author  haftmann 
Sat, 24 Dec 2011 15:53:08 +0100  
changeset 45963  1c7e6454883e 
parent 45144  3f4742ce4629 
child 46329  cf3b387ba667 
permissions  rwrr 
31596  1 
(* Author: Florian Haftmann, TU Muenchen *) 
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header {* Finite types as explicit enumerations *} 

4 

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theory Enum 

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imports Map String 
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begin 
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subsection {* Class @{text enum} *} 

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class enum = 
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fixes enum :: "'a list" 
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fixes enum_all :: "('a \<Rightarrow> bool) \<Rightarrow> bool" 
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fixes enum_ex :: "('a \<Rightarrow> bool) \<Rightarrow> bool" 
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assumes UNIV_enum: "UNIV = set enum" 
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and enum_distinct: "distinct enum" 
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assumes enum_all : "enum_all P = (\<forall> x. P x)" 
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assumes enum_ex : "enum_ex P = (\<exists> x. P x)" 
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begin 
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subclass finite proof 
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qed (simp add: UNIV_enum) 

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lemma enum_UNIV: "set enum = UNIV" unfolding UNIV_enum .. 
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lemma in_enum: "x \<in> set enum" 
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unfolding enum_UNIV by auto 
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lemma enum_eq_I: 

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assumes "\<And>x. x \<in> set xs" 

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shows "set enum = set xs" 

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proof  

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from assms UNIV_eq_I have "UNIV = set xs" by auto 

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with enum_UNIV show ?thesis by simp 
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qed 
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end 

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39 

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subsection {* Equality and order on functions *} 

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instantiation "fun" :: (enum, equal) equal 
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begin 
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definition 
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"HOL.equal f g \<longleftrightarrow> (\<forall>x \<in> set enum. f x = g x)" 
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instance proof 
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qed (simp_all add: equal_fun_def enum_UNIV fun_eq_iff) 
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end 

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lemma [code]: 
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"HOL.equal f g \<longleftrightarrow> enum_all (%x. f x = g x)" 
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by (auto simp add: equal enum_all fun_eq_iff) 
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lemma [code nbe]: 
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"HOL.equal (f :: _ \<Rightarrow> _) f \<longleftrightarrow> True" 
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by (fact equal_refl) 
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lemma order_fun [code]: 
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fixes f g :: "'a\<Colon>enum \<Rightarrow> 'b\<Colon>order" 
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shows "f \<le> g \<longleftrightarrow> enum_all (\<lambda>x. f x \<le> g x)" 
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and "f < g \<longleftrightarrow> f \<le> g \<and> enum_ex (\<lambda>x. f x \<noteq> g x)" 
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by (simp_all add: enum_all enum_ex fun_eq_iff le_fun_def order_less_le) 
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subsection {* Quantifiers *} 

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lemma all_code [code]: "(\<forall>x. P x) \<longleftrightarrow> enum_all P" 
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by (simp add: enum_all) 
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lemma exists_code [code]: "(\<exists>x. P x) \<longleftrightarrow> enum_ex P" 
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by (simp add: enum_ex) 
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lemma exists1_code[code]: "(\<exists>!x. P x) \<longleftrightarrow> list_ex1 P enum" 
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unfolding list_ex1_iff enum_UNIV by auto 
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subsection {* Default instances *} 

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primrec n_lists :: "nat \<Rightarrow> 'a list \<Rightarrow> 'a list list" where 
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"n_lists 0 xs = [[]]" 

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 "n_lists (Suc n) xs = concat (map (\<lambda>ys. map (\<lambda>y. y # ys) xs) (n_lists n xs))" 

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lemma n_lists_Nil [simp]: "n_lists n [] = (if n = 0 then [[]] else [])" 

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by (induct n) simp_all 

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lemma length_n_lists: "length (n_lists n xs) = length xs ^ n" 

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by (induct n) (auto simp add: length_concat o_def listsum_triv) 
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lemma length_n_lists_elem: "ys \<in> set (n_lists n xs) \<Longrightarrow> length ys = n" 

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by (induct n arbitrary: ys) auto 

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lemma set_n_lists: "set (n_lists n xs) = {ys. length ys = n \<and> set ys \<subseteq> set xs}" 

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proof (rule set_eqI) 
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fix ys :: "'a list" 
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show "ys \<in> set (n_lists n xs) \<longleftrightarrow> ys \<in> {ys. length ys = n \<and> set ys \<subseteq> set xs}" 

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proof  

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have "ys \<in> set (n_lists n xs) \<Longrightarrow> length ys = n" 

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by (induct n arbitrary: ys) auto 

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moreover have "\<And>x. ys \<in> set (n_lists n xs) \<Longrightarrow> x \<in> set ys \<Longrightarrow> x \<in> set xs" 

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by (induct n arbitrary: ys) auto 

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moreover have "set ys \<subseteq> set xs \<Longrightarrow> ys \<in> set (n_lists (length ys) xs)" 

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by (induct ys) auto 

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ultimately show ?thesis by auto 

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qed 

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qed 

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lemma distinct_n_lists: 

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assumes "distinct xs" 

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shows "distinct (n_lists n xs)" 

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proof (rule card_distinct) 

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from assms have card_length: "card (set xs) = length xs" by (rule distinct_card) 

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have "card (set (n_lists n xs)) = card (set xs) ^ n" 

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proof (induct n) 

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case 0 then show ?case by simp 

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next 

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case (Suc n) 

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moreover have "card (\<Union>ys\<in>set (n_lists n xs). (\<lambda>y. y # ys) ` set xs) 

