src/HOL/Wellfounded.thy
author krauss
Mon Oct 26 23:26:18 2009 +0100 (2009-10-26)
changeset 33215 6fd85372981e
parent 32960 69916a850301
child 33216 7c61bc5d7310
permissions -rw-r--r--
replaced (outdated) comments by explicit statements
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(*  Title:      HOL/Wellfounded.thy
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    Author:     Tobias Nipkow
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    Author:     Lawrence C Paulson
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    Author:     Konrad Slind
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    Author:     Alexander Krauss
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*)
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header {*Well-founded Recursion*}
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theory Wellfounded
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imports Finite_Set Transitive_Closure
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uses ("Tools/Function/size.ML")
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begin
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subsection {* Basic Definitions *}
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constdefs
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  wf         :: "('a * 'a)set => bool"
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  "wf(r) == (!P. (!x. (!y. (y,x):r --> P(y)) --> P(x)) --> (!x. P(x)))"
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  wfP :: "('a => 'a => bool) => bool"
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  "wfP r == wf {(x, y). r x y}"
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  acyclic :: "('a*'a)set => bool"
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  "acyclic r == !x. (x,x) ~: r^+"
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abbreviation acyclicP :: "('a => 'a => bool) => bool" where
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  "acyclicP r == acyclic {(x, y). r x y}"
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lemma wfP_wf_eq [pred_set_conv]: "wfP (\<lambda>x y. (x, y) \<in> r) = wf r"
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  by (simp add: wfP_def)
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lemma wfUNIVI: 
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   "(!!P x. (ALL x. (ALL y. (y,x) : r --> P(y)) --> P(x)) ==> P(x)) ==> wf(r)"
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  unfolding wf_def by blast
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lemmas wfPUNIVI = wfUNIVI [to_pred]
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text{*Restriction to domain @{term A} and range @{term B}.  If @{term r} is
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    well-founded over their intersection, then @{term "wf r"}*}
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lemma wfI: 
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 "[| r \<subseteq> A <*> B; 
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     !!x P. [|\<forall>x. (\<forall>y. (y,x) : r --> P y) --> P x;  x : A; x : B |] ==> P x |]
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  ==>  wf r"
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  unfolding wf_def by blast
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lemma wf_induct: 
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    "[| wf(r);           
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        !!x.[| ALL y. (y,x): r --> P(y) |] ==> P(x)  
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     |]  ==>  P(a)"
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  unfolding wf_def by blast
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lemmas wfP_induct = wf_induct [to_pred]
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lemmas wf_induct_rule = wf_induct [rule_format, consumes 1, case_names less, induct set: wf]
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lemmas wfP_induct_rule = wf_induct_rule [to_pred, induct set: wfP]
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lemma wf_not_sym: "wf r ==> (a, x) : r ==> (x, a) ~: r"
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  by (induct a arbitrary: x set: wf) blast
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lemma wf_asym:
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  assumes "wf r" "(a, x) \<in> r"
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  obtains "(x, a) \<notin> r"
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  by (drule wf_not_sym[OF assms])
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lemma wf_not_refl [simp]: "wf r ==> (a, a) ~: r"
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  by (blast elim: wf_asym)
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lemma wf_irrefl: assumes "wf r" obtains "(a, a) \<notin> r"
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by (drule wf_not_refl[OF assms])
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lemma wf_wellorderI:
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  assumes wf: "wf {(x::'a::ord, y). x < y}"
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  assumes lin: "OFCLASS('a::ord, linorder_class)"
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  shows "OFCLASS('a::ord, wellorder_class)"
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using lin by (rule wellorder_class.intro)
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  (blast intro: wellorder_axioms.intro wf_induct_rule [OF wf])
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lemma (in wellorder) wf:
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  "wf {(x, y). x < y}"
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unfolding wf_def by (blast intro: less_induct)
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subsection {* Basic Results *}
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text{*transitive closure of a well-founded relation is well-founded! *}
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lemma wf_trancl:
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  assumes "wf r"
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  shows "wf (r^+)"
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proof -
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  {
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    fix P and x
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    assume induct_step: "!!x. (!!y. (y, x) : r^+ ==> P y) ==> P x"
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    have "P x"
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    proof (rule induct_step)
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      fix y assume "(y, x) : r^+"
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      with `wf r` show "P y"
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      proof (induct x arbitrary: y)
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        case (less x)
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        note hyp = `\<And>x' y'. (x', x) : r ==> (y', x') : r^+ ==> P y'`
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        from `(y, x) : r^+` show "P y"
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        proof cases
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          case base
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          show "P y"
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          proof (rule induct_step)
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            fix y' assume "(y', y) : r^+"
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            with `(y, x) : r` show "P y'" by (rule hyp [of y y'])
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          qed
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        next
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          case step
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          then obtain x' where "(x', x) : r" and "(y, x') : r^+" by simp
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          then show "P y" by (rule hyp [of x' y])
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        qed
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      qed
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    qed
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  } then show ?thesis unfolding wf_def by blast
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qed
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lemmas wfP_trancl = wf_trancl [to_pred]
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lemma wf_converse_trancl: "wf (r^-1) ==> wf ((r^+)^-1)"
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  apply (subst trancl_converse [symmetric])
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  apply (erule wf_trancl)
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  done
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text{*Minimal-element characterization of well-foundedness*}
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lemma wf_eq_minimal: "wf r = (\<forall>Q x. x\<in>Q --> (\<exists>z\<in>Q. \<forall>y. (y,z)\<in>r --> y\<notin>Q))"
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proof (intro iffI strip)
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  fix Q :: "'a set" and x
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  assume "wf r" and "x \<in> Q"
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  then show "\<exists>z\<in>Q. \<forall>y. (y, z) \<in> r \<longrightarrow> y \<notin> Q"
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    unfolding wf_def
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    by (blast dest: spec [of _ "%x. x\<in>Q \<longrightarrow> (\<exists>z\<in>Q. \<forall>y. (y,z) \<in> r \<longrightarrow> y\<notin>Q)"]) 
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next
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  assume 1: "\<forall>Q x. x \<in> Q \<longrightarrow> (\<exists>z\<in>Q. \<forall>y. (y, z) \<in> r \<longrightarrow> y \<notin> Q)"
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  show "wf r"
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  proof (rule wfUNIVI)
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    fix P :: "'a \<Rightarrow> bool" and x
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    assume 2: "\<forall>x. (\<forall>y. (y, x) \<in> r \<longrightarrow> P y) \<longrightarrow> P x"
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    let ?Q = "{x. \<not> P x}"
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    have "x \<in> ?Q \<longrightarrow> (\<exists>z \<in> ?Q. \<forall>y. (y, z) \<in> r \<longrightarrow> y \<notin> ?Q)"
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      by (rule 1 [THEN spec, THEN spec])
