive_orthant: "convex {x::'a::euclidean_space. (\<forall>i\<in>Basis. 0 \<le> x\<bullet>i)}"
71136 f636d31f3616 tuned nipkow parents: 71044 diff changeset	1286	by (rule convex_prod) (simp flip: atLeast_def)
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1287
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1288	subsection \<open>Convex hull\<close>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1289
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1290	lemma convex_convex_hull [iff]: "convex (convex hull s)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1291	unfolding hull_def
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1292	using convex_Inter[of "{t. convex t \<and> s \<subseteq> t}"]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1293	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1294
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1295	lemma convex_hull_subset:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1296	"s \<subseteq> convex hull t \<Longrightarrow> convex hull s \<subseteq> convex hull t"
71174 7fac205dd737 tuned nipkow parents: 71136 diff changeset	1297	by (simp add: subset_hull)
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1298
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1299	lemma convex_hull_eq: "convex hull s = s \<longleftrightarrow> convex s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1300	by (metis convex_convex_hull hull_same)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1301
70136 f03a01a18c6e modernized tags: default scope excludes proof; wenzelm parents: 70097 diff changeset	1302	subsubsection\<^marker>\<open>tag unimportant\<close> \<open>Convex hull is "preserved" by a linear function\<close>
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1303
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1304	lemma convex_hull_linear_image:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1305	assumes f: "linear f"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1306	shows "f ` (convex hull s) = convex hull (f ` s)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1307	proof
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1308	show "convex hull (f ` s) \<subseteq> f ` (convex hull s)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1309	by (intro hull_minimal image_mono hull_subset convex_linear_image assms convex_convex_hull)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1310	show "f ` (convex hull s) \<subseteq> convex hull (f ` s)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1311	proof (unfold image_subset_iff_subset_vimage, rule hull_minimal)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1312	show "s \<subseteq> f -` (convex hull (f ` s))"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1313	by (fast intro: hull_inc)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1314	show "convex (f -` (convex hull (f ` s)))"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1315	by (intro convex_linear_vimage [OF f] convex_convex_hull)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1316	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1317	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1318
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1319	lemma in_convex_hull_linear_image:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1320	assumes "linear f"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1321	and "x \<in> convex hull s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1322	shows "f x \<in> convex hull (f ` s)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1323	using convex_hull_linear_image[OF assms(1)] assms(2) by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1324
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1325	lemma convex_hull_Times:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1326	"convex hull (s \<times> t) = (convex hull s) \<times> (convex hull t)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1327	proof
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1328	show "convex hull (s \<times> t) \<subseteq> (convex hull s) \<times> (convex hull t)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1329	by (intro hull_minimal Sigma_mono hull_subset convex_Times convex_convex_hull)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1330	have "(x, y) \<in> convex hull (s \<times> t)" if x: "x \<in> convex hull s" and y: "y \<in> convex hull t" for x y
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1331	proof (rule hull_induct [OF x], rule hull_induct [OF y])
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1332	fix x y assume "x \<in> s" and "y \<in> t"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1333	then show "(x, y) \<in> convex hull (s \<times> t)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1334	by (simp add: hull_inc)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1335	next
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1336	fix x let ?S = "((\<lambda>y. (0, y)) -` (\<lambda>p. (- x, 0) + p) ` (convex hull s \<times> t))"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1337	have "convex ?S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1338	by (intro convex_linear_vimage convex_translation convex_convex_hull,
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1339	simp add: linear_iff)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1340	also have "?S = {y. (x, y) \<in> convex hull (s \<times> t)}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1341	by (auto simp: image_def Bex_def)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1342	finally show "convex {y. (x, y) \<in> convex hull (s \<times> t)}" .
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1343	next
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1344	show "convex {x. (x, y) \<in> convex hull s \<times> t}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1345	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1346	fix y let ?S = "((\<lambda>x. (x, 0)) -` (\<lambda>p. (0, - y) + p) ` (convex hull s \<times> t))"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1347	have "convex ?S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1348	by (intro convex_linear_vimage convex_translation convex_convex_hull,
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1349	simp add: linear_iff)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1350	also have "?S = {x. (x, y) \<in> convex hull (s \<times> t)}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1351	by (auto simp: image_def Bex_def)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1352	finally show "convex {x. (x, y) \<in> convex hull (s \<times> t)}" .
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1353	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1354	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1355	then show "(convex hull s) \<times> (convex hull t) \<subseteq> convex hull (s \<times> t)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1356	unfolding subset_eq split_paired_Ball_Sigma by blast
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1357	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1358
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1359
70136 f03a01a18c6e modernized tags: default scope excludes proof; wenzelm parents: 70097 diff changeset	1360	subsubsection\<^marker>\<open>tag unimportant\<close> \<open>Stepping theorems for convex hulls of finite sets\<close>
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1361
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1362	lemma convex_hull_empty[simp]: "convex hull {} = {}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1363	by (rule hull_unique) auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1364
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1365	lemma convex_hull_singleton[simp]: "convex hull {a} = {a}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1366	by (rule hull_unique) auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1367
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1368	lemma convex_hull_insert:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1369	fixes S :: "'a::real_vector set"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1370	assumes "S \<noteq> {}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1371	shows "convex hull (insert a S) =
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1372	{x. \<exists>u\<ge>0. \<exists>v\<ge>0. \<exists>b. (u + v = 1) \<and> b \<in> (convex hull S) \<and> (x = u \<^sub>R a + v \<^sub>R b)}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1373	(is "_ = ?hull")
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1374	proof (intro equalityI hull_minimal subsetI)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1375	fix x
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1376	assume "x \<in> insert a S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1377	then have "\<exists>u\<ge>0. \<exists>v\<ge>0. u + v = 1 \<and> (\<exists>b. b \<in> convex hull S \<and> x = u \<^sub>R a + v \<^sub>R b)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1378	unfolding insert_iff
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1379	proof
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1380	assume "x = a"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1381	then show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1382	by (rule_tac x=1 in exI) (use assms hull_subset in fastforce)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1383	next
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1384	assume "x \<in> S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1385	with hull_subset[of S convex] show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1386	by force
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1387	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1388	then show "x \<in> ?hull"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1389	by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1390	next
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1391	fix x
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1392	assume "x \<in> ?hull"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1393	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"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1394	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1395	have "a \<in> convex hull insert a S" "b \<in> convex hull insert a S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1396	using hull_mono[of S "insert a S" convex] hull_mono[of "{a}" "insert a S" convex] and obt(4)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1397	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1398	then show "x \<in> convex hull insert a S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1399	unfolding obt(5) using obt(1-3)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1400	by (rule convexD [OF convex_convex_hull])
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1401	next
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1402	show "convex ?hull"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1403	proof (rule convexI)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1404	fix x y u v
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1405	assume as: "(0::real) \<le> u" "0 \<le> v" "u + v = 1" and x: "x \<in> ?hull" and y: "y \<in> ?hull"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1406	from x obtain u1 v1 b1 where
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1407	obt1: "u1\<ge>0" "v1\<ge>0" "u1 + v1 = 1" "b1 \<in> convex hull S" and xeq: "x = u1 \<^sub>R a + v1 \<^sub>R b1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1408	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1409	from y obtain u2 v2 b2 where
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1410	obt2: "u2\<ge>0" "v2\<ge>0" "u2 + v2 = 1" "b2 \<in> convex hull S" and yeq: "y = u2 \<^sub>R a + v2 \<^sub>R b2"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1411	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1412	have : "\<And>(x::'a) s1 s2. x - s1 \<^sub>R x - s2 \<^sub>R x = ((1::real) - (s1 + s2)) \<^sub>R x"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1413	by (auto simp: algebra_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1414	have "\<exists>b \<in> convex hull S. u \<^sub>R x + v \<^sub>R y =
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1415	(u * u1) \<^sub>R a + (v u2) \<^sub>R a + (b - (u u1) \<^sub>R b - (v u2) *\<^sub>R b)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1416	proof (cases "u * v1 + v * v2 = 0")
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1417	case True
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1418	have : "\<And>(x::'a) s1 s2. x - s1 \<^sub>R x - s2 \<^sub>R x = ((1::real) - (s1 + s2)) \<^sub>R x"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1419	by (auto simp: algebra_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1420	have eq0: "u * v1 = 0" "v * v2 = 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1421	using True mult_nonneg_nonneg[OF \<open>u\<ge>0\<close> \<open>v1\<ge>0\<close>] mult_nonneg_nonneg[OF \<open>v\<ge>0\<close> \<open>v2\<ge>0\<close>]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1422	by arith+
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1423	then have "u * u1 + v * u2 = 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1424	using as(3) obt1(3) obt2(3) by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1425	then show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1426	using "*" eq0 as obt1(4) xeq yeq by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1427	next
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1428	case False
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1429	have "1 - (u * u1 + v * u2) = (u + v) - (u * u1 + v * u2)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1430	using as(3) obt1(3) obt2(3) by (auto simp: field_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1431	also have "\<dots> = u * (v1 + u1 - u1) + v * (v2 + u2 - u2)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1432	using as(3) obt1(3) obt2(3) by (auto simp: field_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1433	also have "\<dots> = u * v1 + v * v2"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1434	by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1435	finally have *:"1 - (u u1 + v * u2) = u * v1 + v * v2" by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1436	let ?b = "((u * v1) / (u * v1 + v * v2)) \<^sub>R b1 + ((v v2) / (u * v1 + v * v2)) *\<^sub>R b2"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1437	have zeroes: "0 \<le> u * v1 + v * v2" "0 \<le> u * v1" "0 \<le> u * v1 + v * v2" "0 \<le> v * v2"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1438	using as(1,2) obt1(1,2) obt2(1,2) by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1439	show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1440	proof
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1441	show "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)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1442	unfolding xeq yeq * **
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1443	using False by (auto simp: scaleR_left_distrib scaleR_right_distrib)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1444	show "?b \<in> convex hull S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1445	using False zeroes obt1(4) obt2(4)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1446	by (auto simp: convexD [OF convex_convex_hull] scaleR_left_distrib scaleR_right_distrib add_divide_distrib[symmetric] zero_le_divide_iff)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1447	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1448	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1449	then obtain b where b: "b \<in> convex hull S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1450	"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)" ..
