| author | wenzelm |
| Fri, 04 Jan 2019 23:22:53 +0100 | |
| changeset 69593 | 3dda49e08b9d |
| parent 69313 | b021008c5397 |
| child 69712 | dc85b5b3a532 |
| permissions | -rw-r--r-- |
| 60727 | 1 |
(* Title: HOL/Library/Disjoint_Sets.thy |
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Author: Johannes Hölzl, TU München |
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*) |
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section \<open>Partitions and Disjoint Sets\<close> |
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theory Disjoint_Sets |
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imports Main |
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begin |
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lemma range_subsetD: "range f \<subseteq> B \<Longrightarrow> f i \<in> B" |
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by blast |
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lemma Int_Diff_disjoint: "A \<inter> B \<inter> (A - B) = {}"
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by blast |
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lemma Int_Diff_Un: "A \<inter> B \<union> (A - B) = A" |
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by blast |
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lemma mono_Un: "mono A \<Longrightarrow> (\<Union>i\<le>n. A i) = A n" |
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unfolding mono_def by auto |
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lemma disjnt_equiv_class: "equiv A r \<Longrightarrow> disjnt (r``{a}) (r``{b}) \<longleftrightarrow> (a, b) \<notin> r"
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by (auto dest: equiv_class_self simp: equiv_class_eq_iff disjnt_def) |
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subsection \<open>Set of Disjoint Sets\<close> |
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abbreviation disjoint :: "'a set set \<Rightarrow> bool" where "disjoint \<equiv> pairwise disjnt" |
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lemma disjoint_def: "disjoint A \<longleftrightarrow> (\<forall>a\<in>A. \<forall>b\<in>A. a \<noteq> b \<longrightarrow> a \<inter> b = {})"
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unfolding pairwise_def disjnt_def by auto |
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lemma disjointI: |
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"(\<And>a b. a \<in> A \<Longrightarrow> b \<in> A \<Longrightarrow> a \<noteq> b \<Longrightarrow> a \<inter> b = {}) \<Longrightarrow> disjoint A"
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unfolding disjoint_def by auto |
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lemma disjointD: |
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"disjoint A \<Longrightarrow> a \<in> A \<Longrightarrow> b \<in> A \<Longrightarrow> a \<noteq> b \<Longrightarrow> a \<inter> b = {}"
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unfolding disjoint_def by auto |
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lemma disjoint_image: "inj_on f (\<Union>A) \<Longrightarrow> disjoint A \<Longrightarrow> disjoint ((`) f ` A)" |
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unfolding inj_on_def disjoint_def by blast |
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lemma assumes "disjoint (A \<union> B)" |
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shows disjoint_unionD1: "disjoint A" and disjoint_unionD2: "disjoint B" |
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using assms by (simp_all add: disjoint_def) |
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lemma disjoint_INT: |
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assumes *: "\<And>i. i \<in> I \<Longrightarrow> disjoint (F i)" |
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shows "disjoint {\<Inter>i\<in>I. X i | X. \<forall>i\<in>I. X i \<in> F i}"
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proof (safe intro!: disjointI del: equalityI) |
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fix A B :: "'a \<Rightarrow> 'b set" assume "(\<Inter>i\<in>I. A i) \<noteq> (\<Inter>i\<in>I. B i)" |
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then obtain i where "A i \<noteq> B i" "i \<in> I" |
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by auto |
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moreover assume "\<forall>i\<in>I. A i \<in> F i" "\<forall>i\<in>I. B i \<in> F i" |
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ultimately show "(\<Inter>i\<in>I. A i) \<inter> (\<Inter>i\<in>I. B i) = {}"
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using *[OF \<open>i\<in>I\<close>, THEN disjointD, of "A i" "B i"] |
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by (auto simp flip: INT_Int_distrib) |
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qed |
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subsubsection "Family of Disjoint Sets" |
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definition disjoint_family_on :: "('i \<Rightarrow> 'a set) \<Rightarrow> 'i set \<Rightarrow> bool" where
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"disjoint_family_on A S \<longleftrightarrow> (\<forall>m\<in>S. \<forall>n\<in>S. m \<noteq> n \<longrightarrow> A m \<inter> A n = {})"
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abbreviation "disjoint_family A \<equiv> disjoint_family_on A UNIV" |
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lemma disjoint_family_elem_disjnt: |
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assumes "infinite A" "finite C" |
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and df: "disjoint_family_on B A" |
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obtains x where "x \<in> A" "disjnt C (B x)" |
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proof - |
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have "False" if *: "\<forall>x \<in> A. \<exists>y. y \<in> C \<and> y \<in> B x" |
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proof - |