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= (\<Sum>ys\<in>set (n_lists n xs). card ((\<lambda>y. y # ys) ` set xs))" 

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by (rule card_UN_disjoint) auto 

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moreover have "\<And>ys. card ((\<lambda>y. y # ys) ` set xs) = card (set xs)" 

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by (rule card_image) (simp add: inj_on_def) 

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ultimately show ?case by auto 

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qed 

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also have "\<dots> = length xs ^ n" by (simp add: card_length) 

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finally show "card (set (n_lists n xs)) = length (n_lists n xs)" 

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by (simp add: length_n_lists) 

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qed 

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lemma map_of_zip_enum_is_Some: 

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assumes "length ys = length (enum \<Colon> 'a\<Colon>enum list)" 

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shows "\<exists>y. map_of (zip (enum \<Colon> 'a\<Colon>enum list) ys) x = Some y" 

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proof  

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from assms have "x \<in> set (enum \<Colon> 'a\<Colon>enum list) \<longleftrightarrow> 

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(\<exists>y. map_of (zip (enum \<Colon> 'a\<Colon>enum list) ys) x = Some y)" 

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by (auto intro!: map_of_zip_is_Some) 

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then show ?thesis using enum_UNIV by auto 
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qed 
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lemma map_of_zip_enum_inject: 

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fixes xs ys :: "'b\<Colon>enum list" 

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assumes length: "length xs = length (enum \<Colon> 'a\<Colon>enum list)" 

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"length ys = length (enum \<Colon> 'a\<Colon>enum list)" 

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and map_of: "the \<circ> map_of (zip (enum \<Colon> 'a\<Colon>enum list) xs) = the \<circ> map_of (zip (enum \<Colon> 'a\<Colon>enum list) ys)" 

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shows "xs = ys" 

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proof  

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have "map_of (zip (enum \<Colon> 'a list) xs) = map_of (zip (enum \<Colon> 'a list) ys)" 

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proof 

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fix x :: 'a 

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from length map_of_zip_enum_is_Some obtain y1 y2 

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where "map_of (zip (enum \<Colon> 'a list) xs) x = Some y1" 

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and "map_of (zip (enum \<Colon> 'a list) ys) x = Some y2" by blast 

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moreover from map_of have "the (map_of (zip (enum \<Colon> 'a\<Colon>enum list) xs) x) = the (map_of (zip (enum \<Colon> 'a\<Colon>enum list) ys) x)" 

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by (auto dest: fun_cong) 

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ultimately show "map_of (zip (enum \<Colon> 'a\<Colon>enum list) xs) x = map_of (zip (enum \<Colon> 'a\<Colon>enum list) ys) x" 

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by simp 

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qed 

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with length enum_distinct show "xs = ys" by (rule map_of_zip_inject) 

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qed 

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definition 
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all_n_lists :: "(('a :: enum) list \<Rightarrow> bool) \<Rightarrow> nat \<Rightarrow> bool" 
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where 
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"all_n_lists P n = (\<forall>xs \<in> set (n_lists n enum). P xs)" 
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lemma [code]: 
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"all_n_lists P n = (if n = 0 then P [] else enum_all (%x. all_n_lists (%xs. P (x # xs)) (n  1)))" 
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unfolding all_n_lists_def enum_all 
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by (cases n) (auto simp add: enum_UNIV) 
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definition 
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ex_n_lists :: "(('a :: enum) list \<Rightarrow> bool) \<Rightarrow> nat \<Rightarrow> bool" 
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where 
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"ex_n_lists P n = (\<exists>xs \<in> set (n_lists n enum). P xs)" 
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lemma [code]: 
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"ex_n_lists P n = (if n = 0 then P [] else enum_ex (%x. ex_n_lists (%xs. P (x # xs)) (n  1)))" 
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unfolding ex_n_lists_def enum_ex 
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by (cases n) (auto simp add: enum_UNIV) 
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instantiation "fun" :: (enum, enum) enum 
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begin 

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definition 

37765  188 
"enum = map (\<lambda>ys. the o map_of (zip (enum\<Colon>'a list) ys)) (n_lists (length (enum\<Colon>'a\<Colon>enum list)) enum)" 
26444  189 

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definition 
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"enum_all P = all_n_lists (\<lambda>bs. P (the o map_of (zip enum bs))) (length (enum :: 'a list))" 
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definition 
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"enum_ex P = ex_n_lists (\<lambda>bs. P (the o map_of (zip enum bs))) (length (enum :: 'a list))" 
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instance proof 
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show "UNIV = set (enum \<Colon> ('a \<Rightarrow> 'b) list)" 

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proof (rule UNIV_eq_I) 

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fix f :: "'a \<Rightarrow> 'b" 

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have "f = the \<circ> map_of (zip (enum \<Colon> 'a\<Colon>enum list) (map f enum))" 

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by (auto simp add: map_of_zip_map fun_eq_iff intro: in_enum) 
26444  203 
then show "f \<in> set enum" 
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by (auto simp add: enum_fun_def set_n_lists intro: in_enum) 
26444  205 
qed 
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next 

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from map_of_zip_enum_inject 

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show "distinct (enum \<Colon> ('a \<Rightarrow> 'b) list)" 

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by (auto intro!: inj_onI simp add: enum_fun_def 

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distinct_map distinct_n_lists enum_distinct set_n_lists enum_all) 