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1451
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1452	have u1: "u1 \<le> 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1453	unfolding obt1(3)[symmetric] and not_le using obt1(2) by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1454	have u2: "u2 \<le> 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1455	unfolding obt2(3)[symmetric] and not_le using obt2(2) by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1456	have "u1 * u + u2 * v \<le> max u1 u2 * u + max u1 u2 * v"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1457	proof (rule add_mono)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1458	show "u1 * u \<le> max u1 u2 * u" "u2 * v \<le> max u1 u2 * v"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1459	by (simp_all add: as mult_right_mono)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1460	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1461	also have "\<dots> \<le> 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1462	unfolding distrib_left[symmetric] and as(3) using u1 u2 by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1463	finally have le1: "u1 * u + u2 * v \<le> 1" .
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1464	show "u \<^sub>R x + v \<^sub>R y \<in> ?hull"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1465	proof (intro CollectI exI conjI)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1466	show "0 \<le> u * u1 + v * u2"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1467	by (simp add: as(1) as(2) obt1(1) obt2(1))
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1468	show "0 \<le> 1 - u * u1 - v * u2"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1469	by (simp add: le1 diff_diff_add mult.commute)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1470	qed (use b in \<open>auto simp: algebra_simps\<close>)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1471	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1472	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1473
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1474	lemma convex_hull_insert_alt:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1475	"convex hull (insert a S) =
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1476	(if S = {} then {a}
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1477	else {(1 - u) \<^sub>R a + u \<^sub>R x \|x u. 0 \<le> u \<and> u \<le> 1 \<and> x \<in> convex hull S})"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1478	apply (auto simp: convex_hull_insert)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1479	using diff_eq_eq apply fastforce
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1480	by (metis add.group_left_neutral add_le_imp_le_diff diff_add_cancel)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1481
70136 f03a01a18c6e modernized tags: default scope excludes proof; wenzelm parents: 70097 diff changeset	1482	subsubsection\<^marker>\<open>tag unimportant\<close> \<open>Explicit expression for convex hull\<close>
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1483
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1484	proposition convex_hull_indexed:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1485	fixes S :: "'a::real_vector set"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1486	shows "convex hull S =
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1487	{y. \<exists>k u x. (\<forall>i\<in>{1::nat .. k}. 0 \<le> u i \<and> x i \<in> S) \<and>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1488	(sum u {1..k} = 1) \<and> (\<Sum>i = 1..k. u i *\<^sub>R x i) = y}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1489	(is "?xyz = ?hull")
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1490	proof (rule hull_unique [OF _ convexI])
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1491	show "S \<subseteq> ?hull"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1492	by (clarsimp, rule_tac x=1 in exI, rule_tac x="\<lambda>x. 1" in exI, auto)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1493	next
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1494	fix T
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1495	assume "S \<subseteq> T" "convex T"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1496	then show "?hull \<subseteq> T"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1497	by (blast intro: convex_sum)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1498	next
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1499	fix x y u v
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1500	assume uv: "0 \<le> u" "0 \<le> v" "u + v = (1::real)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1501	assume xy: "x \<in> ?hull" "y \<in> ?hull"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1502	from xy obtain k1 u1 x1 where
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1503	x [rule_format]: "\<forall>i\<in>{1::nat..k1}. 0\<le>u1 i \<and> x1 i \<in> S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1504	"sum u1 {Suc 0..k1} = 1" "(\<Sum>i = Suc 0..k1. u1 i *\<^sub>R x1 i) = x"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1505	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1506	from xy obtain k2 u2 x2 where
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1507	y [rule_format]: "\<forall>i\<in>{1::nat..k2}. 0\<le>u2 i \<and> x2 i \<in> S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1508	"sum u2 {Suc 0..k2} = 1" "(\<Sum>i = Suc 0..k2. u2 i *\<^sub>R x2 i) = y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1509	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1510	have : "\<And>P (x::'a) y s t i. (if P i then s else t) \<^sub>R (if P i then x else y) = (if P i then s \<^sub>R x else t \<^sub>R y)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1511	"{1..k1 + k2} \<inter> {1..k1} = {1..k1}" "{1..k1 + k2} \<inter> - {1..k1} = (\<lambda>i. i + k1) ` {1..k2}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1512	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1513	have inj: "inj_on (\<lambda>i. i + k1) {1..k2}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1514	unfolding inj_on_def by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1515	let ?uu = "\<lambda>i. if i \<in> {1..k1} then u * u1 i else v * u2 (i - k1)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1516	let ?xx = "\<lambda>i. if i \<in> {1..k1} then x1 i else x2 (i - k1)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1517	show "u \<^sub>R x + v \<^sub>R y \<in> ?hull"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1518	proof (intro CollectI exI conjI ballI)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1519	show "0 \<le> ?uu i" "?xx i \<in> S" if "i \<in> {1..k1+k2}" for i
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1520	using that by (auto simp add: le_diff_conv uv(1) x(1) uv(2) y(1))
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1521	show "(\<Sum>i = 1..k1 + k2. ?uu i) = 1" "(\<Sum>i = 1..k1 + k2. ?uu i \<^sub>R ?xx i) = u \<^sub>R x + v *\<^sub>R y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1522	unfolding * sum.If_cases[OF finite_atLeastAtMost[of 1 "k1 + k2"]]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1523	sum.reindex[OF inj] Collect_mem_eq o_def
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1524	unfolding scaleR_scaleR[symmetric] scaleR_right.sum [symmetric] sum_distrib_left[symmetric]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1525	by (simp_all add: sum_distrib_left[symmetric] x(2,3) y(2,3) uv(3))
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1526	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1527	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1528
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1529	lemma convex_hull_finite:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1530	fixes S :: "'a::real_vector set"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1531	assumes "finite S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1532	shows "convex hull S = {y. \<exists>u. (\<forall>x\<in>S. 0 \<le> u x) \<and> sum u S = 1 \<and> sum (\<lambda>x. u x *\<^sub>R x) S = y}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1533	(is "?HULL = _")
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1534	proof (rule hull_unique [OF _ convexI]; clarify)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1535	fix x
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1536	assume "x \<in> S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1537	then show "\<exists>u. (\<forall>x\<in>S. 0 \<le> u x) \<and> sum u S = 1 \<and> (\<Sum>x\<in>S. u x *\<^sub>R x) = x"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1538	by (rule_tac x="\<lambda>y. if x=y then 1 else 0" in exI) (auto simp: sum.delta'[OF assms] sum_delta''[OF assms])
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1539	next
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1540	fix u v :: real
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1541	assume uv: "0 \<le> u" "0 \<le> v" "u + v = 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1542	fix ux assume ux [rule_format]: "\<forall>x\<in>S. 0 \<le> ux x" "sum ux S = (1::real)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1543	fix uy assume uy [rule_format]: "\<forall>x\<in>S. 0 \<le> uy x" "sum uy S = (1::real)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1544	have "0 \<le> u * ux x + v * uy x" if "x\<in>S" for x
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1545	by (simp add: that uv ux(1) uy(1))
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1546	moreover
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1547	have "(\<Sum>x\<in>S. u * ux x + v * uy x) = 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1548	unfolding sum.distrib and sum_distrib_left[symmetric] ux(2) uy(2)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1549	using uv(3) by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1550	moreover
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1551	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)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1552	unfolding scaleR_left_distrib sum.distrib scaleR_scaleR[symmetric] scaleR_right.sum [symmetric]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1553	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1554	ultimately
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1555	show "\<exists>uc. (\<forall>x\<in>S. 0 \<le> uc x) \<and> sum uc S = 1 \<and>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1556	(\<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)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1557	by (rule_tac x="\<lambda>x. u * ux x + v * uy x" in exI, auto)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1558	qed (use assms in \<open>auto simp: convex_explicit\<close>)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1559
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1560
70136 f03a01a18c6e modernized tags: default scope excludes proof; wenzelm parents: 70097 diff changeset	1561	subsubsection\<^marker>\<open>tag unimportant\<close> \<open>Another formulation\<close>
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1562
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1563	text "Formalized by Lars Schewe."