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obtain g where g: "\<forall>x \<in> A. g x \<in> C \<and> g x \<in> B x" |
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using * by metis |
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with df have "inj_on g A" |
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by (fastforce simp add: inj_on_def disjoint_family_on_def) |
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then have "infinite (g ` A)" |
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using \<open>infinite A\<close> finite_image_iff by blast |
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then show False |
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by (meson \<open>finite C\<close> finite_subset g image_subset_iff) |
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qed |
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then show ?thesis |
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by (force simp: disjnt_iff intro: that) |
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qed |
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lemma disjoint_family_onD: |
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"disjoint_family_on A I \<Longrightarrow> i \<in> I \<Longrightarrow> j \<in> I \<Longrightarrow> i \<noteq> j \<Longrightarrow> A i \<inter> A j = {}"
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by (auto simp: disjoint_family_on_def) |
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lemma disjoint_family_subset: "disjoint_family A \<Longrightarrow> (\<And>x. B x \<subseteq> A x) \<Longrightarrow> disjoint_family B" |
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by (force simp add: disjoint_family_on_def) |
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lemma disjoint_family_on_bisimulation: |
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assumes "disjoint_family_on f S" |
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and "\<And>n m. n \<in> S \<Longrightarrow> m \<in> S \<Longrightarrow> n \<noteq> m \<Longrightarrow> f n \<inter> f m = {} \<Longrightarrow> g n \<inter> g m = {}"
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shows "disjoint_family_on g S" |
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using assms unfolding disjoint_family_on_def by auto |
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lemma disjoint_family_on_mono: |
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"A \<subseteq> B \<Longrightarrow> disjoint_family_on f B \<Longrightarrow> disjoint_family_on f A" |
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unfolding disjoint_family_on_def by auto |
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lemma disjoint_family_Suc: |
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"(\<And>n. A n \<subseteq> A (Suc n)) \<Longrightarrow> disjoint_family (\<lambda>i. A (Suc i) - A i)" |
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using lift_Suc_mono_le[of A] |
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by (auto simp add: disjoint_family_on_def) |
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(metis insert_absorb insert_subset le_SucE le_antisym not_le_imp_less less_imp_le) |
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lemma disjoint_family_on_disjoint_image: |
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"disjoint_family_on A I \<Longrightarrow> disjoint (A ` I)" |
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unfolding disjoint_family_on_def disjoint_def by force |
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lemma disjoint_family_on_vimageI: "disjoint_family_on F I \<Longrightarrow> disjoint_family_on (\<lambda>i. f -` F i) I" |
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by (auto simp: disjoint_family_on_def) |
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lemma disjoint_image_disjoint_family_on: |
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assumes d: "disjoint (A ` I)" and i: "inj_on A I" |
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shows "disjoint_family_on A I" |
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unfolding disjoint_family_on_def |
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proof (intro ballI impI) |
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fix n m assume nm: "m \<in> I" "n \<in> I" and "n \<noteq> m" |
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with i[THEN inj_onD, of n m] show "A n \<inter> A m = {}"
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by (intro disjointD[OF d]) auto |
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qed |
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lemma disjoint_UN: |
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assumes F: "\<And>i. i \<in> I \<Longrightarrow> disjoint (F i)" and *: "disjoint_family_on (\<lambda>i. \<Union>F i) I" |
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shows "disjoint (\<Union>i\<in>I. F i)" |
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proof (safe intro!: disjointI del: equalityI) |
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fix A B i j assume "A \<noteq> B" "A \<in> F i" "i \<in> I" "B \<in> F j" "j \<in> I" |
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show "A \<inter> B = {}"
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proof cases |
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assume "i = j" with F[of i] \<open>i \<in> I\<close> \<open>A \<in> F i\<close> \<open>B \<in> F j\<close> \<open>A \<noteq> B\<close> show "A \<inter> B = {}"
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by (auto dest: disjointD) |
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next |
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assume "i \<noteq> j" |
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with * \<open>i\<in>I\<close> \<open>j\<in>I\<close> have "(\<Union>F i) \<inter> (\<Union>F j) = {}"
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by (rule disjoint_family_onD) |
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with \<open>A\<in>F i\<close> \<open>i\<in>I\<close> \<open>B\<in>F j\<close> \<open>j\<in>I\<close> |