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next 
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fix P 
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show "enum_all (P :: ('a \<Rightarrow> 'b) \<Rightarrow> bool) = (\<forall>x. P x)" 
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proof 
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assume "enum_all P" 
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show "\<forall>x. P x" 
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proof 
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fix f :: "'a \<Rightarrow> 'b" 
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have f: "f = the \<circ> map_of (zip (enum \<Colon> 'a\<Colon>enum list) (map f enum))" 
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by (auto simp add: map_of_zip_map fun_eq_iff intro: in_enum) 
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from `enum_all P` have "P (the \<circ> map_of (zip enum (map f enum)))" 
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unfolding enum_all_fun_def all_n_lists_def 
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apply (simp add: set_n_lists) 
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apply (erule_tac x="map f enum" in allE) 
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apply (auto intro!: in_enum) 
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done 
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from this f show "P f" by auto 
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qed 
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next 
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assume "\<forall>x. P x" 
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from this show "enum_all P" 
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unfolding enum_all_fun_def all_n_lists_def by auto 
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qed 
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next 
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fix P 
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show "enum_ex (P :: ('a \<Rightarrow> 'b) \<Rightarrow> bool) = (\<exists>x. P x)" 
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proof 
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assume "enum_ex P" 
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from this show "\<exists>x. P x" 
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unfolding enum_ex_fun_def ex_n_lists_def by auto 
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next 
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assume "\<exists>x. P x" 
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from this obtain f where "P f" .. 
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have f: "f = the \<circ> map_of (zip (enum \<Colon> 'a\<Colon>enum list) (map f enum))" 
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by (auto simp add: map_of_zip_map fun_eq_iff intro: in_enum) 
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from `P f` this have "P (the \<circ> map_of (zip (enum \<Colon> 'a\<Colon>enum list) (map f enum)))" 
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by auto 
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from this show "enum_ex P" 
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unfolding enum_ex_fun_def ex_n_lists_def 
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apply (auto simp add: set_n_lists) 
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251 
apply (rule_tac x="map f enum" in exI) 
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252 
apply (auto intro!: in_enum) 
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253 
done 
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254 
qed 
26444  255 
qed 
256 

257 
end 

258 

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lemma enum_fun_code [code]: "enum = (let enum_a = (enum \<Colon> 'a\<Colon>{enum, equal} list) 
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in map (\<lambda>ys. the o map_of (zip enum_a ys)) (n_lists (length enum_a) enum))" 
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by (simp add: enum_fun_def Let_def) 
26444  262 

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lemma enum_all_fun_code [code]: 
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"enum_all P = (let enum_a = (enum :: 'a::{enum, equal} list) 
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in all_n_lists (\<lambda>bs. P (the o map_of (zip enum_a bs))) (length enum_a))" 
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by (simp add: enum_all_fun_def Let_def) 
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267 

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lemma enum_ex_fun_code [code]: 
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"enum_ex P = (let enum_a = (enum :: 'a::{enum, equal} list) 
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in ex_n_lists (\<lambda>bs. P (the o map_of (zip enum_a bs))) (length enum_a))" 
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by (simp add: enum_ex_fun_def Let_def) 
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26348  273 
instantiation unit :: enum 
274 
begin 

275 

276 
definition 

277 
"enum = [()]" 

278 

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definition 
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"enum_all P = P ()" 
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281 

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definition 
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"enum_ex P = P ()" 
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31464  285 
instance proof 
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qed (auto simp add: enum_unit_def UNIV_unit enum_all_unit_def enum_ex_unit_def intro: unit.exhaust) 
26348  287 

288 
end 

289 

290 
instantiation bool :: enum 

291 
begin 

292 

293 
definition 

294 
"enum = [False, True]" 

295 

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definition 
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"enum_all P = (P False \<and> P True)" 
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definition 
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"enum_ex P = (P False \<or> P True)" 
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31464  302 
instance proof 
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fix P 
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show "enum_all (P :: bool \<Rightarrow> bool) = (\<forall>x. P x)" 
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305 
unfolding enum_all_bool_def by (auto, case_tac x) auto 
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next 
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fix P 
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show "enum_ex (P :: bool \<Rightarrow> bool) = (\<exists>x. P x)" 
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unfolding enum_ex_bool_def by (auto, case_tac x) auto 
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qed (auto simp add: enum_bool_def UNIV_bool) 
26348  311 

312 
end 

313 

314 
primrec product :: "'a list \<Rightarrow> 'b list \<Rightarrow> ('a \<times> 'b) list" where 

315 
"product [] _ = []" 

316 
 "product (x#xs) ys = map (Pair x) ys @ product xs ys" 

317 

318 
lemma product_list_set: 

319 
"set (product xs ys) = set xs \<times> set ys" 

320 
by (induct xs) auto 

321 

26444  322 
lemma distinct_product: 
323 
assumes "distinct xs" and "distinct ys" 

324 
shows "distinct (product xs ys)" 

325 
using assms by (induct xs) 

326 
(auto intro: inj_onI simp add: product_list_set distinct_map) 

327 

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instantiation prod :: (enum, enum) enum 
26348  329 
begin 
330 

331 
definition 

332 
"enum = product enum enum" 

333 

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definition 
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"enum_all P = enum_all (%x. enum_all (%y. P (x, y)))" 
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336 

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definition 
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"enum_ex P = enum_ex (%x. enum_ex (%y. P (x, y)))" 
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339 

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26348  341 
instance by default 
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(simp_all add: enum_prod_def product_list_set distinct_product 
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enum_UNIV enum_distinct enum_all_prod_def enum_all enum_ex_prod_def enum_ex) 
26348  344 

345 
end 

346 

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instantiation sum :: (enum, enum) enum 
26348  348 
begin 
349 