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    then have "\<not> P x \<longrightarrow> (\<exists>z. \<not> P z \<and> (\<forall>y. (y, z) \<in> r \<longrightarrow> P y))" by simp
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    with 2 have "\<not> P x \<longrightarrow> (\<exists>z. \<not> P z \<and> P z)" by fast
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    then show "P x" by simp
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  qed
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qed
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lemma wfE_min: 
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  assumes "wf R" "x \<in> Q"
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  obtains z where "z \<in> Q" "\<And>y. (y, z) \<in> R \<Longrightarrow> y \<notin> Q"
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  using assms unfolding wf_eq_minimal by blast
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lemma wfI_min:
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  "(\<And>x Q. x \<in> Q \<Longrightarrow> \<exists>z\<in>Q. \<forall>y. (y, z) \<in> R \<longrightarrow> y \<notin> Q)
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  \<Longrightarrow> wf R"
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  unfolding wf_eq_minimal by blast
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lemmas wfP_eq_minimal = wf_eq_minimal [to_pred]
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text {* Well-foundedness of subsets *}
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lemma wf_subset: "[| wf(r);  p<=r |] ==> wf(p)"
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  apply (simp (no_asm_use) add: wf_eq_minimal)
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  apply fast
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  done
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lemmas wfP_subset = wf_subset [to_pred]
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text {* Well-foundedness of the empty relation *}
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lemma wf_empty [iff]: "wf({})"
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  by (simp add: wf_def)
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lemma wfP_empty [iff]:
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  "wfP (\<lambda>x y. False)"
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proof -
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  have "wfP bot" by (fact wf_empty [to_pred bot_empty_eq2])
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  then show ?thesis by (simp add: bot_fun_eq bot_bool_eq)
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qed
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lemma wf_Int1: "wf r ==> wf (r Int r')"
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  apply (erule wf_subset)
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  apply (rule Int_lower1)
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  done
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lemma wf_Int2: "wf r ==> wf (r' Int r)"
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  apply (erule wf_subset)
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  apply (rule Int_lower2)
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  done  
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text{*Well-foundedness of insert*}
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lemma wf_insert [iff]: "wf(insert (y,x) r) = (wf(r) & (x,y) ~: r^*)"
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apply (rule iffI)
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 apply (blast elim: wf_trancl [THEN wf_irrefl]
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              intro: rtrancl_into_trancl1 wf_subset 
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                     rtrancl_mono [THEN [2] rev_subsetD])
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apply (simp add: wf_eq_minimal, safe)
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apply (rule allE, assumption, erule impE, blast) 
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apply (erule bexE)
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apply (rename_tac "a", case_tac "a = x")
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 prefer 2
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apply blast 
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apply (case_tac "y:Q")
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 prefer 2 apply blast
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apply (rule_tac x = "{z. z:Q & (z,y) : r^*}" in allE)
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 apply assumption
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apply (erule_tac V = "ALL Q. (EX x. x : Q) --> ?P Q" in thin_rl) 
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  --{*essential for speed*}
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txt{*Blast with new substOccur fails*}
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apply (fast intro: converse_rtrancl_into_rtrancl)
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done
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text{*Well-foundedness of image*}
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lemma wf_prod_fun_image: "[| wf r; inj f |] ==> wf(prod_fun f f ` r)"
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apply (simp only: wf_eq_minimal, clarify)
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apply (case_tac "EX p. f p : Q")
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apply (erule_tac x = "{p. f p : Q}" in allE)
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apply (fast dest: inj_onD, blast)
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done
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subsection {* Well-Foundedness Results for Unions *}
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lemma wf_union_compatible:
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  assumes "wf R" "wf S"
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  assumes "R O S \<subseteq> R"
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  shows "wf (R \<union> S)"
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proof (rule wfI_min)
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  fix x :: 'a and Q 
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  let ?Q' = "{x \<in> Q. \<forall>y. (y, x) \<in> R \<longrightarrow> y \<notin> Q}"
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  assume "x \<in> Q"
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  obtain a where "a \<in> ?Q'"
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    by (rule wfE_min [OF `wf R` `x \<in> Q`]) blast
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  with `wf S`
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  obtain z where "z \<in> ?Q'" and zmin: "\<And>y. (y, z) \<in> S \<Longrightarrow> y \<notin> ?Q'" by (erule wfE_min)
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  { 
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    fix y assume "(y, z) \<in> S"
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    then have "y \<notin> ?Q'" by (rule zmin)
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    have "y \<notin> Q"
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    proof 
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      assume "y \<in> Q"
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      with `y \<notin> ?Q'` 
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      obtain w where "(w, y) \<in> R" and "w \<in> Q" by auto
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      from `(w, y) \<in> R` `(y, z) \<in> S` have "(w, z) \<in> R O S" by (rule rel_compI)
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      with `R O S \<subseteq> R` have "(w, z) \<in> R" ..
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      with `z \<in> ?Q'` have "w \<notin> Q" by blast 
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      with `w \<in> Q` show False by contradiction
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    qed
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  }
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  with `z \<in> ?Q'` show "\<exists>z\<in>Q. \<forall>y. (y, z) \<in> R \<union> S \<longrightarrow> y \<notin> Q" by blast
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qed
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text {* Well-foundedness of indexed union with disjoint domains and ranges *}
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lemma wf_UN: "[| ALL i:I. wf(r i);  
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         ALL i:I. ALL j:I. r i ~= r j --> Domain(r i) Int Range(r j) = {}  
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      |] ==> wf(UN i:I. r i)"
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apply (simp only: wf_eq_minimal, clarify)
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apply (rename_tac A a, case_tac "EX i:I. EX a:A. EX b:A. (b,a) : r i")
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 prefer 2
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 apply force 
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apply clarify
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apply (drule bspec, assumption)  
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apply (erule_tac x="{a. a:A & (EX b:A. (b,a) : r i) }" in allE)
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apply (blast elim!: allE)  
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done
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lemma wfP_SUP:
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  "\<forall>i. wfP (r i) \<Longrightarrow> \<forall>i j. r i \<noteq> r j \<longrightarrow> inf (DomainP (r i)) (RangeP (r j)) = bot \<Longrightarrow> wfP (SUPR UNIV r)"
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  by (rule wf_UN [where I=UNIV and r="\<lambda>i. {(x, y). r i x y}", to_pred SUP_UN_eq2])
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    (simp_all add: Collect_def)
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lemma wf_Union: 
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 "[| ALL r:R. wf r;  
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     ALL r:R. ALL s:R. r ~= s --> Domain r Int Range s = {}  
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  |] ==> wf(Union R)"
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apply (simp add: Union_def)
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apply (blast intro: wf_UN)
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done
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(*Intuition: we find an (R u S)-min element of a nonempty subset A
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             by case distinction.
