isabelle: src/HOL/Analysis/Elementary_Metric_Spaces.thy@73ff22f99d38 (annotated)

69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1	(* Author: L C Paulson, University of Cambridge
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2	Author: Amine Chaieb, University of Cambridge
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	3	Author: Robert Himmelmann, TU Muenchen
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	4	Author: Brian Huffman, Portland State University
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	5	*)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	6
71198 1bf7d1acbe74 tuned Analysis manual immler parents: 71192 diff changeset	7	section \<open>Elementary Metric Spaces\<close>
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	8
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	9	theory Elementary_Metric_Spaces
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	10	imports
69616 d18dc9c5c456 split off theory combining Elementary_Topology and Abstract_Topology immler parents: 69615 diff changeset	11	Abstract_Topology_2
70951 678b2abe9f7d decision procedure for metric spaces, implemented by Maximilian Schäffeler immler parents: 70817 diff changeset	12	Metric_Arith
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	13	begin
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	14
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	15	subsection \<open>Open and closed balls\<close>
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	16
70136 f03a01a18c6e modernized tags: default scope excludes proof; wenzelm parents: 69922 diff changeset	17	definition\<^marker>\<open>tag important\<close> ball :: "'a::metric_space \<Rightarrow> real \<Rightarrow> 'a set"
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	18	where "ball x e = {y. dist x y < e}"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	19
70136 f03a01a18c6e modernized tags: default scope excludes proof; wenzelm parents: 69922 diff changeset	20	definition\<^marker>\<open>tag important\<close> cball :: "'a::metric_space \<Rightarrow> real \<Rightarrow> 'a set"
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	21	where "cball x e = {y. dist x y \<le> e}"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	22
70136 f03a01a18c6e modernized tags: default scope excludes proof; wenzelm parents: 69922 diff changeset	23	definition\<^marker>\<open>tag important\<close> sphere :: "'a::metric_space \<Rightarrow> real \<Rightarrow> 'a set"
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	24	where "sphere x e = {y. dist x y = e}"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	25
70951 678b2abe9f7d decision procedure for metric spaces, implemented by Maximilian Schäffeler immler parents: 70817 diff changeset	26	lemma mem_ball [simp, metric_unfold]: "y \<in> ball x e \<longleftrightarrow> dist x y < e"
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	27	by (simp add: ball_def)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	28
70951 678b2abe9f7d decision procedure for metric spaces, implemented by Maximilian Schäffeler immler parents: 70817 diff changeset	29	lemma mem_cball [simp, metric_unfold]: "y \<in> cball x e \<longleftrightarrow> dist x y \<le> e"
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	30	by (simp add: cball_def)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	31
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	32	lemma mem_sphere [simp]: "y \<in> sphere x e \<longleftrightarrow> dist x y = e"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	33	by (simp add: sphere_def)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	34
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	35	lemma ball_trivial [simp]: "ball x 0 = {}"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	36	by (simp add: ball_def)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	37
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	38	lemma cball_trivial [simp]: "cball x 0 = {x}"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	39	by (simp add: cball_def)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	40
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	41	lemma sphere_trivial [simp]: "sphere x 0 = {x}"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	42	by (simp add: sphere_def)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	43
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	44	lemma disjoint_ballI: "dist x y \<ge> r+s \<Longrightarrow> ball x r \<inter> ball y s = {}"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	45	using dist_triangle_less_add not_le by fastforce
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	46
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	47	lemma disjoint_cballI: "dist x y > r + s \<Longrightarrow> cball x r \<inter> cball y s = {}"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	48	by (metis add_mono disjoint_iff_not_equal dist_triangle2 dual_order.trans leD mem_cball)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	49
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	50	lemma sphere_empty [simp]: "r < 0 \<Longrightarrow> sphere a r = {}"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	51	for a :: "'a::metric_space"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	52	by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	53
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	54	lemma centre_in_ball [simp]: "x \<in> ball x e \<longleftrightarrow> 0 < e"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	55	by simp
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	56
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	57	lemma centre_in_cball [simp]: "x \<in> cball x e \<longleftrightarrow> 0 \<le> e"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	58	by simp
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	59
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	60	lemma ball_subset_cball [simp, intro]: "ball x e \<subseteq> cball x e"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	61	by (simp add: subset_eq)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	62
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	63	lemma mem_ball_imp_mem_cball: "x \<in> ball y e \<Longrightarrow> x \<in> cball y e"
71174 7fac205dd737 tuned nipkow parents: 71028 diff changeset	64	by (auto)
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	65
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	66	lemma sphere_cball [simp,intro]: "sphere z r \<subseteq> cball z r"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	67	by force
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	68
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	69	lemma cball_diff_sphere: "cball a r - sphere a r = ball a r"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	70	by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	71
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	72	lemma subset_ball[intro]: "d \<le> e \<Longrightarrow> ball x d \<subseteq> ball x e"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	73	by (simp add: subset_eq)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	74
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	75	lemma subset_cball[intro]: "d \<le> e \<Longrightarrow> cball x d \<subseteq> cball x e"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	76	by (simp add: subset_eq)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	77
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	78	lemma mem_ball_leI: "x \<in> ball y e \<Longrightarrow> e \<le> f \<Longrightarrow> x \<in> ball y f"
71174 7fac205dd737 tuned nipkow parents: 71028 diff changeset	79	by (auto)
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	80
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	81	lemma mem_cball_leI: "x \<in> cball y e \<Longrightarrow> e \<le> f \<Longrightarrow> x \<in> cball y f"
71174 7fac205dd737 tuned nipkow parents: 71028 diff changeset	82	by (auto)
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	83
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	84	lemma cball_trans: "y \<in> cball z b \<Longrightarrow> x \<in> cball y a \<Longrightarrow> x \<in> cball z (b + a)"
70960 84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	85	by metric
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	86
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	87	lemma ball_max_Un: "ball a (max r s) = ball a r \<union> ball a s"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	88	by (simp add: set_eq_iff) arith
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	89
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	90	lemma ball_min_Int: "ball a (min r s) = ball a r \<inter> ball a s"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	91	by (simp add: set_eq_iff)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	92
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	93	lemma cball_max_Un: "cball a (max r s) = cball a r \<union> cball a s"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	94	by (simp add: set_eq_iff) arith
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	95
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	96	lemma cball_min_Int: "cball a (min r s) = cball a r \<inter> cball a s"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	97	by (simp add: set_eq_iff)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	98
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	99	lemma cball_diff_eq_sphere: "cball a r - ball a r = sphere a r"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	100	by (auto simp: cball_def ball_def dist_commute)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	101
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	102	lemma open_ball [intro, simp]: "open (ball x e)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	103	proof -
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	104	have "open (dist x -` {..<e})"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	105	by (intro open_vimage open_lessThan continuous_intros)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	106	also have "dist x -` {..<e} = ball x e"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	107	by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	108	finally show ?thesis .
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	109	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	110
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	111	lemma open_contains_ball: "open S \<longleftrightarrow> (\<forall>x\<in>S. \<exists>e>0. ball x e \<subseteq> S)"
71633 07bec530f02e cleaned proofs nipkow parents: 71198 diff changeset	112	by (simp add: open_dist subset_eq Ball_def dist_commute)
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	113
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	114	lemma openI [intro?]: "(\<And>x. x\<in>S \<Longrightarrow> \<exists>e>0. ball x e \<subseteq> S) \<Longrightarrow> open S"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	115	by (auto simp: open_contains_ball)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	116
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	117	lemma openE[elim?]:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	118	assumes "open S" "x\<in>S"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	119	obtains e where "e>0" "ball x e \<subseteq> S"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	120	using assms unfolding open_contains_ball by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	121
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	122	lemma open_contains_ball_eq: "open S \<Longrightarrow> x\<in>S \<longleftrightarrow> (\<exists>e>0. ball x e \<subseteq> S)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	123	by (metis open_contains_ball subset_eq centre_in_ball)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	124
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	125	lemma ball_eq_empty[simp]: "ball x e = {} \<longleftrightarrow> e \<le> 0"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	126	unfolding mem_ball set_eq_iff
70960 84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	127	by (simp add: not_less) metric
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	128
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	129	lemma ball_empty: "e \<le> 0 \<Longrightarrow> ball x e = {}" by simp
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	130
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	131	lemma closed_cball [iff]: "closed (cball x e)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	132	proof -
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	133	have "closed (dist x -` {..e})"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	134	by (intro closed_vimage closed_atMost continuous_intros)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	135	also have "dist x -` {..e} = cball x e"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	136	by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	137	finally show ?thesis .
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	138	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	139
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	140	lemma open_contains_cball: "open S \<longleftrightarrow> (\<forall>x\<in>S. \<exists>e>0. cball x e \<subseteq> S)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	141	proof -
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	142	{
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	143	fix x and e::real
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	144	assume "x\<in>S" "e>0" "ball x e \<subseteq> S"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	145	then have "\<exists>d>0. cball x d \<subseteq> S" unfolding subset_eq by (rule_tac x="e/2" in exI, auto)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	146	}
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	147	moreover
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	148	{
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	149	fix x and e::real
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	150	assume "x\<in>S" "e>0" "cball x e \<subseteq> S"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	151	then have "\<exists>d>0. ball x d \<subseteq> S"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	152	unfolding subset_eq
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	153	apply (rule_tac x="e/2" in exI, auto)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	154	done
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	155	}
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	156	ultimately show ?thesis
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	157	unfolding open_contains_ball by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	158	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	159
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	160	lemma open_contains_cball_eq: "open S \<Longrightarrow> (\<forall>x. x \<in> S \<longleftrightarrow> (\<exists>e>0. cball x e \<subseteq> S))"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	161	by (metis open_contains_cball subset_eq order_less_imp_le centre_in_cball)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	162
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	163	lemma eventually_nhds_ball: "d > 0 \<Longrightarrow> eventually (\<lambda>x. x \<in> ball z d) (nhds z)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	164	by (rule eventually_nhds_in_open) simp_all
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	165
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	166	lemma eventually_at_ball: "d > 0 \<Longrightarrow> eventually (\<lambda>t. t \<in> ball z d \<and> t \<in> A) (at z within A)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	167	unfolding eventually_at by (intro exI[of _ d]) (simp_all add: dist_commute)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	168
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	169	lemma eventually_at_ball': "d > 0 \<Longrightarrow> eventually (\<lambda>t. t \<in> ball z d \<and> t \<noteq> z \<and> t \<in> A) (at z within A)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	170	unfolding eventually_at by (intro exI[of _ d]) (simp_all add: dist_commute)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	171
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	172	lemma at_within_ball: "e > 0 \<Longrightarrow> dist x y < e \<Longrightarrow> at y within ball x e = at y"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	173	by (subst at_within_open) auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	174
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	175	lemma atLeastAtMost_eq_cball:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	176	fixes a b::real
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	177	shows "{a .. b} = cball ((a + b)/2) ((b - a)/2)"
71174 7fac205dd737 tuned nipkow parents: 71028 diff changeset	178	by (auto simp: dist_real_def field_simps)
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	179
71028 c2465b429e6e Line_Segment is independent of Convex_Euclidean_Space immler parents: 70960 diff changeset	180	lemma cball_eq_atLeastAtMost:
c2465b429e6e Line_Segment is independent of Convex_Euclidean_Space immler parents: 70960 diff changeset	181	fixes a b::real
c2465b429e6e Line_Segment is independent of Convex_Euclidean_Space immler parents: 70960 diff changeset	182	shows "cball a b = {a - b .. a + b}"
c2465b429e6e Line_Segment is independent of Convex_Euclidean_Space immler parents: 70960 diff changeset	183	by (auto simp: dist_real_def)
c2465b429e6e Line_Segment is independent of Convex_Euclidean_Space immler parents: 70960 diff changeset	184
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	185	lemma greaterThanLessThan_eq_ball:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	186	fixes a b::real
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	187	shows "{a <..< b} = ball ((a + b)/2) ((b - a)/2)"
71174 7fac205dd737 tuned nipkow parents: 71028 diff changeset	188	by (auto simp: dist_real_def field_simps)
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	189
71028 c2465b429e6e Line_Segment is independent of Convex_Euclidean_Space immler parents: 70960 diff changeset	190	lemma ball_eq_greaterThanLessThan:
c2465b429e6e Line_Segment is independent of Convex_Euclidean_Space immler parents: 70960 diff changeset	191	fixes a b::real
c2465b429e6e Line_Segment is independent of Convex_Euclidean_Space immler parents: 70960 diff changeset	192	shows "ball a b = {a - b <..< a + b}"
c2465b429e6e Line_Segment is independent of Convex_Euclidean_Space immler parents: 70960 diff changeset	193	by (auto simp: dist_real_def)
c2465b429e6e Line_Segment is independent of Convex_Euclidean_Space immler parents: 70960 diff changeset	194
69611 42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	195	lemma interior_ball [simp]: "interior (ball x e) = ball x e"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	196	by (simp add: interior_open)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	197
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	198	lemma cball_eq_empty [simp]: "cball x e = {} \<longleftrightarrow> e < 0"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	199	apply (simp add: set_eq_iff not_le)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	200	apply (metis zero_le_dist dist_self order_less_le_trans)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	201	done
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	202
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	203	lemma cball_empty [simp]: "e < 0 \<Longrightarrow> cball x e = {}"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	204	by simp
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	205
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	206	lemma cball_sing:
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	207	fixes x :: "'a::metric_space"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	208	shows "e = 0 \<Longrightarrow> cball x e = {x}"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	209	by (auto simp: set_eq_iff)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	210
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	211	lemma ball_divide_subset: "d \<ge> 1 \<Longrightarrow> ball x (e/d) \<subseteq> ball x e"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	212	apply (cases "e \<le> 0")
70817 dd675800469d dedicated fact collections for algebraic simplification rules potentially splitting goals haftmann parents: 70724 diff changeset	213	apply (simp add: ball_empty field_split_simps)
69611 42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	214	apply (rule subset_ball)
70817 dd675800469d dedicated fact collections for algebraic simplification rules potentially splitting goals haftmann parents: 70724 diff changeset	215	apply (simp add: field_split_simps)
69611 42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	216	done
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	217
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	218	lemma ball_divide_subset_numeral: "ball x (e / numeral w) \<subseteq> ball x e"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	219	using ball_divide_subset one_le_numeral by blast
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	220
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	221	lemma cball_divide_subset: "d \<ge> 1 \<Longrightarrow> cball x (e/d) \<subseteq> cball x e"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	222	apply (cases "e < 0")
70817 dd675800469d dedicated fact collections for algebraic simplification rules potentially splitting goals haftmann parents: 70724 diff changeset	223	apply (simp add: field_split_simps)
69611 42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	224	apply (rule subset_cball)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	225	apply (metis div_by_1 frac_le not_le order_refl zero_less_one)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	226	done
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	227
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	228	lemma cball_divide_subset_numeral: "cball x (e / numeral w) \<subseteq> cball x e"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	229	using cball_divide_subset one_le_numeral by blast
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	230
71192 a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	231	lemma cball_scale:
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	232	assumes "a \<noteq> 0"
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	233	shows "(\<lambda>x. a \<^sub>R x) ` cball c r = cball (a \<^sub>R c :: 'a :: real_normed_vector) (\<bar>a\<bar> * r)"
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	234	proof -
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	235	have 1: "(\<lambda>x. a \<^sub>R x) ` cball c r \<subseteq> cball (a \<^sub>R c) (\<bar>a\<bar> * r)" if "a \<noteq> 0" for a r and c :: 'a
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	236	proof safe
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	237	fix x
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	238	assume x: "x \<in> cball c r"
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	239	have "dist (a \<^sub>R c) (a \<^sub>R x) = norm (a \<^sub>R c - a \<^sub>R x)"
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	240	by (auto simp: dist_norm)
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	241	also have "a \<^sub>R c - a \<^sub>R x = a *\<^sub>R (c - x)"
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	242	by (simp add: algebra_simps)
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	243	finally show "a \<^sub>R x \<in> cball (a \<^sub>R c) (\<bar>a\<bar> * r)"
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	244	using that x by (auto simp: dist_norm)
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	245	qed
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	246
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	247	have "cball (a \<^sub>R c) (\<bar>a\<bar> r) = (\<lambda>x. a \<^sub>R x) ` (\<lambda>x. inverse a \<^sub>R x) ` cball (a \<^sub>R c) (\<bar>a\<bar> r)"
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	248	unfolding image_image using assms by simp
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	249	also have "\<dots> \<subseteq> (\<lambda>x. a \<^sub>R x) ` cball (inverse a \<^sub>R (a \<^sub>R c)) (\<bar>inverse a\<bar> (\<bar>a\<bar> * r))"
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	250	using assms by (intro image_mono 1) auto
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	251	also have "\<dots> = (\<lambda>x. a *\<^sub>R x) ` cball c r"
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	252	using assms by (simp add: algebra_simps)
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	253	finally have "cball (a \<^sub>R c) (\<bar>a\<bar> r) \<subseteq> (\<lambda>x. a *\<^sub>R x) ` cball c r" .
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	254	moreover from assms have "(\<lambda>x. a \<^sub>R x) ` cball c r \<subseteq> cball (a \<^sub>R c) (\<bar>a\<bar> * r)"
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	255	by (intro 1) auto
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	256	ultimately show ?thesis by blast
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	257	qed
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	258
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	259	lemma ball_scale:
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	260	assumes "a \<noteq> 0"
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	261	shows "(\<lambda>x. a \<^sub>R x) ` ball c r = ball (a \<^sub>R c :: 'a :: real_normed_vector) (\<bar>a\<bar> * r)"
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	262	proof -
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	263	have 1: "(\<lambda>x. a \<^sub>R x) ` ball c r \<subseteq> ball (a \<^sub>R c) (\<bar>a\<bar> * r)" if "a \<noteq> 0" for a r and c :: 'a
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	264	proof safe
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	265	fix x
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	266	assume x: "x \<in> ball c r"
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	267	have "dist (a \<^sub>R c) (a \<^sub>R x) = norm (a \<^sub>R c - a \<^sub>R x)"
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	268	by (auto simp: dist_norm)
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	269	also have "a \<^sub>R c - a \<^sub>R x = a *\<^sub>R (c - x)"
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	270	by (simp add: algebra_simps)
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	271	finally show "a \<^sub>R x \<in> ball (a \<^sub>R c) (\<bar>a\<bar> * r)"
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	272	using that x by (auto simp: dist_norm)
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	273	qed
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	274
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	275	have "ball (a \<^sub>R c) (\<bar>a\<bar> r) = (\<lambda>x. a \<^sub>R x) ` (\<lambda>x. inverse a \<^sub>R x) ` ball (a \<^sub>R c) (\<bar>a\<bar> r)"
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	276	unfolding image_image using assms by simp
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	277	also have "\<dots> \<subseteq> (\<lambda>x. a \<^sub>R x) ` ball (inverse a \<^sub>R (a \<^sub>R c)) (\<bar>inverse a\<bar> (\<bar>a\<bar> * r))"
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	278	using assms by (intro image_mono 1) auto
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	279	also have "\<dots> = (\<lambda>x. a *\<^sub>R x) ` ball c r"
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	280	using assms by (simp add: algebra_simps)
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	281	finally have "ball (a \<^sub>R c) (\<bar>a\<bar> r) \<subseteq> (\<lambda>x. a *\<^sub>R x) ` ball c r" .