350 
definition 

351 
"enum = map Inl enum @ map Inr enum" 

352 

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definition 
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"enum_all P = (enum_all (%x. P (Inl x)) \<and> enum_all (%x. P (Inr x)))" 
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355 

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356 
definition 
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"enum_ex P = (enum_ex (%x. P (Inl x)) \<or> enum_ex (%x. P (Inr x)))" 
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358 

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instance proof 
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360 
fix P 
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show "enum_all (P :: ('a + 'b) \<Rightarrow> bool) = (\<forall>x. P x)" 
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362 
unfolding enum_all_sum_def enum_all 
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363 
by (auto, case_tac x) auto 
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364 
next 
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365 
fix P 
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366 
show "enum_ex (P :: ('a + 'b) \<Rightarrow> bool) = (\<exists>x. P x)" 
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367 
unfolding enum_ex_sum_def enum_ex 
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368 
by (auto, case_tac x) auto 
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qed (auto simp add: enum_UNIV enum_sum_def, case_tac x, auto intro: inj_onI simp add: distinct_map enum_distinct) 
26348  370 

371 
end 

372 

373 
instantiation nibble :: enum 

374 
begin 

375 

376 
definition 

377 
"enum = [Nibble0, Nibble1, Nibble2, Nibble3, Nibble4, Nibble5, Nibble6, Nibble7, 

378 
Nibble8, Nibble9, NibbleA, NibbleB, NibbleC, NibbleD, NibbleE, NibbleF]" 

379 

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380 
definition 
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"enum_all P = (P Nibble0 \<and> P Nibble1 \<and> P Nibble2 \<and> P Nibble3 \<and> P Nibble4 \<and> P Nibble5 \<and> P Nibble6 \<and> P Nibble7 
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\<and> P Nibble8 \<and> P Nibble9 \<and> P NibbleA \<and> P NibbleB \<and> P NibbleC \<and> P NibbleD \<and> P NibbleE \<and> P NibbleF)" 
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383 

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384 
definition 
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385 
"enum_ex P = (P Nibble0 \<or> P Nibble1 \<or> P Nibble2 \<or> P Nibble3 \<or> P Nibble4 \<or> P Nibble5 \<or> P Nibble6 \<or> P Nibble7 
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\<or> P Nibble8 \<or> P Nibble9 \<or> P NibbleA \<or> P NibbleB \<or> P NibbleC \<or> P NibbleD \<or> P NibbleE \<or> P NibbleF)" 
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387 

31464  388 
instance proof 
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389 
fix P 
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390 
show "enum_all (P :: nibble \<Rightarrow> bool) = (\<forall>x. P x)" 
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391 
unfolding enum_all_nibble_def 
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392 
by (auto, case_tac x) auto 
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393 
next 
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394 
fix P 
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395 
show "enum_ex (P :: nibble \<Rightarrow> bool) = (\<exists>x. P x)" 
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396 
unfolding enum_ex_nibble_def 
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397 
by (auto, case_tac x) auto 
31464  398 
qed (simp_all add: enum_nibble_def UNIV_nibble) 
26348  399 

400 
end 

401 

402 
instantiation char :: enum 

403 
begin 

404 

405 
definition 

37765  406 
"enum = map (split Char) (product enum enum)" 
26444  407 

31482  408 
lemma enum_chars [code]: 
409 
"enum = chars" 

410 
unfolding enum_char_def chars_def enum_nibble_def by simp 

26348  411 

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412 
definition 
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413 
"enum_all P = list_all P chars" 
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414 

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415 
definition 
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416 
"enum_ex P = list_ex P chars" 
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417 

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418 
lemma set_enum_char: "set (enum :: char list) = UNIV" 
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419 
by (auto intro: char.exhaust simp add: enum_char_def product_list_set enum_UNIV full_SetCompr_eq [symmetric]) 
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420 

31464  421 
instance proof 
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422 
fix P 
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423 
show "enum_all (P :: char \<Rightarrow> bool) = (\<forall>x. P x)" 
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424 
unfolding enum_all_char_def enum_chars[symmetric] 
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425 
by (auto simp add: list_all_iff set_enum_char) 
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426 
next 
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427 
fix P 
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428 
show "enum_ex (P :: char \<Rightarrow> bool) = (\<exists>x. P x)" 
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429 
unfolding enum_ex_char_def enum_chars[symmetric] 
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430 
by (auto simp add: list_ex_iff set_enum_char) 
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431 
next 
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432 
show "distinct (enum :: char list)" 
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433 
by (auto intro: inj_onI simp add: enum_char_def product_list_set distinct_map distinct_product enum_distinct) 
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434 
qed (auto simp add: set_enum_char) 
26348  435 

436 
end 

437 

29024  438 
instantiation option :: (enum) enum 
439 
begin 

440 

441 
definition 

442 
"enum = None # map Some enum" 

443 

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444 
definition 
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445 
"enum_all P = (P None \<and> enum_all (%x. P (Some x)))" 
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446 

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447 
definition 
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448 
"enum_ex P = (P None \<or> enum_ex (%x. P (Some x)))" 
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449 

31464  450 
instance proof 
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451 
fix P 
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452 
show "enum_all (P :: 'a option \<Rightarrow> bool) = (\<forall>x. P x)" 
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453 
unfolding enum_all_option_def enum_all 
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454 
by (auto, case_tac x) auto 
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455 
next 
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456 
fix P 
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457 
show "enum_ex (P :: 'a option \<Rightarrow> bool) = (\<exists>x. P x)" 
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458 
unfolding enum_ex_option_def enum_ex 
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459 
by (auto, case_tac x) auto 
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460 
qed (auto simp add: enum_UNIV enum_option_def, rule option.exhaust, auto intro: simp add: distinct_map enum_distinct) 
45963
1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