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show "A \<inter> B = {}"
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by auto |
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qed |
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qed |
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lemma distinct_list_bind: |
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assumes "distinct xs" "\<And>x. x \<in> set xs \<Longrightarrow> distinct (f x)" |
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"disjoint_family_on (set \<circ> f) (set xs)" |
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shows "distinct (List.bind xs f)" |
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using assms |
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by (induction xs) |
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(auto simp: disjoint_family_on_def distinct_map inj_on_def set_list_bind) |
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lemma bij_betw_UNION_disjoint: |
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assumes disj: "disjoint_family_on A' I" |
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assumes bij: "\<And>i. i \<in> I \<Longrightarrow> bij_betw f (A i) (A' i)" |
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shows "bij_betw f (\<Union>i\<in>I. A i) (\<Union>i\<in>I. A' i)" |
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unfolding bij_betw_def |
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proof |
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from bij show eq: "f ` \<Union>(A ` I) = \<Union>(A' ` I)" |
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by (auto simp: bij_betw_def image_UN) |
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show "inj_on f (\<Union>(A ` I))" |
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proof (rule inj_onI, clarify) |
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fix i j x y assume A: "i \<in> I" "j \<in> I" "x \<in> A i" "y \<in> A j" and B: "f x = f y" |
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from A bij[of i] bij[of j] have "f x \<in> A' i" "f y \<in> A' j" |
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by (auto simp: bij_betw_def) |
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with B have "A' i \<inter> A' j \<noteq> {}" by auto
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with disj A have "i = j" unfolding disjoint_family_on_def by blast |
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with A B bij[of i] show "x = y" by (auto simp: bij_betw_def dest: inj_onD) |
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qed |
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172 |
qed |
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173 |
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| 60727 | 174 |
lemma disjoint_union: "disjoint C \<Longrightarrow> disjoint B \<Longrightarrow> \<Union>C \<inter> \<Union>B = {} \<Longrightarrow> disjoint (C \<union> B)"
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175 |
using disjoint_UN[of "{C, B}" "\<lambda>x. x"] by (auto simp add: disjoint_family_on_def)
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text \<open> |
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The union of an infinite disjoint family of non-empty sets is infinite. |
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\<close> |
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lemma infinite_disjoint_family_imp_infinite_UNION: |
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181 |
assumes "\<not>finite A" "\<And>x. x \<in> A \<Longrightarrow> f x \<noteq> {}" "disjoint_family_on f A"
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| 69313 | 182 |
shows "\<not>finite (\<Union>(f ` A))" |
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183 |
proof - |
| 63148 | 184 |
define g where "g x = (SOME y. y \<in> f x)" for x |
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185 |
have g: "g x \<in> f x" if "x \<in> A" for x |
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unfolding g_def by (rule someI_ex, insert assms(2) that) blast |
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have inj_on_g: "inj_on g A" |
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proof (rule inj_onI, rule ccontr) |
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fix x y assume A: "x \<in> A" "y \<in> A" "g x = g y" "x \<noteq> y" |
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with g[of x] g[of y] have "g x \<in> f x" "g x \<in> f y" by auto |
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with A \<open>x \<noteq> y\<close> assms show False |
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by (auto simp: disjoint_family_on_def inj_on_def) |
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qed |
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from g have "g ` A \<subseteq> \<Union>(f ` A)" by blast |
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moreover from inj_on_g \<open>\<not>finite A\<close> have "\<not>finite (g ` A)" |
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using finite_imageD by blast |
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ultimately show ?thesis using finite_subset by blast |
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qed |
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200 |
|
| 60727 | 201 |
subsection \<open>Construct Disjoint Sequences\<close> |
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definition disjointed :: "(nat \<Rightarrow> 'a set) \<Rightarrow> nat \<Rightarrow> 'a set" where |
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"disjointed A n = A n - (\<Union>i\<in>{0..<n}. A i)"
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lemma finite_UN_disjointed_eq: "(\<Union>i\<in>{0..<n}. disjointed A i) = (\<Union>i\<in>{0..<n}. A i)"
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proof (induct n) |
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case 0 show ?case by simp |
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next |