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	282	moreover from assms have "(\<lambda>x. a \<^sub>R x) ` ball c r \<subseteq> ball (a \<^sub>R c) (\<bar>a\<bar> * r)"
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	283	by (intro 1) auto
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	284	ultimately show ?thesis by blast
a8ccea88b725 Flattened dependency tree of HOL-Analysis Manuel Eberl <eberlm@in.tum.de> parents: 71174 diff changeset	285	qed
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	286
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	287	subsection \<open>Limit Points\<close>
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	288
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	289	lemma islimpt_approachable:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	290	fixes x :: "'a::metric_space"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	291	shows "x islimpt S \<longleftrightarrow> (\<forall>e>0. \<exists>x'\<in>S. x' \<noteq> x \<and> dist x' x < e)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	292	unfolding islimpt_iff_eventually eventually_at by fast
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	293
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	294	lemma islimpt_approachable_le: "x islimpt S \<longleftrightarrow> (\<forall>e>0. \<exists>x'\<in> S. x' \<noteq> x \<and> dist x' x \<le> e)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	295	for x :: "'a::metric_space"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	296	unfolding islimpt_approachable
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	297	using approachable_lt_le [where f="\<lambda>y. dist y x" and P="\<lambda>y. y \<notin> S \<or> y = x",
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	298	THEN arg_cong [where f=Not]]
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	299	by (simp add: Bex_def conj_commute conj_left_commute)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	300
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	301	lemma limpt_of_limpts: "x islimpt {y. y islimpt S} \<Longrightarrow> x islimpt S"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	302	for x :: "'a::metric_space"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	303	apply (clarsimp simp add: islimpt_approachable)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	304	apply (drule_tac x="e/2" in spec)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	305	apply (auto simp: simp del: less_divide_eq_numeral1)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	306	apply (drule_tac x="dist x' x" in spec)
71174 7fac205dd737 tuned nipkow parents: 71028 diff changeset	307	apply (auto simp del: less_divide_eq_numeral1)
70960 84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	308	apply metric
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	309	done
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	310
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	311	lemma closed_limpts: "closed {x::'a::metric_space. x islimpt S}"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	312	using closed_limpt limpt_of_limpts by blast
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	313
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	314	lemma limpt_of_closure: "x islimpt closure S \<longleftrightarrow> x islimpt S"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	315	for x :: "'a::metric_space"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	316	by (auto simp: closure_def islimpt_Un dest: limpt_of_limpts)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	317
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	318	lemma islimpt_eq_infinite_ball: "x islimpt S \<longleftrightarrow> (\<forall>e>0. infinite(S \<inter> ball x e))"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	319	apply (simp add: islimpt_eq_acc_point, safe)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	320	apply (metis Int_commute open_ball centre_in_ball)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	321	by (metis open_contains_ball Int_mono finite_subset inf_commute subset_refl)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	322
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	323	lemma islimpt_eq_infinite_cball: "x islimpt S \<longleftrightarrow> (\<forall>e>0. infinite(S \<inter> cball x e))"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	324	apply (simp add: islimpt_eq_infinite_ball, safe)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	325	apply (meson Int_mono ball_subset_cball finite_subset order_refl)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	326	by (metis open_ball centre_in_ball finite_Int inf.absorb_iff2 inf_assoc open_contains_cball_eq)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	327
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	328
69611 42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	329	subsection \<open>Perfect Metric Spaces\<close>
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	330
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	331	lemma perfect_choose_dist: "0 < r \<Longrightarrow> \<exists>a. a \<noteq> x \<and> dist a x < r"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	332	for x :: "'a::{perfect_space,metric_space}"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	333	using islimpt_UNIV [of x] by (simp add: islimpt_approachable)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	334
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	335	lemma cball_eq_sing:
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	336	fixes x :: "'a::{metric_space,perfect_space}"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	337	shows "cball x e = {x} \<longleftrightarrow> e = 0"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	338	proof (rule linorder_cases)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	339	assume e: "0 < e"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	340	obtain a where "a \<noteq> x" "dist a x < e"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	341	using perfect_choose_dist [OF e] by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	342	then have "a \<noteq> x" "dist x a \<le> e"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	343	by (auto simp: dist_commute)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	344	with e show ?thesis by (auto simp: set_eq_iff)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	345	qed auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	346
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	347
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	348	subsection \<open>?\<close>
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	349
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	350	lemma finite_ball_include:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	351	fixes a :: "'a::metric_space"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	352	assumes "finite S"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	353	shows "\<exists>e>0. S \<subseteq> ball a e"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	354	using assms
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	355	proof induction
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	356	case (insert x S)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	357	then obtain e0 where "e0>0" and e0:"S \<subseteq> ball a e0" by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	358	define e where "e = max e0 (2 * dist a x)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	359	have "e>0" unfolding e_def using \<open>e0>0\<close> by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	360	moreover have "insert x S \<subseteq> ball a e"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	361	using e0 \<open>e>0\<close> unfolding e_def by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	362	ultimately show ?case by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	363	qed (auto intro: zero_less_one)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	364
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	365	lemma finite_set_avoid:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	366	fixes a :: "'a::metric_space"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	367	assumes "finite S"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	368	shows "\<exists>d>0. \<forall>x\<in>S. x \<noteq> a \<longrightarrow> d \<le> dist a x"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	369	using assms
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	370	proof induction
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	371	case (insert x S)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	372	then obtain d where "d > 0" and d: "\<forall>x\<in>S. x \<noteq> a \<longrightarrow> d \<le> dist a x"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	373	by blast
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	374	show ?case
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	375	proof (cases "x = a")
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	376	case True
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	377	with \<open>d > 0 \<close>d show ?thesis by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	378	next
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	379	case False
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	380	let ?d = "min d (dist a x)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	381	from False \<open>d > 0\<close> have dp: "?d > 0"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	382	by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	383	from d have d': "\<forall>x\<in>S. x \<noteq> a \<longrightarrow> ?d \<le> dist a x"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	384	by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	385	with dp False show ?thesis
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	386	by (metis insert_iff le_less min_less_iff_conj not_less)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	387	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	388	qed (auto intro: zero_less_one)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	389
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	390	lemma discrete_imp_closed:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	391	fixes S :: "'a::metric_space set"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	392	assumes e: "0 < e"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	393	and d: "\<forall>x \<in> S. \<forall>y \<in> S. dist y x < e \<longrightarrow> y = x"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	394	shows "closed S"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	395	proof -
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	396	have False if C: "\<And>e. e>0 \<Longrightarrow> \<exists>x'\<in>S. x' \<noteq> x \<and> dist x' x < e" for x
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	397	proof -
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	398	from e have e2: "e/2 > 0" by arith
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	399	from C[rule_format, OF e2] obtain y where y: "y \<in> S" "y \<noteq> x" "dist y x < e/2"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	400	by blast
70960 84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	401	from e2 y(2) have mp: "min (e/2) (dist x y) > 0"
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	402	by simp
70960 84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	403	from d y C[OF mp] show ?thesis
84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	404	by metric
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	405	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	406	then show ?thesis
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	407	by (metis islimpt_approachable closed_limpt [where 'a='a])
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	408	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	409
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	410
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	411	subsection \<open>Interior\<close>
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	412
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	413	lemma mem_interior: "x \<in> interior S \<longleftrightarrow> (\<exists>e>0. ball x e \<subseteq> S)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	414	using open_contains_ball_eq [where S="interior S"]
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	415	by (simp add: open_subset_interior)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	416
69611 42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	417	lemma mem_interior_cball: "x \<in> interior S \<longleftrightarrow> (\<exists>e>0. cball x e \<subseteq> S)"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	418	by (meson ball_subset_cball interior_subset mem_interior open_contains_cball open_interior
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	419	subset_trans)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	420
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	421
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	422	subsection \<open>Frontier\<close>
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	423
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	424	lemma frontier_straddle:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	425	fixes a :: "'a::metric_space"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	426	shows "a \<in> frontier S \<longleftrightarrow> (\<forall>e>0. (\<exists>x\<in>S. dist a x < e) \<and> (\<exists>x. x \<notin> S \<and> dist a x < e))"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	427	unfolding frontier_def closure_interior
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	428	by (auto simp: mem_interior subset_eq ball_def)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	429
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	430
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	431	subsection \<open>Limits\<close>
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	432
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	433	proposition Lim: "(f \<longlongrightarrow> l) net \<longleftrightarrow> trivial_limit net \<or> (\<forall>e>0. eventually (\<lambda>x. dist (f x) l < e) net)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	434	by (auto simp: tendsto_iff trivial_limit_eq)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	435
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	436	text \<open>Show that they yield usual definitions in the various cases.\<close>
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	437
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	438	proposition Lim_within_le: "(f \<longlongrightarrow> l)(at a within S) \<longleftrightarrow>
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	439	(\<forall>e>0. \<exists>d>0. \<forall>x\<in>S. 0 < dist x a \<and> dist x a \<le> d \<longrightarrow> dist (f x) l < e)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	440	by (auto simp: tendsto_iff eventually_at_le)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	441
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	442	proposition Lim_within: "(f \<longlongrightarrow> l) (at a within S) \<longleftrightarrow>
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	443	(\<forall>e >0. \<exists>d>0. \<forall>x \<in> S. 0 < dist x a \<and> dist x a < d \<longrightarrow> dist (f x) l < e)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	444	by (auto simp: tendsto_iff eventually_at)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	445
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	446	corollary Lim_withinI [intro?]:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	447	assumes "\<And>e. e > 0 \<Longrightarrow> \<exists>d>0. \<forall>x \<in> S. 0 < dist x a \<and> dist x a < d \<longrightarrow> dist (f x) l \<le> e"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	448	shows "(f \<longlongrightarrow> l) (at a within S)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	449	apply (simp add: Lim_within, clarify)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	450	apply (rule ex_forward [OF assms [OF half_gt_zero]], auto)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	451	done
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	452
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	453	proposition Lim_at: "(f \<longlongrightarrow> l) (at a) \<longleftrightarrow>
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	454	(\<forall>e >0. \<exists>d>0. \<forall>x. 0 < dist x a \<and> dist x a < d \<longrightarrow> dist (f x) l < e)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	455	by (auto simp: tendsto_iff eventually_at)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	456
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	457	lemma Lim_transform_within_set:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	458	fixes a :: "'a::metric_space" and l :: "'b::metric_space"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	459	shows "\<lbrakk>(f \<longlongrightarrow> l) (at a within S); eventually (\<lambda>x. x \<in> S \<longleftrightarrow> x \<in> T) (at a)\<rbrakk>
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	460	\<Longrightarrow> (f \<longlongrightarrow> l) (at a within T)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	461	apply (clarsimp simp: eventually_at Lim_within)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	462	apply (drule_tac x=e in spec, clarify)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	463	apply (rename_tac k)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	464	apply (rule_tac x="min d k" in exI, simp)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	465	done
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	466
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	467	text \<open>Another limit point characterization.\<close>
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	468
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	469	lemma limpt_sequential_inj:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	470	fixes x :: "'a::metric_space"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	471	shows "x islimpt S \<longleftrightarrow>
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	472	(\<exists>f. (\<forall>n::nat. f n \<in> S - {x}) \<and> inj f \<and> (f \<longlongrightarrow> x) sequentially)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	473	(is "?lhs = ?rhs")
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	474	proof
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	475	assume ?lhs
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	476	then have "\<forall>e>0. \<exists>x'\<in>S. x' \<noteq> x \<and> dist x' x < e"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	477	by (force simp: islimpt_approachable)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	478	then obtain y where y: "\<And>e. e>0 \<Longrightarrow> y e \<in> S \<and> y e \<noteq> x \<and> dist (y e) x < e"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	479	by metis
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	480	define f where "f \<equiv> rec_nat (y 1) (\<lambda>n fn. y (min (inverse(2 ^ (Suc n))) (dist fn x)))"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	481	have [simp]: "f 0 = y 1"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	482	"f(Suc n) = y (min (inverse(2 ^ (Suc n))) (dist (f n) x))" for n
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	483	by (simp_all add: f_def)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	484	have f: "f n \<in> S \<and> (f n \<noteq> x) \<and> dist (f n) x < inverse(2 ^ n)" for n
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	485	proof (induction n)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	486	case 0 show ?case
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	487	by (simp add: y)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	488	next
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	489	case (Suc n) then show ?case
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	490	apply (auto simp: y)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	491	by (metis half_gt_zero_iff inverse_positive_iff_positive less_divide_eq_numeral1(1) min_less_iff_conj y zero_less_dist_iff zero_less_numeral zero_less_power)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	492	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	493	show ?rhs
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	494	proof (rule_tac x=f in exI, intro conjI allI)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	495	show "\<And>n. f n \<in> S - {x}"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	496	using f by blast
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	497	have "dist (f n) x < dist (f m) x" if "m < n" for m n
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	498	using that
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	499	proof (induction n)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	500	case 0 then show ?case by simp
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	501	next
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	502	case (Suc n)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	503	then consider "m < n" \| "m = n" using less_Suc_eq by blast
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	504	then show ?case
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	505	proof cases
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	506	assume "m < n"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	507	have "dist (f(Suc n)) x = dist (y (min (inverse(2 ^ (Suc n))) (dist (f n) x))) x"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	508	by simp
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	509	also have "\<dots> < dist (f n) x"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	510	by (metis dist_pos_lt f min.strict_order_iff min_less_iff_conj y)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	511	also have "\<dots> < dist (f m) x"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	512	using Suc.IH \<open>m < n\<close> by blast
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	513	finally show ?thesis .
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	514	next
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	515	assume "m = n" then show ?case
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	516	by simp (metis dist_pos_lt f half_gt_zero_iff inverse_positive_iff_positive min_less_iff_conj y zero_less_numeral zero_less_power)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	517	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	518	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	519	then show "inj f"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	520	by (metis less_irrefl linorder_injI)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	521	show "f \<longlonglongrightarrow> x"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	522	apply (rule tendstoI)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	523	apply (rule_tac c="nat (ceiling(1/e))" in eventually_sequentiallyI)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	524	apply (rule less_trans [OF f [THEN conjunct2, THEN conjunct2]])
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	525	apply (simp add: field_simps)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	526	by (meson le_less_trans mult_less_cancel_left not_le of_nat_less_two_power)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	527	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	528	next
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	529	assume ?rhs
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	530	then show ?lhs
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	531	by (fastforce simp add: islimpt_approachable lim_sequentially)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	532	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	533
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	534	lemma Lim_dist_ubound:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	535	assumes "\<not>(trivial_limit net)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	536	and "(f \<longlongrightarrow> l) net"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	537	and "eventually (\<lambda>x. dist a (f x) \<le> e) net"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	538	shows "dist a l \<le> e"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	539	using assms by (fast intro: tendsto_le tendsto_intros)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	540
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	541
69613 1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	542	subsection \<open>Continuity\<close>
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	543
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	544	text\<open>Derive the epsilon-delta forms, which we often use as "definitions"\<close>
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	545
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	546	proposition continuous_within_eps_delta:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	547	"continuous (at x within s) f \<longleftrightarrow> (\<forall>e>0. \<exists>d>0. \<forall>x'\<in> s. dist x' x < d --> dist (f x') (f x) < e)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	548	unfolding continuous_within and Lim_within by fastforce
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	549
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	550	corollary continuous_at_eps_delta:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	551	"continuous (at x) f \<longleftrightarrow> (\<forall>e > 0. \<exists>d > 0. \<forall>x'. dist x' x < d \<longrightarrow> dist (f x') (f x) < e)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	552	using continuous_within_eps_delta [of x UNIV f] by simp
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	553
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	554	lemma continuous_at_right_real_increasing:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	555	fixes f :: "real \<Rightarrow> real"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	556	assumes nondecF: "\<And>x y. x \<le> y \<Longrightarrow> f x \<le> f y"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	557	shows "continuous (at_right a) f \<longleftrightarrow> (\<forall>e>0. \<exists>d>0. f (a + d) - f a < e)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	558	apply (simp add: greaterThan_def dist_real_def continuous_within Lim_within_le)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	559	apply (intro all_cong ex_cong, safe)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	560	apply (erule_tac x="a + d" in allE, simp)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	561	apply (simp add: nondecF field_simps)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	562	apply (drule nondecF, simp)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	563	done
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	564
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	565	lemma continuous_at_left_real_increasing:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	566	assumes nondecF: "\<And> x y. x \<le> y \<Longrightarrow> f x \<le> ((f y) :: real)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	567	shows "(continuous (at_left (a :: real)) f) = (\<forall>e > 0. \<exists>delta > 0. f a - f (a - delta) < e)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	568	apply (simp add: lessThan_def dist_real_def continuous_within Lim_within_le)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	569	apply (intro all_cong ex_cong, safe)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	570	apply (erule_tac x="a - d" in allE, simp)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	571	apply (simp add: nondecF field_simps)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	572	apply (cut_tac x="a - d" and y=x in nondecF, simp_all)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	573	done
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	574
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	575	text\<open>Versions in terms of open balls.\<close>
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	576
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	577	lemma continuous_within_ball:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	578	"continuous (at x within s) f \<longleftrightarrow>
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	579	(\<forall>e > 0. \<exists>d > 0. f ` (ball x d \<inter> s) \<subseteq> ball (f x) e)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	580	(is "?lhs = ?rhs")
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	581	proof
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	582	assume ?lhs
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	583	{
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	584	fix e :: real
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	585	assume "e > 0"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	586	then obtain d where d: "d>0" "\<forall>xa\<in>s. 0 < dist xa x \<and> dist xa x < d \<longrightarrow> dist (f xa) (f x) < e"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	587	using \<open>?lhs\<close>[unfolded continuous_within Lim_within] by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	588	{
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	589	fix y
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	590	assume "y \<in> f ` (ball x d \<inter> s)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	591	then have "y \<in> ball (f x) e"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	592	using d(2)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	593	using \<open>e > 0\<close>
70960 84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	594	by (auto simp: dist_commute)
69613 1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	595	}
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	596	then have "\<exists>d>0. f ` (ball x d \<inter> s) \<subseteq> ball (f x) e"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	597	using \<open>d > 0\<close>
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	598	unfolding subset_eq ball_def by (auto simp: dist_commute)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	599	}
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	600	then show ?rhs by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	601	next
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	602	assume ?rhs
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	603	then show ?lhs
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	604	unfolding continuous_within Lim_within ball_def subset_eq
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	605	apply (auto simp: dist_commute)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	606	apply (erule_tac x=e in allE, auto)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	607	done
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	608	qed
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	609
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	610	lemma continuous_at_ball:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	611	"continuous (at x) f \<longleftrightarrow> (\<forall>e>0. \<exists>d>0. f ` (ball x d) \<subseteq> ball (f x) e)" (is "?lhs = ?rhs")
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	612	proof
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	613	assume ?lhs
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	614	then show ?rhs
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	615	unfolding continuous_at Lim_at subset_eq Ball_def Bex_def image_iff mem_ball
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	616	apply auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	617	apply (erule_tac x=e in allE, auto)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	618	apply (rule_tac x=d in exI, auto)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	619	apply (erule_tac x=xa in allE)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	620	apply (auto simp: dist_commute)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	621	done
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	622	next
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	623	assume ?rhs
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	624	then show ?lhs
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	625	unfolding continuous_at Lim_at subset_eq Ball_def Bex_def image_iff mem_ball
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	626	apply auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	627	apply (erule_tac x=e in allE, auto)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	628	apply (rule_tac x=d in exI, auto)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	629	apply (erule_tac x="f xa" in allE)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	630	apply (auto simp: dist_commute)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	631	done
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	632	qed
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	633
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	634	text\<open>Define setwise continuity in terms of limits within the set.\<close>
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	635
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	636	lemma continuous_on_iff:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	637	"continuous_on s f \<longleftrightarrow>
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	638	(\<forall>x\<in>s. \<forall>e>0. \<exists>d>0. \<forall>x'\<in>s. dist x' x < d \<longrightarrow> dist (f x') (f x) < e)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	639	unfolding continuous_on_def Lim_within
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	640	by (metis dist_pos_lt dist_self)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	641
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	642	lemma continuous_within_E:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	643	assumes "continuous (at x within s) f" "e>0"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	644	obtains d where "d>0" "\<And>x'. \<lbrakk>x'\<in> s; dist x' x \<le> d\<rbrakk> \<Longrightarrow> dist (f x') (f x) < e"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	645	using assms apply (simp add: continuous_within_eps_delta)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	646	apply (drule spec [of _ e], clarify)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	647	apply (rule_tac d="d/2" in that, auto)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	648	done
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	649
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	650	lemma continuous_onI [intro?]:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	651	assumes "\<And>x e. \<lbrakk>e > 0; x \<in> s\<rbrakk> \<Longrightarrow> \<exists>d>0. \<forall>x'\<in>s. dist x' x < d \<longrightarrow> dist (f x') (f x) \<le> e"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	652	shows "continuous_on s f"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	653	apply (simp add: continuous_on_iff, clarify)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	654	apply (rule ex_forward [OF assms [OF half_gt_zero]], auto)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	655	done
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	656
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	657	text\<open>Some simple consequential lemmas.\<close>
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	658
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	659	lemma continuous_onE:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	660	assumes "continuous_on s f" "x\<in>s" "e>0"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	661	obtains d where "d>0" "\<And>x'. \<lbrakk>x' \<in> s; dist x' x \<le> d\<rbrakk> \<Longrightarrow> dist (f x') (f x) < e"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	662	using assms
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	663	apply (simp add: continuous_on_iff)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	664	apply (elim ballE allE)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	665	apply (auto intro: that [where d="d/2" for d])
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	666	done
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	667
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	668	text\<open>The usual transformation theorems.\<close>
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	669
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	670	lemma continuous_transform_within:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	671	fixes f g :: "'a::metric_space \<Rightarrow> 'b::topological_space"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	672	assumes "continuous (at x within s) f"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	673	and "0 < d"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	674	and "x \<in> s"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	675	and "\<And>x'. \<lbrakk>x' \<in> s; dist x' x < d\<rbrakk> \<Longrightarrow> f x' = g x'"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	676	shows "continuous (at x within s) g"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	677	using assms
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	678	unfolding continuous_within
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	679	by (force intro: Lim_transform_within)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	680
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	681
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	682	subsection \<open>Closure and Limit Characterization\<close>
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	683
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	684	lemma closure_approachable:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	685	fixes S :: "'a::metric_space set"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	686	shows "x \<in> closure S \<longleftrightarrow> (\<forall>e>0. \<exists>y\<in>S. dist y x < e)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	687	apply (auto simp: closure_def islimpt_approachable)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	688	apply (metis dist_self)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	689	done
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	690
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	691	lemma closure_approachable_le:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	692	fixes S :: "'a::metric_space set"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	693	shows "x \<in> closure S \<longleftrightarrow> (\<forall>e>0. \<exists>y\<in>S. dist y x \<le> e)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	694	unfolding closure_approachable
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	695	using dense by force
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	696
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	697	lemma closure_approachableD:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	698	assumes "x \<in> closure S" "e>0"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	699	shows "\<exists>y\<in>S. dist x y < e"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	700	using assms unfolding closure_approachable by (auto simp: dist_commute)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	701
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	702	lemma closed_approachable:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	703	fixes S :: "'a::metric_space set"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	704	shows "closed S \<Longrightarrow> (\<forall>e>0. \<exists>y\<in>S. dist y x < e) \<longleftrightarrow> x \<in> S"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	705	by (metis closure_closed closure_approachable)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	706
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	707	lemma closure_contains_Inf:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	708	fixes S :: "real set"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	709	assumes "S \<noteq> {}" "bdd_below S"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	710	shows "Inf S \<in> closure S"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	711	proof -
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	712	have *: "\<forall>x\<in>S. Inf S \<le> x"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	713	using cInf_lower[of _ S] assms by metis
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	714	{
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	715	fix e :: real
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	716	assume "e > 0"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	717	then have "Inf S < Inf S + e" by simp
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	718	with assms obtain x where "x \<in> S" "x < Inf S + e"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	719	by (subst (asm) cInf_less_iff) auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	720	with * have "\<exists>x\<in>S. dist x (Inf S) < e"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	721	by (intro bexI[of _ x]) (auto simp: dist_real_def)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	722	}
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	723	then show ?thesis unfolding closure_approachable by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	724	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	725
70617 c81ac117afa6 moved lemmas; reduced dependencies of Lipschitz immler parents: 70136 diff changeset	726	lemma closure_contains_Sup:
c81ac117afa6 moved lemmas; reduced dependencies of Lipschitz immler parents: 70136 diff changeset	727	fixes S :: "real set"
c81ac117afa6 moved lemmas; reduced dependencies of Lipschitz immler parents: 70136 diff changeset	728	assumes "S \<noteq> {}" "bdd_above S"
c81ac117afa6 moved lemmas; reduced dependencies of Lipschitz immler parents: 70136 diff changeset	729	shows "Sup S \<in> closure S"
c81ac117afa6 moved lemmas; reduced dependencies of Lipschitz immler parents: 70136 diff changeset	730	proof -
c81ac117afa6 moved lemmas; reduced dependencies of Lipschitz immler parents: 70136 diff changeset	731	have *: "\<forall>x\<in>S. x \<le> Sup S"
c81ac117afa6 moved lemmas; reduced dependencies of Lipschitz immler parents: 70136 diff changeset	732	using cSup_upper[of _ S] assms by metis
c81ac117afa6 moved lemmas; reduced dependencies of Lipschitz immler parents: 70136 diff changeset	733	{
c81ac117afa6 moved lemmas; reduced dependencies of Lipschitz immler parents: 70136 diff changeset	734	fix e :: real
c81ac117afa6 moved lemmas; reduced dependencies of Lipschitz immler parents: 70136 diff changeset	735	assume "e > 0"
c81ac117afa6 moved lemmas; reduced dependencies of Lipschitz immler parents: 70136 diff changeset	736	then have "Sup S - e < Sup S" by simp
c81ac117afa6 moved lemmas; reduced dependencies of Lipschitz immler parents: 70136 diff changeset	737	with assms obtain x where "x \<in> S" "Sup S - e < x"
c81ac117afa6 moved lemmas; reduced dependencies of Lipschitz immler parents: 70136 diff changeset	738	by (subst (asm) less_cSup_iff) auto
c81ac117afa6 moved lemmas; reduced dependencies of Lipschitz immler parents: 70136 diff changeset	739	with * have "\<exists>x\<in>S. dist x (Sup S) < e"
c81ac117afa6 moved lemmas; reduced dependencies of Lipschitz immler parents: 70136 diff changeset	740	by (intro bexI[of _ x]) (auto simp: dist_real_def)
c81ac117afa6 moved lemmas; reduced dependencies of Lipschitz immler parents: 70136 diff changeset	741	}
c81ac117afa6 moved lemmas; reduced dependencies of Lipschitz immler parents: 70136 diff changeset	742	then show ?thesis unfolding closure_approachable by auto
c81ac117afa6 moved lemmas; reduced dependencies of Lipschitz immler parents: 70136 diff changeset	743	qed
c81ac117afa6 moved lemmas; reduced dependencies of Lipschitz immler parents: 70136 diff changeset	744
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	745	lemma not_trivial_limit_within_ball:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	746	"\<not> trivial_limit (at x within S) \<longleftrightarrow> (\<forall>e>0. S \<inter> ball x e - {x} \<noteq> {})"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	747	(is "?lhs \<longleftrightarrow> ?rhs")
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	748	proof
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	749	show ?rhs if ?lhs
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	750	proof -
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	751	{
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	752	fix e :: real
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	753	assume "e > 0"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	754	then obtain y where "y \<in> S - {x}" and "dist y x < e"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	755	using \<open>?lhs\<close> not_trivial_limit_within[of x S] closure_approachable[of x "S - {x}"]
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	756	by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	757	then have "y \<in> S \<inter> ball x e - {x}"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	758	unfolding ball_def by (simp add: dist_commute)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	759	then have "S \<inter> ball x e - {x} \<noteq> {}" by blast
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	760	}
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	761	then show ?thesis by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	762	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	763	show ?lhs if ?rhs
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	764	proof -
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	765	{
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	766	fix e :: real