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1564
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1565	lemma convex_hull_explicit:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1566	fixes p :: "'a::real_vector set"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1567	shows "convex hull p =
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1568	{y. \<exists>S u. finite S \<and> S \<subseteq> p \<and> (\<forall>x\<in>S. 0 \<le> u x) \<and> sum u S = 1 \<and> sum (\<lambda>v. u v *\<^sub>R v) S = y}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1569	(is "?lhs = ?rhs")
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1570	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1571	{
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1572	fix x
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1573	assume "x\<in>?lhs"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1574	then obtain k u y where
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1575	obt: "\<forall>i\<in>{1::nat..k}. 0 \<le> u i \<and> y i \<in> p" "sum u {1..k} = 1" "(\<Sum>i = 1..k. u i *\<^sub>R y i) = x"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1576	unfolding convex_hull_indexed by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1577
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1578	have fin: "finite {1..k}" by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1579	have fin': "\<And>v. finite {i \<in> {1..k}. y i = v}" by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1580	{
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1581	fix j
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1582	assume "j\<in>{1..k}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1583	then have "y j \<in> p" "0 \<le> sum u {i. Suc 0 \<le> i \<and> i \<le> k \<and> y i = y j}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1584	using obt(1)[THEN bspec[where x=j]] and obt(2)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1585	apply simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1586	apply (rule sum_nonneg)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1587	using obt(1)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1588	apply auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1589	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1590	}
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1591	moreover
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1592	have "(\<Sum>v\<in>y ` {1..k}. sum u {i \<in> {1..k}. y i = v}) = 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1593	unfolding sum.image_gen[OF fin, symmetric] using obt(2) by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1594	moreover have "(\<Sum>v\<in>y ` {1..k}. sum u {i \<in> {1..k}. y i = v} *\<^sub>R v) = x"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1595	using sum.image_gen[OF fin, of "\<lambda>i. u i *\<^sub>R y i" y, symmetric]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1596	unfolding scaleR_left.sum using obt(3) by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1597	ultimately
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1598	have "\<exists>S u. finite S \<and> S \<subseteq> p \<and> (\<forall>x\<in>S. 0 \<le> u x) \<and> sum u S = 1 \<and> (\<Sum>v\<in>S. u v *\<^sub>R v) = x"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1599	apply (rule_tac x="y ` {1..k}" in exI)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1600	apply (rule_tac x="\<lambda>v. sum u {i\<in>{1..k}. y i = v}" in exI, auto)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1601	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1602	then have "x\<in>?rhs" by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1603	}
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1604	moreover
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1605	{
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1606	fix y
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1607	assume "y\<in>?rhs"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1608	then obtain S u where
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1609	obt: "finite S" "S \<subseteq> p" "\<forall>x\<in>S. 0 \<le> u x" "sum u S = 1" "(\<Sum>v\<in>S. u v *\<^sub>R v) = y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1610	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1611
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1612	obtain f where f: "inj_on f {1..card S}" "f ` {1..card S} = S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1613	using ex_bij_betw_nat_finite_1[OF obt(1)] unfolding bij_betw_def by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1614
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1615	{
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1616	fix i :: nat
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1617	assume "i\<in>{1..card S}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1618	then have "f i \<in> S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1619	using f(2) by blast
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1620	then have "0 \<le> u (f i)" "f i \<in> p" using obt(2,3) by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1621	}
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1622	moreover have *: "finite {1..card S}" by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1623	{
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1624	fix y
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1625	assume "y\<in>S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1626	then obtain i where "i\<in>{1..card S}" "f i = y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1627	using f using image_iff[of y f "{1..card S}"]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1628	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1629	then have "{x. Suc 0 \<le> x \<and> x \<le> card S \<and> f x = y} = {i}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1630	apply auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1631	using f(1)[unfolded inj_on_def]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1632	by (metis One_nat_def atLeastAtMost_iff)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1633	then have "card {x. Suc 0 \<le> x \<and> x \<le> card S \<and> f x = y} = 1" by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1634	then have "(\<Sum>x\<in>{x \<in> {1..card S}. f x = y}. u (f x)) = u y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1635	"(\<Sum>x\<in>{x \<in> {1..card S}. f x = y}. u (f x) \<^sub>R f x) = u y \<^sub>R y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1636	by (auto simp: sum_constant_scaleR)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1637	}
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1638	then have "(\<Sum>x = 1..card S. u (f x)) = 1" "(\<Sum>i = 1..card S. u (f i) *\<^sub>R f i) = y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1639	unfolding sum.image_gen[OF (1), of "\<lambda>x. u (f x) \<^sub>R f x" f]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1640	and sum.image_gen[OF *(1), of "\<lambda>x. u (f x)" f]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1641	unfolding f
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1642	using sum.cong [of S 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"]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1643	using sum.cong [of S S "\<lambda>y. (\<Sum>x\<in>{x \<in> {1..card S}. f x = y}. u (f x))" u]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1644	unfolding obt(4,5)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1645	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1646	ultimately
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1647	have "\<exists>k u x. (\<forall>i\<in>{1..k}. 0 \<le> u i \<and> x i \<in> p) \<and> sum u {1..k} = 1 \<and>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1648	(\<Sum>i::nat = 1..k. u i *\<^sub>R x i) = y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1649	apply (rule_tac x="card S" in exI)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1650	apply (rule_tac x="u \<circ> f" in exI)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1651	apply (rule_tac x=f in exI, fastforce)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1652	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1653	then have "y \<in> ?lhs"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1654	unfolding convex_hull_indexed by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1655	}
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1656	ultimately show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1657	unfolding set_eq_iff by blast
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1658	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1659
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1660
70136 f03a01a18c6e modernized tags: default scope excludes proof; wenzelm parents: 70097 diff changeset	1661	subsubsection\<^marker>\<open>tag unimportant\<close> \<open>A stepping theorem for that expansion\<close>
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1662
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1663	lemma convex_hull_finite_step:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1664	fixes S :: "'a::real_vector set"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1665	assumes "finite S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1666	shows
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1667	"(\<exists>u. (\<forall>x\<in>insert a S. 0 \<le> u x) \<and> sum u (insert a S) = w \<and> sum (\<lambda>x. u x *\<^sub>R x) (insert a S) = y)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1668	\<longleftrightarrow> (\<exists>v\<ge>0. \<exists>u. (\<forall>x\<in>S. 0 \<le> u x) \<and> sum u S = w - v \<and> sum (\<lambda>x. u x \<^sub>R x) S = y - v \<^sub>R a)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1669	(is "?lhs = ?rhs")
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1670	proof (rule, case_tac[!] "a\<in>S")
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1671	assume "a \<in> S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1672	then have *: "insert a S = S" by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1673	assume ?lhs
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1674	then show ?rhs
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1675	unfolding * by (rule_tac x=0 in exI, auto)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1676	next
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1677	assume ?lhs
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1678	then obtain u where
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1679	u: "\<forall>x\<in>insert a S. 0 \<le> u x" "sum u (insert a S) = w" "(\<Sum>x\<in>insert a S. u x *\<^sub>R x) = y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1680	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1681	assume "a \<notin> S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1682	then show ?rhs
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1683	apply (rule_tac x="u a" in exI)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1684	using u(1)[THEN bspec[where x=a]]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1685	apply simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1686	apply (rule_tac x=u in exI)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1687	using u[unfolded sum_clauses(2)[OF assms]] and \<open>a\<notin>S\<close>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1688	apply auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1689	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1690	next
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1691	assume "a \<in> S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1692	then have *: "insert a S = S" by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1693	have fin: "finite (insert a S)" using assms by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1694	assume ?rhs
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1695	then obtain v u where uv: "v\<ge>0" "\<forall>x\<in>S. 0 \<le> u x" "sum u S = w - v" "(\<Sum>x\<in>S. u x \<^sub>R x) = y - v \<^sub>R a"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1696	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1697	show ?lhs
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1698	apply (rule_tac x = "\<lambda>x. (if a = x then v else 0) + u x" in exI)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1699	unfolding scaleR_left_distrib and sum.distrib and sum_delta''[OF fin] and sum.delta'[OF fin]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1700	unfolding sum_clauses(2)[OF assms]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1701	using uv and uv(2)[THEN bspec[where x=a]] and \<open>a\<in>S\<close>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1702	apply auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1703	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1704	next