461 
end 
1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

462 

1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

463 
primrec sublists :: "'a list \<Rightarrow> 'a list list" where 
1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
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diff
changeset

464 
"sublists [] = [[]]" 
1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

465 
 "sublists (x#xs) = (let xss = sublists xs in map (Cons x) xss @ xss)" 
1c7e6454883e
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haftmann
parents:
45144
diff
changeset

466 

1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

467 
lemma length_sublists: 
1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

468 
"length (sublists xs) = Suc (Suc (0\<Colon>nat)) ^ length xs" 
1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

469 
by (induct xs) (simp_all add: Let_def) 
1c7e6454883e
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haftmann
parents:
45144
diff
changeset

470 

1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

471 
lemma sublists_powset: 
1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

472 
"set ` set (sublists xs) = Pow (set xs)" 
1c7e6454883e
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haftmann
parents:
45144
diff
changeset

473 
proof  
1c7e6454883e
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haftmann
parents:
45144
diff
changeset

474 
have aux: "\<And>x A. set ` Cons x ` A = insert x ` set ` A" 
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enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

475 
by (auto simp add: image_def) 
1c7e6454883e
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haftmann
parents:
45144
diff
changeset

476 
have "set (map set (sublists xs)) = Pow (set xs)" 
1c7e6454883e
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haftmann
parents:
45144
diff
changeset

477 
by (induct xs) 
1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

478 
(simp_all add: aux Let_def Pow_insert Un_commute comp_def del: map_map) 
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haftmann
parents:
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diff
changeset

479 
then show ?thesis by simp 
1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

480 
qed 
1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

481 

1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

482 
lemma distinct_set_sublists: 
1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

483 
assumes "distinct xs" 
1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

484 
shows "distinct (map set (sublists xs))" 
1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

485 
proof (rule card_distinct) 
1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

486 
have "finite (set xs)" by rule 
1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

487 
then have "card (Pow (set xs)) = Suc (Suc 0) ^ card (set xs)" by (rule card_Pow) 
1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

488 
with assms distinct_card [of xs] 
1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

489 
have "card (Pow (set xs)) = Suc (Suc 0) ^ length xs" by simp 
1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

490 
then show "card (set (map set (sublists xs))) = length (map set (sublists xs))" 
1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

491 
by (simp add: sublists_powset length_sublists) 
1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

492 
qed 
1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

493 

1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

494 
instantiation set :: (enum) enum 
1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

495 
begin 
1c7e6454883e
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haftmann
parents:
45144
diff
changeset

496 

1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

497 
definition 
1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

498 
"enum = map set (sublists enum)" 
1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

499 

1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

500 
definition 
1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

501 
"enum_all P \<longleftrightarrow> (\<forall>A\<in>set enum. P (A::'a set))" 
1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

502 

1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

503 
definition 
1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

504 
"enum_ex P \<longleftrightarrow> (\<exists>A\<in>set enum. P (A::'a set))" 
1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

505 

1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

506 
instance proof 
1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

507 
qed (simp_all add: enum_set_def enum_all_set_def enum_ex_set_def sublists_powset distinct_set_sublists 
1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
45144
diff
changeset

508 
enum_distinct enum_UNIV) 
29024  509 

510 
end 

511 

45963
1c7e6454883e
enum type class instance for `set`; dropped misfitting code lemma for trancl
haftmann
parents:
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diff
changeset

512 

40647  513 
subsection {* Small finite types *} 
514 

515 
text {* We define small finite types for the use in Quickcheck *} 

516 

517 
datatype finite_1 = a\<^isub>1 

518 

40900
1d5f76d79856
adding shorter output syntax for the finite types of quickcheck
bulwahn
parents:
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diff
changeset

519 
notation (output) a\<^isub>1 ("a\<^isub>1") 
1d5f76d79856
adding shorter output syntax for the finite types of quickcheck
bulwahn
parents:
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diff
changeset

520 

40647  521 
instantiation finite_1 :: enum 
522 
begin 

523 

524 
definition 

525 
"enum = [a\<^isub>1]" 

526 

41078
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

527 
definition 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

528 
"enum_all P = P a\<^isub>1" 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

529 

051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

530 
definition 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

531 
"enum_ex P = P a\<^isub>1" 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

532 

40647  533 
instance proof 
41078
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

534 
fix P 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

535 
show "enum_all (P :: finite_1 \<Rightarrow> bool) = (\<forall>x. P x)" 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

536 
unfolding enum_all_finite_1_def 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

537 
by (auto, case_tac x) auto 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

538 
next 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

539 
fix P 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

540 
show "enum_ex (P :: finite_1 \<Rightarrow> bool) = (\<exists>x. P x)" 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

541 
unfolding enum_ex_finite_1_def 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

542 
by (auto, case_tac x) auto 
40647  543 
qed (auto simp add: enum_finite_1_def intro: finite_1.exhaust) 
544 

29024  545 
end 
40647  546 

40651
9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

547 
instantiation finite_1 :: linorder 
9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

548 
begin 
9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

549 

9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

550 
definition less_eq_finite_1 :: "finite_1 \<Rightarrow> finite_1 \<Rightarrow> bool" 
9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

551 
where 
9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

552 
"less_eq_finite_1 x y = True" 
9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

553 

9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

554 
definition less_finite_1 :: "finite_1 \<Rightarrow> finite_1 \<Rightarrow> bool" 
9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