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	767	assume "e > 0"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	768	then obtain y where "y \<in> S \<inter> ball x e - {x}"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	769	using \<open>?rhs\<close> by blast
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	770	then have "y \<in> S - {x}" and "dist y x < e"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	771	unfolding ball_def by (simp_all add: dist_commute)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	772	then have "\<exists>y \<in> S - {x}. dist y x < e"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	773	by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	774	}
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	775	then show ?thesis
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	776	using not_trivial_limit_within[of x S] closure_approachable[of x "S - {x}"]
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	777	by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	778	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	779	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	780
69613 1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	781
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	782	subsection \<open>Boundedness\<close>
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	783
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	784	(* FIXME: This has to be unified with BSEQ!! *)
70136 f03a01a18c6e modernized tags: default scope excludes proof; wenzelm parents: 69922 diff changeset	785	definition\<^marker>\<open>tag important\<close> (in metric_space) bounded :: "'a set \<Rightarrow> bool"
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	786	where "bounded S \<longleftrightarrow> (\<exists>x e. \<forall>y\<in>S. dist x y \<le> e)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	787
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	788	lemma bounded_subset_cball: "bounded S \<longleftrightarrow> (\<exists>e x. S \<subseteq> cball x e \<and> 0 \<le> e)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	789	unfolding bounded_def subset_eq by auto (meson order_trans zero_le_dist)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	790
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	791	lemma bounded_any_center: "bounded S \<longleftrightarrow> (\<exists>e. \<forall>y\<in>S. dist a y \<le> e)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	792	unfolding bounded_def
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	793	by auto (metis add.commute add_le_cancel_right dist_commute dist_triangle_le)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	794
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	795	lemma bounded_iff: "bounded S \<longleftrightarrow> (\<exists>a. \<forall>x\<in>S. norm x \<le> a)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	796	unfolding bounded_any_center [where a=0]
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	797	by (simp add: dist_norm)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	798
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	799	lemma bdd_above_norm: "bdd_above (norm ` X) \<longleftrightarrow> bounded X"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	800	by (simp add: bounded_iff bdd_above_def)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	801
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	802	lemma bounded_norm_comp: "bounded ((\<lambda>x. norm (f x)) ` S) = bounded (f ` S)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	803	by (simp add: bounded_iff)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	804
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	805	lemma boundedI:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	806	assumes "\<And>x. x \<in> S \<Longrightarrow> norm x \<le> B"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	807	shows "bounded S"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	808	using assms bounded_iff by blast
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	809
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	810	lemma bounded_empty [simp]: "bounded {}"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	811	by (simp add: bounded_def)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	812
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	813	lemma bounded_subset: "bounded T \<Longrightarrow> S \<subseteq> T \<Longrightarrow> bounded S"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	814	by (metis bounded_def subset_eq)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	815
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	816	lemma bounded_interior[intro]: "bounded S \<Longrightarrow> bounded(interior S)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	817	by (metis bounded_subset interior_subset)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	818
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	819	lemma bounded_closure[intro]:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	820	assumes "bounded S"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	821	shows "bounded (closure S)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	822	proof -
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	823	from assms obtain x and a where a: "\<forall>y\<in>S. dist x y \<le> a"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	824	unfolding bounded_def by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	825	{
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	826	fix y
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	827	assume "y \<in> closure S"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	828	then obtain f where f: "\<forall>n. f n \<in> S" "(f \<longlongrightarrow> y) sequentially"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	829	unfolding closure_sequential by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	830	have "\<forall>n. f n \<in> S \<longrightarrow> dist x (f n) \<le> a" using a by simp
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	831	then have "eventually (\<lambda>n. dist x (f n) \<le> a) sequentially"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	832	by (simp add: f(1))
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	833	have "dist x y \<le> a"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	834	apply (rule Lim_dist_ubound [of sequentially f])
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	835	apply (rule trivial_limit_sequentially)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	836	apply (rule f(2))
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	837	apply fact
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	838	done
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	839	}
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	840	then show ?thesis
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	841	unfolding bounded_def by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	842	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	843
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	844	lemma bounded_closure_image: "bounded (f ` closure S) \<Longrightarrow> bounded (f ` S)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	845	by (simp add: bounded_subset closure_subset image_mono)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	846
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	847	lemma bounded_cball[simp,intro]: "bounded (cball x e)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	848	apply (simp add: bounded_def)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	849	apply (rule_tac x=x in exI)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	850	apply (rule_tac x=e in exI, auto)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	851	done
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	852
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	853	lemma bounded_ball[simp,intro]: "bounded (ball x e)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	854	by (metis ball_subset_cball bounded_cball bounded_subset)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	855
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	856	lemma bounded_Un[simp]: "bounded (S \<union> T) \<longleftrightarrow> bounded S \<and> bounded T"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	857	by (auto simp: bounded_def) (metis Un_iff bounded_any_center le_max_iff_disj)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	858
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	859	lemma bounded_Union[intro]: "finite F \<Longrightarrow> \<forall>S\<in>F. bounded S \<Longrightarrow> bounded (\<Union>F)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	860	by (induct rule: finite_induct[of F]) auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	861
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	862	lemma bounded_UN [intro]: "finite A \<Longrightarrow> \<forall>x\<in>A. bounded (B x) \<Longrightarrow> bounded (\<Union>x\<in>A. B x)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	863	by (induct set: finite) auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	864
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	865	lemma bounded_insert [simp]: "bounded (insert x S) \<longleftrightarrow> bounded S"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	866	proof -
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	867	have "\<forall>y\<in>{x}. dist x y \<le> 0"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	868	by simp
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	869	then have "bounded {x}"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	870	unfolding bounded_def by fast
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	871	then show ?thesis
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	872	by (metis insert_is_Un bounded_Un)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	873	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	874
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	875	lemma bounded_subset_ballI: "S \<subseteq> ball x r \<Longrightarrow> bounded S"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	876	by (meson bounded_ball bounded_subset)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	877
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	878	lemma bounded_subset_ballD:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	879	assumes "bounded S" shows "\<exists>r. 0 < r \<and> S \<subseteq> ball x r"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	880	proof -
70960 84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	881	obtain e::real and y where "S \<subseteq> cball y e" "0 \<le> e"
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	882	using assms by (auto simp: bounded_subset_cball)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	883	then show ?thesis
70960 84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	884	by (intro exI[where x="dist x y + e + 1"]) metric
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	885	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	886
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	887	lemma finite_imp_bounded [intro]: "finite S \<Longrightarrow> bounded S"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	888	by (induct set: finite) simp_all
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	889
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	890	lemma bounded_Int[intro]: "bounded S \<or> bounded T \<Longrightarrow> bounded (S \<inter> T)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	891	by (metis Int_lower1 Int_lower2 bounded_subset)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	892
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	893	lemma bounded_diff[intro]: "bounded S \<Longrightarrow> bounded (S - T)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	894	by (metis Diff_subset bounded_subset)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	895
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	896	lemma bounded_dist_comp:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	897	assumes "bounded (f ` S)" "bounded (g ` S)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	898	shows "bounded ((\<lambda>x. dist (f x) (g x)) ` S)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	899	proof -
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	900	from assms obtain M1 M2 where *: "dist (f x) undefined \<le> M1" "dist undefined (g x) \<le> M2" if "x \<in> S" for x
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	901	by (auto simp: bounded_any_center[of _ undefined] dist_commute)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	902	have "dist (f x) (g x) \<le> M1 + M2" if "x \<in> S" for x
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	903	using *[OF that]
70960 84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	904	by metric
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	905	then show ?thesis
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	906	by (auto intro!: boundedI)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	907	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	908
69613 1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	909	lemma bounded_Times:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	910	assumes "bounded s" "bounded t"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	911	shows "bounded (s \<times> t)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	912	proof -
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	913	obtain x y a b where "\<forall>z\<in>s. dist x z \<le> a" "\<forall>z\<in>t. dist y z \<le> b"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	914	using assms [unfolded bounded_def] by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	915	then have "\<forall>z\<in>s \<times> t. dist (x, y) z \<le> sqrt (a\<^sup>2 + b\<^sup>2)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	916	by (auto simp: dist_Pair_Pair real_sqrt_le_mono add_mono power_mono)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	917	then show ?thesis unfolding bounded_any_center [where a="(x, y)"] by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	918	qed
69611 42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	919
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	920
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	921	subsection \<open>Compactness\<close>
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	922
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	923	lemma compact_imp_bounded:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	924	assumes "compact U"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	925	shows "bounded U"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	926	proof -
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	927	have "compact U" "\<forall>x\<in>U. open (ball x 1)" "U \<subseteq> (\<Union>x\<in>U. ball x 1)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	928	using assms by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	929	then obtain D where D: "D \<subseteq> U" "finite D" "U \<subseteq> (\<Union>x\<in>D. ball x 1)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	930	by (metis compactE_image)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	931	from \<open>finite D\<close> have "bounded (\<Union>x\<in>D. ball x 1)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	932	by (simp add: bounded_UN)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	933	then show "bounded U" using \<open>U \<subseteq> (\<Union>x\<in>D. ball x 1)\<close>
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	934	by (rule bounded_subset)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	935	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	936
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	937	lemma closure_Int_ball_not_empty:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	938	assumes "S \<subseteq> closure T" "x \<in> S" "r > 0"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	939	shows "T \<inter> ball x r \<noteq> {}"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	940	using assms centre_in_ball closure_iff_nhds_not_empty by blast
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	941
69613 1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	942	lemma compact_sup_maxdistance:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	943	fixes s :: "'a::metric_space set"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	944	assumes "compact s"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	945	and "s \<noteq> {}"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	946	shows "\<exists>x\<in>s. \<exists>y\<in>s. \<forall>u\<in>s. \<forall>v\<in>s. dist u v \<le> dist x y"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	947	proof -
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	948	have "compact (s \<times> s)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	949	using \<open>compact s\<close> by (intro compact_Times)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	950	moreover have "s \<times> s \<noteq> {}"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	951	using \<open>s \<noteq> {}\<close> by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	952	moreover have "continuous_on (s \<times> s) (\<lambda>x. dist (fst x) (snd x))"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	953	by (intro continuous_at_imp_continuous_on ballI continuous_intros)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	954	ultimately show ?thesis
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	955	using continuous_attains_sup[of "s \<times> s" "\<lambda>x. dist (fst x) (snd x)"] by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	956	qed
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	957
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	958
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	959	subsubsection\<open>Totally bounded\<close>
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	960
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	961	lemma cauchy_def: "Cauchy s \<longleftrightarrow> (\<forall>e>0. \<exists>N. \<forall>m n. m \<ge> N \<and> n \<ge> N \<longrightarrow> dist (s m) (s n) < e)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	962	unfolding Cauchy_def by metis
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	963
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	964	proposition seq_compact_imp_totally_bounded:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	965	assumes "seq_compact s"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	966	shows "\<forall>e>0. \<exists>k. finite k \<and> k \<subseteq> s \<and> s \<subseteq> (\<Union>x\<in>k. ball x e)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	967	proof -
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	968	{ fix e::real assume "e > 0" assume *: "\<And>k. finite k \<Longrightarrow> k \<subseteq> s \<Longrightarrow> \<not> s \<subseteq> (\<Union>x\<in>k. ball x e)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	969	let ?Q = "\<lambda>x n r. r \<in> s \<and> (\<forall>m < (n::nat). \<not> (dist (x m) r < e))"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	970	have "\<exists>x. \<forall>n::nat. ?Q x n (x n)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	971	proof (rule dependent_wellorder_choice)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	972	fix n x assume "\<And>y. y < n \<Longrightarrow> ?Q x y (x y)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	973	then have "\<not> s \<subseteq> (\<Union>x\<in>x ` {0..<n}. ball x e)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	974	using *[of "x ` {0 ..< n}"] by (auto simp: subset_eq)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	975	then obtain z where z:"z\<in>s" "z \<notin> (\<Union>x\<in>x ` {0..<n}. ball x e)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	976	unfolding subset_eq by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	977	show "\<exists>r. ?Q x n r"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	978	using z by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	979	qed simp
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	980	then obtain x where "\<forall>n::nat. x n \<in> s" and x:"\<And>n m. m < n \<Longrightarrow> \<not> (dist (x m) (x n) < e)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	981	by blast
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	982	then obtain l r where "l \<in> s" and r:"strict_mono r" and "((x \<circ> r) \<longlongrightarrow> l) sequentially"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	983	using assms by (metis seq_compact_def)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	984	from this(3) have "Cauchy (x \<circ> r)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	985	using LIMSEQ_imp_Cauchy by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	986	then obtain N::nat where "\<And>m n. N \<le> m \<Longrightarrow> N \<le> n \<Longrightarrow> dist ((x \<circ> r) m) ((x \<circ> r) n) < e"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	987	unfolding cauchy_def using \<open>e > 0\<close> by blast
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	988	then have False
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	989	using x[of "r N" "r (N+1)"] r by (auto simp: strict_mono_def) }
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	990	then show ?thesis
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	991	by metis
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	992	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	993
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	994	subsubsection\<open>Heine-Borel theorem\<close>
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	995
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	996	proposition seq_compact_imp_Heine_Borel:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	997	fixes s :: "'a :: metric_space set"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	998	assumes "seq_compact s"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	999	shows "compact s"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1000	proof -
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1001	from seq_compact_imp_totally_bounded[OF \<open>seq_compact s\<close>]
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1002	obtain f where f: "\<forall>e>0. finite (f e) \<and> f e \<subseteq> s \<and> s \<subseteq> (\<Union>x\<in>f e. ball x e)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1003	unfolding choice_iff' ..
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1004	define K where "K = (\<lambda>(x, r). ball x r) ` ((\<Union>e \<in> \<rat> \<inter> {0 <..}. f e) \<times> \<rat>)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1005	have "countably_compact s"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1006	using \<open>seq_compact s\<close> by (rule seq_compact_imp_countably_compact)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1007	then show "compact s"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1008	proof (rule countably_compact_imp_compact)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1009	show "countable K"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1010	unfolding K_def using f
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1011	by (auto intro: countable_finite countable_subset countable_rat
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1012	intro!: countable_image countable_SIGMA countable_UN)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1013	show "\<forall>b\<in>K. open b" by (auto simp: K_def)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1014	next
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1015	fix T x
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1016	assume T: "open T" "x \<in> T" and x: "x \<in> s"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1017	from openE[OF T] obtain e where "0 < e" "ball x e \<subseteq> T"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1018	by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1019	then have "0 < e / 2" "ball x (e / 2) \<subseteq> T"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1020	by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1021	from Rats_dense_in_real[OF \<open>0 < e / 2\<close>] obtain r where "r \<in> \<rat>" "0 < r" "r < e / 2"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1022	by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1023	from f[rule_format, of r] \<open>0 < r\<close> \<open>x \<in> s\<close> obtain k where "k \<in> f r" "x \<in> ball k r"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1024	by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1025	from \<open>r \<in> \<rat>\<close> \<open>0 < r\<close> \<open>k \<in> f r\<close> have "ball k r \<in> K"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1026	by (auto simp: K_def)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1027	then show "\<exists>b\<in>K. x \<in> b \<and> b \<inter> s \<subseteq> T"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1028	proof (rule bexI[rotated], safe)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1029	fix y
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1030	assume "y \<in> ball k r"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1031	with \<open>r < e / 2\<close> \<open>x \<in> ball k r\<close> have "dist x y < e"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1032	by (intro dist_triangle_half_r [of k _ e]) (auto simp: dist_commute)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1033	with \<open>ball x e \<subseteq> T\<close> show "y \<in> T"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1034	by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1035	next
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1036	show "x \<in> ball k r" by fact
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1037	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1038	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1039	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1040
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1041	proposition compact_eq_seq_compact_metric:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1042	"compact (s :: 'a::metric_space set) \<longleftrightarrow> seq_compact s"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1043	using compact_imp_seq_compact seq_compact_imp_Heine_Borel by blast
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1044
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1045	proposition compact_def: \<comment> \<open>this is the definition of compactness in HOL Light\<close>
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1046	"compact (S :: 'a::metric_space set) \<longleftrightarrow>
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1047	(\<forall>f. (\<forall>n. f n \<in> S) \<longrightarrow> (\<exists>l\<in>S. \<exists>r::nat\<Rightarrow>nat. strict_mono r \<and> (f \<circ> r) \<longlonglongrightarrow> l))"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1048	unfolding compact_eq_seq_compact_metric seq_compact_def by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1049
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1050	subsubsection \<open>Complete the chain of compactness variants\<close>
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1051
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1052	proposition compact_eq_Bolzano_Weierstrass:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1053	fixes s :: "'a::metric_space set"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1054	shows "compact s \<longleftrightarrow> (\<forall>t. infinite t \<and> t \<subseteq> s --> (\<exists>x \<in> s. x islimpt t))"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1055	(is "?lhs = ?rhs")
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1056	proof
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1057	assume ?lhs
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1058	then show ?rhs
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1059	using Heine_Borel_imp_Bolzano_Weierstrass[of s] by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1060	next
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1061	assume ?rhs
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1062	then show ?lhs
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1063	unfolding compact_eq_seq_compact_metric by (rule Bolzano_Weierstrass_imp_seq_compact)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1064	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1065
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1066	proposition Bolzano_Weierstrass_imp_bounded:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1067	"\<forall>t. infinite t \<and> t \<subseteq> s \<longrightarrow> (\<exists>x \<in> s. x islimpt t) \<Longrightarrow> bounded s"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1068	using compact_imp_bounded unfolding compact_eq_Bolzano_Weierstrass .
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1069
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1070
69613 1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1071	subsection \<open>Banach fixed point theorem\<close>
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1072
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1073	theorem banach_fix:\<comment> \<open>TODO: rename to \<open>Banach_fix\<close>\<close>
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1074	assumes s: "complete s" "s \<noteq> {}"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1075	and c: "0 \<le> c" "c < 1"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1076	and f: "f ` s \<subseteq> s"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1077	and lipschitz: "\<forall>x\<in>s. \<forall>y\<in>s. dist (f x) (f y) \<le> c * dist x y"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1078	shows "\<exists>!x\<in>s. f x = x"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1079	proof -
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1080	from c have "1 - c > 0" by simp
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1081
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1082	from s(2) obtain z0 where z0: "z0 \<in> s" by blast
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1083	define z where "z n = (f ^^ n) z0" for n
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1084	with f z0 have z_in_s: "z n \<in> s" for n :: nat
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1085	by (induct n) auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1086	define d where "d = dist (z 0) (z 1)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1087
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1088	have fzn: "f (z n) = z (Suc n)" for n
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1089	by (simp add: z_def)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1090	have cf_z: "dist (z n) (z (Suc n)) \<le> (c ^ n) * d" for n :: nat
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1091	proof (induct n)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1092	case 0
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1093	then show ?case
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1094	by (simp add: d_def)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1095	next
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1096	case (Suc m)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1097	with \<open>0 \<le> c\<close> have "c * dist (z m) (z (Suc m)) \<le> c ^ Suc m * d"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1098	using mult_left_mono[of "dist (z m) (z (Suc m))" "c ^ m * d" c] by simp
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1099	then show ?case
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1100	using lipschitz[THEN bspec[where x="z m"], OF z_in_s, THEN bspec[where x="z (Suc m)"], OF z_in_s]
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1101	by (simp add: fzn mult_le_cancel_left)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1102	qed
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1103
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1104	have cf_z2: "(1 - c) * dist (z m) (z (m + n)) \<le> (c ^ m) * d * (1 - c ^ n)" for n m :: nat
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1105	proof (induct n)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1106	case 0
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1107	show ?case by simp
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1108	next
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1109	case (Suc k)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1110	from c have "(1 - c) * dist (z m) (z (m + Suc k)) \<le>
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1111	(1 - c) * (dist (z m) (z (m + k)) + dist (z (m + k)) (z (Suc (m + k))))"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1112	by (simp add: dist_triangle)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1113	also from c cf_z[of "m + k"] have "\<dots> \<le> (1 - c) * (dist (z m) (z (m + k)) + c ^ (m + k) * d)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1114	by simp
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1115	also from Suc have "\<dots> \<le> c ^ m * d * (1 - c ^ k) + (1 - c) * c ^ (m + k) * d"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1116	by (simp add: field_simps)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1117	also have "\<dots> = (c ^ m) * (d * (1 - c ^ k) + (1 - c) * c ^ k * d)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1118	by (simp add: power_add field_simps)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1119	also from c have "\<dots> \<le> (c ^ m) * d * (1 - c ^ Suc k)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1120	by (simp add: field_simps)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1121	finally show ?case by simp
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1122	qed
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1123
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1124	have "\<exists>N. \<forall>m n. N \<le> m \<and> N \<le> n \<longrightarrow> dist (z m) (z n) < e" if "e > 0" for e
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1125	proof (cases "d = 0")
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1126	case True
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1127	from \<open>1 - c > 0\<close> have "(1 - c) * x \<le> 0 \<longleftrightarrow> x \<le> 0" for x
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1128	by (metis mult_zero_left mult.commute real_mult_le_cancel_iff1)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1129	with c cf_z2[of 0] True have "z n = z0" for n
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1130	by (simp add: z_def)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1131	with \<open>e > 0\<close> show ?thesis by simp
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1132	next
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1133	case False
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1134	with zero_le_dist[of "z 0" "z 1"] have "d > 0"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1135	by (metis d_def less_le)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1136	with \<open>1 - c > 0\<close> \<open>e > 0\<close> have "0 < e * (1 - c) / d"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1137	by simp
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1138	with c obtain N where N: "c ^ N < e * (1 - c) / d"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1139	using real_arch_pow_inv[of "e * (1 - c) / d" c] by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1140	have *: "dist (z m) (z n) < e" if "m > n" and as: "m \<ge> N" "n \<ge> N" for m n :: nat
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1141	proof -
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1142	from c \<open>n \<ge> N\<close> have *: "c ^ n \<le> c ^ N"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1143	using power_decreasing[OF \<open>n\<ge>N\<close>, of c] by simp
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1144	from c \<open>m > n\<close> have "1 - c ^ (m - n) > 0"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1145	using power_strict_mono[of c 1 "m - n"] by simp
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1146	with \<open>d > 0\<close> \<open>0 < 1 - c\<close> have *: "d (1 - c ^ (m - n)) / (1 - c) > 0"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1147	by simp
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1148	from cf_z2[of n "m - n"] \<open>m > n\<close>
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1149	have "dist (z m) (z n) \<le> c ^ n * d * (1 - c ^ (m - n)) / (1 - c)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1150	by (simp add: pos_le_divide_eq[OF \<open>1 - c > 0\<close>] mult.commute dist_commute)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1151	also have "\<dots> \<le> c ^ N * d * (1 - c ^ (m - n)) / (1 - c)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1152	using mult_right_mono[OF * order_less_imp_le[OF **]]
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1153	by (simp add: mult.assoc)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1154	also have "\<dots> < (e * (1 - c) / d) * d * (1 - c ^ (m - n)) / (1 - c)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1155	using mult_strict_right_mono[OF N **] by (auto simp: mult.assoc)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1156	also from c \<open>d > 0\<close> \<open>1 - c > 0\<close> have "\<dots> = e * (1 - c ^ (m - n))"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1157	by simp
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1158	also from c \<open>1 - c ^ (m - n) > 0\<close> \<open>e > 0\<close> have "\<dots> \<le> e"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1159	using mult_right_le_one_le[of e "1 - c ^ (m - n)"] by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1160	finally show ?thesis by simp
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1161	qed
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1162	have "dist (z n) (z m) < e" if "N \<le> m" "N \<le> n" for m n :: nat
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1163	proof (cases "n = m")
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1164	case True
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1165	with \<open>e > 0\<close> show ?thesis by simp
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1166	next
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1167	case False
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1168	with [of n m] [of m n] and that show ?thesis
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1169	by (auto simp: dist_commute nat_neq_iff)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1170	qed
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1171	then show ?thesis by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1172	qed
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1173	then have "Cauchy z"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1174	by (simp add: cauchy_def)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1175	then obtain x where "x\<in>s" and x:"(z \<longlongrightarrow> x) sequentially"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1176	using s(1)[unfolded compact_def complete_def, THEN spec[where x=z]] and z_in_s by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1177
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1178	define e where "e = dist (f x) x"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1179	have "e = 0"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1180	proof (rule ccontr)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1181	assume "e \<noteq> 0"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1182	then have "e > 0"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1183	unfolding e_def using zero_le_dist[of "f x" x]
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1184	by (metis dist_eq_0_iff dist_nz e_def)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1185	then obtain N where N:"\<forall>n\<ge>N. dist (z n) x < e / 2"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1186	using x[unfolded lim_sequentially, THEN spec[where x="e/2"]] by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1187	then have N':"dist (z N) x < e / 2" by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1188	have : "c dist (z N) x \<le> dist (z N) x"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1189	unfolding mult_le_cancel_right2
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1190	using zero_le_dist[of "z N" x] and c
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1191	by (metis dist_eq_0_iff dist_nz order_less_asym less_le)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1192	have "dist (f (z N)) (f x) \<le> c * dist (z N) x"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1193	using lipschitz[THEN bspec[where x="z N"], THEN bspec[where x=x]]
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1194	using z_in_s[of N] \<open>x\<in>s\<close>
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1195	using c
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1196	by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1197	also have "\<dots> < e / 2"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1198	using N' and c using * by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1199	finally show False
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1200	unfolding fzn
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1201	using N[THEN spec[where x="Suc N"]] and dist_triangle_half_r[of "z (Suc N)" "f x" e x]
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1202	unfolding e_def
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1203	by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1204	qed
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1205	then have "f x = x" by (auto simp: e_def)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1206	moreover have "y = x" if "f y = y" "y \<in> s" for y
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1207	proof -
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1208	from \<open>x \<in> s\<close> \<open>f x = x\<close> that have "dist x y \<le> c * dist x y"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1209	using lipschitz[THEN bspec[where x=x], THEN bspec[where x=y]] by simp
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1210	with c and zero_le_dist[of x y] have "dist x y = 0"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1211	by (simp add: mult_le_cancel_right1)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1212	then show ?thesis by simp
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1213	qed
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1214	ultimately show ?thesis
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1215	using \<open>x\<in>s\<close> by blast
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1216	qed
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1217
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1218
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1219	subsection \<open>Edelstein fixed point theorem\<close>
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1220
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1221	theorem edelstein_fix:\<comment> \<open>TODO: rename to \<open>Edelstein_fix\<close>\<close>
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1222	fixes s :: "'a::metric_space set"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1223	assumes s: "compact s" "s \<noteq> {}"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1224	and gs: "(g ` s) \<subseteq> s"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1225	and dist: "\<forall>x\<in>s. \<forall>y\<in>s. x \<noteq> y \<longrightarrow> dist (g x) (g y) < dist x y"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1226	shows "\<exists>!x\<in>s. g x = x"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1227	proof -
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1228	let ?D = "(\<lambda>x. (x, x)) ` s"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1229	have D: "compact ?D" "?D \<noteq> {}"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1230	by (rule compact_continuous_image)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1231	(auto intro!: s continuous_Pair continuous_ident simp: continuous_on_eq_continuous_within)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1232
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1233	have "\<And>x y e. x \<in> s \<Longrightarrow> y \<in> s \<Longrightarrow> 0 < e \<Longrightarrow> dist y x < e \<Longrightarrow> dist (g y) (g x) < e"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1234	using dist by fastforce
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1235	then have "continuous_on s g"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1236	by (auto simp: continuous_on_iff)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1237	then have cont: "continuous_on ?D (\<lambda>x. dist ((g \<circ> fst) x) (snd x))"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1238	unfolding continuous_on_eq_continuous_within
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1239	by (intro continuous_dist ballI continuous_within_compose)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1240	(auto intro!: continuous_fst continuous_snd continuous_ident simp: image_image)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1241
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1242	obtain a where "a \<in> s" and le: "\<And>x. x \<in> s \<Longrightarrow> dist (g a) a \<le> dist (g x) x"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1243	using continuous_attains_inf[OF D cont] by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1244