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1705	assume ?rhs
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1706	then obtain v u where uv: "v\<ge>0" "\<forall>x\<in>S. 0 \<le> u x" "sum u S = w - v" "(\<Sum>x\<in>S. u x \<^sub>R x) = y - v \<^sub>R a"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1707	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1708	moreover assume "a \<notin> S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1709	moreover
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1710	have "(\<Sum>x\<in>S. if a = x then v else u x) = sum 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)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1711	using \<open>a \<notin> S\<close>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1712	by (auto simp: intro!: sum.cong)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1713	ultimately show ?lhs
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1714	by (rule_tac x="\<lambda>x. if a = x then v else u x" in exI) (auto simp: sum_clauses(2)[OF assms])
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1715	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1716
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1717
70136 f03a01a18c6e modernized tags: default scope excludes proof; wenzelm parents: 70097 diff changeset	1718	subsubsection\<^marker>\<open>tag unimportant\<close> \<open>Hence some special cases\<close>
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1719
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1720	lemma convex_hull_2:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1721	"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}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1722	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1723	have *: "\<And>u. (\<forall>x\<in>{a, b}. 0 \<le> u x) \<longleftrightarrow> 0 \<le> u a \<and> 0 \<le> u b"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1724	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1725	have **: "finite {b}" by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1726	show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1727	apply (simp add: convex_hull_finite)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1728	unfolding convex_hull_finite_step[OF *, of a 1, unfolded conj_assoc]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1729	apply auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1730	apply (rule_tac x=v in exI)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1731	apply (rule_tac x="1 - v" in exI, simp)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1732	apply (rule_tac x=u in exI, simp)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1733	apply (rule_tac x="\<lambda>x. v" in exI, simp)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1734	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1735	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1736
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1737	lemma convex_hull_2_alt: "convex hull {a,b} = {a + u *\<^sub>R (b - a) \| u. 0 \<le> u \<and> u \<le> 1}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1738	unfolding convex_hull_2
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1739	proof (rule Collect_cong)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1740	have *: "\<And>x y ::real. x + y = 1 \<longleftrightarrow> x = 1 - y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1741	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1742	fix x
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1743	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) \<longleftrightarrow>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1744	(\<exists>u. x = a + u *\<^sub>R (b - a) \<and> 0 \<le> u \<and> u \<le> 1)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1745	unfolding *
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1746	apply auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1747	apply (rule_tac[!] x=u in exI)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1748	apply (auto simp: algebra_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1749	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1750	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1751
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1752	lemma convex_hull_3:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1753	"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}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1754	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1755	have fin: "finite {a,b,c}" "finite {b,c}" "finite {c}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1756	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1757	have *: "\<And>x y z ::real. x + y + z = 1 \<longleftrightarrow> x = 1 - y - z"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1758	by (auto simp: field_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1759	show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1760	unfolding convex_hull_finite[OF fin(1)] and convex_hull_finite_step[OF fin(2)] and *
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1761	unfolding convex_hull_finite_step[OF fin(3)]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1762	apply (rule Collect_cong, simp)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1763	apply auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1764	apply (rule_tac x=va in exI)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1765	apply (rule_tac x="u c" in exI, simp)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1766	apply (rule_tac x="1 - v - w" in exI, simp)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1767	apply (rule_tac x=v in exI, simp)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1768	apply (rule_tac x="\<lambda>x. w" in exI, simp)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1769	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1770	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1771
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1772	lemma convex_hull_3_alt:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1773	"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}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1774	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1775	have *: "\<And>x y z ::real. x + y + z = 1 \<longleftrightarrow> x = 1 - y - z"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1776	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1777	show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1778	unfolding convex_hull_3
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1779	apply (auto simp: *)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1780	apply (rule_tac x=v in exI)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1781	apply (rule_tac x=w in exI)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1782	apply (simp add: algebra_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1783	apply (rule_tac x=u in exI)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1784	apply (rule_tac x=v in exI)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1785	apply (simp add: algebra_simps)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1786	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1787	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1788
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1789
70136 f03a01a18c6e modernized tags: default scope excludes proof; wenzelm parents: 70097 diff changeset	1790	subsection\<^marker>\<open>tag unimportant\<close> \<open>Relations among closure notions and corresponding hulls\<close>
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1791
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1792	lemma affine_imp_convex: "affine s \<Longrightarrow> convex s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1793	unfolding affine_def convex_def by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1794
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1795	lemma convex_affine_hull [simp]: "convex (affine hull S)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1796	by (simp add: affine_imp_convex)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1797
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1798	lemma subspace_imp_convex: "subspace s \<Longrightarrow> convex s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1799	using subspace_imp_affine affine_imp_convex by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1800
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1801	lemma convex_hull_subset_span: "(convex hull s) \<subseteq> (span s)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1802	by (metis hull_minimal span_superset subspace_imp_convex subspace_span)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1803
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1804	lemma convex_hull_subset_affine_hull: "(convex hull s) \<subseteq> (affine hull s)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1805	by (metis affine_affine_hull affine_imp_convex hull_minimal hull_subset)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1806
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1807	lemma aff_dim_convex_hull:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1808	fixes S :: "'n::euclidean_space set"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1809	shows "aff_dim (convex hull S) = aff_dim S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1810	using aff_dim_affine_hull[of S] convex_hull_subset_affine_hull[of S]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1811	hull_subset[of S "convex"] aff_dim_subset[of S "convex hull S"]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1812	aff_dim_subset[of "convex hull S" "affine hull S"]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1813	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1814
71242 ec5090faf541 separated Affine theory from Convex nipkow parents: 71240 diff changeset	1815
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1816	subsection \<open>Caratheodory's theorem\<close>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1817
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1818	lemma convex_hull_caratheodory_aff_dim:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1819	fixes p :: "('a::euclidean_space) set"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1820	shows "convex hull p =
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1821	{y. \<exists>s u. finite s \<and> s \<subseteq> p \<and> card s \<le> aff_dim p + 1 \<and>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1822	(\<forall>x\<in>s. 0 \<le> u x) \<and> sum u s = 1 \<and> sum (\<lambda>v. u v *\<^sub>R v) s = y}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1823	unfolding convex_hull_explicit set_eq_iff mem_Collect_eq
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1824	proof (intro allI iffI)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1825	fix y
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1826	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>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1827	sum u s = 1 \<and> (\<Sum>v\<in>s. u v *\<^sub>R v) = y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1828	assume "\<exists>s u. finite s \<and> s \<subseteq> p \<and> (\<forall>x\<in>s. 0 \<le> u x) \<and> sum u s = 1 \<and> (\<Sum>v\<in>s. u v *\<^sub>R v) = y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1829	then obtain N where "?P N" by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1830	then have "\<exists>n\<le>N. (\<forall>k<n. \<not> ?P k) \<and> ?P n"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1831	apply (rule_tac ex_least_nat_le, auto)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1832	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1833	then obtain n where "?P n" and smallest: "\<forall>k<n. \<not> ?P k"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1834	by blast
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1835	then obtain s u where obt: "finite s" "card s = n" "s\<subseteq>p" "\<forall>x\<in>s. 0 \<le> u x"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1836	"sum u s = 1" "(\<Sum>v\<in>s. u v *\<^sub>R v) = y" by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1837
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1838	have "card s \<le> aff_dim p + 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1839	proof (rule ccontr, simp only: not_le)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1840	assume "aff_dim p + 1 < card s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1841	then have "affine_dependent s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1842	using affine_dependent_biggerset[OF obt(1)] independent_card_le_aff_dim not_less obt(3)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1843	by blast