555 
where 
9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

556 
"less_finite_1 x y = False" 
9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

557 

9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

558 
instance 
9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

559 
apply (intro_classes) 
9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

560 
apply (auto simp add: less_finite_1_def less_eq_finite_1_def) 
9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

561 
apply (metis finite_1.exhaust) 
9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

562 
done 
9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

563 

9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

564 
end 
9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

565 

41085
a549ff1d4070
adding a smarter enumeration scheme for finite functions
bulwahn
parents:
41078
diff
changeset

566 
hide_const (open) a\<^isub>1 
40657  567 

40647  568 
datatype finite_2 = a\<^isub>1  a\<^isub>2 
569 

40900
1d5f76d79856
adding shorter output syntax for the finite types of quickcheck
bulwahn
parents:
40898
diff
changeset

570 
notation (output) a\<^isub>1 ("a\<^isub>1") 
1d5f76d79856
adding shorter output syntax for the finite types of quickcheck
bulwahn
parents:
40898
diff
changeset

571 
notation (output) a\<^isub>2 ("a\<^isub>2") 
1d5f76d79856
adding shorter output syntax for the finite types of quickcheck
bulwahn
parents:
40898
diff
changeset

572 

40647  573 
instantiation finite_2 :: enum 
574 
begin 

575 

576 
definition 

577 
"enum = [a\<^isub>1, a\<^isub>2]" 

578 

41078
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

579 
definition 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

580 
"enum_all P = (P a\<^isub>1 \<and> P a\<^isub>2)" 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

581 

051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

582 
definition 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

583 
"enum_ex P = (P a\<^isub>1 \<or> P a\<^isub>2)" 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

584 

40647  585 
instance proof 
41078
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

586 
fix P 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

587 
show "enum_all (P :: finite_2 \<Rightarrow> bool) = (\<forall>x. P x)" 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

588 
unfolding enum_all_finite_2_def 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

589 
by (auto, case_tac x) auto 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

590 
next 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

591 
fix P 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

592 
show "enum_ex (P :: finite_2 \<Rightarrow> bool) = (\<exists>x. P x)" 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

593 
unfolding enum_ex_finite_2_def 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

594 
by (auto, case_tac x) auto 
40647  595 
qed (auto simp add: enum_finite_2_def intro: finite_2.exhaust) 
596 

597 
end 

598 

40651
9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

599 
instantiation finite_2 :: linorder 
9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

600 
begin 
9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

601 

9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

602 
definition less_finite_2 :: "finite_2 \<Rightarrow> finite_2 \<Rightarrow> bool" 
9752ba7348b5
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bulwahn
parents:
40650
diff
changeset

603 
where 
9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

604 
"less_finite_2 x y = ((x = a\<^isub>1) & (y = a\<^isub>2))" 
9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

605 

9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

606 
definition less_eq_finite_2 :: "finite_2 \<Rightarrow> finite_2 \<Rightarrow> bool" 
9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

607 
where 
9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

608 
"less_eq_finite_2 x y = ((x = y) \<or> (x < y))" 
9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

609 

9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

610 

9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

611 
instance 
9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

612 
apply (intro_classes) 
9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

613 
apply (auto simp add: less_finite_2_def less_eq_finite_2_def) 
9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

614 
apply (metis finite_2.distinct finite_2.nchotomy)+ 
9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

615 
done 
9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

616 

9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

617 
end 
9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

618 

41085
a549ff1d4070
adding a smarter enumeration scheme for finite functions
bulwahn
parents:
41078
diff
changeset

619 
hide_const (open) a\<^isub>1 a\<^isub>2 
40657  620 

40651
9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

621 

40647  622 
datatype finite_3 = a\<^isub>1  a\<^isub>2  a\<^isub>3 
623 

40900
1d5f76d79856
adding shorter output syntax for the finite types of quickcheck
bulwahn
parents:
40898
diff
changeset

624 
notation (output) a\<^isub>1 ("a\<^isub>1") 
1d5f76d79856
adding shorter output syntax for the finite types of quickcheck
bulwahn
parents:
40898
diff
changeset

625 
notation (output) a\<^isub>2 ("a\<^isub>2") 
1d5f76d79856
adding shorter output syntax for the finite types of quickcheck
bulwahn
parents:
40898
diff
changeset

626 
notation (output) a\<^isub>3 ("a\<^isub>3") 
1d5f76d79856
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627 

40647  628 
instantiation finite_3 :: enum 
629 
begin 

630 

631 
definition 

632 
"enum = [a\<^isub>1, a\<^isub>2, a\<^isub>3]" 

633 

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634 
definition 
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635 
"enum_all P = (P a\<^isub>1 \<and> P a\<^isub>2 \<and> P a\<^isub>3)" 
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changeset

636 

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637 
definition 
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638 
"enum_ex P = (P a\<^isub>1 \<or> P a\<^isub>2 \<or> P a\<^isub>3)" 
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639 

40647  640 
instance proof 
41078
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changeset

641 
fix P 
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642 
show "enum_all (P :: finite_3 \<Rightarrow> bool) = (\<forall>x. P x)" 
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changeset

643 
unfolding enum_all_finite_3_def 
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644 
by (auto, case_tac x) auto 
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645 
next 
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changeset

646 
fix P 
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647 
show "enum_ex (P :: finite_3 \<Rightarrow> bool) = (\<exists>x. P x)" 
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changeset

648 
unfolding enum_ex_finite_3_def 
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changeset

649 
by (auto, case_tac x) auto 
40647  650 
qed (auto simp add: enum_finite_3_def intro: finite_3.exhaust) 
651 