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case (Suc n) |
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thus ?case by (simp add: atLeastLessThanSuc disjointed_def) |
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qed |
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lemma UN_disjointed_eq: "(\<Union>i. disjointed A i) = (\<Union>i. A i)" |
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by (rule UN_finite2_eq [where k=0]) |
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(simp add: finite_UN_disjointed_eq) |
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lemma less_disjoint_disjointed: "m < n \<Longrightarrow> disjointed A m \<inter> disjointed A n = {}"
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by (auto simp add: disjointed_def) |
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lemma disjoint_family_disjointed: "disjoint_family (disjointed A)" |
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by (simp add: disjoint_family_on_def) |
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(metis neq_iff Int_commute less_disjoint_disjointed) |
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lemma disjointed_subset: "disjointed A n \<subseteq> A n" |
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by (auto simp add: disjointed_def) |
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lemma disjointed_0[simp]: "disjointed A 0 = A 0" |
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by (simp add: disjointed_def) |
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lemma disjointed_mono: "mono A \<Longrightarrow> disjointed A (Suc n) = A (Suc n) - A n" |
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using mono_Un[of A] by (simp add: disjointed_def atLeastLessThanSuc_atLeastAtMost atLeast0AtMost) |
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subsection \<open>Partitions\<close> |
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text \<open> |
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Partitions \<^term>\<open>P\<close> of a set \<^term>\<open>A\<close>. We explicitly disallow empty sets. |
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\<close> |
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definition partition_on :: "'a set \<Rightarrow> 'a set set \<Rightarrow> bool" |
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where |
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"partition_on A P \<longleftrightarrow> \<Union>P = A \<and> disjoint P \<and> {} \<notin> P"
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lemma partition_onI: |
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"\<Union>P = A \<Longrightarrow> (\<And>p q. p \<in> P \<Longrightarrow> q \<in> P \<Longrightarrow> p \<noteq> q \<Longrightarrow> disjnt p q) \<Longrightarrow> {} \<notin> P \<Longrightarrow> partition_on A P"
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by (auto simp: partition_on_def pairwise_def) |
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lemma partition_onD1: "partition_on A P \<Longrightarrow> A = \<Union>P" |
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by (auto simp: partition_on_def) |
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lemma partition_onD2: "partition_on A P \<Longrightarrow> disjoint P" |
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by (auto simp: partition_on_def) |
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lemma partition_onD3: "partition_on A P \<Longrightarrow> {} \<notin> P"
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by (auto simp: partition_on_def) |
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subsection \<open>Constructions of partitions\<close> |
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lemma partition_on_empty: "partition_on {} P \<longleftrightarrow> P = {}"
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unfolding partition_on_def by fastforce |
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lemma partition_on_space: "A \<noteq> {} \<Longrightarrow> partition_on A {A}"
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by (auto simp: partition_on_def disjoint_def) |
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lemma partition_on_singletons: "partition_on A ((\<lambda>x. {x}) ` A)"
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by (auto simp: partition_on_def disjoint_def) |
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lemma partition_on_transform: |
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assumes P: "partition_on A P" |
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assumes F_UN: "\<Union>(F ` P) = F (\<Union>P)" and F_disjnt: "\<And>p q. p \<in> P \<Longrightarrow> q \<in> P \<Longrightarrow> disjnt p q \<Longrightarrow> disjnt (F p) (F q)" |
|
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shows "partition_on (F A) (F ` P - {{}})"
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proof - |
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have "\<Union>(F ` P - {{}}) = F A"
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unfolding P[THEN partition_onD1] F_UN[symmetric] by auto |
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with P show ?thesis |
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by (auto simp add: partition_on_def pairwise_def intro!: F_disjnt) |
|
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qed |
|
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||
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lemma partition_on_restrict: "partition_on A P \<Longrightarrow> partition_on (B \<inter> A) ((\<inter>) B ` P - {{}})"
|
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by (intro partition_on_transform) (auto simp: disjnt_def) |
281 |
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lemma partition_on_vimage: "partition_on A P \<Longrightarrow> partition_on (f -` A) ((-`) f ` P - {{}})"
|
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by (intro partition_on_transform) (auto simp: disjnt_def) |
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lemma partition_on_inj_image: |