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1844	then obtain w v where wv: "sum w s = 0" "v\<in>s" "w v \<noteq> 0" "(\<Sum>v\<in>s. w v *\<^sub>R v) = 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1845	using affine_dependent_explicit_finite[OF obt(1)] by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1846	define i where "i = (\<lambda>v. (u v) / (- w v)) ` {v\<in>s. w v < 0}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1847	define t where "t = Min i"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1848	have "\<exists>x\<in>s. w x < 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1849	proof (rule ccontr, simp add: not_less)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1850	assume as:"\<forall>x\<in>s. 0 \<le> w x"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1851	then have "sum w (s - {v}) \<ge> 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1852	apply (rule_tac sum_nonneg, auto)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1853	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1854	then have "sum w s > 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1855	unfolding sum.remove[OF obt(1) \<open>v\<in>s\<close>]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1856	using as[THEN bspec[where x=v]] \<open>v\<in>s\<close> \<open>w v \<noteq> 0\<close> by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1857	then show False using wv(1) by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1858	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1859	then have "i \<noteq> {}" unfolding i_def by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1860	then have "t \<ge> 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1861	using Min_ge_iff[of i 0 ] and obt(1)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1862	unfolding t_def i_def
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1863	using obt(4)[unfolded le_less]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1864	by (auto simp: divide_le_0_iff)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1865	have t: "\<forall>v\<in>s. u v + t * w v \<ge> 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1866	proof
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1867	fix v
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1868	assume "v \<in> s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1869	then have v: "0 \<le> u v"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1870	using obt(4)[THEN bspec[where x=v]] by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1871	show "0 \<le> u v + t * w v"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1872	proof (cases "w v < 0")
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1873	case False
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1874	thus ?thesis using v \<open>t\<ge>0\<close> by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1875	next
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1876	case True
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1877	then have "t \<le> u v / (- w v)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1878	using \<open>v\<in>s\<close> unfolding t_def i_def
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1879	apply (rule_tac Min_le)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1880	using obt(1) apply auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1881	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1882	then show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1883	unfolding real_0_le_add_iff
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1884	using pos_le_divide_eq[OF True[unfolded neg_0_less_iff_less[symmetric]]]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1885	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1886	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1887	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1888	obtain a where "a \<in> s" and "t = (\<lambda>v. (u v) / (- w v)) a" and "w a < 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1889	using Min_in[OF _ \<open>i\<noteq>{}\<close>] and obt(1) unfolding i_def t_def by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1890	then have a: "a \<in> s" "u a + t * w a = 0" by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1891	have *: "\<And>f. sum f (s - {a}) = sum f s - ((f a)::'b::ab_group_add)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1892	unfolding sum.remove[OF obt(1) \<open>a\<in>s\<close>] by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1893	have "(\<Sum>v\<in>s. u v + t * w v) = 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1894	unfolding sum.distrib wv(1) sum_distrib_left[symmetric] obt(5) by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1895	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"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1896	unfolding sum.distrib obt(6) scaleR_scaleR[symmetric] scaleR_right.sum [symmetric] wv(4)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1897	using a(2) [THEN eq_neg_iff_add_eq_0 [THEN iffD2]] by simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1898	ultimately have "?P (n - 1)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1899	apply (rule_tac x="(s - {a})" in exI)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1900	apply (rule_tac x="\<lambda>v. u v + t * w v" in exI)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1901	using obt(1-3) and t and a
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1902	apply (auto simp: * scaleR_left_distrib)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1903	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1904	then show False
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1905	using smallest[THEN spec[where x="n - 1"]] by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1906	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1907	then show "\<exists>s u. finite s \<and> s \<subseteq> p \<and> card s \<le> aff_dim p + 1 \<and>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1908	(\<forall>x\<in>s. 0 \<le> u x) \<and> sum u s = 1 \<and> (\<Sum>v\<in>s. u v *\<^sub>R v) = y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1909	using obt by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1910	qed auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1911
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1912	lemma caratheodory_aff_dim:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1913	fixes p :: "('a::euclidean_space) set"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1914	shows "convex hull p = {x. \<exists>s. finite s \<and> s \<subseteq> p \<and> card s \<le> aff_dim p + 1 \<and> x \<in> convex hull s}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1915	(is "?lhs = ?rhs")
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1916	proof
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1917	show "?lhs \<subseteq> ?rhs"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1918	apply (subst convex_hull_caratheodory_aff_dim, clarify)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1919	apply (rule_tac x=s in exI)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1920	apply (simp add: hull_subset convex_explicit [THEN iffD1, OF convex_convex_hull])
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1921	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1922	next
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1923	show "?rhs \<subseteq> ?lhs"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1924	using hull_mono by blast
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1925	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1926
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1927	lemma convex_hull_caratheodory:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1928	fixes p :: "('a::euclidean_space) set"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1929	shows "convex hull p =
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1930	{y. \<exists>s u. finite s \<and> s \<subseteq> p \<and> card s \<le> DIM('a) + 1 \<and>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1931	(\<forall>x\<in>s. 0 \<le> u x) \<and> sum u s = 1 \<and> sum (\<lambda>v. u v *\<^sub>R v) s = y}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1932	(is "?lhs = ?rhs")
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1933	proof (intro set_eqI iffI)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1934	fix x
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1935	assume "x \<in> ?lhs" then show "x \<in> ?rhs"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1936	apply (simp only: convex_hull_caratheodory_aff_dim Set.mem_Collect_eq)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1937	apply (erule ex_forward)+
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1938	using aff_dim_le_DIM [of p]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1939	apply simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1940	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1941	next
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1942	fix x
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1943	assume "x \<in> ?rhs" then show "x \<in> ?lhs"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1944	by (auto simp: convex_hull_explicit)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1945	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1946
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1947	theorem caratheodory:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1948	"convex hull p =
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1949	{x::'a::euclidean_space. \<exists>s. finite s \<and> s \<subseteq> p \<and>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1950	card s \<le> DIM('a) + 1 \<and> x \<in> convex hull s}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1951	proof safe
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1952	fix x
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1953	assume "x \<in> convex hull p"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1954	then obtain s u where "finite s" "s \<subseteq> p" "card s \<le> DIM('a) + 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1955	"\<forall>x\<in>s. 0 \<le> u x" "sum u s = 1" "(\<Sum>v\<in>s. u v *\<^sub>R v) = x"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1956	unfolding convex_hull_caratheodory by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1957	then show "\<exists>s. finite s \<and> s \<subseteq> p \<and> card s \<le> DIM('a) + 1 \<and> x \<in> convex hull s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1958	apply (rule_tac x=s in exI)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1959	using hull_subset[of s convex]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1960	using convex_convex_hull[simplified convex_explicit, of s,
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1961	THEN spec[where x=s], THEN spec[where x=u]]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1962	apply auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1963	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1964	next
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1965	fix x s
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1966	assume "finite s" "s \<subseteq> p" "card s \<le> DIM('a) + 1" "x \<in> convex hull s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1967	then show "x \<in> convex hull p"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1968	using hull_mono[OF \<open>s\<subseteq>p\<close>] by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1969	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1970
70136 f03a01a18c6e modernized tags: default scope excludes proof; wenzelm parents: 70097 diff changeset	1971	subsection\<^marker>\<open>tag unimportant\<close>\<open>Some Properties of subset of standard basis\<close>
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1972
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1973	lemma affine_hull_substd_basis:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1974	assumes "d \<subseteq> Basis"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1975	shows "affine hull (insert 0 d) = {x::'a::euclidean_space. \<forall>i\<in>Basis. i \<notin> d \<longrightarrow> x\<bullet>i = 0}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1976	(is "affine hull (insert 0 ?A) = ?B")
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1977	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1978	have *: "\<And>A. (+) (0::'a) ` A = A" "\<And>A. (+) (- (0::'a)) ` A = A"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1979	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1980	show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1981	unfolding affine_hull_insert_span_gen span_substd_basis[OF assms,symmetric] * ..