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  1. There is a step a -R-> b with a,b : A.
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     Pick an R-min element z of the (nonempty) set {a:A | EX b:A. a -R-> b}.
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     By definition, there is z':A s.t. z -R-> z'. Because z is R-min in the
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     subset, z' must be R-min in A. Because z' has an R-predecessor, it cannot
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     have an S-successor and is thus S-min in A as well.
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  2. There is no such step.
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     Pick an S-min element of A. In this case it must be an R-min
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     element of A as well.
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*)
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lemma wf_Un:
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     "[| wf r; wf s; Domain r Int Range s = {} |] ==> wf(r Un s)"
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  using wf_union_compatible[of s r] 
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  by (auto simp: Un_ac)
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lemma wf_union_merge: 
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  "wf (R \<union> S) = wf (R O R \<union> S O R \<union> S)" (is "wf ?A = wf ?B")
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proof
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  assume "wf ?A"
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  with wf_trancl have wfT: "wf (?A^+)" .
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  moreover have "?B \<subseteq> ?A^+"
krauss@26748
   307
    by (subst trancl_unfold, subst trancl_unfold) blast
krauss@26748
   308
  ultimately show "wf ?B" by (rule wf_subset)
krauss@26748
   309
next
krauss@26748
   310
  assume "wf ?B"
krauss@26748
   311
krauss@26748
   312
  show "wf ?A"
krauss@26748
   313
  proof (rule wfI_min)
krauss@26748
   314
    fix Q :: "'a set" and x 
krauss@26748
   315
    assume "x \<in> Q"
krauss@26748
   316
krauss@26748
   317
    with `wf ?B`
krauss@26748
   318
    obtain z where "z \<in> Q" and "\<And>y. (y, z) \<in> ?B \<Longrightarrow> y \<notin> Q" 
krauss@26748
   319
      by (erule wfE_min)
krauss@26748
   320
    then have A1: "\<And>y. (y, z) \<in> R O R \<Longrightarrow> y \<notin> Q"
krauss@32235
   321
      and A2: "\<And>y. (y, z) \<in> S O R \<Longrightarrow> y \<notin> Q"
krauss@26748
   322
      and A3: "\<And>y. (y, z) \<in> S \<Longrightarrow> y \<notin> Q"
krauss@26748
   323
      by auto
krauss@26748
   324
    
krauss@26748
   325
    show "\<exists>z\<in>Q. \<forall>y. (y, z) \<in> ?A \<longrightarrow> y \<notin> Q"
krauss@26748
   326
    proof (cases "\<forall>y. (y, z) \<in> R \<longrightarrow> y \<notin> Q")
krauss@26748
   327
      case True
krauss@26748
   328
      with `z \<in> Q` A3 show ?thesis by blast
krauss@26748
   329
    next
krauss@26748
   330
      case False 
krauss@26748
   331
      then obtain z' where "z'\<in>Q" "(z', z) \<in> R" by blast
krauss@26748
   332
krauss@26748
   333
      have "\<forall>y. (y, z') \<in> ?A \<longrightarrow> y \<notin> Q"
krauss@26748
   334
      proof (intro allI impI)
krauss@26748
   335
        fix y assume "(y, z') \<in> ?A"
krauss@26748
   336
        then show "y \<notin> Q"
krauss@26748
   337
        proof
krauss@26748
   338
          assume "(y, z') \<in> R" 
krauss@26748
   339
          then have "(y, z) \<in> R O R" using `(z', z) \<in> R` ..
krauss@26748
   340
          with A1 show "y \<notin> Q" .
krauss@26748
   341
        next
krauss@26748
   342
          assume "(y, z') \<in> S" 
krauss@32235
   343
          then have "(y, z) \<in> S O R" using  `(z', z) \<in> R` ..
krauss@26748
   344
          with A2 show "y \<notin> Q" .
krauss@26748
   345
        qed
krauss@26748
   346
      qed
krauss@26748
   347
      with `z' \<in> Q` show ?thesis ..