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assumes P: "partition_on A P" and f: "inj_on f A" |
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shows "partition_on (f ` A) ((`) f ` P - {{}})"
|
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proof (rule partition_on_transform[OF P]) |
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show "p \<in> P \<Longrightarrow> q \<in> P \<Longrightarrow> disjnt p q \<Longrightarrow> disjnt (f ` p) (f ` q)" for p q |
|
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using f[THEN inj_onD] P[THEN partition_onD1] by (auto simp: disjnt_def) |
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qed auto |
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subsection \<open>Finiteness of partitions\<close> |
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lemma finitely_many_partition_on: |
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assumes "finite A" |
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shows "finite {P. partition_on A P}"
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proof (rule finite_subset) |
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show "{P. partition_on A P} \<subseteq> Pow (Pow A)"
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unfolding partition_on_def by auto |
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show "finite (Pow (Pow A))" |
|
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using assms by simp |
|
303 |
qed |
|
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lemma finite_elements: "finite A \<Longrightarrow> partition_on A P \<Longrightarrow> finite P" |
|
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using partition_onD1[of A P] by (simp add: finite_UnionD) |
|
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subsection \<open>Equivalence of partitions and equivalence classes\<close> |
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lemma partition_on_quotient: |
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assumes r: "equiv A r" |
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shows "partition_on A (A // r)" |
|
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proof (rule partition_onI) |
|
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from r have "refl_on A r" |
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by (auto elim: equivE) |
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then show "\<Union>(A // r) = A" "{} \<notin> A // r"
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by (auto simp: refl_on_def quotient_def) |
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fix p q assume "p \<in> A // r" "q \<in> A // r" "p \<noteq> q" |
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then obtain x y where "x \<in> A" "y \<in> A" "p = r `` {x}" "q = r `` {y}"
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by (auto simp: quotient_def) |
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with r equiv_class_eq_iff[OF r, of x y] \<open>p \<noteq> q\<close> show "disjnt p q" |
|
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by (auto simp: disjnt_equiv_class) |
|
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qed |
|
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lemma equiv_partition_on: |
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assumes P: "partition_on A P" |
|
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shows "equiv A {(x, y). \<exists>p \<in> P. x \<in> p \<and> y \<in> p}"
|
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proof (rule equivI) |
|
330 |
have "A = \<Union>P" "disjoint P" "{} \<notin> P"
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using P by (auto simp: partition_on_def) |
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then show "refl_on A {(x, y). \<exists>p\<in>P. x \<in> p \<and> y \<in> p}"
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unfolding refl_on_def by auto |
|
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show "trans {(x, y). \<exists>p\<in>P. x \<in> p \<and> y \<in> p}"
|
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using \<open>disjoint P\<close> by (auto simp: trans_def disjoint_def) |
|
336 |
qed (auto simp: sym_def) |
|
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lemma partition_on_eq_quotient: |
|
339 |
assumes P: "partition_on A P" |
|
340 |
shows "A // {(x, y). \<exists>p \<in> P. x \<in> p \<and> y \<in> p} = P"
|
|
341 |
unfolding quotient_def |
|
342 |
proof safe |
|
343 |
fix x assume "x \<in> A" |
|
344 |
then obtain p where "p \<in> P" "x \<in> p" "\<And>q. q \<in> P \<Longrightarrow> x \<in> q \<Longrightarrow> p = q" |
|
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using P by (auto simp: partition_on_def disjoint_def) |
|
346 |
then have "{y. \<exists>p\<in>P. x \<in> p \<and> y \<in> p} = p"
|
|
347 |
by (safe intro!: bexI[of _ p]) simp |
|
348 |
then show "{(x, y). \<exists>p\<in>P. x \<in> p \<and> y \<in> p} `` {x} \<in> P"
|
|
349 |
by (simp add: \<open>p \<in> P\<close>) |
|
350 |
next |
|
351 |
fix p assume "p \<in> P" |
|
352 |
then have "p \<noteq> {}"
|
|
353 |
using P by (auto simp: partition_on_def) |
|
354 |
then obtain x where "x \<in> p" |
|
355 |
by auto |
|
356 |
then have "x \<in> A" "\<And>q. q \<in> P \<Longrightarrow> x \<in> q \<Longrightarrow> p = q" |
|
357 |
using P \<open>p \<in> P\<close> by (auto simp: partition_on_def disjoint_def) |
|
358 |
with \<open>p\<in>P\<close> \<open>x \<in> p\<close> have "{y. \<exists>p\<in>P. x \<in> p \<and> y \<in> p} = p"
|
|
359 |
by (safe intro!: bexI[of _ p]) simp |
|
360 |
then show "p \<in> (\<Union>x\<in>A. {{(x, y). \<exists>p\<in>P. x \<in> p \<and> y \<in> p} `` {x}})"
|
|
361 |
by (auto intro: \<open>x \<in> A\<close>) |
|
362 |
qed |
|
363 |
||
364 |
lemma partition_on_alt: "partition_on A P \<longleftrightarrow> (\<exists>r. equiv A r \<and> P = A // r)" |
|
365 |
by (auto simp: partition_on_eq_quotient intro!: partition_on_quotient intro: equiv_partition_on) |
|
366 |
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| 62390 | 367 |
end |