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1982	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1983
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1984	lemma affine_hull_convex_hull [simp]: "affine hull (convex hull S) = affine hull S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1985	by (metis Int_absorb1 Int_absorb2 convex_hull_subset_affine_hull hull_hull hull_mono hull_subset)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1986
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1987
70136 f03a01a18c6e modernized tags: default scope excludes proof; wenzelm parents: 70097 diff changeset	1988	subsection\<^marker>\<open>tag unimportant\<close> \<open>Moving and scaling convex hulls\<close>
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1989
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1990	lemma convex_hull_set_plus:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1991	"convex hull (S + T) = convex hull S + convex hull T"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1992	unfolding set_plus_image
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1993	apply (subst convex_hull_linear_image [symmetric])
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1994	apply (simp add: linear_iff scaleR_right_distrib)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1995	apply (simp add: convex_hull_Times)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1996	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1997
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1998	lemma translation_eq_singleton_plus: "(\<lambda>x. a + x) ` T = {a} + T"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	1999	unfolding set_plus_def by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2000
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2001	lemma convex_hull_translation:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2002	"convex hull ((\<lambda>x. a + x) ` S) = (\<lambda>x. a + x) ` (convex hull S)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2003	unfolding translation_eq_singleton_plus
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2004	by (simp only: convex_hull_set_plus convex_hull_singleton)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2005
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2006	lemma convex_hull_scaling:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2007	"convex hull ((\<lambda>x. c \<^sub>R x) ` S) = (\<lambda>x. c \<^sub>R x) ` (convex hull S)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2008	using linear_scaleR by (rule convex_hull_linear_image [symmetric])
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2009
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2010	lemma convex_hull_affinity:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2011	"convex hull ((\<lambda>x. a + c \<^sub>R x) ` S) = (\<lambda>x. a + c \<^sub>R x) ` (convex hull S)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2012	by(simp only: image_image[symmetric] convex_hull_scaling convex_hull_translation)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2013
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2014
70136 f03a01a18c6e modernized tags: default scope excludes proof; wenzelm parents: 70097 diff changeset	2015	subsection\<^marker>\<open>tag unimportant\<close> \<open>Convexity of cone hulls\<close>
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2016
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2017	lemma convex_cone_hull:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2018	assumes "convex S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2019	shows "convex (cone hull S)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2020	proof (rule convexI)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2021	fix x y
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2022	assume xy: "x \<in> cone hull S" "y \<in> cone hull S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2023	then have "S \<noteq> {}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2024	using cone_hull_empty_iff[of S] by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2025	fix u v :: real
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2026	assume uv: "u \<ge> 0" "v \<ge> 0" "u + v = 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2027	then have : "u \<^sub>R x \<in> cone hull S" "v *\<^sub>R y \<in> cone hull S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2028	using cone_cone_hull[of S] xy cone_def[of "cone hull S"] by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2029	from * obtain cx :: real and xx where x: "u \<^sub>R x = cx \<^sub>R xx" "cx \<ge> 0" "xx \<in> S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2030	using cone_hull_expl[of S] by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2031	from * obtain cy :: real and yy where y: "v \<^sub>R y = cy \<^sub>R yy" "cy \<ge> 0" "yy \<in> S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2032	using cone_hull_expl[of S] by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2033	{
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2034	assume "cx + cy \<le> 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2035	then have "u \<^sub>R x = 0" and "v \<^sub>R y = 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2036	using x y by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2037	then have "u \<^sub>R x + v \<^sub>R y = 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2038	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2039	then have "u \<^sub>R x + v \<^sub>R y \<in> cone hull S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2040	using cone_hull_contains_0[of S] \<open>S \<noteq> {}\<close> by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2041	}
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2042	moreover
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2043	{
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2044	assume "cx + cy > 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2045	then have "(cx / (cx + cy)) \<^sub>R xx + (cy / (cx + cy)) \<^sub>R yy \<in> S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2046	using assms mem_convex_alt[of S xx yy cx cy] x y by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2047	then have "cx \<^sub>R xx + cy \<^sub>R yy \<in> cone hull S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2048	using mem_cone_hull[of "(cx/(cx+cy)) \<^sub>R xx + (cy/(cx+cy)) \<^sub>R yy" S "cx+cy"] \<open>cx+cy>0\<close>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2049	by (auto simp: scaleR_right_distrib)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2050	then have "u \<^sub>R x + v \<^sub>R y \<in> cone hull S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2051	using x y by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2052	}
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2053	moreover have "cx + cy \<le> 0 \<or> cx + cy > 0" by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2054	ultimately show "u \<^sub>R x + v \<^sub>R y \<in> cone hull S" by blast
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2055	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2056
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2057	lemma cone_convex_hull:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2058	assumes "cone S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2059	shows "cone (convex hull S)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2060	proof (cases "S = {}")
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2061	case True
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2062	then show ?thesis by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2063	next
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2064	case False
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2065	then have : "0 \<in> S \<and> (\<forall>c. c > 0 \<longrightarrow> (\<^sub>R) c ` S = S)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2066	using cone_iff[of S] assms by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2067	{
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2068	fix c :: real
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2069	assume "c > 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2070	then have "(\<^sub>R) c ` (convex hull S) = convex hull ((\<^sub>R) c ` S)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2071	using convex_hull_scaling[of _ S] by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2072	also have "\<dots> = convex hull S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2073	using * \<open>c > 0\<close> by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2074	finally have "(*\<^sub>R) c ` (convex hull S) = convex hull S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2075	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2076	}
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2077	then have "0 \<in> convex hull S" "\<And>c. c > 0 \<Longrightarrow> ((*\<^sub>R) c ` (convex hull S)) = (convex hull S)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2078	using * hull_subset[of S convex] by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2079	then show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2080	using \<open>S \<noteq> {}\<close> cone_iff[of "convex hull S"] by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2081	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2082
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2083	subsection \<open>Radon's theorem\<close>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2084
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2085	text "Formalized by Lars Schewe."
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2086
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2087	lemma Radon_ex_lemma:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2088	assumes "finite c" "affine_dependent c"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2089	shows "\<exists>u. sum u c = 0 \<and> (\<exists>v\<in>c. u v \<noteq> 0) \<and> sum (\<lambda>v. u v *\<^sub>R v) c = 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2090	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2091	from assms(2)[unfolded affine_dependent_explicit]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2092	obtain s u where
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2093	"finite s" "s \<subseteq> c" "sum u s = 0" "\<exists>v\<in>s. u v \<noteq> 0" "(\<Sum>v\<in>s. u v *\<^sub>R v) = 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2094	by blast
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2095	then show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2096	apply (rule_tac x="\<lambda>v. if v\<in>s then u v else 0" in exI)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2097	unfolding if_smult scaleR_zero_left and sum.inter_restrict[OF assms(1), symmetric]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2098	apply (auto simp: Int_absorb1)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2099	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2100	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2101
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2102	lemma Radon_s_lemma:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2103	assumes "finite s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2104	and "sum f s = (0::real)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2105	shows "sum f {x\<in>s. 0 < f x} = - sum f {x\<in>s. f x < 0}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2106	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2107	have *: "\<And>x. (if f x < 0 then f x else 0) + (if 0 < f x then f x else 0) = f x"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2108	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2109	show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2110	unfolding add_eq_0_iff[symmetric] and sum.inter_filter[OF assms(1)]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2111	and sum.distrib[symmetric] and *
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2112	using assms(2)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2113	by assumption
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2114	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2115
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2116	lemma Radon_v_lemma:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2117	assumes "finite s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2118	and "sum f s = 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2119	and "\<forall>x. g x = (0::real) \<longrightarrow> f x = (0::'a::euclidean_space)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2120	shows "(sum f {x\<in>s. 0 < g x}) = - sum f {x\<in>s. g x < 0}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2121	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2122	have *: "\<And>x. (if 0 < g x then f x else 0) + (if g x < 0 then f x else 0) = f x"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2123	using assms(3) by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2124	show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2125	unfolding eq_neg_iff_add_eq_0 and sum.inter_filter[OF assms(1)]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2126	and sum.distrib[symmetric] and *
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2127	using assms(2)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2128	apply assumption
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2129	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2130	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2131
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2132	lemma Radon_partition:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2133	assumes "finite c" "affine_dependent c"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2134	shows "\<exists>m p. m \<inter> p = {} \<and> m \<union> p = c \<and> (convex hull m) \<inter> (convex hull p) \<noteq> {}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2135	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2136	obtain u v where uv: "sum u c = 0" "v\<in>c" "u v \<noteq> 0" "(\<Sum>v\<in>c. u v *\<^sub>R v) = 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2137	using Radon_ex_lemma[OF assms] by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2138	have fin: "finite {x \<in> c. 0 < u x}" "finite {x \<in> c. 0 > u x}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2139	using assms(1) by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2140	define z where "z = inverse (sum u {x\<in>c. u x > 0}) \<^sub>R sum (\<lambda>x. u x \<^sub>R x) {x\<in>c. u x > 0}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2141	have "sum u {x \<in> c. 0 < u x} \<noteq> 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2142	proof (cases "u v \<ge> 0")