krauss@26748
   348
    qed
krauss@26748
   349
  qed
krauss@26748
   350
qed
krauss@26748
   351
krauss@26748
   352
lemma wf_comp_self: "wf R = wf (R O R)"  -- {* special case *}
krauss@26748
   353
  by (rule wf_union_merge [where S = "{}", simplified])
krauss@26748
   354
krauss@26748
   355
krauss@26748
   356
subsubsection {* acyclic *}
krauss@26748
   357
krauss@26748
   358
lemma acyclicI: "ALL x. (x, x) ~: r^+ ==> acyclic r"
krauss@26748
   359
  by (simp add: acyclic_def)
krauss@26748
   360
krauss@26748
   361
lemma wf_acyclic: "wf r ==> acyclic r"
krauss@26748
   362
apply (simp add: acyclic_def)
krauss@26748
   363
apply (blast elim: wf_trancl [THEN wf_irrefl])
krauss@26748
   364
done
krauss@26748
   365
krauss@26748
   366
lemmas wfP_acyclicP = wf_acyclic [to_pred]
krauss@26748
   367
krauss@26748
   368
lemma acyclic_insert [iff]:
krauss@26748
   369
     "acyclic(insert (y,x) r) = (acyclic r & (x,y) ~: r^*)"
krauss@26748
   370
apply (simp add: acyclic_def trancl_insert)
krauss@26748
   371
apply (blast intro: rtrancl_trans)
krauss@26748
   372
done
krauss@26748
   373
krauss@26748
   374
lemma acyclic_converse [iff]: "acyclic(r^-1) = acyclic r"
krauss@26748
   375
by (simp add: acyclic_def trancl_converse)
krauss@26748
   376
krauss@26748
   377
lemmas acyclicP_converse [iff] = acyclic_converse [to_pred]
krauss@26748
   378
krauss@26748
   379
lemma acyclic_impl_antisym_rtrancl: "acyclic r ==> antisym(r^*)"
krauss@26748
   380
apply (simp add: acyclic_def antisym_def)
krauss@26748
   381
apply (blast elim: rtranclE intro: rtrancl_into_trancl1 rtrancl_trancl_trancl)
krauss@26748
   382
done
krauss@26748
   383
krauss@26748
   384
(* Other direction:
krauss@26748
   385
acyclic = no loops
krauss@26748
   386
antisym = only self loops
krauss@26748
   387
Goalw [acyclic_def,antisym_def] "antisym( r^* ) ==> acyclic(r - Id)
krauss@26748
   388
==> antisym( r^* ) = acyclic(r - Id)";
krauss@26748
   389
*)
krauss@26748
   390
krauss@26748
   391
lemma acyclic_subset: "[| acyclic s; r <= s |] ==> acyclic r"
krauss@26748
   392
apply (simp add: acyclic_def)
krauss@26748
   393
apply (blast intro: trancl_mono)
krauss@26748
   394
done
krauss@26748
   395
krauss@26748
   396
text{* Wellfoundedness of finite acyclic relations*}
krauss@26748
   397
krauss@26748
   398
lemma finite_acyclic_wf [rule_format]: "finite r ==> acyclic r --> wf r"
krauss@26748
   399
apply (erule finite_induct, blast)
krauss@26748
   400
apply (simp (no_asm_simp) only: split_tupled_all)
krauss@26748
   401
apply simp
krauss@26748
   402
done
krauss@26748
   403
krauss@26748
   404
lemma finite_acyclic_wf_converse: "[|finite r; acyclic r|] ==> wf (r^-1)"
krauss@26748
   405
apply (erule finite_converse [THEN iffD2, THEN finite_acyclic_wf])
krauss@26748
   406
apply (erule acyclic_converse [THEN iffD2])
krauss@26748
   407
done
krauss@26748
   408
krauss@26748
   409
lemma wf_iff_acyclic_if_finite: "finite r ==> wf r = acyclic r"
krauss@26748
   410
by (blast intro: finite_acyclic_wf wf_acyclic)
krauss@26748
   411
krauss@26748
   412
krauss@26748
   413
subsection {* @{typ nat} is well-founded *}
krauss@26748
   414
krauss@26748
   415
lemma less_nat_rel: "op < = (\<lambda>m n. n = Suc m)^++"
krauss@26748
   416
proof (rule ext, rule ext, rule iffI)
krauss@26748
   417
  fix n m :: nat
krauss@26748
   418
  assume "m < n"
krauss@26748
   419
  then show "(\<lambda>m n. n = Suc m)^++ m n"
krauss@26748
   420
  proof (induct n)
krauss@26748
   421
    case 0 then show ?case by auto
krauss@26748
   422
  next
krauss@26748
   423
    case (Suc n) then show ?case
krauss@26748
   424
      by (auto simp add: less_Suc_eq_le le_less intro: tranclp.trancl_into_trancl)
krauss@26748
   425
  qed
krauss@26748
   426
next
krauss@26748
   427
  fix n m :: nat
krauss@26748
   428
  assume "(\<lambda>m n. n = Suc m)^++ m n"
krauss@26748
   429
  then show "m < n"
krauss@26748
   430
    by (induct n)
krauss@26748
   431
      (simp_all add: less_Suc_eq_le reflexive le_less)
krauss@26748
   432
qed
krauss@26748
   433
krauss@26748
   434
definition
krauss@26748
   435
  pred_nat :: "(nat * nat) set" where
krauss@26748
   436
  "pred_nat = {(m, n). n = Suc m}"
krauss@26748
   437
krauss@26748
   438
definition
krauss@26748
   439
  less_than :: "(nat * nat) set" where
krauss@26748
   440
  "less_than = pred_nat^+"
krauss@26748
   441
krauss@26748
   442
lemma less_eq: "(m, n) \<in> pred_nat^+ \<longleftrightarrow> m < n"
krauss@26748
   443
  unfolding less_nat_rel pred_nat_def trancl_def by simp
krauss@26748
   444
krauss@26748
   445
lemma pred_nat_trancl_eq_le:
krauss@26748
   446
  "(m, n) \<in> pred_nat^* \<longleftrightarrow> m \<le> n"
krauss@26748
   447
  unfolding less_eq rtrancl_eq_or_trancl by auto
krauss@26748
   448
krauss@26748
   449
lemma wf_pred_nat: "wf pred_nat"
krauss@26748
   450
  apply (unfold wf_def pred_nat_def, clarify)
krauss@26748
   451
  apply (induct_tac x, blast+)
krauss@26748
   452
  done
krauss@26748
   453
krauss@26748
   454
lemma wf_less_than [iff]: "wf less_than"
krauss@26748
   455
  by (simp add: less_than_def wf_pred_nat [THEN wf_trancl])
krauss@26748
   456
krauss@26748
   457
lemma trans_less_than [iff]: "trans less_than"
krauss@26748
   458
  by (simp add: less_than_def trans_trancl)
krauss@26748
   459
krauss@26748
   460
lemma less_than_iff [iff]: "((x,y): less_than) = (x<y)"
krauss@26748
   461
  by (simp add: less_than_def less_eq)
krauss@26748
   462
krauss@26748
   463
lemma wf_less: "wf {(x, y::nat). x < y}"
krauss@26748
   464
  using wf_less_than by (simp add: less_than_def less_eq [symmetric])
krauss@26748
   465
krauss@26748
   466
krauss@26748
   467
subsection {* Accessible Part *}
krauss@26748
   468
krauss@26748
   469
text {*
krauss@26748
   470
 Inductive definition of the accessible part @{term "acc r"} of a
krauss@26748
   471
 relation; see also \cite{paulin-tlca}.