652 
end 

653 

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654 
instantiation finite_3 :: linorder 
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655 
begin 
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656 

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657 
definition less_finite_3 :: "finite_3 \<Rightarrow> finite_3 \<Rightarrow> bool" 
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658 
where 
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659 
"less_finite_3 x y = (case x of a\<^isub>1 => (y \<noteq> a\<^isub>1) 
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changeset

660 
 a\<^isub>2 => (y = a\<^isub>3) a\<^isub>3 => False)" 
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changeset

661 

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changeset

662 
definition less_eq_finite_3 :: "finite_3 \<Rightarrow> finite_3 \<Rightarrow> bool" 
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changeset

663 
where 
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adding code equation for function equality; adding some instantiations for the finite types
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changeset

664 
"less_eq_finite_3 x y = ((x = y) \<or> (x < y))" 
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changeset

665 

9752ba7348b5
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diff
changeset

666 

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adding code equation for function equality; adding some instantiations for the finite types
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changeset

667 
instance proof (intro_classes) 
9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
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changeset

668 
qed (auto simp add: less_finite_3_def less_eq_finite_3_def split: finite_3.split_asm) 
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diff
changeset

669 

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changeset

670 
end 
9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
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diff
changeset

671 

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a549ff1d4070
adding a smarter enumeration scheme for finite functions
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diff
changeset

672 
hide_const (open) a\<^isub>1 a\<^isub>2 a\<^isub>3 
40657  673 

40651
9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
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diff
changeset

674 

40647  675 
datatype finite_4 = a\<^isub>1  a\<^isub>2  a\<^isub>3  a\<^isub>4 
676 

40900
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adding shorter output syntax for the finite types of quickcheck
bulwahn
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diff
changeset

677 
notation (output) a\<^isub>1 ("a\<^isub>1") 
1d5f76d79856
adding shorter output syntax for the finite types of quickcheck
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parents:
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diff
changeset

678 
notation (output) a\<^isub>2 ("a\<^isub>2") 
1d5f76d79856
adding shorter output syntax for the finite types of quickcheck
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parents:
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diff
changeset

679 
notation (output) a\<^isub>3 ("a\<^isub>3") 
1d5f76d79856
adding shorter output syntax for the finite types of quickcheck
bulwahn
parents:
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diff
changeset

680 
notation (output) a\<^isub>4 ("a\<^isub>4") 
1d5f76d79856
adding shorter output syntax for the finite types of quickcheck
bulwahn
parents:
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diff
changeset

681 

40647  682 
instantiation finite_4 :: enum 
683 
begin 

684 

685 
definition 

686 
"enum = [a\<^isub>1, a\<^isub>2, a\<^isub>3, a\<^isub>4]" 

687 

41078
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
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diff
changeset

688 
definition 
051251fde456
adding more efficient implementations for quantifiers in Enum
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parents:
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diff
changeset

689 
"enum_all P = (P a\<^isub>1 \<and> P a\<^isub>2 \<and> P a\<^isub>3 \<and> P a\<^isub>4)" 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
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diff
changeset

690 

051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
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diff
changeset

691 
definition 
051251fde456
adding more efficient implementations for quantifiers in Enum
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parents:
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diff
changeset

692 
"enum_ex P = (P a\<^isub>1 \<or> P a\<^isub>2 \<or> P a\<^isub>3 \<or> P a\<^isub>4)" 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
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diff
changeset

693 

40647  694 
instance proof 
41078
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

695 
fix P 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
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diff
changeset

696 
show "enum_all (P :: finite_4 \<Rightarrow> bool) = (\<forall>x. P x)" 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
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diff
changeset

697 
unfolding enum_all_finite_4_def 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

698 
by (auto, case_tac x) auto 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

699 
next 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

700 
fix P 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

701 
show "enum_ex (P :: finite_4 \<Rightarrow> bool) = (\<exists>x. P x)" 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

702 
unfolding enum_ex_finite_4_def 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

703 
by (auto, case_tac x) auto 
40647  704 
qed (auto simp add: enum_finite_4_def intro: finite_4.exhaust) 
705 

706 
end 

707 

41085
a549ff1d4070
adding a smarter enumeration scheme for finite functions
bulwahn
parents:
41078
diff
changeset

708 
hide_const (open) a\<^isub>1 a\<^isub>2 a\<^isub>3 a\<^isub>4 
40651
9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

709 

9752ba7348b5
adding code equation for function equality; adding some instantiations for the finite types
bulwahn
parents:
40650
diff
changeset

710 

40647  711 
datatype finite_5 = a\<^isub>1  a\<^isub>2  a\<^isub>3  a\<^isub>4  a\<^isub>5 
712 

40900
1d5f76d79856
adding shorter output syntax for the finite types of quickcheck
bulwahn
parents:
40898
diff
changeset

713 
notation (output) a\<^isub>1 ("a\<^isub>1") 
1d5f76d79856
adding shorter output syntax for the finite types of quickcheck
bulwahn
parents:
40898
diff
changeset

714 
notation (output) a\<^isub>2 ("a\<^isub>2") 
1d5f76d79856
adding shorter output syntax for the finite types of quickcheck
bulwahn
parents:
40898
diff
changeset

715 
notation (output) a\<^isub>3 ("a\<^isub>3") 
1d5f76d79856
adding shorter output syntax for the finite types of quickcheck
bulwahn
parents:
40898
diff
changeset

716 
notation (output) a\<^isub>4 ("a\<^isub>4") 
1d5f76d79856
adding shorter output syntax for the finite types of quickcheck
bulwahn
parents:
40898
diff
changeset