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2143	case False
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2144	then have "u v < 0" by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2145	then show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2146	proof (cases "\<exists>w\<in>{x \<in> c. 0 < u x}. u w > 0")
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2147	case True
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2148	then show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2149	using sum_nonneg_eq_0_iff[of _ u, OF fin(1)] by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2150	next
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2151	case False
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2152	then have "sum u c \<le> sum (\<lambda>x. if x=v then u v else 0) c"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2153	apply (rule_tac sum_mono, auto)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2154	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2155	then show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2156	unfolding sum.delta[OF assms(1)] using uv(2) and \<open>u v < 0\<close> and uv(1) by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2157	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2158	qed (insert sum_nonneg_eq_0_iff[of _ u, OF fin(1)] uv(2-3), auto)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2159
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2160	then have *: "sum u {x\<in>c. u x > 0} > 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2161	unfolding less_le
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2162	apply (rule_tac conjI)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2163	apply (rule_tac sum_nonneg, auto)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2164	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2165	moreover have "sum u ({x \<in> c. 0 < u x} \<union> {x \<in> c. u x < 0}) = sum u c"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2166	"(\<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)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2167	using assms(1)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2168	apply (rule_tac[!] sum.mono_neutral_left, auto)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2169	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2170	then have "sum u {x \<in> c. 0 < u x} = - sum u {x \<in> c. 0 > u x}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2171	"(\<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)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2172	unfolding eq_neg_iff_add_eq_0
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2173	using uv(1,4)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2174	by (auto simp: sum.union_inter_neutral[OF fin, symmetric])
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2175	moreover have "\<forall>x\<in>{v \<in> c. u v < 0}. 0 \<le> inverse (sum u {x \<in> c. 0 < u x}) * - u x"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2176	apply rule
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2177	apply (rule mult_nonneg_nonneg)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2178	using *
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2179	apply auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2180	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2181	ultimately have "z \<in> convex hull {v \<in> c. u v \<le> 0}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2182	unfolding convex_hull_explicit mem_Collect_eq
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2183	apply (rule_tac x="{v \<in> c. u v < 0}" in exI)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2184	apply (rule_tac x="\<lambda>y. inverse (sum u {x\<in>c. u x > 0}) * - u y" in exI)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2185	using assms(1) unfolding scaleR_scaleR[symmetric] scaleR_right.sum [symmetric] and z_def
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2186	apply (auto simp: sum_negf sum_distrib_left[symmetric])
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2187	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2188	moreover have "\<forall>x\<in>{v \<in> c. 0 < u v}. 0 \<le> inverse (sum u {x \<in> c. 0 < u x}) * u x"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2189	apply rule
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2190	apply (rule mult_nonneg_nonneg)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2191	using *
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2192	apply auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2193	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2194	then have "z \<in> convex hull {v \<in> c. u v > 0}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2195	unfolding convex_hull_explicit mem_Collect_eq
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2196	apply (rule_tac x="{v \<in> c. 0 < u v}" in exI)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2197	apply (rule_tac x="\<lambda>y. inverse (sum u {x\<in>c. u x > 0}) * u y" in exI)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2198	using assms(1)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2199	unfolding scaleR_scaleR[symmetric] scaleR_right.sum [symmetric] and z_def
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2200	using *
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2201	apply (auto simp: sum_negf sum_distrib_left[symmetric])
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2202	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2203	ultimately show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2204	apply (rule_tac x="{v\<in>c. u v \<le> 0}" in exI)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2205	apply (rule_tac x="{v\<in>c. u v > 0}" in exI, auto)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2206	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2207	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2208
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2209	theorem Radon:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2210	assumes "affine_dependent c"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2211	obtains m p where "m \<subseteq> c" "p \<subseteq> c" "m \<inter> p = {}" "(convex hull m) \<inter> (convex hull p) \<noteq> {}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2212	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2213	from assms[unfolded affine_dependent_explicit]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2214	obtain s u where
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2215	"finite s" "s \<subseteq> c" "sum u s = 0" "\<exists>v\<in>s. u v \<noteq> 0" "(\<Sum>v\<in>s. u v *\<^sub>R v) = 0"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2216	by blast
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2217	then have *: "finite s" "affine_dependent s" and s: "s \<subseteq> c"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2218	unfolding affine_dependent_explicit by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2219	from Radon_partition[OF *]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2220	obtain m p where "m \<inter> p = {}" "m \<union> p = s" "convex hull m \<inter> convex hull p \<noteq> {}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2221	by blast
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2222	then show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2223	apply (rule_tac that[of p m])
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2224	using s
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2225	apply auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2226	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2227	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2228
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2229
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2230	subsection \<open>Helly's theorem\<close>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2231
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2232	lemma Helly_induct:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2233	fixes f :: "'a::euclidean_space set set"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2234	assumes "card f = n"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2235	and "n \<ge> DIM('a) + 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2236	and "\<forall>s\<in>f. convex s" "\<forall>t\<subseteq>f. card t = DIM('a) + 1 \<longrightarrow> \<Inter>t \<noteq> {}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2237	shows "\<Inter>f \<noteq> {}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2238	using assms
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2239	proof (induction n arbitrary: f)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2240	case 0
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2241	then show ?case by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2242	next
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2243	case (Suc n)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2244	have "finite f"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2245	using \<open>card f = Suc n\<close> by (auto intro: card_ge_0_finite)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2246	show "\<Inter>f \<noteq> {}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2247	proof (cases "n = DIM('a)")
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2248	case True
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2249	then show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2250	by (simp add: Suc.prems(1) Suc.prems(4))
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2251	next
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2252	case False
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2253	have "\<Inter>(f - {s}) \<noteq> {}" if "s \<in> f" for s
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2254	proof (rule Suc.IH[rule_format])
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2255	show "card (f - {s}) = n"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2256	by (simp add: Suc.prems(1) \<open>finite f\<close> that)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2257	show "DIM('a) + 1 \<le> n"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2258	using False Suc.prems(2) by linarith
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2259	show "\<And>t. \<lbrakk>t \<subseteq> f - {s}; card t = DIM('a) + 1\<rbrakk> \<Longrightarrow> \<Inter>t \<noteq> {}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2260	by (simp add: Suc.prems(4) subset_Diff_insert)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2261	qed (use Suc in auto)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2262	then have "\<forall>s\<in>f. \<exists>x. x \<in> \<Inter>(f - {s})"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2263	by blast
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2264	then obtain X where X: "\<And>s. s\<in>f \<Longrightarrow> X s \<in> \<Inter>(f - {s})"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2265	by metis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2266	show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2267	proof (cases "inj_on X f")
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2268	case False
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2269	then obtain s t where "s\<noteq>t" and st: "s\<in>f" "t\<in>f" "X s = X t"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2270	unfolding inj_on_def by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2271	then have *: "\<Inter>f = \<Inter>(f - {s}) \<inter> \<Inter>(f - {t})" by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2272	show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2273	by (metis "*" X disjoint_iff_not_equal st)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2274	next
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2275	case True
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2276	then obtain m p where mp: "m \<inter> p = {}" "m \<union> p = X ` f" "convex hull m \<inter> convex hull p \<noteq> {}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2277	using Radon_partition[of "X ` f"] and affine_dependent_biggerset[of "X ` f"]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2278	unfolding card_image[OF True] and \<open>card f = Suc n\<close>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2279	using Suc(3) \<open>finite f\<close> and False
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2280	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2281	have "m \<subseteq> X ` f" "p \<subseteq> X ` f"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2282	using mp(2) by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2283	then obtain g h where gh:"m = X ` g" "p = X ` h" "g \<subseteq> f" "h \<subseteq> f"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2284	unfolding subset_image_iff by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2285	then have "f \<union> (g \<union> h) = f" by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2286	then have f: "f = g \<union> h"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2287	using inj_on_Un_image_eq_iff[of X f "g \<union> h"] and True
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2288	unfolding mp(2)[unfolded image_Un[symmetric] gh]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2289	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2290	have *: "g \<inter> h = {}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2291	using mp(1)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2292	unfolding gh
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2293	using inj_on_image_Int[OF True gh(3,4)]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2294	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2295	have "convex hull (X ` h) \<subseteq> \<Inter>g" "convex hull (X ` g) \<subseteq> \<Inter>h"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2296	by (rule hull_minimal; use X * f in \<open>auto simp: Suc.prems(3) convex_Inter\<close>)+
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2297	then show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2298	unfolding f using mp(3)[unfolded gh] by blast