krauss@26748
   472
*}
krauss@26748
   473
krauss@26748
   474
inductive_set
krauss@26748
   475
  acc :: "('a * 'a) set => 'a set"
krauss@26748
   476
  for r :: "('a * 'a) set"
krauss@26748
   477
  where
krauss@26748
   478
    accI: "(!!y. (y, x) : r ==> y : acc r) ==> x : acc r"
krauss@26748
   479
krauss@26748
   480
abbreviation
krauss@26748
   481
  termip :: "('a => 'a => bool) => 'a => bool" where
krauss@26748
   482
  "termip r == accp (r\<inverse>\<inverse>)"
krauss@26748
   483
krauss@26748
   484
abbreviation
krauss@26748
   485
  termi :: "('a * 'a) set => 'a set" where
krauss@26748
   486
  "termi r == acc (r\<inverse>)"
krauss@26748
   487
krauss@26748
   488
lemmas accpI = accp.accI
krauss@26748
   489
krauss@26748
   490
text {* Induction rules *}
krauss@26748
   491
krauss@26748
   492
theorem accp_induct:
krauss@26748
   493
  assumes major: "accp r a"
krauss@26748
   494
  assumes hyp: "!!x. accp r x ==> \<forall>y. r y x --> P y ==> P x"
krauss@26748
   495
  shows "P a"
krauss@26748
   496
  apply (rule major [THEN accp.induct])
krauss@26748
   497
  apply (rule hyp)
krauss@26748
   498
   apply (rule accp.accI)
krauss@26748
   499
   apply fast
krauss@26748
   500
  apply fast
krauss@26748
   501
  done
krauss@26748
   502
krauss@26748
   503
theorems accp_induct_rule = accp_induct [rule_format, induct set: accp]
krauss@26748
   504
krauss@26748
   505
theorem accp_downward: "accp r b ==> r a b ==> accp r a"
krauss@26748
   506
  apply (erule accp.cases)
krauss@26748
   507
  apply fast
krauss@26748
   508
  done
krauss@26748
   509
krauss@26748
   510
lemma not_accp_down:
krauss@26748
   511
  assumes na: "\<not> accp R x"
krauss@26748
   512
  obtains z where "R z x" and "\<not> accp R z"
krauss@26748
   513
proof -
krauss@26748
   514
  assume a: "\<And>z. \<lbrakk>R z x; \<not> accp R z\<rbrakk> \<Longrightarrow> thesis"
krauss@26748
   515
krauss@26748
   516
  show thesis
krauss@26748
   517
  proof (cases "\<forall>z. R z x \<longrightarrow> accp R z")
krauss@26748
   518
    case True
krauss@26748
   519
    hence "\<And>z. R z x \<Longrightarrow> accp R z" by auto
krauss@26748
   520
    hence "accp R x"
krauss@26748
   521
      by (rule accp.accI)
krauss@26748
   522
    with na show thesis ..
krauss@26748
   523
  next
krauss@26748
   524
    case False then obtain z where "R z x" and "\<not> accp R z"
krauss@26748
   525
      by auto
krauss@26748
   526
    with a show thesis .
krauss@26748
   527
  qed
krauss@26748
   528
qed
krauss@26748
   529
krauss@26748
   530
lemma accp_downwards_aux: "r\<^sup>*\<^sup>* b a ==> accp r a --> accp r b"
krauss@26748
   531
  apply (erule rtranclp_induct)
krauss@26748
   532
   apply blast
krauss@26748
   533
  apply (blast dest: accp_downward)
krauss@26748
   534
  done
krauss@26748
   535
krauss@26748
   536
theorem accp_downwards: "accp r a ==> r\<^sup>*\<^sup>* b a ==> accp r b"
krauss@26748
   537
  apply (blast dest: accp_downwards_aux)
krauss@26748
   538
  done
krauss@26748
   539
krauss@26748
   540
theorem accp_wfPI: "\<forall>x. accp r x ==> wfP r"
krauss@26748
   541
  apply (rule wfPUNIVI)
krauss@26748
   542
  apply (induct_tac P x rule: accp_induct)
krauss@26748
   543
   apply blast
krauss@26748
   544
  apply blast
krauss@26748
   545
  done
krauss@26748
   546
krauss@26748
   547
theorem accp_wfPD: "wfP r ==> accp r x"
krauss@26748
   548
  apply (erule wfP_induct_rule)
krauss@26748
   549
  apply (rule accp.accI)
krauss@26748
   550
  apply blast
krauss@26748
   551
  done
krauss@26748
   552
krauss@26748
   553
theorem wfP_accp_iff: "wfP r = (\<forall>x. accp r x)"
krauss@26748
   554
  apply (blast intro: accp_wfPI dest: accp_wfPD)
krauss@26748
   555
  done
krauss@26748
   556
krauss@26748
   557
krauss@26748
   558
text {* Smaller relations have bigger accessible parts: *}
krauss@26748
   559
krauss@26748
   560
lemma accp_subset:
krauss@26748
   561
  assumes sub: "R1 \<le> R2"
krauss@26748
   562
  shows "accp R2 \<le> accp R1"
berghofe@26803
   563
proof (rule predicate1I)
krauss@26748
   564
  fix x assume "accp R2 x"
krauss@26748
   565
  then show "accp R1 x"
krauss@26748
   566
  proof (induct x)
krauss@26748
   567
    fix x
krauss@26748
   568
    assume ih: "\<And>y. R2 y x \<Longrightarrow> accp R1 y"
krauss@26748
   569
    with sub show "accp R1 x"
krauss@26748
   570
      by (blast intro: accp.accI)
krauss@26748
   571
  qed
krauss@26748
   572
qed
krauss@26748
   573
krauss@26748
   574
krauss@26748
   575
text {* This is a generalized induction theorem that works on
krauss@26748
   576
  subsets of the accessible part. *}
krauss@26748
   577
krauss@26748
   578
lemma accp_subset_induct:
krauss@26748
   579
  assumes subset: "D \<le> accp R"
krauss@26748
   580
    and dcl: "\<And>x z. \<lbrakk>D x; R z x\<rbrakk> \<Longrightarrow> D z"
krauss@26748
   581
    and "D x"
krauss@26748
   582
    and istep: "\<And>x. \<lbrakk>D x; (\<And>z. R z x \<Longrightarrow> P z)\<rbrakk> \<Longrightarrow> P x"
krauss@26748
   583
  shows "P x"
krauss@26748
   584
proof -
krauss@26748
   585
  from subset and `D x`
krauss@26748
   586
  have "accp R x" ..