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1245	have "g a = a"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1246	proof (rule ccontr)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1247	assume "g a \<noteq> a"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1248	with \<open>a \<in> s\<close> gs have "dist (g (g a)) (g a) < dist (g a) a"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1249	by (intro dist[rule_format]) auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1250	moreover have "dist (g a) a \<le> dist (g (g a)) (g a)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1251	using \<open>a \<in> s\<close> gs by (intro le) auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1252	ultimately show False by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1253	qed
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1254	moreover have "\<And>x. x \<in> s \<Longrightarrow> g x = x \<Longrightarrow> x = a"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1255	using dist[THEN bspec[where x=a]] \<open>g a = a\<close> and \<open>a\<in>s\<close> by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1256	ultimately show "\<exists>!x\<in>s. g x = x"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1257	using \<open>a \<in> s\<close> by blast
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1258	qed
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1259
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1260	subsection \<open>The diameter of a set\<close>
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1261
70136 f03a01a18c6e modernized tags: default scope excludes proof; wenzelm parents: 69922 diff changeset	1262	definition\<^marker>\<open>tag important\<close> diameter :: "'a::metric_space set \<Rightarrow> real" where
69613 1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1263	"diameter S = (if S = {} then 0 else SUP (x,y)\<in>S\<times>S. dist x y)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1264
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1265	lemma diameter_empty [simp]: "diameter{} = 0"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1266	by (auto simp: diameter_def)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1267
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1268	lemma diameter_singleton [simp]: "diameter{x} = 0"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1269	by (auto simp: diameter_def)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1270
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1271	lemma diameter_le:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1272	assumes "S \<noteq> {} \<or> 0 \<le> d"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1273	and no: "\<And>x y. \<lbrakk>x \<in> S; y \<in> S\<rbrakk> \<Longrightarrow> norm(x - y) \<le> d"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1274	shows "diameter S \<le> d"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1275	using assms
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1276	by (auto simp: dist_norm diameter_def intro: cSUP_least)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1277
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1278	lemma diameter_bounded_bound:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1279	fixes s :: "'a :: metric_space set"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1280	assumes s: "bounded s" "x \<in> s" "y \<in> s"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1281	shows "dist x y \<le> diameter s"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1282	proof -
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1283	from s obtain z d where z: "\<And>x. x \<in> s \<Longrightarrow> dist z x \<le> d"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1284	unfolding bounded_def by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1285	have "bdd_above (case_prod dist ` (s\<times>s))"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1286	proof (intro bdd_aboveI, safe)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1287	fix a b
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1288	assume "a \<in> s" "b \<in> s"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1289	with z[of a] z[of b] dist_triangle[of a b z]
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1290	show "dist a b \<le> 2 * d"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1291	by (simp add: dist_commute)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1292	qed
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1293	moreover have "(x,y) \<in> s\<times>s" using s by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1294	ultimately have "dist x y \<le> (SUP (x,y)\<in>s\<times>s. dist x y)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1295	by (rule cSUP_upper2) simp
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1296	with \<open>x \<in> s\<close> show ?thesis
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1297	by (auto simp: diameter_def)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1298	qed
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1299
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1300	lemma diameter_lower_bounded:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1301	fixes s :: "'a :: metric_space set"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1302	assumes s: "bounded s"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1303	and d: "0 < d" "d < diameter s"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1304	shows "\<exists>x\<in>s. \<exists>y\<in>s. d < dist x y"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1305	proof (rule ccontr)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1306	assume contr: "\<not> ?thesis"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1307	moreover have "s \<noteq> {}"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1308	using d by (auto simp: diameter_def)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1309	ultimately have "diameter s \<le> d"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1310	by (auto simp: not_less diameter_def intro!: cSUP_least)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1311	with \<open>d < diameter s\<close> show False by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1312	qed
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1313
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1314	lemma diameter_bounded:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1315	assumes "bounded s"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1316	shows "\<forall>x\<in>s. \<forall>y\<in>s. dist x y \<le> diameter s"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1317	and "\<forall>d>0. d < diameter s \<longrightarrow> (\<exists>x\<in>s. \<exists>y\<in>s. dist x y > d)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1318	using diameter_bounded_bound[of s] diameter_lower_bounded[of s] assms
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1319	by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1320
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1321	lemma bounded_two_points:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1322	"bounded S \<longleftrightarrow> (\<exists>e. \<forall>x\<in>S. \<forall>y\<in>S. dist x y \<le> e)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1323	apply (rule iffI)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1324	subgoal using diameter_bounded(1) by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1325	subgoal using bounded_any_center[of S] by meson
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1326	done
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1327
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1328	lemma diameter_compact_attained:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1329	assumes "compact s"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1330	and "s \<noteq> {}"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1331	shows "\<exists>x\<in>s. \<exists>y\<in>s. dist x y = diameter s"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1332	proof -
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1333	have b: "bounded s" using assms(1)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1334	by (rule compact_imp_bounded)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1335	then obtain x y where xys: "x\<in>s" "y\<in>s"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1336	and xy: "\<forall>u\<in>s. \<forall>v\<in>s. dist u v \<le> dist x y"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1337	using compact_sup_maxdistance[OF assms] by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1338	then have "diameter s \<le> dist x y"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1339	unfolding diameter_def
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1340	apply clarsimp
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1341	apply (rule cSUP_least, fast+)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1342	done
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1343	then show ?thesis
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1344	by (metis b diameter_bounded_bound order_antisym xys)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1345	qed
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1346
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1347	lemma diameter_ge_0:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1348	assumes "bounded S" shows "0 \<le> diameter S"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1349	by (metis all_not_in_conv assms diameter_bounded_bound diameter_empty dist_self order_refl)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1350
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1351	lemma diameter_subset:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1352	assumes "S \<subseteq> T" "bounded T"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1353	shows "diameter S \<le> diameter T"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1354	proof (cases "S = {} \<or> T = {}")
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1355	case True
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1356	with assms show ?thesis
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1357	by (force simp: diameter_ge_0)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1358	next
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1359	case False
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1360	then have "bdd_above ((\<lambda>x. case x of (x, xa) \<Rightarrow> dist x xa) ` (T \<times> T))"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1361	using \<open>bounded T\<close> diameter_bounded_bound by (force simp: bdd_above_def)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1362	with False \<open>S \<subseteq> T\<close> show ?thesis
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1363	apply (simp add: diameter_def)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1364	apply (rule cSUP_subset_mono, auto)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1365	done
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1366	qed
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1367
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1368	lemma diameter_closure:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1369	assumes "bounded S"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1370	shows "diameter(closure S) = diameter S"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1371	proof (rule order_antisym)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1372	have "False" if "diameter S < diameter (closure S)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1373	proof -
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1374	define d where "d = diameter(closure S) - diameter(S)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1375	have "d > 0"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1376	using that by (simp add: d_def)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1377	then have "diameter(closure(S)) - d / 2 < diameter(closure(S))"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1378	by simp
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1379	have dd: "diameter (closure S) - d / 2 = (diameter(closure(S)) + diameter(S)) / 2"
70817 dd675800469d dedicated fact collections for algebraic simplification rules potentially splitting goals haftmann parents: 70724 diff changeset	1380	by (simp add: d_def field_split_simps)
69613 1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1381	have bocl: "bounded (closure S)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1382	using assms by blast
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1383	moreover have "0 \<le> diameter S"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1384	using assms diameter_ge_0 by blast
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1385	ultimately obtain x y where "x \<in> closure S" "y \<in> closure S" and xy: "diameter(closure(S)) - d / 2 < dist x y"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1386	using diameter_bounded(2) [OF bocl, rule_format, of "diameter(closure(S)) - d / 2"] \<open>d > 0\<close> d_def by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1387	then obtain x' y' where x'y': "x' \<in> S" "dist x' x < d/4" "y' \<in> S" "dist y' y < d/4"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1388	using closure_approachable
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1389	by (metis \<open>0 < d\<close> zero_less_divide_iff zero_less_numeral)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1390	then have "dist x' y' \<le> diameter S"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1391	using assms diameter_bounded_bound by blast
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1392	with x'y' have "dist x y \<le> d / 4 + diameter S + d / 4"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1393	by (meson add_mono_thms_linordered_semiring(1) dist_triangle dist_triangle3 less_eq_real_def order_trans)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1394	then show ?thesis
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1395	using xy d_def by linarith
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1396	qed
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1397	then show "diameter (closure S) \<le> diameter S"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1398	by fastforce
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1399	next
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1400	show "diameter S \<le> diameter (closure S)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1401	by (simp add: assms bounded_closure closure_subset diameter_subset)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1402	qed
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1403
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1404	proposition Lebesgue_number_lemma:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1405	assumes "compact S" "\<C> \<noteq> {}" "S \<subseteq> \<Union>\<C>" and ope: "\<And>B. B \<in> \<C> \<Longrightarrow> open B"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1406	obtains \<delta> where "0 < \<delta>" "\<And>T. \<lbrakk>T \<subseteq> S; diameter T < \<delta>\<rbrakk> \<Longrightarrow> \<exists>B \<in> \<C>. T \<subseteq> B"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1407	proof (cases "S = {}")
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1408	case True
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1409	then show ?thesis
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1410	by (metis \<open>\<C> \<noteq> {}\<close> zero_less_one empty_subsetI equals0I subset_trans that)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1411	next
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1412	case False
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1413	{ fix x assume "x \<in> S"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1414	then obtain C where C: "x \<in> C" "C \<in> \<C>"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1415	using \<open>S \<subseteq> \<Union>\<C>\<close> by blast
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1416	then obtain r where r: "r>0" "ball x (2*r) \<subseteq> C"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1417	by (metis mult.commute mult_2_right not_le ope openE field_sum_of_halves zero_le_numeral zero_less_mult_iff)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1418	then have "\<exists>r C. r > 0 \<and> ball x (2*r) \<subseteq> C \<and> C \<in> \<C>"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1419	using C by blast
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1420	}
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1421	then obtain r where r: "\<And>x. x \<in> S \<Longrightarrow> r x > 0 \<and> (\<exists>C \<in> \<C>. ball x (2*r x) \<subseteq> C)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1422	by metis
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1423	then have "S \<subseteq> (\<Union>x \<in> S. ball x (r x))"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1424	by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1425	then obtain \<T> where "finite \<T>" "S \<subseteq> \<Union>\<T>" and \<T>: "\<T> \<subseteq> (\<lambda>x. ball x (r x)) ` S"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1426	by (rule compactE [OF \<open>compact S\<close>]) auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1427	then obtain S0 where "S0 \<subseteq> S" "finite S0" and S0: "\<T> = (\<lambda>x. ball x (r x)) ` S0"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1428	by (meson finite_subset_image)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1429	then have "S0 \<noteq> {}"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1430	using False \<open>S \<subseteq> \<Union>\<T>\<close> by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1431	define \<delta> where "\<delta> = Inf (r ` S0)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1432	have "\<delta> > 0"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1433	using \<open>finite S0\<close> \<open>S0 \<subseteq> S\<close> \<open>S0 \<noteq> {}\<close> r by (auto simp: \<delta>_def finite_less_Inf_iff)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1434	show ?thesis
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1435	proof
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1436	show "0 < \<delta>"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1437	by (simp add: \<open>0 < \<delta>\<close>)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1438	show "\<exists>B \<in> \<C>. T \<subseteq> B" if "T \<subseteq> S" and dia: "diameter T < \<delta>" for T
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1439	proof (cases "T = {}")
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1440	case True
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1441	then show ?thesis
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1442	using \<open>\<C> \<noteq> {}\<close> by blast
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1443	next
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1444	case False
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1445	then obtain y where "y \<in> T" by blast
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1446	then have "y \<in> S"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1447	using \<open>T \<subseteq> S\<close> by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1448	then obtain x where "x \<in> S0" and x: "y \<in> ball x (r x)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1449	using \<open>S \<subseteq> \<Union>\<T>\<close> S0 that by blast
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1450	have "ball y \<delta> \<subseteq> ball y (r x)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1451	by (metis \<delta>_def \<open>S0 \<noteq> {}\<close> \<open>finite S0\<close> \<open>x \<in> S0\<close> empty_is_image finite_imageI finite_less_Inf_iff imageI less_irrefl not_le subset_ball)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1452	also have "... \<subseteq> ball x (2*r x)"
70960 84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	1453	using x by metric
69613 1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1454	finally obtain C where "C \<in> \<C>" "ball y \<delta> \<subseteq> C"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1455	by (meson r \<open>S0 \<subseteq> S\<close> \<open>x \<in> S0\<close> dual_order.trans subsetCE)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1456	have "bounded T"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1457	using \<open>compact S\<close> bounded_subset compact_imp_bounded \<open>T \<subseteq> S\<close> by blast
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1458	then have "T \<subseteq> ball y \<delta>"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1459	using \<open>y \<in> T\<close> dia diameter_bounded_bound by fastforce
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1460	then show ?thesis
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1461	apply (rule_tac x=C in bexI)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1462	using \<open>ball y \<delta> \<subseteq> C\<close> \<open>C \<in> \<C>\<close> by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1463	qed
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1464	qed
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1465	qed
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1466
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1467
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1468	subsection \<open>Metric spaces with the Heine-Borel property\<close>
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1469
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1470	text \<open>
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1471	A metric space (or topological vector space) is said to have the
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1472	Heine-Borel property if every closed and bounded subset is compact.
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1473	\<close>
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1474
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1475	class heine_borel = metric_space +
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1476	assumes bounded_imp_convergent_subsequence:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1477	"bounded (range f) \<Longrightarrow> \<exists>l r. strict_mono (r::nat\<Rightarrow>nat) \<and> ((f \<circ> r) \<longlongrightarrow> l) sequentially"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1478
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1479	proposition bounded_closed_imp_seq_compact:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1480	fixes s::"'a::heine_borel set"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1481	assumes "bounded s"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1482	and "closed s"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1483	shows "seq_compact s"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1484	proof (unfold seq_compact_def, clarify)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1485	fix f :: "nat \<Rightarrow> 'a"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1486	assume f: "\<forall>n. f n \<in> s"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1487	with \<open>bounded s\<close> have "bounded (range f)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1488	by (auto intro: bounded_subset)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1489	obtain l r where r: "strict_mono (r :: nat \<Rightarrow> nat)" and l: "((f \<circ> r) \<longlongrightarrow> l) sequentially"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1490	using bounded_imp_convergent_subsequence [OF \<open>bounded (range f)\<close>] by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1491	from f have fr: "\<forall>n. (f \<circ> r) n \<in> s"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1492	by simp
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1493	have "l \<in> s" using \<open>closed s\<close> fr l
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1494	by (rule closed_sequentially)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1495	show "\<exists>l\<in>s. \<exists>r. strict_mono r \<and> ((f \<circ> r) \<longlongrightarrow> l) sequentially"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1496	using \<open>l \<in> s\<close> r l by blast
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1497	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1498
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1499	lemma compact_eq_bounded_closed:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1500	fixes s :: "'a::heine_borel set"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1501	shows "compact s \<longleftrightarrow> bounded s \<and> closed s"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1502	(is "?lhs = ?rhs")
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1503	proof
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1504	assume ?lhs
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1505	then show ?rhs
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1506	using compact_imp_closed compact_imp_bounded
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1507	by blast
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1508	next
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1509	assume ?rhs
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1510	then show ?lhs
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1511	using bounded_closed_imp_seq_compact[of s]
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1512	unfolding compact_eq_seq_compact_metric
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1513	by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1514	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1515
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1516	lemma compact_Inter:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1517	fixes \<F> :: "'a :: heine_borel set set"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1518	assumes com: "\<And>S. S \<in> \<F> \<Longrightarrow> compact S" and "\<F> \<noteq> {}"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1519	shows "compact(\<Inter> \<F>)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1520	using assms
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1521	by (meson Inf_lower all_not_in_conv bounded_subset closed_Inter compact_eq_bounded_closed)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1522
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1523	lemma compact_closure [simp]:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1524	fixes S :: "'a::heine_borel set"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1525	shows "compact(closure S) \<longleftrightarrow> bounded S"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1526	by (meson bounded_closure bounded_subset closed_closure closure_subset compact_eq_bounded_closed)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1527
70136 f03a01a18c6e modernized tags: default scope excludes proof; wenzelm parents: 69922 diff changeset	1528	instance\<^marker>\<open>tag important\<close> real :: heine_borel
f03a01a18c6e modernized tags: default scope excludes proof; wenzelm parents: 69922 diff changeset	1529	proof
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1530	fix f :: "nat \<Rightarrow> real"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1531	assume f: "bounded (range f)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1532	obtain r :: "nat \<Rightarrow> nat" where r: "strict_mono r" "monoseq (f \<circ> r)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1533	unfolding comp_def by (metis seq_monosub)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1534	then have "Bseq (f \<circ> r)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1535	unfolding Bseq_eq_bounded using f
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1536	by (metis BseqI' bounded_iff comp_apply rangeI)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1537	with r show "\<exists>l r. strict_mono r \<and> (f \<circ> r) \<longlonglongrightarrow> l"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1538	using Bseq_monoseq_convergent[of "f \<circ> r"] by (auto simp: convergent_def)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1539	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1540
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1541	lemma compact_lemma_general:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1542	fixes f :: "nat \<Rightarrow> 'a"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1543	fixes proj::"'a \<Rightarrow> 'b \<Rightarrow> 'c::heine_borel" (infixl "proj" 60)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1544	fixes unproj:: "('b \<Rightarrow> 'c) \<Rightarrow> 'a"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1545	assumes finite_basis: "finite basis"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1546	assumes bounded_proj: "\<And>k. k \<in> basis \<Longrightarrow> bounded ((\<lambda>x. x proj k) ` range f)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1547	assumes proj_unproj: "\<And>e k. k \<in> basis \<Longrightarrow> (unproj e) proj k = e k"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1548	assumes unproj_proj: "\<And>x. unproj (\<lambda>k. x proj k) = x"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1549	shows "\<forall>d\<subseteq>basis. \<exists>l::'a. \<exists> r::nat\<Rightarrow>nat.
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1550	strict_mono r \<and> (\<forall>e>0. eventually (\<lambda>n. \<forall>i\<in>d. dist (f (r n) proj i) (l proj i) < e) sequentially)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1551	proof safe
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1552	fix d :: "'b set"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1553	assume d: "d \<subseteq> basis"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1554	with finite_basis have "finite d"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1555	by (blast intro: finite_subset)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1556	from this d show "\<exists>l::'a. \<exists>r::nat\<Rightarrow>nat. strict_mono r \<and>
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1557	(\<forall>e>0. eventually (\<lambda>n. \<forall>i\<in>d. dist (f (r n) proj i) (l proj i) < e) sequentially)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1558	proof (induct d)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1559	case empty
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1560	then show ?case
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1561	unfolding strict_mono_def by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1562	next
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1563	case (insert k d)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1564	have k[intro]: "k \<in> basis"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1565	using insert by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1566	have s': "bounded ((\<lambda>x. x proj k) ` range f)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1567	using k
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1568	by (rule bounded_proj)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1569	obtain l1::"'a" and r1 where r1: "strict_mono r1"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1570	and lr1: "\<forall>e > 0. eventually (\<lambda>n. \<forall>i\<in>d. dist (f (r1 n) proj i) (l1 proj i) < e) sequentially"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1571	using insert(3) using insert(4) by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1572	have f': "\<forall>n. f (r1 n) proj k \<in> (\<lambda>x. x proj k) ` range f"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1573	by simp
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1574	have "bounded (range (\<lambda>i. f (r1 i) proj k))"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1575	by (metis (lifting) bounded_subset f' image_subsetI s')
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1576	then obtain l2 r2 where r2:"strict_mono r2" and lr2:"((\<lambda>i. f (r1 (r2 i)) proj k) \<longlongrightarrow> l2) sequentially"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1577	using bounded_imp_convergent_subsequence[of "\<lambda>i. f (r1 i) proj k"]
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1578	by (auto simp: o_def)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1579	define r where "r = r1 \<circ> r2"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1580	have r:"strict_mono r"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1581	using r1 and r2 unfolding r_def o_def strict_mono_def by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1582	moreover
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1583	define l where "l = unproj (\<lambda>i. if i = k then l2 else l1 proj i)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1584	{
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1585	fix e::real
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1586	assume "e > 0"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1587	from lr1 \<open>e > 0\<close> have N1: "eventually (\<lambda>n. \<forall>i\<in>d. dist (f (r1 n) proj i) (l1 proj i) < e) sequentially"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1588	by blast
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1589	from lr2 \<open>e > 0\<close> have N2:"eventually (\<lambda>n. dist (f (r1 (r2 n)) proj k) l2 < e) sequentially"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1590	by (rule tendstoD)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1591	from r2 N1 have N1': "eventually (\<lambda>n. \<forall>i\<in>d. dist (f (r1 (r2 n)) proj i) (l1 proj i) < e) sequentially"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1592	by (rule eventually_subseq)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1593	have "eventually (\<lambda>n. \<forall>i\<in>(insert k d). dist (f (r n) proj i) (l proj i) < e) sequentially"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1594	using N1' N2
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1595	by eventually_elim (insert insert.prems, auto simp: l_def r_def o_def proj_unproj)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1596	}
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1597	ultimately show ?case by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1598	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1599	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1600
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1601	lemma bounded_fst: "bounded s \<Longrightarrow> bounded (fst ` s)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1602	unfolding bounded_def
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1603	by (metis (erased, hide_lams) dist_fst_le image_iff order_trans)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1604
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1605	lemma bounded_snd: "bounded s \<Longrightarrow> bounded (snd ` s)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1606	unfolding bounded_def
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1607	by (metis (no_types, hide_lams) dist_snd_le image_iff order.trans)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1608
70136 f03a01a18c6e modernized tags: default scope excludes proof; wenzelm parents: 69922 diff changeset	1609	instance\<^marker>\<open>tag important\<close> prod :: (heine_borel, heine_borel) heine_borel
f03a01a18c6e modernized tags: default scope excludes proof; wenzelm parents: 69922 diff changeset	1610	proof
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1611	fix f :: "nat \<Rightarrow> 'a \<times> 'b"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1612	assume f: "bounded (range f)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1613	then have "bounded (fst ` range f)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1614	by (rule bounded_fst)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1615	then have s1: "bounded (range (fst \<circ> f))"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1616	by (simp add: image_comp)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1617	obtain l1 r1 where r1: "strict_mono r1" and l1: "(\<lambda>n. fst (f (r1 n))) \<longlonglongrightarrow> l1"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1618	using bounded_imp_convergent_subsequence [OF s1] unfolding o_def by fast
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1619	from f have s2: "bounded (range (snd \<circ> f \<circ> r1))"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1620	by (auto simp: image_comp intro: bounded_snd bounded_subset)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1621	obtain l2 r2 where r2: "strict_mono r2" and l2: "((\<lambda>n. snd (f (r1 (r2 n)))) \<longlongrightarrow> l2) sequentially"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1622	using bounded_imp_convergent_subsequence [OF s2]
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1623	unfolding o_def by fast
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1624	have l1': "((\<lambda>n. fst (f (r1 (r2 n)))) \<longlongrightarrow> l1) sequentially"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1625	using LIMSEQ_subseq_LIMSEQ [OF l1 r2] unfolding o_def .
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1626	have l: "((f \<circ> (r1 \<circ> r2)) \<longlongrightarrow> (l1, l2)) sequentially"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1627	using tendsto_Pair [OF l1' l2] unfolding o_def by simp
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1628	have r: "strict_mono (r1 \<circ> r2)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1629	using r1 r2 unfolding strict_mono_def by simp
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1630	show "\<exists>l r. strict_mono r \<and> ((f \<circ> r) \<longlongrightarrow> l) sequentially"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1631	using l r by fast
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1632	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1633
69611 42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1634
69613 1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1635	subsection \<open>Completeness\<close>
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1636
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1637	proposition (in metric_space) completeI:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1638	assumes "\<And>f. \<forall>n. f n \<in> s \<Longrightarrow> Cauchy f \<Longrightarrow> \<exists>l\<in>s. f \<longlonglongrightarrow> l"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1639	shows "complete s"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1640	using assms unfolding complete_def by fast
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1641
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1642	proposition (in metric_space) completeE:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1643	assumes "complete s" and "\<forall>n. f n \<in> s" and "Cauchy f"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1644	obtains l where "l \<in> s" and "f \<longlonglongrightarrow> l"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1645	using assms unfolding complete_def by fast
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1646
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1647	(* TODO: generalize to uniform spaces *)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1648	lemma compact_imp_complete:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1649	fixes s :: "'a::metric_space set"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1650	assumes "compact s"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1651	shows "complete s"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1652	proof -
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1653	{
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1654	fix f
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1655	assume as: "(\<forall>n::nat. f n \<in> s)" "Cauchy f"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1656	from as(1) obtain l r where lr: "l\<in>s" "strict_mono r" "(f \<circ> r) \<longlonglongrightarrow> l"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1657	using assms unfolding compact_def by blast
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1658
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1659	note lr' = seq_suble [OF lr(2)]
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1660	{
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1661	fix e :: real
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1662	assume "e > 0"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1663	from as(2) obtain N where N:"\<forall>m n. N \<le> m \<and> N \<le> n \<longrightarrow> dist (f m) (f n) < e/2"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1664	unfolding cauchy_def
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1665	using \<open>e > 0\<close>
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1666	apply (erule_tac x="e/2" in allE, auto)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1667	done
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1668	from lr(3)[unfolded lim_sequentially, THEN spec[where x="e/2"]]
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1669	obtain M where M:"\<forall>n\<ge>M. dist ((f \<circ> r) n) l < e/2"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1670	using \<open>e > 0\<close> by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1671	{
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1672	fix n :: nat
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1673	assume n: "n \<ge> max N M"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1674	have "dist ((f \<circ> r) n) l < e/2"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1675	using n M by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1676	moreover have "r n \<ge> N"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1677	using lr'[of n] n by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1678	then have "dist (f n) ((f \<circ> r) n) < e / 2"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1679	using N and n by auto
70960 84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	1680	ultimately have "dist (f n) l < e" using n M
84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	1681	by metric
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1682	}
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1683	then have "\<exists>N. \<forall>n\<ge>N. dist (f n) l < e" by blast
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1684	}
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1685	then have "\<exists>l\<in>s. (f \<longlongrightarrow> l) sequentially" using \<open>l\<in>s\<close>
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1686	unfolding lim_sequentially by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1687	}
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1688	then show ?thesis unfolding complete_def by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1689	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1690
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1691	proposition compact_eq_totally_bounded:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1692	"compact s \<longleftrightarrow> complete s \<and> (\<forall>e>0. \<exists>k. finite k \<and> s \<subseteq> (\<Union>x\<in>k. ball x e))"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1693	(is "_ \<longleftrightarrow> ?rhs")
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1694	proof
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1695	assume assms: "?rhs"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1696	then obtain k where k: "\<And>e. 0 < e \<Longrightarrow> finite (k e)" "\<And>e. 0 < e \<Longrightarrow> s \<subseteq> (\<Union>x\<in>k e. ball x e)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1697	by (auto simp: choice_iff')
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1698
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1699	show "compact s"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1700	proof cases
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1701	assume "s = {}"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1702	then show "compact s" by (simp add: compact_def)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1703	next
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1704	assume "s \<noteq> {}"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1705	show ?thesis
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1706	unfolding compact_def
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1707	proof safe
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1708	fix f :: "nat \<Rightarrow> 'a"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1709	assume f: "\<forall>n. f n \<in> s"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1710
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1711	define e where "e n = 1 / (2 * Suc n)" for n
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1712	then have [simp]: "\<And>n. 0 < e n" by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1713	define B where "B n U = (SOME b. infinite {n. f n \<in> b} \<and> (\<exists>x. b \<subseteq> ball x (e n) \<inter> U))" for n U
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1714	{
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1715	fix n U
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1716	assume "infinite {n. f n \<in> U}"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1717	then have "\<exists>b\<in>k (e n). infinite {i\<in>{n. f n \<in> U}. f i \<in> ball b (e n)}"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1718	using k f by (intro pigeonhole_infinite_rel) (auto simp: subset_eq)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1719	then obtain a where
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1720	"a \<in> k (e n)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1721	"infinite {i \<in> {n. f n \<in> U}. f i \<in> ball a (e n)}" ..