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2299	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2300	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2301	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2302
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2303	theorem Helly:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2304	fixes f :: "'a::euclidean_space set set"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2305	assumes "card f \<ge> DIM('a) + 1" "\<forall>s\<in>f. convex s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2306	and "\<And>t. \<lbrakk>t\<subseteq>f; card t = DIM('a) + 1\<rbrakk> \<Longrightarrow> \<Inter>t \<noteq> {}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2307	shows "\<Inter>f \<noteq> {}"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2308	apply (rule Helly_induct)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2309	using assms
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2310	apply auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2311	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2312
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2313	subsection \<open>Epigraphs of convex functions\<close>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2314
70136 f03a01a18c6e modernized tags: default scope excludes proof; wenzelm parents: 70097 diff changeset	2315	definition\<^marker>\<open>tag important\<close> "epigraph S (f :: _ \<Rightarrow> real) = {xy. fst xy \<in> S \<and> f (fst xy) \<le> snd xy}"
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2316
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2317	lemma mem_epigraph: "(x, y) \<in> epigraph S f \<longleftrightarrow> x \<in> S \<and> f x \<le> y"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2318	unfolding epigraph_def by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2319
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2320	lemma convex_epigraph: "convex (epigraph S f) \<longleftrightarrow> convex_on S f \<and> convex S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2321	proof safe
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2322	assume L: "convex (epigraph S f)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2323	then show "convex_on S f"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2324	by (auto simp: convex_def convex_on_def epigraph_def)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2325	show "convex S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2326	using L
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2327	apply (clarsimp simp: convex_def convex_on_def epigraph_def)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2328	apply (erule_tac x=x in allE)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2329	apply (erule_tac x="f x" in allE, safe)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2330	apply (erule_tac x=y in allE)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2331	apply (erule_tac x="f y" in allE)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2332	apply (auto simp: )
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2333	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2334	next
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2335	assume "convex_on S f" "convex S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2336	then show "convex (epigraph S f)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2337	unfolding convex_def convex_on_def epigraph_def
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2338	apply safe
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2339	apply (rule_tac [2] y="u * f a + v * f aa" in order_trans)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2340	apply (auto intro!:mult_left_mono add_mono)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2341	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2342	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2343
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2344	lemma convex_epigraphI: "convex_on S f \<Longrightarrow> convex S \<Longrightarrow> convex (epigraph S f)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2345	unfolding convex_epigraph by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2346
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2347	lemma convex_epigraph_convex: "convex S \<Longrightarrow> convex_on S f \<longleftrightarrow> convex(epigraph S f)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2348	by (simp add: convex_epigraph)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2349
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2350
70136 f03a01a18c6e modernized tags: default scope excludes proof; wenzelm parents: 70097 diff changeset	2351	subsubsection\<^marker>\<open>tag unimportant\<close> \<open>Use this to derive general bound property of convex function\<close>
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2352
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2353	lemma convex_on:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2354	assumes "convex S"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2355	shows "convex_on S f \<longleftrightarrow>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2356	(\<forall>k u x. (\<forall>i\<in>{1..k::nat}. 0 \<le> u i \<and> x i \<in> S) \<and> sum u {1..k} = 1 \<longrightarrow>
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2357	f (sum (\<lambda>i. u i \<^sub>R x i) {1..k}) \<le> sum (\<lambda>i. u i f(x i)) {1..k})"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2358
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2359	unfolding convex_epigraph_convex[OF assms] convex epigraph_def Ball_def mem_Collect_eq
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2360	unfolding fst_sum snd_sum fst_scaleR snd_scaleR
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2361	apply safe
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2362	apply (drule_tac x=k in spec)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2363	apply (drule_tac x=u in spec)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2364	apply (drule_tac x="\<lambda>i. (x i, f (x i))" in spec)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2365	apply simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2366	using assms[unfolded convex] apply simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2367	apply (rule_tac y="\<Sum>i = 1..k. u i * f (fst (x i))" in order_trans, force)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2368	apply (rule sum_mono)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2369	apply (erule_tac x=i in allE)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2370	unfolding real_scaleR_def
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2371	apply (rule mult_left_mono)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2372	using assms[unfolded convex] apply auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2373	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2374
70136 f03a01a18c6e modernized tags: default scope excludes proof; wenzelm parents: 70097 diff changeset	2375	subsection\<^marker>\<open>tag unimportant\<close> \<open>A bound within a convex hull\<close>
69619 3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2376
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2377	lemma convex_on_convex_hull_bound:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2378	assumes "convex_on (convex hull s) f"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2379	and "\<forall>x\<in>s. f x \<le> b"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2380	shows "\<forall>x\<in> convex hull s. f x \<le> b"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2381	proof
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2382	fix x
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2383	assume "x \<in> convex hull s"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2384	then obtain k u v where
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2385	obt: "\<forall>i\<in>{1..k::nat}. 0 \<le> u i \<and> v i \<in> s" "sum u {1..k} = 1" "(\<Sum>i = 1..k. u i *\<^sub>R v i) = x"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2386	unfolding convex_hull_indexed mem_Collect_eq by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2387	have "(\<Sum>i = 1..k. u i * f (v i)) \<le> b"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2388	using sum_mono[of "{1..k}" "\<lambda>i. u i * f (v i)" "\<lambda>i. u i * b"]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2389	unfolding sum_distrib_right[symmetric] obt(2) mult_1
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2390	apply (drule_tac meta_mp)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2391	apply (rule mult_left_mono)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2392	using assms(2) obt(1)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2393	apply auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2394	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2395	then show "f x \<le> b"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2396	using assms(1)[unfolded convex_on[OF convex_convex_hull], rule_format, of k u v]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2397	unfolding obt(2-3)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2398	using obt(1) and hull_subset[unfolded subset_eq, rule_format, of _ s]
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2399	by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2400	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2401
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2402	lemma inner_sum_Basis[simp]: "i \<in> Basis \<Longrightarrow> (\<Sum>Basis) \<bullet> i = 1"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2403	by (simp add: inner_sum_left sum.If_cases inner_Basis)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2404
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2405	lemma convex_set_plus:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2406	assumes "convex S" and "convex T" shows "convex (S + T)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2407	proof -
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2408	have "convex (\<Union>x\<in> S. \<Union>y \<in> T. {x + y})"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2409	using assms by (rule convex_sums)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2410	moreover have "(\<Union>x\<in> S. \<Union>y \<in> T. {x + y}) = S + T"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2411	unfolding set_plus_def by auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2412	finally show "convex (S + T)" .
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2413	qed
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2414
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2415	lemma convex_set_sum:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2416	assumes "\<And>i. i \<in> A \<Longrightarrow> convex (B i)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2417	shows "convex (\<Sum>i\<in>A. B i)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2418	proof (cases "finite A")
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2419	case True then show ?thesis using assms
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2420	by induct (auto simp: convex_set_plus)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2421	qed auto
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2422
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2423	lemma finite_set_sum:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2424	assumes "finite A" and "\<forall>i\<in>A. finite (B i)" shows "finite (\<Sum>i\<in>A. B i)"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2425	using assms by (induct set: finite, simp, simp add: finite_set_plus)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2426
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2427	lemma box_eq_set_sum_Basis:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2428	shows "{x. \<forall>i\<in>Basis. x\<bullet>i \<in> B i} = (\<Sum>i\<in>Basis. image (\<lambda>x. x *\<^sub>R i) (B i))"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2429	apply (subst set_sum_alt [OF finite_Basis], safe)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2430	apply (fast intro: euclidean_representation [symmetric])
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2431	apply (subst inner_sum_left)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2432	apply (rename_tac f)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2433	apply (subgoal_tac "(\<Sum>x\<in>Basis. f x \<bullet> i) = f i \<bullet> i")
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2434	apply (drule (1) bspec)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2435	apply clarsimp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2436	apply (frule sum.remove [OF finite_Basis])
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2437	apply (erule trans, simp)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2438	apply (rule sum.neutral, clarsimp)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2439	apply (frule_tac x=i in bspec, assumption)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2440	apply (drule_tac x=x in bspec, assumption, clarsimp)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2441	apply (cut_tac u=x and v=i in inner_Basis, assumption+)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2442	apply (rule ccontr, simp)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2443	done
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2444
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2445	lemma convex_hull_set_sum:
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2446	"convex hull (\<Sum>i\<in>A. B i) = (\<Sum>i\<in>A. convex hull (B i))"
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2447	proof (cases "finite A")
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2448	assume "finite A" then show ?thesis
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2449	by (induct set: finite, simp, simp add: convex_hull_set_plus)
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2450	qed simp
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2451
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2452
3f7d8e05e0f2 split off Convex.thy: material that does not require Topology_Euclidean_Space immler parents: diff changeset	2453	end

author	wenzelm
	Thu, 09 Jan 2020 15:45:31 +0100
changeset 71360	fcf5ee85743d
parent 71244	38457af660bc
child 72385	4a2c0eb482aa
permissions	-rw-r--r--