krauss@26748
   587
  then show "P x" using `D x`
krauss@26748
   588
  proof (induct x)
krauss@26748
   589
    fix x
krauss@26748
   590
    assume "D x"
krauss@26748
   591
      and "\<And>y. R y x \<Longrightarrow> D y \<Longrightarrow> P y"
krauss@26748
   592
    with dcl and istep show "P x" by blast
krauss@26748
   593
  qed
krauss@26748
   594
qed
krauss@26748
   595
krauss@26748
   596
krauss@26748
   597
text {* Set versions of the above theorems *}
krauss@26748
   598
krauss@26748
   599
lemmas acc_induct = accp_induct [to_set]
krauss@26748
   600
krauss@26748
   601
lemmas acc_induct_rule = acc_induct [rule_format, induct set: acc]
krauss@26748
   602
krauss@26748
   603
lemmas acc_downward = accp_downward [to_set]
krauss@26748
   604
krauss@26748
   605
lemmas not_acc_down = not_accp_down [to_set]
krauss@26748
   606
krauss@26748
   607
lemmas acc_downwards_aux = accp_downwards_aux [to_set]
krauss@26748
   608
krauss@26748
   609
lemmas acc_downwards = accp_downwards [to_set]
krauss@26748
   610
krauss@26748
   611
lemmas acc_wfI = accp_wfPI [to_set]
krauss@26748
   612
krauss@26748
   613
lemmas acc_wfD = accp_wfPD [to_set]
krauss@26748
   614
krauss@26748
   615
lemmas wf_acc_iff = wfP_accp_iff [to_set]
krauss@26748
   616
berghofe@26803
   617
lemmas acc_subset = accp_subset [to_set pred_subset_eq]
krauss@26748
   618
berghofe@26803
   619
lemmas acc_subset_induct = accp_subset_induct [to_set pred_subset_eq]
krauss@26748
   620
krauss@26748
   621
krauss@26748
   622
subsection {* Tools for building wellfounded relations *}
krauss@26748
   623
krauss@26748
   624
text {* Inverse Image *}
krauss@26748
   625
krauss@26748
   626
lemma wf_inv_image [simp,intro!]: "wf(r) ==> wf(inv_image r (f::'a=>'b))"
krauss@26748
   627
apply (simp (no_asm_use) add: inv_image_def wf_eq_minimal)
krauss@26748
   628
apply clarify
krauss@26748
   629
apply (subgoal_tac "EX (w::'b) . w : {w. EX (x::'a) . x: Q & (f x = w) }")
krauss@26748
   630
prefer 2 apply (blast del: allE)
krauss@26748
   631
apply (erule allE)
krauss@26748
   632
apply (erule (1) notE impE)
krauss@26748
   633
apply blast
krauss@26748
   634
done
krauss@26748
   635
haftmann@31775
   636
text {* Measure Datatypes into @{typ nat} *}
krauss@26748
   637
krauss@26748
   638
definition measure :: "('a => nat) => ('a * 'a)set"
krauss@26748
   639
where "measure == inv_image less_than"
krauss@26748
   640
krauss@26748
   641
lemma in_measure[simp]: "((x,y) : measure f) = (f x < f y)"
krauss@26748
   642
  by (simp add:measure_def)
krauss@26748
   643
krauss@26748
   644
lemma wf_measure [iff]: "wf (measure f)"
krauss@26748
   645
apply (unfold measure_def)
krauss@26748
   646
apply (rule wf_less_than [THEN wf_inv_image])
krauss@26748
   647
done
krauss@26748
   648
krauss@26748
   649
text{* Lexicographic combinations *}
krauss@26748
   650
krauss@26748
   651
definition
krauss@26748
   652
 lex_prod  :: "[('a*'a)set, ('b*'b)set] => (('a*'b)*('a*'b))set"
krauss@26748
   653
               (infixr "<*lex*>" 80)
krauss@26748
   654
where
krauss@26748
   655
    "ra <*lex*> rb == {((a,b),(a',b')). (a,a') : ra | a=a' & (b,b') : rb}"
krauss@26748
   656
krauss@26748
   657
lemma wf_lex_prod [intro!]: "[| wf(ra); wf(rb) |] ==> wf(ra <*lex*> rb)"
krauss@26748
   658
apply (unfold wf_def lex_prod_def) 
krauss@26748
   659
apply (rule allI, rule impI)
krauss@26748
   660
apply (simp (no_asm_use) only: split_paired_All)
krauss@26748
   661
apply (drule spec, erule mp) 
krauss@26748
   662
apply (rule allI, rule impI)
krauss@26748
   663
apply (drule spec, erule mp, blast) 
krauss@26748
   664
done
krauss@26748
   665
krauss@26748
   666
lemma in_lex_prod[simp]: 
krauss@26748
   667
  "(((a,b),(a',b')): r <*lex*> s) = ((a,a'): r \<or> (a = a' \<and> (b, b') : s))"
krauss@26748
   668
  by (auto simp:lex_prod_def)
krauss@26748
   669
krauss@26748
   670
text{* @{term "op <*lex*>"} preserves transitivity *}
krauss@26748
   671
krauss@26748
   672
lemma trans_lex_prod [intro!]: 
krauss@26748
   673
    "[| trans R1; trans R2 |] ==> trans (R1 <*lex*> R2)"
krauss@26748
   674
by (unfold trans_def lex_prod_def, blast) 
krauss@26748
   675
haftmann@31775
   676
text {* lexicographic combinations with measure Datatypes *}
krauss@26748
   677
krauss@26748
   678
definition 
krauss@26748
   679
  mlex_prod :: "('a \<Rightarrow> nat) \<Rightarrow> ('a \<times> 'a) set \<Rightarrow> ('a \<times> 'a) set" (infixr "<*mlex*>" 80)
krauss@26748
   680
where
krauss@26748
   681
  "f <*mlex*> R = inv_image (less_than <*lex*> R) (%x. (f x, x))"
krauss@26748
   682
krauss@26748
   683
lemma wf_mlex: "wf R \<Longrightarrow> wf (f <*mlex*> R)"
krauss@26748
   684
unfolding mlex_prod_def
krauss@26748
   685
by auto
krauss@26748
   686
krauss@26748
   687
lemma mlex_less: "f x < f y \<Longrightarrow> (x, y) \<in> f <*mlex*> R"
krauss@26748
   688
unfolding mlex_prod_def by simp
krauss@26748
   689
krauss@26748
   690
lemma mlex_leq: "f x \<le> f y \<Longrightarrow> (x, y) \<in> R \<Longrightarrow> (x, y) \<in> f <*mlex*> R"
krauss@26748
   691
unfolding mlex_prod_def by auto
krauss@26748
   692
krauss@26748
   693
text {* proper subset relation on finite sets *}