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1722	then have "\<exists>b. infinite {i. f i \<in> b} \<and> (\<exists>x. b \<subseteq> ball x (e n) \<inter> U)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1723	by (intro exI[of _ "ball a (e n) \<inter> U"] exI[of _ a]) (auto simp: ac_simps)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1724	from someI_ex[OF this]
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1725	have "infinite {i. f i \<in> B n U}" "\<exists>x. B n U \<subseteq> ball x (e n) \<inter> U"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1726	unfolding B_def by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1727	}
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1728	note B = this
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1729
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1730	define F where "F = rec_nat (B 0 UNIV) B"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1731	{
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1732	fix n
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1733	have "infinite {i. f i \<in> F n}"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1734	by (induct n) (auto simp: F_def B)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1735	}
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1736	then have F: "\<And>n. \<exists>x. F (Suc n) \<subseteq> ball x (e n) \<inter> F n"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1737	using B by (simp add: F_def)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1738	then have F_dec: "\<And>m n. m \<le> n \<Longrightarrow> F n \<subseteq> F m"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1739	using decseq_SucI[of F] by (auto simp: decseq_def)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1740
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1741	obtain sel where sel: "\<And>k i. i < sel k i" "\<And>k i. f (sel k i) \<in> F k"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1742	proof (atomize_elim, unfold all_conj_distrib[symmetric], intro choice allI)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1743	fix k i
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1744	have "infinite ({n. f n \<in> F k} - {.. i})"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1745	using \<open>infinite {n. f n \<in> F k}\<close> by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1746	from infinite_imp_nonempty[OF this]
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1747	show "\<exists>x>i. f x \<in> F k"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1748	by (simp add: set_eq_iff not_le conj_commute)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1749	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1750
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1751	define t where "t = rec_nat (sel 0 0) (\<lambda>n i. sel (Suc n) i)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1752	have "strict_mono t"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1753	unfolding strict_mono_Suc_iff by (simp add: t_def sel)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1754	moreover have "\<forall>i. (f \<circ> t) i \<in> s"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1755	using f by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1756	moreover
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1757	{
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1758	fix n
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1759	have "(f \<circ> t) n \<in> F n"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1760	by (cases n) (simp_all add: t_def sel)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1761	}
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1762	note t = this
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1763
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1764	have "Cauchy (f \<circ> t)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1765	proof (safe intro!: metric_CauchyI exI elim!: nat_approx_posE)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1766	fix r :: real and N n m
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1767	assume "1 / Suc N < r" "Suc N \<le> n" "Suc N \<le> m"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1768	then have "(f \<circ> t) n \<in> F (Suc N)" "(f \<circ> t) m \<in> F (Suc N)" "2 * e N < r"
71174 7fac205dd737 tuned nipkow parents: 71028 diff changeset	1769	using F_dec t by (auto simp: e_def field_simps)
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1770	with F[of N] obtain x where "dist x ((f \<circ> t) n) < e N" "dist x ((f \<circ> t) m) < e N"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1771	by (auto simp: subset_eq)
70960 84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	1772	with \<open>2 * e N < r\<close> show "dist ((f \<circ> t) m) ((f \<circ> t) n) < r"
84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	1773	by metric
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1774	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1775
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1776	ultimately show "\<exists>l\<in>s. \<exists>r. strict_mono r \<and> (f \<circ> r) \<longlonglongrightarrow> l"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1777	using assms unfolding complete_def by blast
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1778	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1779	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1780	qed (metis compact_imp_complete compact_imp_seq_compact seq_compact_imp_totally_bounded)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1781
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1782	lemma cauchy_imp_bounded:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1783	assumes "Cauchy s"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1784	shows "bounded (range s)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1785	proof -
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1786	from assms obtain N :: nat where "\<forall>m n. N \<le> m \<and> N \<le> n \<longrightarrow> dist (s m) (s n) < 1"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1787	unfolding cauchy_def by force
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1788	then have N:"\<forall>n. N \<le> n \<longrightarrow> dist (s N) (s n) < 1" by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1789	moreover
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1790	have "bounded (s ` {0..N})"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1791	using finite_imp_bounded[of "s ` {1..N}"] by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1792	then obtain a where a:"\<forall>x\<in>s ` {0..N}. dist (s N) x \<le> a"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1793	unfolding bounded_any_center [where a="s N"] by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1794	ultimately show "?thesis"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1795	unfolding bounded_any_center [where a="s N"]
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1796	apply (rule_tac x="max a 1" in exI, auto)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1797	apply (erule_tac x=y in allE)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1798	apply (erule_tac x=y in ballE, auto)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1799	done
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1800	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1801
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1802	instance heine_borel < complete_space
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1803	proof
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1804	fix f :: "nat \<Rightarrow> 'a" assume "Cauchy f"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1805	then have "bounded (range f)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1806	by (rule cauchy_imp_bounded)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1807	then have "compact (closure (range f))"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1808	unfolding compact_eq_bounded_closed by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1809	then have "complete (closure (range f))"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1810	by (rule compact_imp_complete)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1811	moreover have "\<forall>n. f n \<in> closure (range f)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1812	using closure_subset [of "range f"] by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1813	ultimately have "\<exists>l\<in>closure (range f). (f \<longlongrightarrow> l) sequentially"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1814	using \<open>Cauchy f\<close> unfolding complete_def by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1815	then show "convergent f"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1816	unfolding convergent_def by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1817	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1818
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1819	lemma complete_UNIV: "complete (UNIV :: ('a::complete_space) set)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1820	proof (rule completeI)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1821	fix f :: "nat \<Rightarrow> 'a" assume "Cauchy f"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1822	then have "convergent f" by (rule Cauchy_convergent)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1823	then show "\<exists>l\<in>UNIV. f \<longlonglongrightarrow> l" unfolding convergent_def by simp
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1824	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1825
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1826	lemma complete_imp_closed:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1827	fixes S :: "'a::metric_space set"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1828	assumes "complete S"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1829	shows "closed S"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1830	proof (unfold closed_sequential_limits, clarify)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1831	fix f x assume "\<forall>n. f n \<in> S" and "f \<longlonglongrightarrow> x"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1832	from \<open>f \<longlonglongrightarrow> x\<close> have "Cauchy f"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1833	by (rule LIMSEQ_imp_Cauchy)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1834	with \<open>complete S\<close> and \<open>\<forall>n. f n \<in> S\<close> obtain l where "l \<in> S" and "f \<longlonglongrightarrow> l"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1835	by (rule completeE)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1836	from \<open>f \<longlonglongrightarrow> x\<close> and \<open>f \<longlonglongrightarrow> l\<close> have "x = l"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1837	by (rule LIMSEQ_unique)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1838	with \<open>l \<in> S\<close> show "x \<in> S"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1839	by simp
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1840	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1841
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1842	lemma complete_Int_closed:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1843	fixes S :: "'a::metric_space set"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1844	assumes "complete S" and "closed t"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1845	shows "complete (S \<inter> t)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1846	proof (rule completeI)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1847	fix f assume "\<forall>n. f n \<in> S \<inter> t" and "Cauchy f"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1848	then have "\<forall>n. f n \<in> S" and "\<forall>n. f n \<in> t"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1849	by simp_all
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1850	from \<open>complete S\<close> obtain l where "l \<in> S" and "f \<longlonglongrightarrow> l"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1851	using \<open>\<forall>n. f n \<in> S\<close> and \<open>Cauchy f\<close> by (rule completeE)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1852	from \<open>closed t\<close> and \<open>\<forall>n. f n \<in> t\<close> and \<open>f \<longlonglongrightarrow> l\<close> have "l \<in> t"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1853	by (rule closed_sequentially)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1854	with \<open>l \<in> S\<close> and \<open>f \<longlonglongrightarrow> l\<close> show "\<exists>l\<in>S \<inter> t. f \<longlonglongrightarrow> l"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1855	by fast
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1856	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1857
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1858	lemma complete_closed_subset:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1859	fixes S :: "'a::metric_space set"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1860	assumes "closed S" and "S \<subseteq> t" and "complete t"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1861	shows "complete S"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1862	using assms complete_Int_closed [of t S] by (simp add: Int_absorb1)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1863
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1864	lemma complete_eq_closed:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1865	fixes S :: "('a::complete_space) set"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1866	shows "complete S \<longleftrightarrow> closed S"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1867	proof
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1868	assume "closed S" then show "complete S"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1869	using subset_UNIV complete_UNIV by (rule complete_closed_subset)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1870	next
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1871	assume "complete S" then show "closed S"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1872	by (rule complete_imp_closed)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1873	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1874
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1875	lemma convergent_eq_Cauchy:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1876	fixes S :: "nat \<Rightarrow> 'a::complete_space"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1877	shows "(\<exists>l. (S \<longlongrightarrow> l) sequentially) \<longleftrightarrow> Cauchy S"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1878	unfolding Cauchy_convergent_iff convergent_def ..
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1879
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1880	lemma convergent_imp_bounded:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1881	fixes S :: "nat \<Rightarrow> 'a::metric_space"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1882	shows "(S \<longlongrightarrow> l) sequentially \<Longrightarrow> bounded (range S)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1883	by (intro cauchy_imp_bounded LIMSEQ_imp_Cauchy)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1884
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1885	lemma frontier_subset_compact:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1886	fixes S :: "'a::heine_borel set"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1887	shows "compact S \<Longrightarrow> frontier S \<subseteq> S"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1888	using frontier_subset_closed compact_eq_bounded_closed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1889	by blast
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	1890
69613 1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1891	lemma continuous_closed_imp_Cauchy_continuous:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1892	fixes S :: "('a::complete_space) set"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1893	shows "\<lbrakk>continuous_on S f; closed S; Cauchy \<sigma>; \<And>n. (\<sigma> n) \<in> S\<rbrakk> \<Longrightarrow> Cauchy(f \<circ> \<sigma>)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1894	apply (simp add: complete_eq_closed [symmetric] continuous_on_sequentially)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1895	by (meson LIMSEQ_imp_Cauchy complete_def)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1896
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1897	lemma banach_fix_type:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1898	fixes f::"'a::complete_space\<Rightarrow>'a"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1899	assumes c:"0 \<le> c" "c < 1"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1900	and lipschitz:"\<forall>x. \<forall>y. dist (f x) (f y) \<le> c * dist x y"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1901	shows "\<exists>!x. (f x = x)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1902	using assms banach_fix[OF complete_UNIV UNIV_not_empty assms(1,2) subset_UNIV, of f]
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1903	by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1904
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1905
70136 f03a01a18c6e modernized tags: default scope excludes proof; wenzelm parents: 69922 diff changeset	1906	subsection\<^marker>\<open>tag unimportant\<close>\<open> Finite intersection property\<close>
69615 e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1907
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1908	text\<open>Also developed in HOL's toplogical spaces theory, but the Heine-Borel type class isn't available there.\<close>
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1909
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1910	lemma closed_imp_fip:
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1911	fixes S :: "'a::heine_borel set"
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1912	assumes "closed S"
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1913	and T: "T \<in> \<F>" "bounded T"
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1914	and clof: "\<And>T. T \<in> \<F> \<Longrightarrow> closed T"
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1915	and none: "\<And>\<F>'. \<lbrakk>finite \<F>'; \<F>' \<subseteq> \<F>\<rbrakk> \<Longrightarrow> S \<inter> \<Inter>\<F>' \<noteq> {}"
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1916	shows "S \<inter> \<Inter>\<F> \<noteq> {}"
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1917	proof -
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1918	have "compact (S \<inter> T)"
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1919	using \<open>closed S\<close> clof compact_eq_bounded_closed T by blast
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1920	then have "(S \<inter> T) \<inter> \<Inter>\<F> \<noteq> {}"
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1921	apply (rule compact_imp_fip)
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1922	apply (simp add: clof)
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1923	by (metis Int_assoc complete_lattice_class.Inf_insert finite_insert insert_subset none \<open>T \<in> \<F>\<close>)
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1924	then show ?thesis by blast
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1925	qed
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1926
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1927	lemma closed_imp_fip_compact:
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1928	fixes S :: "'a::heine_borel set"
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1929	shows
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1930	"\<lbrakk>closed S; \<And>T. T \<in> \<F> \<Longrightarrow> compact T;
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1931	\<And>\<F>'. \<lbrakk>finite \<F>'; \<F>' \<subseteq> \<F>\<rbrakk> \<Longrightarrow> S \<inter> \<Inter>\<F>' \<noteq> {}\<rbrakk>
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1932	\<Longrightarrow> S \<inter> \<Inter>\<F> \<noteq> {}"
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1933	by (metis Inf_greatest closed_imp_fip compact_eq_bounded_closed empty_subsetI finite.emptyI inf.orderE)
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1934
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1935	lemma closed_fip_Heine_Borel:
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1936	fixes \<F> :: "'a::heine_borel set set"
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1937	assumes "closed S" "T \<in> \<F>" "bounded T"
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1938	and "\<And>T. T \<in> \<F> \<Longrightarrow> closed T"
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1939	and "\<And>\<F>'. \<lbrakk>finite \<F>'; \<F>' \<subseteq> \<F>\<rbrakk> \<Longrightarrow> \<Inter>\<F>' \<noteq> {}"
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1940	shows "\<Inter>\<F> \<noteq> {}"
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1941	proof -
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1942	have "UNIV \<inter> \<Inter>\<F> \<noteq> {}"
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1943	using assms closed_imp_fip [OF closed_UNIV] by auto
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1944	then show ?thesis by simp
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1945	qed
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1946
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1947	lemma compact_fip_Heine_Borel:
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1948	fixes \<F> :: "'a::heine_borel set set"
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1949	assumes clof: "\<And>T. T \<in> \<F> \<Longrightarrow> compact T"
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1950	and none: "\<And>\<F>'. \<lbrakk>finite \<F>'; \<F>' \<subseteq> \<F>\<rbrakk> \<Longrightarrow> \<Inter>\<F>' \<noteq> {}"
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1951	shows "\<Inter>\<F> \<noteq> {}"
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1952	by (metis InterI all_not_in_conv clof closed_fip_Heine_Borel compact_eq_bounded_closed none)
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1953
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1954	lemma compact_sequence_with_limit:
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1955	fixes f :: "nat \<Rightarrow> 'a::heine_borel"
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1956	shows "(f \<longlongrightarrow> l) sequentially \<Longrightarrow> compact (insert l (range f))"
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1957	apply (simp add: compact_eq_bounded_closed, auto)
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1958	apply (simp add: convergent_imp_bounded)
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1959	by (simp add: closed_limpt islimpt_insert sequence_unique_limpt)
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1960
e502cd4d7062 moved material from Connected.thy to more appropriate places immler parents: 69613 diff changeset	1961
69613 1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1962	subsection \<open>Properties of Balls and Spheres\<close>
69611 42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1963
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1964	lemma compact_cball[simp]:
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1965	fixes x :: "'a::heine_borel"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1966	shows "compact (cball x e)"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1967	using compact_eq_bounded_closed bounded_cball closed_cball
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1968	by blast
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1969
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1970	lemma compact_frontier_bounded[intro]:
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1971	fixes S :: "'a::heine_borel set"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1972	shows "bounded S \<Longrightarrow> compact (frontier S)"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1973	unfolding frontier_def
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1974	using compact_eq_bounded_closed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1975	by blast
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1976
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1977	lemma compact_frontier[intro]:
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1978	fixes S :: "'a::heine_borel set"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1979	shows "compact S \<Longrightarrow> compact (frontier S)"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1980	using compact_eq_bounded_closed compact_frontier_bounded
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1981	by blast
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1982
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1983
69613 1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	1984	subsection \<open>Distance from a Set\<close>
69611 42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1985
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1986	lemma distance_attains_sup:
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1987	assumes "compact s" "s \<noteq> {}"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1988	shows "\<exists>x\<in>s. \<forall>y\<in>s. dist a y \<le> dist a x"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1989	proof (rule continuous_attains_sup [OF assms])
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1990	{
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1991	fix x
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1992	assume "x\<in>s"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1993	have "(dist a \<longlongrightarrow> dist a x) (at x within s)"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1994	by (intro tendsto_dist tendsto_const tendsto_ident_at)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1995	}
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1996	then show "continuous_on s (dist a)"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1997	unfolding continuous_on ..
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1998	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	1999
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2000	text \<open>For \emph{minimal} distance, we only need closure, not compactness.\<close>
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2001
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2002	lemma distance_attains_inf:
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2003	fixes a :: "'a::heine_borel"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2004	assumes "closed s" and "s \<noteq> {}"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2005	obtains x where "x\<in>s" "\<And>y. y \<in> s \<Longrightarrow> dist a x \<le> dist a y"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2006	proof -
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2007	from assms obtain b where "b \<in> s" by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2008	let ?B = "s \<inter> cball a (dist b a)"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2009	have "?B \<noteq> {}" using \<open>b \<in> s\<close>
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2010	by (auto simp: dist_commute)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2011	moreover have "continuous_on ?B (dist a)"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2012	by (auto intro!: continuous_at_imp_continuous_on continuous_dist continuous_ident continuous_const)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2013	moreover have "compact ?B"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2014	by (intro closed_Int_compact \<open>closed s\<close> compact_cball)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2015	ultimately obtain x where "x \<in> ?B" "\<forall>y\<in>?B. dist a x \<le> dist a y"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2016	by (metis continuous_attains_inf)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2017	with that show ?thesis by fastforce
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2018	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2019
69613 1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2020
69611 42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2021	subsection \<open>Infimum Distance\<close>
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2022
70136 f03a01a18c6e modernized tags: default scope excludes proof; wenzelm parents: 69922 diff changeset	2023	definition\<^marker>\<open>tag important\<close> "infdist x A = (if A = {} then 0 else INF a\<in>A. dist x a)"
69611 42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2024
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2025	lemma bdd_below_image_dist[intro, simp]: "bdd_below (dist x ` A)"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2026	by (auto intro!: zero_le_dist)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2027
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2028	lemma infdist_notempty: "A \<noteq> {} \<Longrightarrow> infdist x A = (INF a\<in>A. dist x a)"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2029	by (simp add: infdist_def)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2030
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2031	lemma infdist_nonneg: "0 \<le> infdist x A"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2032	by (auto simp: infdist_def intro: cINF_greatest)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2033
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2034	lemma infdist_le: "a \<in> A \<Longrightarrow> infdist x A \<le> dist x a"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2035	by (auto intro: cINF_lower simp add: infdist_def)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2036
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2037	lemma infdist_le2: "a \<in> A \<Longrightarrow> dist x a \<le> d \<Longrightarrow> infdist x A \<le> d"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2038	by (auto intro!: cINF_lower2 simp add: infdist_def)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2039
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2040	lemma infdist_zero[simp]: "a \<in> A \<Longrightarrow> infdist a A = 0"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2041	by (auto intro!: antisym infdist_nonneg infdist_le2)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2042
70724 65371451fde8 A few more simple results paulson <lp15@cam.ac.uk> parents: 70723 diff changeset	2043	lemma infdist_Un_min:
65371451fde8 A few more simple results paulson <lp15@cam.ac.uk> parents: 70723 diff changeset	2044	assumes "A \<noteq> {}" "B \<noteq> {}"
65371451fde8 A few more simple results paulson <lp15@cam.ac.uk> parents: 70723 diff changeset	2045	shows "infdist x (A \<union> B) = min (infdist x A) (infdist x B)"
65371451fde8 A few more simple results paulson <lp15@cam.ac.uk> parents: 70723 diff changeset	2046	using assms by (simp add: infdist_def cINF_union inf_real_def)
65371451fde8 A few more simple results paulson <lp15@cam.ac.uk> parents: 70723 diff changeset	2047
69611 42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2048	lemma infdist_triangle: "infdist x A \<le> infdist y A + dist x y"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2049	proof (cases "A = {}")
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2050	case True
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2051	then show ?thesis by (simp add: infdist_def)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2052	next
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2053	case False
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2054	then obtain a where "a \<in> A" by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2055	have "infdist x A \<le> Inf {dist x y + dist y a \|a. a \<in> A}"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2056	proof (rule cInf_greatest)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2057	from \<open>A \<noteq> {}\<close> show "{dist x y + dist y a \|a. a \<in> A} \<noteq> {}"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2058	by simp
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2059	fix d
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2060	assume "d \<in> {dist x y + dist y a \|a. a \<in> A}"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2061	then obtain a where d: "d = dist x y + dist y a" "a \<in> A"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2062	by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2063	show "infdist x A \<le> d"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2064	unfolding infdist_notempty[OF \<open>A \<noteq> {}\<close>]
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2065	proof (rule cINF_lower2)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2066	show "a \<in> A" by fact
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2067	show "dist x a \<le> d"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2068	unfolding d by (rule dist_triangle)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2069	qed simp
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2070	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2071	also have "\<dots> = dist x y + infdist y A"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2072	proof (rule cInf_eq, safe)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2073	fix a
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2074	assume "a \<in> A"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2075	then show "dist x y + infdist y A \<le> dist x y + dist y a"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2076	by (auto intro: infdist_le)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2077	next
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2078	fix i
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2079	assume inf: "\<And>d. d \<in> {dist x y + dist y a \|a. a \<in> A} \<Longrightarrow> i \<le> d"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2080	then have "i - dist x y \<le> infdist y A"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2081	unfolding infdist_notempty[OF \<open>A \<noteq> {}\<close>] using \<open>a \<in> A\<close>
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2082	by (intro cINF_greatest) (auto simp: field_simps)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2083	then show "i \<le> dist x y + infdist y A"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2084	by simp
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2085	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2086	finally show ?thesis by simp
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2087	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2088
70724 65371451fde8 A few more simple results paulson <lp15@cam.ac.uk> parents: 70723 diff changeset	2089	lemma infdist_triangle_abs: "\<bar>infdist x A - infdist y A\<bar> \<le> dist x y"
65371451fde8 A few more simple results paulson <lp15@cam.ac.uk> parents: 70723 diff changeset	2090	by (metis (full_types) abs_diff_le_iff diff_le_eq dist_commute infdist_triangle)
65371451fde8 A few more simple results paulson <lp15@cam.ac.uk> parents: 70723 diff changeset	2091
69611 42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2092	lemma in_closure_iff_infdist_zero:
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2093	assumes "A \<noteq> {}"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2094	shows "x \<in> closure A \<longleftrightarrow> infdist x A = 0"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2095	proof
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2096	assume "x \<in> closure A"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2097	show "infdist x A = 0"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2098	proof (rule ccontr)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2099	assume "infdist x A \<noteq> 0"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2100	with infdist_nonneg[of x A] have "infdist x A > 0"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2101	by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2102	then have "ball x (infdist x A) \<inter> closure A = {}"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2103	apply auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2104	apply (metis \<open>x \<in> closure A\<close> closure_approachable dist_commute infdist_le not_less)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2105	done
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2106	then have "x \<notin> closure A"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2107	by (metis \<open>0 < infdist x A\<close> centre_in_ball disjoint_iff_not_equal)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2108	then show False using \<open>x \<in> closure A\<close> by simp
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2109	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2110	next
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2111	assume x: "infdist x A = 0"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2112	then obtain a where "a \<in> A"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2113	by atomize_elim (metis all_not_in_conv assms)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2114	show "x \<in> closure A"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2115	unfolding closure_approachable
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2116	apply safe
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2117	proof (rule ccontr)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2118	fix e :: real
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2119	assume "e > 0"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2120	assume "\<not> (\<exists>y\<in>A. dist y x < e)"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2121	then have "infdist x A \<ge> e" using \<open>a \<in> A\<close>
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2122	unfolding infdist_def
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2123	by (force simp: dist_commute intro: cINF_greatest)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2124	with x \<open>e > 0\<close> show False by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2125	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2126	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2127
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2128	lemma in_closed_iff_infdist_zero:
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2129	assumes "closed A" "A \<noteq> {}"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2130	shows "x \<in> A \<longleftrightarrow> infdist x A = 0"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2131	proof -
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2132	have "x \<in> closure A \<longleftrightarrow> infdist x A = 0"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2133	by (rule in_closure_iff_infdist_zero) fact
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2134	with assms show ?thesis by simp
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2135	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2136
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2137	lemma infdist_pos_not_in_closed:
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2138	assumes "closed S" "S \<noteq> {}" "x \<notin> S"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2139	shows "infdist x S > 0"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2140	using in_closed_iff_infdist_zero[OF assms(1) assms(2), of x] assms(3) infdist_nonneg le_less by fastforce
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2141
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2142	lemma
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2143	infdist_attains_inf:
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2144	fixes X::"'a::heine_borel set"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2145	assumes "closed X"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2146	assumes "X \<noteq> {}"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2147	obtains x where "x \<in> X" "infdist y X = dist y x"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2148	proof -
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2149	have "bdd_below (dist y ` X)"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2150	by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2151	from distance_attains_inf[OF assms, of y]
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2152	obtain x where INF: "x \<in> X" "\<And>z. z \<in> X \<Longrightarrow> dist y x \<le> dist y z" by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2153	have "infdist y X = dist y x"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2154	by (auto simp: infdist_def assms
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2155	intro!: antisym cINF_lower[OF _ \<open>x \<in> X\<close>] cINF_greatest[OF assms(2) INF(2)])
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2156	with \<open>x \<in> X\<close> show ?thesis ..