717 
notation (output) a\<^isub>5 ("a\<^isub>5") 
1d5f76d79856
adding shorter output syntax for the finite types of quickcheck
bulwahn
parents:
40898
diff
changeset

718 

40647  719 
instantiation finite_5 :: enum 
720 
begin 

721 

722 
definition 

723 
"enum = [a\<^isub>1, a\<^isub>2, a\<^isub>3, a\<^isub>4, a\<^isub>5]" 

724 

41078
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

725 
definition 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

726 
"enum_all P = (P a\<^isub>1 \<and> P a\<^isub>2 \<and> P a\<^isub>3 \<and> P a\<^isub>4 \<and> P a\<^isub>5)" 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

727 

051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

728 
definition 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

729 
"enum_ex P = (P a\<^isub>1 \<or> P a\<^isub>2 \<or> P a\<^isub>3 \<or> P a\<^isub>4 \<or> P a\<^isub>5)" 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

730 

40647  731 
instance proof 
41078
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

732 
fix P 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

733 
show "enum_all (P :: finite_5 \<Rightarrow> bool) = (\<forall>x. P x)" 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

734 
unfolding enum_all_finite_5_def 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

735 
by (auto, case_tac x) auto 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

736 
next 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

737 
fix P 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

738 
show "enum_ex (P :: finite_5 \<Rightarrow> bool) = (\<exists>x. P x)" 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

739 
unfolding enum_ex_finite_5_def 
051251fde456
adding more efficient implementations for quantifiers in Enum
bulwahn
parents:
40900
diff
changeset

740 
by (auto, case_tac x) auto 
40647  741 
qed (auto simp add: enum_finite_5_def intro: finite_5.exhaust) 
742 

743 
end 

744 

41115
2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
41085
diff
changeset

745 
subsection {* An executable THE operator on finite types *} 
2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
41085
diff
changeset

746 

2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
41085
diff
changeset

747 
definition 
2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
41085
diff
changeset

748 
[code del]: "enum_the P = The P" 
2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
41085
diff
changeset

749 

2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
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diff
changeset

750 
lemma [code]: 
2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
41085
diff
changeset

751 
"The P = (case filter P enum of [x] => x  _ => enum_the P)" 
2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
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diff
changeset

752 
proof  
2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
41085
diff
changeset

753 
{ 
2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
41085
diff
changeset

754 
fix a 
2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
41085
diff
changeset

755 
assume filter_enum: "filter P enum = [a]" 
2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
41085
diff
changeset

756 
have "The P = a" 
2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
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diff
changeset

757 
proof (rule the_equality) 
2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
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diff
changeset

758 
fix x 
2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
41085
diff
changeset

759 
assume "P x" 
2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
41085
diff
changeset

760 
show "x = a" 
2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
41085
diff
changeset

761 
proof (rule ccontr) 
2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
41085
diff
changeset

762 
assume "x \<noteq> a" 
2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
41085
diff
changeset

763 
from filter_enum obtain us vs 
2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
41085
diff
changeset

764 
where enum_eq: "enum = us @ [a] @ vs" 
2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
41085
diff
changeset

765 
and "\<forall> x \<in> set us. \<not> P x" 
2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
41085
diff
changeset

766 
and "\<forall> x \<in> set vs. \<not> P x" 
2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
41085
diff
changeset

767 
and "P a" 
2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
41085
diff
changeset

768 
by (auto simp add: filter_eq_Cons_iff) (simp only: filter_empty_conv[symmetric]) 
2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
41085
diff
changeset

769 
with `P x` in_enum[of x, unfolded enum_eq] `x \<noteq> a` show "False" by auto 
2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
41085
diff
changeset

770 
qed 
2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
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diff
changeset

771 
next 
2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
41085
diff
changeset

772 
from filter_enum show "P a" by (auto simp add: filter_eq_Cons_iff) 
2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
41085
diff
changeset

773 
qed 
2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
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diff
changeset

774 
} 
2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
41085
diff
changeset

775 
from this show ?thesis 
2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
41085
diff
changeset

776 
unfolding enum_the_def by (auto split: list.split) 
2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
41085
diff
changeset

777 
qed 
2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
41085
diff
changeset

778 

45140  779 

45117
3911cf09899a
adding code equations for cardinality and (reflexive) transitive closure on finite types
bulwahn
parents:
41115
diff
changeset

780 
subsection {* Closing up *} 
3911cf09899a
adding code equations for cardinality and (reflexive) transitive closure on finite types
bulwahn
parents:
41115
diff
changeset

781 

41115
2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
41085
diff
changeset

782 
code_abort enum_the 
2c362ff5daf4
adding an executable THE operator on finite types
bulwahn
parents:
41085
diff
changeset

783 

41085
a549ff1d4070
adding a smarter enumeration scheme for finite functions
bulwahn
parents:
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diff
changeset

784 
hide_const (open) a\<^isub>1 a\<^isub>2 a\<^isub>3 a\<^isub>4 a\<^isub>5 
40657  785 

786 

41085
a549ff1d4070
adding a smarter enumeration scheme for finite functions
bulwahn
parents:
41078
diff
changeset

787 
hide_type (open) finite_1 finite_2 finite_3 finite_4 finite_5 
45117
3911cf09899a
adding code equations for cardinality and (reflexive) transitive closure on finite types
bulwahn
parents:
41115
diff
changeset

788 
hide_const (open) enum enum_all enum_ex n_lists all_n_lists ex_n_lists product ntrancl 
40647  789 

790 
end 