krauss@26748
   694
krauss@26748
   695
definition finite_psubset  :: "('a set * 'a set) set"
krauss@26748
   696
where "finite_psubset == {(A,B). A < B & finite B}"
krauss@26748
   697
krauss@28260
   698
lemma wf_finite_psubset[simp]: "wf(finite_psubset)"
krauss@26748
   699
apply (unfold finite_psubset_def)
krauss@26748
   700
apply (rule wf_measure [THEN wf_subset])
krauss@26748
   701
apply (simp add: measure_def inv_image_def less_than_def less_eq)
krauss@26748
   702
apply (fast elim!: psubset_card_mono)
krauss@26748
   703
done
krauss@26748
   704
krauss@26748
   705
lemma trans_finite_psubset: "trans finite_psubset"
berghofe@26803
   706
by (simp add: finite_psubset_def less_le trans_def, blast)
krauss@26748
   707
krauss@28260
   708
lemma in_finite_psubset[simp]: "(A, B) \<in> finite_psubset = (A < B & finite B)"
krauss@28260
   709
unfolding finite_psubset_def by auto
krauss@26748
   710
krauss@28735
   711
text {* max- and min-extension of order to finite sets *}
krauss@28735
   712
krauss@28735
   713
inductive_set max_ext :: "('a \<times> 'a) set \<Rightarrow> ('a set \<times> 'a set) set" 
krauss@28735
   714
for R :: "('a \<times> 'a) set"
krauss@28735
   715
where
krauss@28735
   716
  max_extI[intro]: "finite X \<Longrightarrow> finite Y \<Longrightarrow> Y \<noteq> {} \<Longrightarrow> (\<And>x. x \<in> X \<Longrightarrow> \<exists>y\<in>Y. (x, y) \<in> R) \<Longrightarrow> (X, Y) \<in> max_ext R"
krauss@28735
   717
krauss@28735
   718
lemma max_ext_wf:
krauss@28735
   719
  assumes wf: "wf r"
krauss@28735
   720
  shows "wf (max_ext r)"
krauss@28735
   721
proof (rule acc_wfI, intro allI)
krauss@28735
   722
  fix M show "M \<in> acc (max_ext r)" (is "_ \<in> ?W")
krauss@28735
   723
  proof cases
krauss@28735
   724
    assume "finite M"
krauss@28735
   725
    thus ?thesis
krauss@28735
   726
    proof (induct M)
krauss@28735
   727
      show "{} \<in> ?W"
krauss@28735
   728
        by (rule accI) (auto elim: max_ext.cases)
krauss@28735
   729
    next
krauss@28735
   730
      fix M a assume "M \<in> ?W" "finite M"
krauss@28735
   731
      with wf show "insert a M \<in> ?W"
krauss@28735
   732
      proof (induct arbitrary: M)
krauss@28735
   733
        fix M a
krauss@28735
   734
        assume "M \<in> ?W"  and  [intro]: "finite M"
krauss@28735
   735
        assume hyp: "\<And>b M. (b, a) \<in> r \<Longrightarrow> M \<in> ?W \<Longrightarrow> finite M \<Longrightarrow> insert b M \<in> ?W"
krauss@28735
   736
        {
krauss@28735
   737
          fix N M :: "'a set"
krauss@28735
   738
          assume "finite N" "finite M"
krauss@28735
   739
          then
krauss@28735
   740
          have "\<lbrakk>M \<in> ?W ; (\<And>y. y \<in> N \<Longrightarrow> (y, a) \<in> r)\<rbrakk> \<Longrightarrow>  N \<union> M \<in> ?W"
krauss@28735
   741
            by (induct N arbitrary: M) (auto simp: hyp)
krauss@28735
   742
        }
krauss@28735
   743
        note add_less = this
krauss@28735
   744
        
krauss@28735
   745
        show "insert a M \<in> ?W"
krauss@28735
   746
        proof (rule accI)
krauss@28735
   747
          fix N assume Nless: "(N, insert a M) \<in> max_ext r"
krauss@28735
   748
          hence asm1: "\<And>x. x \<in> N \<Longrightarrow> (x, a) \<in> r \<or> (\<exists>y \<in> M. (x, y) \<in> r)"
krauss@28735
   749
            by (auto elim!: max_ext.cases)
krauss@28735
   750
krauss@28735
   751
          let ?N1 = "{ n \<in> N. (n, a) \<in> r }"
krauss@28735
   752
          let ?N2 = "{ n \<in> N. (n, a) \<notin> r }"
krauss@28735
   753
          have N: "?N1 \<union> ?N2 = N" by (rule set_ext) auto
krauss@28735
   754
          from Nless have "finite N" by (auto elim: max_ext.cases)
krauss@28735
   755
          then have finites: "finite ?N1" "finite ?N2" by auto
krauss@28735
   756
          
krauss@28735
   757
          have "?N2 \<in> ?W"
krauss@28735
   758
          proof cases
krauss@28735
   759
            assume [simp]: "M = {}"
krauss@28735
   760
            have Mw: "{} \<in> ?W" by (rule accI) (auto elim: max_ext.cases)
krauss@28735
   761
krauss@28735
   762
            from asm1 have "?N2 = {}" by auto
krauss@28735
   763
            with Mw show "?N2 \<in> ?W" by (simp only:)
krauss@28735
   764
          next
krauss@28735
   765
            assume "M \<noteq> {}"
krauss@28735
   766
            have N2: "(?N2, M) \<in> max_ext r" 
krauss@28735
   767
              by (rule max_extI[OF _ _ `M \<noteq> {}`]) (insert asm1, auto intro: finites)
krauss@28735
   768
            
krauss@28735
   769
            with `M \<in> ?W` show "?N2 \<in> ?W" by (rule acc_downward)
krauss@28735
   770
          qed
krauss@28735
   771
          with finites have "?N1 \<union> ?N2 \<in> ?W" 
krauss@28735
   772
            by (rule add_less) simp
krauss@28735
   773
          then show "N \<in> ?W" by (simp only: N)
krauss@28735
   774
        qed
krauss@28735
   775
      qed
krauss@28735
   776
    qed
krauss@28735
   777
  next
krauss@28735
   778
    assume [simp]: "\<not> finite M"
krauss@28735
   779
    show ?thesis
krauss@28735
   780
      by (rule accI) (auto elim: max_ext.cases)
krauss@28735
   781
  qed
krauss@28735
   782