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2157	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2158
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2159
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2160	text \<open>Every metric space is a T4 space:\<close>
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2161
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2162	instance metric_space \<subseteq> t4_space
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2163	proof
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2164	fix S T::"'a set" assume H: "closed S" "closed T" "S \<inter> T = {}"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2165	consider "S = {}" \| "T = {}" \| "S \<noteq> {} \<and> T \<noteq> {}" by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2166	then show "\<exists>U V. open U \<and> open V \<and> S \<subseteq> U \<and> T \<subseteq> V \<and> U \<inter> V = {}"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2167	proof (cases)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2168	case 1
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2169	show ?thesis
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2170	apply (rule exI[of _ "{}"], rule exI[of _ UNIV]) using 1 by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2171	next
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2172	case 2
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2173	show ?thesis
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2174	apply (rule exI[of _ UNIV], rule exI[of _ "{}"]) using 2 by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2175	next
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2176	case 3
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2177	define U where "U = (\<Union>x\<in>S. ball x ((infdist x T)/2))"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2178	have A: "open U" unfolding U_def by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2179	have "infdist x T > 0" if "x \<in> S" for x
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2180	using H that 3 by (auto intro!: infdist_pos_not_in_closed)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2181	then have B: "S \<subseteq> U" unfolding U_def by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2182	define V where "V = (\<Union>x\<in>T. ball x ((infdist x S)/2))"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2183	have C: "open V" unfolding V_def by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2184	have "infdist x S > 0" if "x \<in> T" for x
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2185	using H that 3 by (auto intro!: infdist_pos_not_in_closed)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2186	then have D: "T \<subseteq> V" unfolding V_def by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2187
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2188	have "(ball x ((infdist x T)/2)) \<inter> (ball y ((infdist y S)/2)) = {}" if "x \<in> S" "y \<in> T" for x y
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2189	proof (auto)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2190	fix z assume H: "dist x z * 2 < infdist x T" "dist y z * 2 < infdist y S"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2191	have "2 * dist x y \<le> 2 * dist x z + 2 * dist y z"
70960 84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	2192	by metric
69611 42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2193	also have "... < infdist x T + infdist y S"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2194	using H by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2195	finally have "dist x y < infdist x T \<or> dist x y < infdist y S"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2196	by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2197	then show False
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2198	using infdist_le[OF \<open>x \<in> S\<close>, of y] infdist_le[OF \<open>y \<in> T\<close>, of x] by (auto simp add: dist_commute)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2199	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2200	then have E: "U \<inter> V = {}"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2201	unfolding U_def V_def by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2202	show ?thesis
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2203	apply (rule exI[of _ U], rule exI[of _ V]) using A B C D E by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2204	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2205	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2206
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2207	lemma tendsto_infdist [tendsto_intros]:
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2208	assumes f: "(f \<longlongrightarrow> l) F"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2209	shows "((\<lambda>x. infdist (f x) A) \<longlongrightarrow> infdist l A) F"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2210	proof (rule tendstoI)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2211	fix e ::real
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2212	assume "e > 0"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2213	from tendstoD[OF f this]
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2214	show "eventually (\<lambda>x. dist (infdist (f x) A) (infdist l A) < e) F"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2215	proof (eventually_elim)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2216	fix x
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2217	from infdist_triangle[of l A "f x"] infdist_triangle[of "f x" A l]
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2218	have "dist (infdist (f x) A) (infdist l A) \<le> dist (f x) l"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2219	by (simp add: dist_commute dist_real_def)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2220	also assume "dist (f x) l < e"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2221	finally show "dist (infdist (f x) A) (infdist l A) < e" .
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2222	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2223	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2224
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2225	lemma continuous_infdist[continuous_intros]:
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2226	assumes "continuous F f"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2227	shows "continuous F (\<lambda>x. infdist (f x) A)"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2228	using assms unfolding continuous_def by (rule tendsto_infdist)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2229
70723 4e39d87c9737 imported new material mostly due to Sébastien Gouëzel paulson <lp15@cam.ac.uk> parents: 70617 diff changeset	2230	lemma continuous_on_infdist [continuous_intros]:
4e39d87c9737 imported new material mostly due to Sébastien Gouëzel paulson <lp15@cam.ac.uk> parents: 70617 diff changeset	2231	assumes "continuous_on S f"
4e39d87c9737 imported new material mostly due to Sébastien Gouëzel paulson <lp15@cam.ac.uk> parents: 70617 diff changeset	2232	shows "continuous_on S (\<lambda>x. infdist (f x) A)"
4e39d87c9737 imported new material mostly due to Sébastien Gouëzel paulson <lp15@cam.ac.uk> parents: 70617 diff changeset	2233	using assms unfolding continuous_on by (auto intro: tendsto_infdist)
4e39d87c9737 imported new material mostly due to Sébastien Gouëzel paulson <lp15@cam.ac.uk> parents: 70617 diff changeset	2234
69611 42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2235	lemma compact_infdist_le:
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2236	fixes A::"'a::heine_borel set"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2237	assumes "A \<noteq> {}"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2238	assumes "compact A"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2239	assumes "e > 0"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2240	shows "compact {x. infdist x A \<le> e}"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2241	proof -
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2242	from continuous_closed_vimage[of "{0..e}" "\<lambda>x. infdist x A"]
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2243	continuous_infdist[OF continuous_ident, of _ UNIV A]
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2244	have "closed {x. infdist x A \<le> e}" by (auto simp: vimage_def infdist_nonneg)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2245	moreover
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2246	from assms obtain x0 b where b: "\<And>x. x \<in> A \<Longrightarrow> dist x0 x \<le> b" "closed A"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2247	by (auto simp: compact_eq_bounded_closed bounded_def)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2248	{
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2249	fix y
70960 84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	2250	assume "infdist y A \<le> e"
84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	2251	moreover
69611 42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2252	from infdist_attains_inf[OF \<open>closed A\<close> \<open>A \<noteq> {}\<close>, of y]
70960 84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	2253	obtain z where "z \<in> A" "infdist y A = dist y z" by blast
84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	2254	ultimately
84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	2255	have "dist x0 y \<le> b + e" using b by metric
69611 42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2256	} then
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2257	have "bounded {x. infdist x A \<le> e}"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2258	by (auto simp: bounded_any_center[where a=x0] intro!: exI[where x="b + e"])
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2259	ultimately show "compact {x. infdist x A \<le> e}"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2260	by (simp add: compact_eq_bounded_closed)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2261	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2262
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2263
69613 1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2264	subsection \<open>Separation between Points and Sets\<close>
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2265
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2266	proposition separate_point_closed:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2267	fixes s :: "'a::heine_borel set"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2268	assumes "closed s" and "a \<notin> s"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2269	shows "\<exists>d>0. \<forall>x\<in>s. d \<le> dist a x"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2270	proof (cases "s = {}")
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2271	case True
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2272	then show ?thesis by(auto intro!: exI[where x=1])
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2273	next
69613 1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2274	case False
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2275	from assms obtain x where "x\<in>s" "\<forall>y\<in>s. dist a x \<le> dist a y"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2276	using \<open>s \<noteq> {}\<close> by (blast intro: distance_attains_inf [of s a])
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2277	with \<open>x\<in>s\<close> show ?thesis using dist_pos_lt[of a x] and\<open>a \<notin> s\<close>
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2278	by blast
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2279	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2280
69613 1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2281	proposition separate_compact_closed:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2282	fixes s t :: "'a::heine_borel set"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2283	assumes "compact s"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2284	and t: "closed t" "s \<inter> t = {}"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2285	shows "\<exists>d>0. \<forall>x\<in>s. \<forall>y\<in>t. d \<le> dist x y"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2286	proof cases
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2287	assume "s \<noteq> {} \<and> t \<noteq> {}"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2288	then have "s \<noteq> {}" "t \<noteq> {}" by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2289	let ?inf = "\<lambda>x. infdist x t"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2290	have "continuous_on s ?inf"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2291	by (auto intro!: continuous_at_imp_continuous_on continuous_infdist continuous_ident)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2292	then obtain x where x: "x \<in> s" "\<forall>y\<in>s. ?inf x \<le> ?inf y"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2293	using continuous_attains_inf[OF \<open>compact s\<close> \<open>s \<noteq> {}\<close>] by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2294	then have "0 < ?inf x"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2295	using t \<open>t \<noteq> {}\<close> in_closed_iff_infdist_zero by (auto simp: less_le infdist_nonneg)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2296	moreover have "\<forall>x'\<in>s. \<forall>y\<in>t. ?inf x \<le> dist x' y"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2297	using x by (auto intro: order_trans infdist_le)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2298	ultimately show ?thesis by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2299	qed (auto intro!: exI[of _ 1])
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2300
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2301	proposition separate_closed_compact:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2302	fixes s t :: "'a::heine_borel set"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2303	assumes "closed s"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2304	and "compact t"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2305	and "s \<inter> t = {}"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2306	shows "\<exists>d>0. \<forall>x\<in>s. \<forall>y\<in>t. d \<le> dist x y"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2307	proof -
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2308	have *: "t \<inter> s = {}"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2309	using assms(3) by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2310	show ?thesis
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2311	using separate_compact_closed[OF assms(2,1) *] by (force simp: dist_commute)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2312	qed
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2313
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2314	proposition compact_in_open_separated:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2315	fixes A::"'a::heine_borel set"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2316	assumes "A \<noteq> {}"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2317	assumes "compact A"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2318	assumes "open B"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2319	assumes "A \<subseteq> B"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2320	obtains e where "e > 0" "{x. infdist x A \<le> e} \<subseteq> B"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2321	proof atomize_elim
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2322	have "closed (- B)" "compact A" "- B \<inter> A = {}"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2323	using assms by (auto simp: open_Diff compact_eq_bounded_closed)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2324	from separate_closed_compact[OF this]
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2325	obtain d'::real where d': "d'>0" "\<And>x y. x \<notin> B \<Longrightarrow> y \<in> A \<Longrightarrow> d' \<le> dist x y"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2326	by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2327	define d where "d = d' / 2"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2328	hence "d>0" "d < d'" using d' by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2329	with d' have d: "\<And>x y. x \<notin> B \<Longrightarrow> y \<in> A \<Longrightarrow> d < dist x y"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2330	by force
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2331	show "\<exists>e>0. {x. infdist x A \<le> e} \<subseteq> B"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2332	proof (rule ccontr)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2333	assume "\<nexists>e. 0 < e \<and> {x. infdist x A \<le> e} \<subseteq> B"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2334	with \<open>d > 0\<close> obtain x where x: "infdist x A \<le> d" "x \<notin> B"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2335	by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2336	from assms have "closed A" "A \<noteq> {}" by (auto simp: compact_eq_bounded_closed)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2337	from infdist_attains_inf[OF this]
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2338	obtain y where y: "y \<in> A" "infdist x A = dist x y"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2339	by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2340	have "dist x y \<le> d" using x y by simp
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2341	also have "\<dots> < dist x y" using y d x by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2342	finally show False by simp
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2343	qed
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2344	qed
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2345
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2346
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2347	subsection \<open>Uniform Continuity\<close>
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2348
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2349	lemma uniformly_continuous_onE:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2350	assumes "uniformly_continuous_on s f" "0 < e"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2351	obtains d where "d>0" "\<And>x x'. \<lbrakk>x\<in>s; x'\<in>s; dist x' x < d\<rbrakk> \<Longrightarrow> dist (f x') (f x) < e"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2352	using assms
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2353	by (auto simp: uniformly_continuous_on_def)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2354
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2355	lemma uniformly_continuous_on_sequentially:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2356	"uniformly_continuous_on s f \<longleftrightarrow> (\<forall>x y. (\<forall>n. x n \<in> s) \<and> (\<forall>n. y n \<in> s) \<and>
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2357	(\<lambda>n. dist (x n) (y n)) \<longlonglongrightarrow> 0 \<longrightarrow> (\<lambda>n. dist (f(x n)) (f(y n))) \<longlonglongrightarrow> 0)" (is "?lhs = ?rhs")
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2358	proof
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2359	assume ?lhs
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2360	{
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2361	fix x y
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2362	assume x: "\<forall>n. x n \<in> s"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2363	and y: "\<forall>n. y n \<in> s"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2364	and xy: "((\<lambda>n. dist (x n) (y n)) \<longlongrightarrow> 0) sequentially"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2365	{
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2366	fix e :: real
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2367	assume "e > 0"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2368	then obtain d where "d > 0" and d: "\<forall>x\<in>s. \<forall>x'\<in>s. dist x' x < d \<longrightarrow> dist (f x') (f x) < e"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2369	using \<open>?lhs\<close>[unfolded uniformly_continuous_on_def, THEN spec[where x=e]] by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2370	obtain N where N: "\<forall>n\<ge>N. dist (x n) (y n) < d"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2371	using xy[unfolded lim_sequentially dist_norm] and \<open>d>0\<close> by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2372	{
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2373	fix n
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2374	assume "n\<ge>N"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2375	then have "dist (f (x n)) (f (y n)) < e"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2376	using N[THEN spec[where x=n]]
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2377	using d[THEN bspec[where x="x n"], THEN bspec[where x="y n"]]
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2378	using x and y
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2379	by (simp add: dist_commute)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2380	}
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2381	then have "\<exists>N. \<forall>n\<ge>N. dist (f (x n)) (f (y n)) < e"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2382	by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2383	}
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2384	then have "((\<lambda>n. dist (f(x n)) (f(y n))) \<longlongrightarrow> 0) sequentially"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2385	unfolding lim_sequentially and dist_real_def by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2386	}
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2387	then show ?rhs by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2388	next
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2389	assume ?rhs
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2390	{
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2391	assume "\<not> ?lhs"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2392	then obtain e where "e > 0" "\<forall>d>0. \<exists>x\<in>s. \<exists>x'\<in>s. dist x' x < d \<and> \<not> dist (f x') (f x) < e"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2393	unfolding uniformly_continuous_on_def by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2394	then obtain fa where fa:
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2395	"\<forall>x. 0 < x \<longrightarrow> fst (fa x) \<in> s \<and> snd (fa x) \<in> s \<and> dist (fst (fa x)) (snd (fa x)) < x \<and> \<not> dist (f (fst (fa x))) (f (snd (fa x))) < e"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2396	using choice[of "\<lambda>d x. d>0 \<longrightarrow> fst x \<in> s \<and> snd x \<in> s \<and> dist (snd x) (fst x) < d \<and> \<not> dist (f (snd x)) (f (fst x)) < e"]
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2397	unfolding Bex_def
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2398	by (auto simp: dist_commute)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2399	define x where "x n = fst (fa (inverse (real n + 1)))" for n
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2400	define y where "y n = snd (fa (inverse (real n + 1)))" for n
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2401	have xyn: "\<forall>n. x n \<in> s \<and> y n \<in> s"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2402	and xy0: "\<forall>n. dist (x n) (y n) < inverse (real n + 1)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2403	and fxy:"\<forall>n. \<not> dist (f (x n)) (f (y n)) < e"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2404	unfolding x_def and y_def using fa
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2405	by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2406	{
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2407	fix e :: real
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2408	assume "e > 0"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2409	then obtain N :: nat where "N \<noteq> 0" and N: "0 < inverse (real N) \<and> inverse (real N) < e"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2410	unfolding real_arch_inverse[of e] by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2411	{
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2412	fix n :: nat
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2413	assume "n \<ge> N"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2414	then have "inverse (real n + 1) < inverse (real N)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2415	using of_nat_0_le_iff and \<open>N\<noteq>0\<close> by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2416	also have "\<dots> < e" using N by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2417	finally have "inverse (real n + 1) < e" by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2418	then have "dist (x n) (y n) < e"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2419	using xy0[THEN spec[where x=n]] by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2420	}
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2421	then have "\<exists>N. \<forall>n\<ge>N. dist (x n) (y n) < e" by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2422	}
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2423	then have "\<forall>e>0. \<exists>N. \<forall>n\<ge>N. dist (f (x n)) (f (y n)) < e"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2424	using \<open>?rhs\<close>[THEN spec[where x=x], THEN spec[where x=y]] and xyn
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2425	unfolding lim_sequentially dist_real_def by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2426	then have False using fxy and \<open>e>0\<close> by auto
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2427	}
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2428	then show ?lhs
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2429	unfolding uniformly_continuous_on_def by blast
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2430	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2431
69613 1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2432
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2433	subsection \<open>Continuity on a Compact Domain Implies Uniform Continuity\<close>
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2434
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2435	text\<open>From the proof of the Heine-Borel theorem: Lemma 2 in section 3.7, page 69 of
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2436	J. C. Burkill and H. Burkill. A Second Course in Mathematical Analysis (CUP, 2002)\<close>
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2437
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2438	lemma Heine_Borel_lemma:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2439	assumes "compact S" and Ssub: "S \<subseteq> \<Union>\<G>" and opn: "\<And>G. G \<in> \<G> \<Longrightarrow> open G"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2440	obtains e where "0 < e" "\<And>x. x \<in> S \<Longrightarrow> \<exists>G \<in> \<G>. ball x e \<subseteq> G"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2441	proof -
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2442	have False if neg: "\<And>e. 0 < e \<Longrightarrow> \<exists>x \<in> S. \<forall>G \<in> \<G>. \<not> ball x e \<subseteq> G"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2443	proof -
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2444	have "\<exists>x \<in> S. \<forall>G \<in> \<G>. \<not> ball x (1 / Suc n) \<subseteq> G" for n
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2445	using neg by simp
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2446	then obtain f where "\<And>n. f n \<in> S" and fG: "\<And>G n. G \<in> \<G> \<Longrightarrow> \<not> ball (f n) (1 / Suc n) \<subseteq> G"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2447	by metis
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2448	then obtain l r where "l \<in> S" "strict_mono r" and to_l: "(f \<circ> r) \<longlonglongrightarrow> l"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2449	using \<open>compact S\<close> compact_def that by metis
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2450	then obtain G where "l \<in> G" "G \<in> \<G>"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2451	using Ssub by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2452	then obtain e where "0 < e" and e: "\<And>z. dist z l < e \<Longrightarrow> z \<in> G"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2453	using opn open_dist by blast
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2454	obtain N1 where N1: "\<And>n. n \<ge> N1 \<Longrightarrow> dist (f (r n)) l < e/2"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2455	using to_l apply (simp add: lim_sequentially)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2456	using \<open>0 < e\<close> half_gt_zero that by blast
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2457	obtain N2 where N2: "of_nat N2 > 2/e"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2458	using reals_Archimedean2 by blast
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2459	obtain x where "x \<in> ball (f (r (max N1 N2))) (1 / real (Suc (r (max N1 N2))))" and "x \<notin> G"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2460	using fG [OF \<open>G \<in> \<G>\<close>, of "r (max N1 N2)"] by blast
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2461	then have "dist (f (r (max N1 N2))) x < 1 / real (Suc (r (max N1 N2)))"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2462	by simp
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2463	also have "... \<le> 1 / real (Suc (max N1 N2))"
70817 dd675800469d dedicated fact collections for algebraic simplification rules potentially splitting goals haftmann parents: 70724 diff changeset	2464	apply (simp add: field_split_simps del: max.bounded_iff)
69613 1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2465	using \<open>strict_mono r\<close> seq_suble by blast
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2466	also have "... \<le> 1 / real (Suc N2)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2467	by (simp add: field_simps)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2468	also have "... < e/2"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2469	using N2 \<open>0 < e\<close> by (simp add: field_simps)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2470	finally have "dist (f (r (max N1 N2))) x < e / 2" .
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2471	moreover have "dist (f (r (max N1 N2))) l < e/2"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2472	using N1 max.cobounded1 by blast
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2473	ultimately have "dist x l < e"
70960 84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	2474	by metric
69613 1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2475	then show ?thesis
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2476	using e \<open>x \<notin> G\<close> by blast
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2477	qed
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2478	then show ?thesis
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2479	by (meson that)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2480	qed
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2481
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2482	lemma compact_uniformly_equicontinuous:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2483	assumes "compact S"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2484	and cont: "\<And>x e. \<lbrakk>x \<in> S; 0 < e\<rbrakk>
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2485	\<Longrightarrow> \<exists>d. 0 < d \<and>
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2486	(\<forall>f \<in> \<F>. \<forall>x' \<in> S. dist x' x < d \<longrightarrow> dist (f x') (f x) < e)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2487	and "0 < e"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2488	obtains d where "0 < d"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2489	"\<And>f x x'. \<lbrakk>f \<in> \<F>; x \<in> S; x' \<in> S; dist x' x < d\<rbrakk> \<Longrightarrow> dist (f x') (f x) < e"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2490	proof -
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2491	obtain d where d_pos: "\<And>x e. \<lbrakk>x \<in> S; 0 < e\<rbrakk> \<Longrightarrow> 0 < d x e"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2492	and d_dist : "\<And>x x' e f. \<lbrakk>dist x' x < d x e; x \<in> S; x' \<in> S; 0 < e; f \<in> \<F>\<rbrakk> \<Longrightarrow> dist (f x') (f x) < e"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2493	using cont by metis
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2494	let ?\<G> = "((\<lambda>x. ball x (d x (e / 2))) ` S)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2495	have Ssub: "S \<subseteq> \<Union> ?\<G>"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2496	by clarsimp (metis d_pos \<open>0 < e\<close> dist_self half_gt_zero_iff)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2497	then obtain k where "0 < k" and k: "\<And>x. x \<in> S \<Longrightarrow> \<exists>G \<in> ?\<G>. ball x k \<subseteq> G"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2498	by (rule Heine_Borel_lemma [OF \<open>compact S\<close>]) auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2499	moreover have "dist (f v) (f u) < e" if "f \<in> \<F>" "u \<in> S" "v \<in> S" "dist v u < k" for f u v
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2500	proof -
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2501	obtain G where "G \<in> ?\<G>" "u \<in> G" "v \<in> G"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2502	using k that
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2503	by (metis \<open>dist v u < k\<close> \<open>u \<in> S\<close> \<open>0 < k\<close> centre_in_ball subsetD dist_commute mem_ball)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2504	then obtain w where w: "dist w u < d w (e / 2)" "dist w v < d w (e / 2)" "w \<in> S"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2505	by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2506	with that d_dist have "dist (f w) (f v) < e/2"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2507	by (metis \<open>0 < e\<close> dist_commute half_gt_zero)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2508	moreover
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2509	have "dist (f w) (f u) < e/2"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2510	using that d_dist w by (metis \<open>0 < e\<close> dist_commute divide_pos_pos zero_less_numeral)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2511	ultimately show ?thesis
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2512	using dist_triangle_half_r by blast
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2513	qed
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2514	ultimately show ?thesis using that by blast
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2515	qed
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2516
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2517	corollary compact_uniformly_continuous:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2518	fixes f :: "'a :: metric_space \<Rightarrow> 'b :: metric_space"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2519	assumes f: "continuous_on S f" and S: "compact S"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2520	shows "uniformly_continuous_on S f"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2521	using f
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2522	unfolding continuous_on_iff uniformly_continuous_on_def
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2523	by (force intro: compact_uniformly_equicontinuous [OF S, of "{f}"])
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2524
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2525
70136 f03a01a18c6e modernized tags: default scope excludes proof; wenzelm parents: 69922 diff changeset	2526	subsection\<^marker>\<open>tag unimportant\<close>\<open> Theorems relating continuity and uniform continuity to closures\<close>
69611 42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2527
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2528	lemma continuous_on_closure:
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2529	"continuous_on (closure S) f \<longleftrightarrow>
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2530	(\<forall>x e. x \<in> closure S \<and> 0 < e
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2531	\<longrightarrow> (\<exists>d. 0 < d \<and> (\<forall>y. y \<in> S \<and> dist y x < d \<longrightarrow> dist (f y) (f x) < e)))"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2532	(is "?lhs = ?rhs")
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2533	proof
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2534	assume ?lhs then show ?rhs
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2535	unfolding continuous_on_iff by (metis Un_iff closure_def)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2536	next
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2537	assume R [rule_format]: ?rhs
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2538	show ?lhs
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2539	proof
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2540	fix x and e::real
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2541	assume "0 < e" and x: "x \<in> closure S"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2542	obtain \<delta>::real where "\<delta> > 0"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2543	and \<delta>: "\<And>y. \<lbrakk>y \<in> S; dist y x < \<delta>\<rbrakk> \<Longrightarrow> dist (f y) (f x) < e/2"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2544	using R [of x "e/2"] \<open>0 < e\<close> x by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2545	have "dist (f y) (f x) \<le> e" if y: "y \<in> closure S" and dyx: "dist y x < \<delta>/2" for y
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2546	proof -
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2547	obtain \<delta>'::real where "\<delta>' > 0"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2548	and \<delta>': "\<And>z. \<lbrakk>z \<in> S; dist z y < \<delta>'\<rbrakk> \<Longrightarrow> dist (f z) (f y) < e/2"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2549	using R [of y "e/2"] \<open>0 < e\<close> y by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2550	obtain z where "z \<in> S" and z: "dist z y < min \<delta>' \<delta> / 2"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2551	using closure_approachable y
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2552	by (metis \<open>0 < \<delta>'\<close> \<open>0 < \<delta>\<close> divide_pos_pos min_less_iff_conj zero_less_numeral)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2553	have "dist (f z) (f y) < e/2"
70960 84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	2554	using \<delta>' [OF \<open>z \<in> S\<close>] z \<open>0 < \<delta>'\<close> by metric
69611 42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2555	moreover have "dist (f z) (f x) < e/2"
70960 84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	2556	using \<delta>[OF \<open>z \<in> S\<close>] z dyx by metric
69611 42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2557	ultimately show ?thesis
70960 84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	2558	by metric
69611 42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2559	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2560	then show "\<exists>d>0. \<forall>x'\<in>closure S. dist x' x < d \<longrightarrow> dist (f x') (f x) \<le> e"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2561	by (rule_tac x="\<delta>/2" in exI) (simp add: \<open>\<delta> > 0\<close>)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2562	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2563	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2564
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2565	lemma continuous_on_closure_sequentially:
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2566	fixes f :: "'a::metric_space \<Rightarrow> 'b :: metric_space"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2567	shows
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2568	"continuous_on (closure S) f \<longleftrightarrow>
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2569	(\<forall>x a. a \<in> closure S \<and> (\<forall>n. x n \<in> S) \<and> x \<longlonglongrightarrow> a \<longrightarrow> (f \<circ> x) \<longlonglongrightarrow> f a)"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2570	(is "?lhs = ?rhs")
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2571	proof -
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2572	have "continuous_on (closure S) f \<longleftrightarrow>
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2573	(\<forall>x \<in> closure S. continuous (at x within S) f)"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2574	by (force simp: continuous_on_closure continuous_within_eps_delta)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2575	also have "... = ?rhs"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2576	by (force simp: continuous_within_sequentially)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2577	finally show ?thesis .