qed
krauss@28735
   783
krauss@29125
   784
lemma max_ext_additive: 
krauss@29125
   785
 "(A, B) \<in> max_ext R \<Longrightarrow> (C, D) \<in> max_ext R \<Longrightarrow>
krauss@29125
   786
  (A \<union> C, B \<union> D) \<in> max_ext R"
krauss@29125
   787
by (force elim!: max_ext.cases)
krauss@29125
   788
krauss@28735
   789
krauss@28735
   790
definition
krauss@28735
   791
  min_ext :: "('a \<times> 'a) set \<Rightarrow> ('a set \<times> 'a set) set" 
krauss@28735
   792
where
krauss@28735
   793
  [code del]: "min_ext r = {(X, Y) | X Y. X \<noteq> {} \<and> (\<forall>y \<in> Y. (\<exists>x \<in> X. (x, y) \<in> r))}"
krauss@28735
   794
krauss@28735
   795
lemma min_ext_wf:
krauss@28735
   796
  assumes "wf r"
krauss@28735
   797
  shows "wf (min_ext r)"
krauss@28735
   798
proof (rule wfI_min)
krauss@28735
   799
  fix Q :: "'a set set"
krauss@28735
   800
  fix x
krauss@28735
   801
  assume nonempty: "x \<in> Q"
krauss@28735
   802
  show "\<exists>m \<in> Q. (\<forall> n. (n, m) \<in> min_ext r \<longrightarrow> n \<notin> Q)"
krauss@28735
   803
  proof cases
krauss@28735
   804
    assume "Q = {{}}" thus ?thesis by (simp add: min_ext_def)
krauss@28735
   805
  next
krauss@28735
   806
    assume "Q \<noteq> {{}}"
krauss@28735
   807
    with nonempty
krauss@28735
   808
    obtain e x where "x \<in> Q" "e \<in> x" by force
krauss@28735
   809
    then have eU: "e \<in> \<Union>Q" by auto
krauss@28735
   810
    with `wf r` 
krauss@28735
   811
    obtain z where z: "z \<in> \<Union>Q" "\<And>y. (y, z) \<in> r \<Longrightarrow> y \<notin> \<Union>Q" 
krauss@28735
   812
      by (erule wfE_min)
krauss@28735
   813
    from z obtain m where "m \<in> Q" "z \<in> m" by auto
krauss@28735
   814
    from `m \<in> Q`
krauss@28735
   815
    show ?thesis
krauss@28735
   816
    proof (rule, intro bexI allI impI)
krauss@28735
   817
      fix n
krauss@28735
   818
      assume smaller: "(n, m) \<in> min_ext r"
krauss@28735
   819
      with `z \<in> m` obtain y where y: "y \<in> n" "(y, z) \<in> r" by (auto simp: min_ext_def)
krauss@28735
   820
      then show "n \<notin> Q" using z(2) by auto
krauss@28735
   821
    qed      
krauss@28735
   822
  qed
krauss@28735
   823
qed
krauss@26748
   824
krauss@26748
   825
krauss@26748
   826
subsection{*Weakly decreasing sequences (w.r.t. some well-founded order) 
krauss@26748
   827
   stabilize.*}
krauss@26748
   828
krauss@26748
   829
text{*This material does not appear to be used any longer.*}
krauss@26748
   830
krauss@28845
   831
lemma sequence_trans: "[| ALL i. (f (Suc i), f i) : r^* |] ==> (f (i+k), f i) : r^*"
krauss@28845
   832
by (induct k) (auto intro: rtrancl_trans)
krauss@26748
   833
krauss@28845
   834
lemma wf_weak_decr_stable: 
krauss@28845
   835
  assumes as: "ALL i. (f (Suc i), f i) : r^*" "wf (r^+)"
krauss@28845
   836
  shows "EX i. ALL k. f (i+k) = f i"
krauss@28845
   837
proof -
krauss@28845
   838
  have lem: "!!x. [| ALL i. (f (Suc i), f i) : r^*; wf (r^+) |]  
krauss@26748
   839
      ==> ALL m. f m = x --> (EX i. ALL k. f (m+i+k) = f (m+i))"
krauss@28845
   840
  apply (erule wf_induct, clarify)
krauss@28845
   841
  apply (case_tac "EX j. (f (m+j), f m) : r^+")
krauss@28845
   842
   apply clarify
krauss@28845
   843
   apply (subgoal_tac "EX i. ALL k. f ((m+j) +i+k) = f ( (m+j) +i) ")
krauss@28845
   844
    apply clarify
krauss@28845
   845
    apply (rule_tac x = "j+i" in exI)
krauss@28845
   846
    apply (simp add: add_ac, blast)
krauss@28845
   847
  apply (rule_tac x = 0 in exI, clarsimp)
krauss@28845
   848
  apply (drule_tac i = m and k = k in sequence_trans)
krauss@28845
   849
  apply (blast elim: rtranclE dest: rtrancl_into_trancl1)
krauss@28845
   850
  done
krauss@26748
   851
krauss@28845
   852
  from lem[OF as, THEN spec, of 0, simplified] 
krauss@28845
   853
  show ?thesis by auto
krauss@28845
   854
qed
krauss@26748
   855
krauss@26748
   856
(* special case of the theorem above: <= *)
krauss@26748
   857
lemma weak_decr_stable:
krauss@26748
   858
     "ALL i. f (Suc i) <= ((f i)::nat) ==> EX i. ALL k. f (i+k) = f i"
krauss@26748
   859
apply (rule_tac r = pred_nat in wf_weak_decr_stable)
krauss@26748
   860
apply (simp add: pred_nat_trancl_eq_le)
krauss@26748
   861
apply (intro wf_trancl wf_pred_nat)
krauss@26748
   862
done
krauss@26748
   863
krauss@26748
   864
krauss@26748
   865
subsection {* size of a datatype value *}
krauss@26748
   866
haftmann@31775
   867
use "Tools/Function/size.ML"
krauss@26748
   868
krauss@26748
   869
setup Size.setup
krauss@26748
   870
haftmann@28562
   871
lemma size_bool [code]:
haftmann@27823
   872
  "size (b\<Colon>bool) = 0" by (cases b) auto
haftmann@27823
   873
haftmann@28562
   874
lemma nat_size [simp, code]: "size (n\<Colon>nat) = n"
krauss@26748
   875
  by (induct n) simp_all
krauss@26748
   876
haftmann@27823
   877
declare "prod.size" [noatp]
krauss@26748
   878
haftmann@30430
   879
lemma [code]:
haftmann@30430
   880
  "size (P :: 'a Predicate.pred) = 0" by (cases P) simp
haftmann@30430
   881
haftmann@30430
   882
lemma [code]:
haftmann@30430
   883
  "pred_size f P = 0" by (cases P) simp
haftmann@30430
   884
krauss@26748
   885
end