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2578	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2579
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2580	lemma uniformly_continuous_on_closure:
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2581	fixes f :: "'a::metric_space \<Rightarrow> 'b::metric_space"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2582	assumes ucont: "uniformly_continuous_on S f"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2583	and cont: "continuous_on (closure S) f"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2584	shows "uniformly_continuous_on (closure S) f"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2585	unfolding uniformly_continuous_on_def
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2586	proof (intro allI impI)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2587	fix e::real
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2588	assume "0 < e"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2589	then obtain d::real
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2590	where "d>0"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2591	and d: "\<And>x x'. \<lbrakk>x\<in>S; x'\<in>S; dist x' x < d\<rbrakk> \<Longrightarrow> dist (f x') (f x) < e/3"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2592	using ucont [unfolded uniformly_continuous_on_def, rule_format, of "e/3"] by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2593	show "\<exists>d>0. \<forall>x\<in>closure S. \<forall>x'\<in>closure S. dist x' x < d \<longrightarrow> dist (f x') (f x) < e"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2594	proof (rule exI [where x="d/3"], clarsimp simp: \<open>d > 0\<close>)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2595	fix x y
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2596	assume x: "x \<in> closure S" and y: "y \<in> closure S" and dyx: "dist y x * 3 < d"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2597	obtain d1::real where "d1 > 0"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2598	and d1: "\<And>w. \<lbrakk>w \<in> closure S; dist w x < d1\<rbrakk> \<Longrightarrow> dist (f w) (f x) < e/3"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2599	using cont [unfolded continuous_on_iff, rule_format, of "x" "e/3"] \<open>0 < e\<close> x by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2600	obtain x' where "x' \<in> S" and x': "dist x' x < min d1 (d / 3)"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2601	using closure_approachable [of x S]
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2602	by (metis \<open>0 < d1\<close> \<open>0 < d\<close> divide_pos_pos min_less_iff_conj x zero_less_numeral)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2603	obtain d2::real where "d2 > 0"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2604	and d2: "\<forall>w \<in> closure S. dist w y < d2 \<longrightarrow> dist (f w) (f y) < e/3"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2605	using cont [unfolded continuous_on_iff, rule_format, of "y" "e/3"] \<open>0 < e\<close> y by auto
70960 84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	2606	obtain y' where "y' \<in> S" and y': "dist y' y < min d2 (d / 3)"
84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	2607	using closure_approachable [of y S]
84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	2608	by (metis \<open>0 < d2\<close> \<open>0 < d\<close> divide_pos_pos min_less_iff_conj y zero_less_numeral)
84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	2609	have "dist x' x < d/3" using x' by auto
84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	2610	then have "dist x' y' < d"
84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	2611	using dyx y' by metric
84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	2612	then have "dist (f x') (f y') < e/3"
84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	2613	by (rule d [OF \<open>y' \<in> S\<close> \<open>x' \<in> S\<close>])
84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	2614	moreover have "dist (f x') (f x) < e/3" using \<open>x' \<in> S\<close> closure_subset x' d1
84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	2615	by (simp add: closure_def)
84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	2616	moreover have "dist (f y') (f y) < e/3" using \<open>y' \<in> S\<close> closure_subset y' d2
84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	2617	by (simp add: closure_def)
84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	2618	ultimately show "dist (f y) (f x) < e" by metric
69611 42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2619	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2620	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2621
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2622	lemma uniformly_continuous_on_extension_at_closure:
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2623	fixes f::"'a::metric_space \<Rightarrow> 'b::complete_space"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2624	assumes uc: "uniformly_continuous_on X f"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2625	assumes "x \<in> closure X"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2626	obtains l where "(f \<longlongrightarrow> l) (at x within X)"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2627	proof -
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2628	from assms obtain xs where xs: "xs \<longlonglongrightarrow> x" "\<And>n. xs n \<in> X"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2629	by (auto simp: closure_sequential)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2630
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2631	from uniformly_continuous_on_Cauchy[OF uc LIMSEQ_imp_Cauchy, OF xs]
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2632	obtain l where l: "(\<lambda>n. f (xs n)) \<longlonglongrightarrow> l"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2633	by atomize_elim (simp only: convergent_eq_Cauchy)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2634
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2635	have "(f \<longlongrightarrow> l) (at x within X)"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2636	proof (safe intro!: Lim_within_LIMSEQ)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2637	fix xs'
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2638	assume "\<forall>n. xs' n \<noteq> x \<and> xs' n \<in> X"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2639	and xs': "xs' \<longlonglongrightarrow> x"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2640	then have "xs' n \<noteq> x" "xs' n \<in> X" for n by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2641
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2642	from uniformly_continuous_on_Cauchy[OF uc LIMSEQ_imp_Cauchy, OF \<open>xs' \<longlonglongrightarrow> x\<close> \<open>xs' _ \<in> X\<close>]
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2643	obtain l' where l': "(\<lambda>n. f (xs' n)) \<longlonglongrightarrow> l'"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2644	by atomize_elim (simp only: convergent_eq_Cauchy)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2645
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2646	show "(\<lambda>n. f (xs' n)) \<longlonglongrightarrow> l"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2647	proof (rule tendstoI)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2648	fix e::real assume "e > 0"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2649	define e' where "e' \<equiv> e / 2"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2650	have "e' > 0" using \<open>e > 0\<close> by (simp add: e'_def)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2651
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2652	have "\<forall>\<^sub>F n in sequentially. dist (f (xs n)) l < e'"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2653	by (simp add: \<open>0 < e'\<close> l tendstoD)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2654	moreover
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2655	from uc[unfolded uniformly_continuous_on_def, rule_format, OF \<open>e' > 0\<close>]
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2656	obtain d where d: "d > 0" "\<And>x x'. x \<in> X \<Longrightarrow> x' \<in> X \<Longrightarrow> dist x x' < d \<Longrightarrow> dist (f x) (f x') < e'"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2657	by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2658	have "\<forall>\<^sub>F n in sequentially. dist (xs n) (xs' n) < d"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2659	by (auto intro!: \<open>0 < d\<close> order_tendstoD tendsto_eq_intros xs xs')
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2660	ultimately
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2661	show "\<forall>\<^sub>F n in sequentially. dist (f (xs' n)) l < e"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2662	proof eventually_elim
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2663	case (elim n)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2664	have "dist (f (xs' n)) l \<le> dist (f (xs n)) (f (xs' n)) + dist (f (xs n)) l"
70960 84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	2665	by metric
69611 42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2666	also have "dist (f (xs n)) (f (xs' n)) < e'"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2667	by (auto intro!: d xs \<open>xs' _ \<in> _\<close> elim)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2668	also note \<open>dist (f (xs n)) l < e'\<close>
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2669	also have "e' + e' = e" by (simp add: e'_def)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2670	finally show ?case by simp
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2671	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2672	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2673	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2674	thus ?thesis ..
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2675	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2676
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2677	lemma uniformly_continuous_on_extension_on_closure:
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2678	fixes f::"'a::metric_space \<Rightarrow> 'b::complete_space"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2679	assumes uc: "uniformly_continuous_on X f"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2680	obtains g where "uniformly_continuous_on (closure X) g" "\<And>x. x \<in> X \<Longrightarrow> f x = g x"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2681	"\<And>Y h x. X \<subseteq> Y \<Longrightarrow> Y \<subseteq> closure X \<Longrightarrow> continuous_on Y h \<Longrightarrow> (\<And>x. x \<in> X \<Longrightarrow> f x = h x) \<Longrightarrow> x \<in> Y \<Longrightarrow> h x = g x"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2682	proof -
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2683	from uc have cont_f: "continuous_on X f"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2684	by (simp add: uniformly_continuous_imp_continuous)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2685	obtain y where y: "(f \<longlongrightarrow> y x) (at x within X)" if "x \<in> closure X" for x
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2686	apply atomize_elim
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2687	apply (rule choice)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2688	using uniformly_continuous_on_extension_at_closure[OF assms]
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2689	by metis
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2690	let ?g = "\<lambda>x. if x \<in> X then f x else y x"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2691
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2692	have "uniformly_continuous_on (closure X) ?g"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2693	unfolding uniformly_continuous_on_def
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2694	proof safe
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2695	fix e::real assume "e > 0"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2696	define e' where "e' \<equiv> e / 3"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2697	have "e' > 0" using \<open>e > 0\<close> by (simp add: e'_def)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2698	from uc[unfolded uniformly_continuous_on_def, rule_format, OF \<open>0 < e'\<close>]
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2699	obtain d where "d > 0" and d: "\<And>x x'. x \<in> X \<Longrightarrow> x' \<in> X \<Longrightarrow> dist x' x < d \<Longrightarrow> dist (f x') (f x) < e'"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2700	by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2701	define d' where "d' = d / 3"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2702	have "d' > 0" using \<open>d > 0\<close> by (simp add: d'_def)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2703	show "\<exists>d>0. \<forall>x\<in>closure X. \<forall>x'\<in>closure X. dist x' x < d \<longrightarrow> dist (?g x') (?g x) < e"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2704	proof (safe intro!: exI[where x=d'] \<open>d' > 0\<close>)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2705	fix x x' assume x: "x \<in> closure X" and x': "x' \<in> closure X" and dist: "dist x' x < d'"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2706	then obtain xs xs' where xs: "xs \<longlonglongrightarrow> x" "\<And>n. xs n \<in> X"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2707	and xs': "xs' \<longlonglongrightarrow> x'" "\<And>n. xs' n \<in> X"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2708	by (auto simp: closure_sequential)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2709	have "\<forall>\<^sub>F n in sequentially. dist (xs' n) x' < d'"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2710	and "\<forall>\<^sub>F n in sequentially. dist (xs n) x < d'"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2711	by (auto intro!: \<open>0 < d'\<close> order_tendstoD tendsto_eq_intros xs xs')
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2712	moreover
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2713	have "(\<lambda>x. f (xs x)) \<longlonglongrightarrow> y x" if "x \<in> closure X" "x \<notin> X" "xs \<longlonglongrightarrow> x" "\<And>n. xs n \<in> X" for xs x
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2714	using that not_eventuallyD
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2715	by (force intro!: filterlim_compose[OF y[OF \<open>x \<in> closure X\<close>]] simp: filterlim_at)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2716	then have "(\<lambda>x. f (xs' x)) \<longlonglongrightarrow> ?g x'" "(\<lambda>x. f (xs x)) \<longlonglongrightarrow> ?g x"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2717	using x x'
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2718	by (auto intro!: continuous_on_tendsto_compose[OF cont_f] simp: xs' xs)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2719	then have "\<forall>\<^sub>F n in sequentially. dist (f (xs' n)) (?g x') < e'"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2720	"\<forall>\<^sub>F n in sequentially. dist (f (xs n)) (?g x) < e'"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2721	by (auto intro!: \<open>0 < e'\<close> order_tendstoD tendsto_eq_intros)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2722	ultimately
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2723	have "\<forall>\<^sub>F n in sequentially. dist (?g x') (?g x) < e"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2724	proof eventually_elim
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2725	case (elim n)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2726	have "dist (?g x') (?g x) \<le>
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2727	dist (f (xs' n)) (?g x') + dist (f (xs' n)) (f (xs n)) + dist (f (xs n)) (?g x)"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2728	by (metis add.commute add_le_cancel_left dist_commute dist_triangle dist_triangle_le)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2729	also
70960 84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	2730	from \<open>dist (xs' n) x' < d'\<close> \<open>dist x' x < d'\<close> \<open>dist (xs n) x < d'\<close>
84f79d82df0a some applications of "metric" immler parents: 70951 diff changeset	2731	have "dist (xs' n) (xs n) < d" unfolding d'_def by metric
69611 42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2732	with \<open>xs _ \<in> X\<close> \<open>xs' _ \<in> X\<close> have "dist (f (xs' n)) (f (xs n)) < e'"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2733	by (rule d)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2734	also note \<open>dist (f (xs' n)) (?g x') < e'\<close>
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2735	also note \<open>dist (f (xs n)) (?g x) < e'\<close>
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2736	finally show ?case by (simp add: e'_def)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2737	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2738	then show "dist (?g x') (?g x) < e" by simp
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2739	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2740	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2741	moreover have "f x = ?g x" if "x \<in> X" for x using that by simp
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2742	moreover
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2743	{
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2744	fix Y h x
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2745	assume Y: "x \<in> Y" "X \<subseteq> Y" "Y \<subseteq> closure X" and cont_h: "continuous_on Y h"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2746	and extension: "(\<And>x. x \<in> X \<Longrightarrow> f x = h x)"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2747	{
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2748	assume "x \<notin> X"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2749	have "x \<in> closure X" using Y by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2750	then obtain xs where xs: "xs \<longlonglongrightarrow> x" "\<And>n. xs n \<in> X"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2751	by (auto simp: closure_sequential)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2752	from continuous_on_tendsto_compose[OF cont_h xs(1)] xs(2) Y
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2753	have hx: "(\<lambda>x. f (xs x)) \<longlonglongrightarrow> h x"
69712 dc85b5b3a532 renamings and new material paulson <lp15@cam.ac.uk> parents: 69676 diff changeset	2754	by (auto simp: subsetD extension)
69611 42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2755	then have "(\<lambda>x. f (xs x)) \<longlonglongrightarrow> y x"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2756	using \<open>x \<notin> X\<close> not_eventuallyD xs(2)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2757	by (force intro!: filterlim_compose[OF y[OF \<open>x \<in> closure X\<close>]] simp: filterlim_at xs)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2758	with hx have "h x = y x" by (rule LIMSEQ_unique)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2759	} then
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2760	have "h x = ?g x"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2761	using extension by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2762	}
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2763	ultimately show ?thesis ..
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2764	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2765
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2766	lemma bounded_uniformly_continuous_image:
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2767	fixes f :: "'a :: heine_borel \<Rightarrow> 'b :: heine_borel"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2768	assumes "uniformly_continuous_on S f" "bounded S"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2769	shows "bounded(f ` S)"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2770	by (metis (no_types, lifting) assms bounded_closure_image compact_closure compact_continuous_image compact_eq_bounded_closed image_cong uniformly_continuous_imp_continuous uniformly_continuous_on_extension_on_closure)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2771
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2772
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2773	subsection \<open>With Abstract Topology (TODO: move and remove dependency?)\<close>
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2774
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2775	lemma openin_contains_ball:
69922 4a9167f377b0 new material about topology, etc.; also fixes for yesterday's paulson <lp15@cam.ac.uk> parents: 69918 diff changeset	2776	"openin (top_of_set t) s \<longleftrightarrow>
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2777	s \<subseteq> t \<and> (\<forall>x \<in> s. \<exists>e. 0 < e \<and> ball x e \<inter> t \<subseteq> s)"
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2778	(is "?lhs = ?rhs")
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2779	proof
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2780	assume ?lhs
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2781	then show ?rhs
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2782	apply (simp add: openin_open)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2783	apply (metis Int_commute Int_mono inf.cobounded2 open_contains_ball order_refl subsetCE)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2784	done
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2785	next
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2786	assume ?rhs
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2787	then show ?lhs
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2788	apply (simp add: openin_euclidean_subtopology_iff)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2789	by (metis (no_types) Int_iff dist_commute inf.absorb_iff2 mem_ball)
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2790	qed
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2791
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2792	lemma openin_contains_cball:
69922 4a9167f377b0 new material about topology, etc.; also fixes for yesterday's paulson <lp15@cam.ac.uk> parents: 69918 diff changeset	2793	"openin (top_of_set t) s \<longleftrightarrow>
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2794	s \<subseteq> t \<and>
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2795	(\<forall>x \<in> s. \<exists>e. 0 < e \<and> cball x e \<inter> t \<subseteq> s)"
69622 003475955593 moved generalized lemmas immler parents: 69621 diff changeset	2796	apply (simp add: openin_contains_ball)
003475955593 moved generalized lemmas immler parents: 69621 diff changeset	2797	apply (rule iffI)
003475955593 moved generalized lemmas immler parents: 69621 diff changeset	2798	apply (auto dest!: bspec)
003475955593 moved generalized lemmas immler parents: 69621 diff changeset	2799	apply (rule_tac x="e/2" in exI, force+)
69544 5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2800	done
5aa5a8d6e5b5 split off theorems involving classes below metric_space and real_normed_vector immler parents: diff changeset	2801
69611 42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2802
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2803	subsection \<open>Closed Nest\<close>
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2804
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2805	text \<open>Bounded closed nest property (proof does not use Heine-Borel)\<close>
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2806
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2807	lemma bounded_closed_nest:
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2808	fixes S :: "nat \<Rightarrow> ('a::heine_borel) set"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2809	assumes "\<And>n. closed (S n)"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2810	and "\<And>n. S n \<noteq> {}"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2811	and "\<And>m n. m \<le> n \<Longrightarrow> S n \<subseteq> S m"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2812	and "bounded (S 0)"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2813	obtains a where "\<And>n. a \<in> S n"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2814	proof -
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2815	from assms(2) obtain x where x: "\<forall>n. x n \<in> S n"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2816	using choice[of "\<lambda>n x. x \<in> S n"] by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2817	from assms(4,1) have "seq_compact (S 0)"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2818	by (simp add: bounded_closed_imp_seq_compact)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2819	then obtain l r where lr: "l \<in> S 0" "strict_mono r" "(x \<circ> r) \<longlonglongrightarrow> l"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2820	using x and assms(3) unfolding seq_compact_def by blast
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2821	have "\<forall>n. l \<in> S n"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2822	proof
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2823	fix n :: nat
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2824	have "closed (S n)"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2825	using assms(1) by simp
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2826	moreover have "\<forall>i. (x \<circ> r) i \<in> S i"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2827	using x and assms(3) and lr(2) [THEN seq_suble] by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2828	then have "\<forall>i. (x \<circ> r) (i + n) \<in> S n"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2829	using assms(3) by (fast intro!: le_add2)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2830	moreover have "(\<lambda>i. (x \<circ> r) (i + n)) \<longlonglongrightarrow> l"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2831	using lr(3) by (rule LIMSEQ_ignore_initial_segment)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2832	ultimately show "l \<in> S n"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2833	by (rule closed_sequentially)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2834	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2835	then show ?thesis
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2836	using that by blast
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2837	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2838
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2839	text \<open>Decreasing case does not even need compactness, just completeness.\<close>
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2840
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2841	lemma decreasing_closed_nest:
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2842	fixes S :: "nat \<Rightarrow> ('a::complete_space) set"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2843	assumes "\<And>n. closed (S n)"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2844	"\<And>n. S n \<noteq> {}"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2845	"\<And>m n. m \<le> n \<Longrightarrow> S n \<subseteq> S m"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2846	"\<And>e. e>0 \<Longrightarrow> \<exists>n. \<forall>x\<in>S n. \<forall>y\<in>S n. dist x y < e"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2847	obtains a where "\<And>n. a \<in> S n"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2848	proof -
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2849	have "\<forall>n. \<exists>x. x \<in> S n"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2850	using assms(2) by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2851	then have "\<exists>t. \<forall>n. t n \<in> S n"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2852	using choice[of "\<lambda>n x. x \<in> S n"] by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2853	then obtain t where t: "\<forall>n. t n \<in> S n" by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2854	{
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2855	fix e :: real
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2856	assume "e > 0"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2857	then obtain N where N: "\<forall>x\<in>S N. \<forall>y\<in>S N. dist x y < e"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2858	using assms(4) by blast
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2859	{
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2860	fix m n :: nat
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2861	assume "N \<le> m \<and> N \<le> n"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2862	then have "t m \<in> S N" "t n \<in> S N"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2863	using assms(3) t unfolding subset_eq t by blast+
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2864	then have "dist (t m) (t n) < e"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2865	using N by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2866	}
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2867	then have "\<exists>N. \<forall>m n. N \<le> m \<and> N \<le> n \<longrightarrow> dist (t m) (t n) < e"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2868	by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2869	}
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2870	then have "Cauchy t"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2871	unfolding cauchy_def by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2872	then obtain l where l:"(t \<longlongrightarrow> l) sequentially"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2873	using complete_UNIV unfolding complete_def by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2874	{ fix n :: nat
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2875	{ fix e :: real
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2876	assume "e > 0"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2877	then obtain N :: nat where N: "\<forall>n\<ge>N. dist (t n) l < e"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2878	using l[unfolded lim_sequentially] by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2879	have "t (max n N) \<in> S n"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2880	by (meson assms(3) contra_subsetD max.cobounded1 t)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2881	then have "\<exists>y\<in>S n. dist y l < e"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2882	using N max.cobounded2 by blast
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2883	}
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2884	then have "l \<in> S n"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2885	using closed_approachable[of "S n" l] assms(1) by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2886	}
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2887	then show ?thesis
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2888	using that by blast
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2889	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2890
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2891	text \<open>Strengthen it to the intersection actually being a singleton.\<close>
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2892
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2893	lemma decreasing_closed_nest_sing:
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2894	fixes S :: "nat \<Rightarrow> 'a::complete_space set"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2895	assumes "\<And>n. closed(S n)"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2896	"\<And>n. S n \<noteq> {}"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2897	"\<And>m n. m \<le> n \<Longrightarrow> S n \<subseteq> S m"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2898	"\<And>e. e>0 \<Longrightarrow> \<exists>n. \<forall>x \<in> (S n). \<forall> y\<in>(S n). dist x y < e"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2899	shows "\<exists>a. \<Inter>(range S) = {a}"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2900	proof -
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2901	obtain a where a: "\<forall>n. a \<in> S n"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2902	using decreasing_closed_nest[of S] using assms by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2903	{ fix b
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2904	assume b: "b \<in> \<Inter>(range S)"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2905	{ fix e :: real
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2906	assume "e > 0"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2907	then have "dist a b < e"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2908	using assms(4) and b and a by blast
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2909	}
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2910	then have "dist a b = 0"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2911	by (metis dist_eq_0_iff dist_nz less_le)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2912	}
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2913	with a have "\<Inter>(range S) = {a}"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2914	unfolding image_def by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2915	then show ?thesis ..
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2916	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2917
70136 f03a01a18c6e modernized tags: default scope excludes proof; wenzelm parents: 69922 diff changeset	2918	subsection\<^marker>\<open>tag unimportant\<close> \<open>Making a continuous function avoid some value in a neighbourhood\<close>
69611 42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2919
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2920	lemma continuous_within_avoid:
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2921	fixes f :: "'a::metric_space \<Rightarrow> 'b::t1_space"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2922	assumes "continuous (at x within s) f"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2923	and "f x \<noteq> a"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2924	shows "\<exists>e>0. \<forall>y \<in> s. dist x y < e --> f y \<noteq> a"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2925	proof -
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2926	obtain U where "open U" and "f x \<in> U" and "a \<notin> U"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2927	using t1_space [OF \<open>f x \<noteq> a\<close>] by fast
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2928	have "(f \<longlongrightarrow> f x) (at x within s)"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2929	using assms(1) by (simp add: continuous_within)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2930	then have "eventually (\<lambda>y. f y \<in> U) (at x within s)"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2931	using \<open>open U\<close> and \<open>f x \<in> U\<close>
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2932	unfolding tendsto_def by fast
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2933	then have "eventually (\<lambda>y. f y \<noteq> a) (at x within s)"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2934	using \<open>a \<notin> U\<close> by (fast elim: eventually_mono)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2935	then show ?thesis
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2936	using \<open>f x \<noteq> a\<close> by (auto simp: dist_commute eventually_at)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2937	qed
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2938
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2939	lemma continuous_at_avoid:
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2940	fixes f :: "'a::metric_space \<Rightarrow> 'b::t1_space"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2941	assumes "continuous (at x) f"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2942	and "f x \<noteq> a"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2943	shows "\<exists>e>0. \<forall>y. dist x y < e \<longrightarrow> f y \<noteq> a"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2944	using assms continuous_within_avoid[of x UNIV f a] by simp
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2945
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2946	lemma continuous_on_avoid:
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2947	fixes f :: "'a::metric_space \<Rightarrow> 'b::t1_space"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2948	assumes "continuous_on s f"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2949	and "x \<in> s"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2950	and "f x \<noteq> a"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2951	shows "\<exists>e>0. \<forall>y \<in> s. dist x y < e \<longrightarrow> f y \<noteq> a"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2952	using assms(1)[unfolded continuous_on_eq_continuous_within, THEN bspec[where x=x],
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2953	OF assms(2)] continuous_within_avoid[of x s f a]
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2954	using assms(3)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2955	by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2956
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2957	lemma continuous_on_open_avoid:
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2958	fixes f :: "'a::metric_space \<Rightarrow> 'b::t1_space"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2959	assumes "continuous_on s f"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2960	and "open s"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2961	and "x \<in> s"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2962	and "f x \<noteq> a"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2963	shows "\<exists>e>0. \<forall>y. dist x y < e \<longrightarrow> f y \<noteq> a"
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2964	using assms(1)[unfolded continuous_on_eq_continuous_at[OF assms(2)], THEN bspec[where x=x], OF assms(3)]
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2965	using continuous_at_avoid[of x f a] assms(4)
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2966	by auto
42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	2967
69613 1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2968	subsection \<open>Consequences for Real Numbers\<close>
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2969
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2970	lemma closed_contains_Inf:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2971	fixes S :: "real set"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2972	shows "S \<noteq> {} \<Longrightarrow> bdd_below S \<Longrightarrow> closed S \<Longrightarrow> Inf S \<in> S"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2973	by (metis closure_contains_Inf closure_closed)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2974
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2975	lemma closed_subset_contains_Inf:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2976	fixes A C :: "real set"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2977	shows "closed C \<Longrightarrow> A \<subseteq> C \<Longrightarrow> A \<noteq> {} \<Longrightarrow> bdd_below A \<Longrightarrow> Inf A \<in> C"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2978	by (metis closure_contains_Inf closure_minimal subset_eq)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2979
70617 c81ac117afa6 moved lemmas; reduced dependencies of Lipschitz immler parents: 70136 diff changeset	2980	lemma closed_contains_Sup:
c81ac117afa6 moved lemmas; reduced dependencies of Lipschitz immler parents: 70136 diff changeset	2981	fixes S :: "real set"
c81ac117afa6 moved lemmas; reduced dependencies of Lipschitz immler parents: 70136 diff changeset	2982	shows "S \<noteq> {} \<Longrightarrow> bdd_above S \<Longrightarrow> closed S \<Longrightarrow> Sup S \<in> S"
c81ac117afa6 moved lemmas; reduced dependencies of Lipschitz immler parents: 70136 diff changeset	2983	by (subst closure_closed[symmetric], assumption, rule closure_contains_Sup)
c81ac117afa6 moved lemmas; reduced dependencies of Lipschitz immler parents: 70136 diff changeset	2984
c81ac117afa6 moved lemmas; reduced dependencies of Lipschitz immler parents: 70136 diff changeset	2985	lemma closed_subset_contains_Sup:
c81ac117afa6 moved lemmas; reduced dependencies of Lipschitz immler parents: 70136 diff changeset	2986	fixes A C :: "real set"
c81ac117afa6 moved lemmas; reduced dependencies of Lipschitz immler parents: 70136 diff changeset	2987	shows "closed C \<Longrightarrow> A \<subseteq> C \<Longrightarrow> A \<noteq> {} \<Longrightarrow> bdd_above A \<Longrightarrow> Sup A \<in> C"
c81ac117afa6 moved lemmas; reduced dependencies of Lipschitz immler parents: 70136 diff changeset	2988	by (metis closure_contains_Sup closure_minimal subset_eq)
c81ac117afa6 moved lemmas; reduced dependencies of Lipschitz immler parents: 70136 diff changeset	2989
69613 1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2990	lemma atLeastAtMost_subset_contains_Inf:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2991	fixes A :: "real set" and a b :: real
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2992	shows "A \<noteq> {} \<Longrightarrow> a \<le> b \<Longrightarrow> A \<subseteq> {a..b} \<Longrightarrow> Inf A \<in> {a..b}"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2993	by (rule closed_subset_contains_Inf)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2994	(auto intro: closed_real_atLeastAtMost intro!: bdd_belowI[of A a])
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2995
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2996	lemma bounded_real: "bounded (S::real set) \<longleftrightarrow> (\<exists>a. \<forall>x\<in>S. \<bar>x\<bar> \<le> a)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2997	by (simp add: bounded_iff)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2998
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	2999	lemma bounded_imp_bdd_above: "bounded S \<Longrightarrow> bdd_above (S :: real set)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3000	by (auto simp: bounded_def bdd_above_def dist_real_def)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3001	(metis abs_le_D1 abs_minus_commute diff_le_eq)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3002
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3003	lemma bounded_imp_bdd_below: "bounded S \<Longrightarrow> bdd_below (S :: real set)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3004	by (auto simp: bounded_def bdd_below_def dist_real_def)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3005	(metis abs_le_D1 add.commute diff_le_eq)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3006
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3007	lemma bounded_has_Sup:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3008	fixes S :: "real set"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3009	assumes "bounded S"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3010	and "S \<noteq> {}"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3011	shows "\<forall>x\<in>S. x \<le> Sup S"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3012	and "\<forall>b. (\<forall>x\<in>S. x \<le> b) \<longrightarrow> Sup S \<le> b"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3013	proof
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3014	show "\<forall>b. (\<forall>x\<in>S. x \<le> b) \<longrightarrow> Sup S \<le> b"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3015	using assms by (metis cSup_least)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3016	qed (metis cSup_upper assms(1) bounded_imp_bdd_above)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3017
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3018	lemma Sup_insert:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3019	fixes S :: "real set"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3020	shows "bounded S \<Longrightarrow> Sup (insert x S) = (if S = {} then x else max x (Sup S))"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3021	by (auto simp: bounded_imp_bdd_above sup_max cSup_insert_If)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3022
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3023	lemma bounded_has_Inf:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3024	fixes S :: "real set"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3025	assumes "bounded S"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3026	and "S \<noteq> {}"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3027	shows "\<forall>x\<in>S. x \<ge> Inf S"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3028	and "\<forall>b. (\<forall>x\<in>S. x \<ge> b) \<longrightarrow> Inf S \<ge> b"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3029	proof
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3030	show "\<forall>b. (\<forall>x\<in>S. x \<ge> b) \<longrightarrow> Inf S \<ge> b"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3031	using assms by (metis cInf_greatest)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3032	qed (metis cInf_lower assms(1) bounded_imp_bdd_below)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3033
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3034	lemma Inf_insert:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3035	fixes S :: "real set"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3036	shows "bounded S \<Longrightarrow> Inf (insert x S) = (if S = {} then x else min x (Inf S))"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3037	by (auto simp: bounded_imp_bdd_below inf_min cInf_insert_If)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3038
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3039	lemma open_real:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3040	fixes s :: "real set"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3041	shows "open s \<longleftrightarrow> (\<forall>x \<in> s. \<exists>e>0. \<forall>x'. \<bar>x' - x\<bar> < e --> x' \<in> s)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3042	unfolding open_dist dist_norm by simp
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3043
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3044	lemma islimpt_approachable_real:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3045	fixes s :: "real set"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3046	shows "x islimpt s \<longleftrightarrow> (\<forall>e>0. \<exists>x'\<in> s. x' \<noteq> x \<and> \<bar>x' - x\<bar> < e)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3047	unfolding islimpt_approachable dist_norm by simp
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3048
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3049	lemma closed_real:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3050	fixes s :: "real set"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3051	shows "closed s \<longleftrightarrow> (\<forall>x. (\<forall>e>0. \<exists>x' \<in> s. x' \<noteq> x \<and> \<bar>x' - x\<bar> < e) \<longrightarrow> x \<in> s)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3052	unfolding closed_limpt islimpt_approachable dist_norm by simp
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3053
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3054	lemma continuous_at_real_range:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3055	fixes f :: "'a::real_normed_vector \<Rightarrow> real"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3056	shows "continuous (at x) f \<longleftrightarrow> (\<forall>e>0. \<exists>d>0. \<forall>x'. norm(x' - x) < d --> \<bar>f x' - f x\<bar> < e)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3057	unfolding continuous_at
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3058	unfolding Lim_at
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3059	unfolding dist_norm
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3060	apply auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3061	apply (erule_tac x=e in allE, auto)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3062	apply (rule_tac x=d in exI, auto)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3063	apply (erule_tac x=x' in allE, auto)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3064	apply (erule_tac x=e in allE, auto)
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3065	done
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3066
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3067	lemma continuous_on_real_range:
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3068	fixes f :: "'a::real_normed_vector \<Rightarrow> real"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3069	shows "continuous_on s f \<longleftrightarrow>
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3070	(\<forall>x \<in> s. \<forall>e>0. \<exists>d>0. (\<forall>x' \<in> s. norm(x' - x) < d \<longrightarrow> \<bar>f x' - f x\<bar> < e))"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3071	unfolding continuous_on_iff dist_norm by simp
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3072
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3073	lemma continuous_on_closed_Collect_le:
69618 2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3074	fixes f g :: "'a::topological_space \<Rightarrow> real"
69613 1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3075	assumes f: "continuous_on s f" and g: "continuous_on s g" and s: "closed s"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3076	shows "closed {x \<in> s. f x \<le> g x}"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3077	proof -
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3078	have "closed ((\<lambda>x. g x - f x) -` {0..} \<inter> s)"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3079	using closed_real_atLeast continuous_on_diff [OF g f]
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3080	by (simp add: continuous_on_closed_vimage [OF s])
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3081	also have "((\<lambda>x. g x - f x) -` {0..} \<inter> s) = {x\<in>s. f x \<le> g x}"
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3082	by auto
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3083	finally show ?thesis .
1331e57b54c6 moved material from Connected.thy to more appropriate places immler parents: 69611 diff changeset	3084	qed
69611 42cc3609fedf moved some material from Connected.thy to more appropriate places immler parents: 69544 diff changeset	3085
69618 2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3086	lemma continuous_le_on_closure:
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3087	fixes a::real
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3088	assumes f: "continuous_on (closure s) f"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3089	and x: "x \<in> closure(s)"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3090	and xlo: "\<And>x. x \<in> s ==> f(x) \<le> a"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3091	shows "f(x) \<le> a"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3092	using image_closure_subset [OF f, where T=" {x. x \<le> a}" ] assms
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3093	continuous_on_closed_Collect_le[of "UNIV" "\<lambda>x. x" "\<lambda>x. a"]
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3094	by auto
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3095
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3096	lemma continuous_ge_on_closure:
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3097	fixes a::real
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3098	assumes f: "continuous_on (closure s) f"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3099	and x: "x \<in> closure(s)"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3100	and xlo: "\<And>x. x \<in> s ==> f(x) \<ge> a"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3101	shows "f(x) \<ge> a"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3102	using image_closure_subset [OF f, where T=" {x. a \<le> x}"] assms
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3103	continuous_on_closed_Collect_le[of "UNIV" "\<lambda>x. a" "\<lambda>x. x"]
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3104	by auto
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3105
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3106
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3107	subsection\<open>The infimum of the distance between two sets\<close>
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3108
70136 f03a01a18c6e modernized tags: default scope excludes proof; wenzelm parents: 69922 diff changeset	3109	definition\<^marker>\<open>tag important\<close> setdist :: "'a::metric_space set \<Rightarrow> 'a set \<Rightarrow> real" where
69618 2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3110	"setdist s t \<equiv>
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3111	(if s = {} \<or> t = {} then 0
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3112	else Inf {dist x y\| x y. x \<in> s \<and> y \<in> t})"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3113
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3114	lemma setdist_empty1 [simp]: "setdist {} t = 0"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3115	by (simp add: setdist_def)
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3116
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3117	lemma setdist_empty2 [simp]: "setdist t {} = 0"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3118	by (simp add: setdist_def)
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3119
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3120	lemma setdist_pos_le [simp]: "0 \<le> setdist s t"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3121	by (auto simp: setdist_def ex_in_conv [symmetric] intro: cInf_greatest)
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3122
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3123	lemma le_setdistI:
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3124	assumes "s \<noteq> {}" "t \<noteq> {}" "\<And>x y. \<lbrakk>x \<in> s; y \<in> t\<rbrakk> \<Longrightarrow> d \<le> dist x y"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3125	shows "d \<le> setdist s t"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3126	using assms
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3127	by (auto simp: setdist_def Set.ex_in_conv [symmetric] intro: cInf_greatest)
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3128
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3129	lemma setdist_le_dist: "\<lbrakk>x \<in> s; y \<in> t\<rbrakk> \<Longrightarrow> setdist s t \<le> dist x y"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3130	unfolding setdist_def
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3131	by (auto intro!: bdd_belowI [where m=0] cInf_lower)
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3132
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3133	lemma le_setdist_iff:
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3134	"d \<le> setdist s t \<longleftrightarrow>
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3135	(\<forall>x \<in> s. \<forall>y \<in> t. d \<le> dist x y) \<and> (s = {} \<or> t = {} \<longrightarrow> d \<le> 0)"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3136	apply (cases "s = {} \<or> t = {}")
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3137	apply (force simp add: setdist_def)
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3138	apply (intro iffI conjI)
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3139	using setdist_le_dist apply fastforce
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3140	apply (auto simp: intro: le_setdistI)
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3141	done
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3142
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3143	lemma setdist_ltE:
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3144	assumes "setdist s t < b" "s \<noteq> {}" "t \<noteq> {}"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3145	obtains x y where "x \<in> s" "y \<in> t" "dist x y < b"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3146	using assms
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3147	by (auto simp: not_le [symmetric] le_setdist_iff)
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3148
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3149	lemma setdist_refl: "setdist s s = 0"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3150	apply (cases "s = {}")
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3151	apply (force simp add: setdist_def)
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3152	apply (rule antisym [OF _ setdist_pos_le])
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3153	apply (metis all_not_in_conv dist_self setdist_le_dist)
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3154	done
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3155
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3156	lemma setdist_sym: "setdist s t = setdist t s"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3157	by (force simp: setdist_def dist_commute intro!: arg_cong [where f=Inf])
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3158
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3159	lemma setdist_triangle: "setdist s t \<le> setdist s {a} + setdist {a} t"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3160	proof (cases "s = {} \<or> t = {}")
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3161	case True then show ?thesis
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3162	using setdist_pos_le by fastforce
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3163	next
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3164	case False
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3165	have "\<And>x. x \<in> s \<Longrightarrow> setdist s t - dist x a \<le> setdist {a} t"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3166	apply (rule le_setdistI, blast)
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3167	using False apply (fastforce intro: le_setdistI)
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3168	apply (simp add: algebra_simps)
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3169	apply (metis dist_commute dist_triangle3 order_trans [OF setdist_le_dist])
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3170	done
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3171	then have "setdist s t - setdist {a} t \<le> setdist s {a}"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3172	using False by (fastforce intro: le_setdistI)
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3173	then show ?thesis
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3174	by (simp add: algebra_simps)
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3175	qed
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3176
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3177	lemma setdist_singletons [simp]: "setdist {x} {y} = dist x y"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3178	by (simp add: setdist_def)
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3179
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3180	lemma setdist_Lipschitz: "\<bar>setdist {x} s - setdist {y} s\<bar> \<le> dist x y"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3181	apply (subst setdist_singletons [symmetric])
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3182	by (metis abs_diff_le_iff diff_le_eq setdist_triangle setdist_sym)
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3183
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3184	lemma continuous_at_setdist [continuous_intros]: "continuous (at x) (\<lambda>y. (setdist {y} s))"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3185	by (force simp: continuous_at_eps_delta dist_real_def intro: le_less_trans [OF setdist_Lipschitz])
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3186
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3187	lemma continuous_on_setdist [continuous_intros]: "continuous_on t (\<lambda>y. (setdist {y} s))"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3188	by (metis continuous_at_setdist continuous_at_imp_continuous_on)
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3189
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3190	lemma uniformly_continuous_on_setdist: "uniformly_continuous_on t (\<lambda>y. (setdist {y} s))"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3191	by (force simp: uniformly_continuous_on_def dist_real_def intro: le_less_trans [OF setdist_Lipschitz])
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3192
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3193	lemma setdist_subset_right: "\<lbrakk>t \<noteq> {}; t \<subseteq> u\<rbrakk> \<Longrightarrow> setdist s u \<le> setdist s t"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3194	apply (cases "s = {} \<or> u = {}", force)
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3195	apply (auto simp: setdist_def intro!: bdd_belowI [where m=0] cInf_superset_mono)
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3196	done
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3197
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3198	lemma setdist_subset_left: "\<lbrakk>s \<noteq> {}; s \<subseteq> t\<rbrakk> \<Longrightarrow> setdist t u \<le> setdist s u"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3199	by (metis setdist_subset_right setdist_sym)
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3200
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3201	lemma setdist_closure_1 [simp]: "setdist (closure s) t = setdist s t"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3202	proof (cases "s = {} \<or> t = {}")
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3203	case True then show ?thesis by force
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3204	next
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3205	case False
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3206	{ fix y
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3207	assume "y \<in> t"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3208	have "continuous_on (closure s) (\<lambda>a. dist a y)"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3209	by (auto simp: continuous_intros dist_norm)
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3210	then have *: "\<And>x. x \<in> closure s \<Longrightarrow> setdist s t \<le> dist x y"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3211	apply (rule continuous_ge_on_closure)
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3212	apply assumption
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3213	apply (blast intro: setdist_le_dist \<open>y \<in> t\<close> )
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3214	done
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3215	} note * = this
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3216	show ?thesis
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3217	apply (rule antisym)
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3218	using False closure_subset apply (blast intro: setdist_subset_left)
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3219	using False *
71174 7fac205dd737 tuned nipkow parents: 71028 diff changeset	3220	apply (force intro!: le_setdistI)
69618 2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3221	done
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3222	qed
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3223
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3224	lemma setdist_closure_2 [simp]: "setdist t (closure s) = setdist t s"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3225	by (metis setdist_closure_1 setdist_sym)
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3226
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3227	lemma setdist_eq_0I: "\<lbrakk>x \<in> S; x \<in> T\<rbrakk> \<Longrightarrow> setdist S T = 0"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3228	by (metis antisym dist_self setdist_le_dist setdist_pos_le)
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3229
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3230	lemma setdist_unique:
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3231	"\<lbrakk>a \<in> S; b \<in> T; \<And>x y. x \<in> S \<and> y \<in> T ==> dist a b \<le> dist x y\<rbrakk>
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3232	\<Longrightarrow> setdist S T = dist a b"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3233	by (force simp add: setdist_le_dist le_setdist_iff intro: antisym)
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3234
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3235	lemma setdist_le_sing: "x \<in> S ==> setdist S T \<le> setdist {x} T"
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3236	using setdist_subset_left by auto
2be1baf40351 moved setdist to more appropriate places immler parents: 69616 diff changeset	3237
69918 eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3238	lemma infdist_eq_setdist: "infdist x A = setdist {x} A"
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3239	by (simp add: infdist_def setdist_def Setcompr_eq_image)
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3240
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3241	lemma setdist_eq_infdist: "setdist A B = (if A = {} then 0 else INF a\<in>A. infdist a B)"
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3242	proof -
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3243	have "Inf {dist x y \|x y. x \<in> A \<and> y \<in> B} = (INF x\<in>A. Inf (dist x ` B))"
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3244	if "b \<in> B" "a \<in> A" for a b
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3245	proof (rule order_antisym)
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3246	have "Inf {dist x y \|x y. x \<in> A \<and> y \<in> B} \<le> Inf (dist x ` B)"
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3247	if "b \<in> B" "a \<in> A" "x \<in> A" for x
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3248	proof -
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3249	have *: "\<And>b'. b' \<in> B \<Longrightarrow> Inf {dist x y \|x y. x \<in> A \<and> y \<in> B} \<le> dist x b'"
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3250	by (metis (mono_tags, lifting) ex_in_conv setdist_def setdist_le_dist that(3))
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3251	show ?thesis
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3252	using that by (subst conditionally_complete_lattice_class.le_cInf_iff) (auto simp: *)+
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3253	qed
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3254	then show "Inf {dist x y \|x y. x \<in> A \<and> y \<in> B} \<le> (INF x\<in>A. Inf (dist x ` B))"
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3255	using that
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3256	by (subst conditionally_complete_lattice_class.le_cInf_iff) (auto simp: bdd_below_def)
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3257	next
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3258	have *: "\<And>x y. \<lbrakk>b \<in> B; a \<in> A; x \<in> A; y \<in> B\<rbrakk> \<Longrightarrow> \<exists>a\<in>A. Inf (dist a ` B) \<le> dist x y"
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3259	by (meson bdd_below_image_dist cINF_lower)
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3260	show "(INF x\<in>A. Inf (dist x ` B)) \<le> Inf {dist x y \|x y. x \<in> A \<and> y \<in> B}"
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3261	proof (rule conditionally_complete_lattice_class.cInf_mono)
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3262	show "bdd_below ((\<lambda>x. Inf (dist x ` B)) ` A)"
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3263	by (metis (no_types, lifting) bdd_belowI2 ex_in_conv infdist_def infdist_nonneg that(1))
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3264	qed (use that in \<open>auto simp: *\<close>)
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3265	qed
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3266	then show ?thesis
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3267	by (auto simp: setdist_def infdist_def)
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3268	qed
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3269
70724 65371451fde8 A few more simple results paulson <lp15@cam.ac.uk> parents: 70723 diff changeset	3270	lemma infdist_mono:
65371451fde8 A few more simple results paulson <lp15@cam.ac.uk> parents: 70723 diff changeset	3271	assumes "A \<subseteq> B" "A \<noteq> {}"
65371451fde8 A few more simple results paulson <lp15@cam.ac.uk> parents: 70723 diff changeset	3272	shows "infdist x B \<le> infdist x A"
65371451fde8 A few more simple results paulson <lp15@cam.ac.uk> parents: 70723 diff changeset	3273	by (simp add: assms infdist_eq_setdist setdist_subset_right)
65371451fde8 A few more simple results paulson <lp15@cam.ac.uk> parents: 70723 diff changeset	3274
65371451fde8 A few more simple results paulson <lp15@cam.ac.uk> parents: 70723 diff changeset	3275	lemma infdist_singleton [simp]:
65371451fde8 A few more simple results paulson <lp15@cam.ac.uk> parents: 70723 diff changeset	3276	"infdist x {y} = dist x y"
65371451fde8 A few more simple results paulson <lp15@cam.ac.uk> parents: 70723 diff changeset	3277	by (simp add: infdist_eq_setdist)
65371451fde8 A few more simple results paulson <lp15@cam.ac.uk> parents: 70723 diff changeset	3278
69918 eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3279	proposition setdist_attains_inf:
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3280	assumes "compact B" "B \<noteq> {}"
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3281	obtains y where "y \<in> B" "setdist A B = infdist y A"
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3282	proof (cases "A = {}")
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3283	case True
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3284	then show thesis
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3285	by (metis assms diameter_compact_attained infdist_def setdist_def that)
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3286	next
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3287	case False
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3288	obtain y where "y \<in> B" and min: "\<And>y'. y' \<in> B \<Longrightarrow> infdist y A \<le> infdist y' A"
70723 4e39d87c9737 imported new material mostly due to Sébastien Gouëzel paulson <lp15@cam.ac.uk> parents: 70617 diff changeset	3289	by (metis continuous_attains_inf [OF assms continuous_on_infdist] continuous_on_id)
69918 eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3290	show thesis
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3291	proof
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3292	have "setdist A B = (INF y\<in>B. infdist y A)"
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3293	by (metis \<open>B \<noteq> {}\<close> setdist_eq_infdist setdist_sym)
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3294	also have "\<dots> = infdist y A"
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3295	proof (rule order_antisym)
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3296	show "(INF y\<in>B. infdist y A) \<le> infdist y A"
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3297	proof (rule cInf_lower)
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3298	show "infdist y A \<in> (\<lambda>y. infdist y A) ` B"
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3299	using \<open>y \<in> B\<close> by blast
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3300	show "bdd_below ((\<lambda>y. infdist y A) ` B)"
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3301	by (meson bdd_belowI2 infdist_nonneg)
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3302	qed
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3303	next
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3304	show "infdist y A \<le> (INF y\<in>B. infdist y A)"
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3305	by (simp add: \<open>B \<noteq> {}\<close> cINF_greatest min)
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3306	qed
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3307	finally show "setdist A B = infdist y A" .
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3308	qed (fact \<open>y \<in> B\<close>)
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3309	qed
eddcc7c726f3 new material;' strengthened material; moved proofs out of Function_Topology in order to lessen its dependencies paulson <lp15@cam.ac.uk> parents: 69712 diff changeset	3310
70723 4e39d87c9737 imported new material mostly due to Sébastien Gouëzel paulson <lp15@cam.ac.uk> parents: 70617 diff changeset	3311	end

author	wenzelm
	Mon, 08 Jun 2020 22:49:06 +0200
changeset 71929	73ff22f99d38
parent 71633	07bec530f02e
child 72225	341b15d092f2
permissions	-rw-r--r--