src/HOL/ex/Unification.thy
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(*  Title:      HOL/ex/Unification.thy
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    Author:     Martin Coen, Cambridge University Computer Laboratory
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    Author:     Konrad Slind, TUM & Cambridge University Computer Laboratory
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    Author:     Alexander Krauss, TUM
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*)
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header {* Substitution and Unification *}
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theory Unification
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imports Main
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begin
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text {* 
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  Implements Manna \& Waldinger's formalization, with Paulson's
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  simplifications, and some new simplifications by Slind and Krauss.
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  Z Manna \& R Waldinger, Deductive Synthesis of the Unification
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  Algorithm.  SCP 1 (1981), 5-48
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  L C Paulson, Verifying the Unification Algorithm in LCF. SCP 5
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  (1985), 143-170
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  K Slind, Reasoning about Terminating Functional Programs,
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  Ph.D. thesis, TUM, 1999, Sect. 5.8
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  A Krauss, Partial and Nested Recursive Function Definitions in
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  Higher-Order Logic, JAR 44(4):303–336, 2010. Sect. 6.3
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*}
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subsection {* Terms *}
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text {* Binary trees with leaves that are constants or variables. *}
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datatype 'a trm = 
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  Var 'a 
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  | Const 'a
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  | Comb "'a trm" "'a trm" (infix "\<cdot>" 60)
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primrec vars_of :: "'a trm \<Rightarrow> 'a set"
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where
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  "vars_of (Var v) = {v}"
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| "vars_of (Const c) = {}"
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| "vars_of (M \<cdot> N) = vars_of M \<union> vars_of N"
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fun occs :: "'a trm \<Rightarrow> 'a trm \<Rightarrow> bool" (infixl "\<prec>" 54) 
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where
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  "u \<prec> Var v \<longleftrightarrow> False"
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| "u \<prec> Const c \<longleftrightarrow> False"
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| "u \<prec> M \<cdot> N \<longleftrightarrow> u = M \<or> u = N \<or> u \<prec> M \<or> u \<prec> N"
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lemma finite_vars_of[intro]: "finite (vars_of t)"
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  by (induct t) simp_all
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lemma vars_iff_occseq: "x \<in> vars_of t \<longleftrightarrow> Var x \<prec> t \<or> Var x = t"
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  by (induct t) auto
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lemma occs_vars_subset: "M \<prec> N \<Longrightarrow> vars_of M \<subseteq> vars_of N"
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  by (induct N) auto
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subsection {* Substitutions *}
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type_synonym 'a subst = "('a \<times> 'a trm) list"
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fun assoc :: "'a \<Rightarrow> 'b \<Rightarrow> ('a \<times> 'b) list \<Rightarrow> 'b"
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where
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  "assoc x d [] = d"
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| "assoc x d ((p,q)#t) = (if x = p then q else assoc x d t)"
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primrec subst :: "'a trm \<Rightarrow> 'a subst \<Rightarrow> 'a trm" (infixl "\<lhd>" 55)
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where
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  "(Var v) \<lhd> s = assoc v (Var v) s"
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| "(Const c) \<lhd> s = (Const c)"
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| "(M \<cdot> N) \<lhd> s = (M \<lhd> s) \<cdot> (N \<lhd> s)"
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definition subst_eq (infixr "\<doteq>" 52)
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where
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  "s1 \<doteq> s2 \<longleftrightarrow> (\<forall>t. t \<lhd> s1 = t \<lhd> s2)" 
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fun comp :: "'a subst \<Rightarrow> 'a subst \<Rightarrow> 'a subst" (infixl "\<lozenge>" 56)
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where
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  "[] \<lozenge> bl = bl"
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| "((a,b) # al) \<lozenge> bl = (a, b \<lhd> bl) # (al \<lozenge> bl)"
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lemma subst_Nil[simp]: "t \<lhd> [] = t"
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by (induct t) auto
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lemma subst_mono: "t \<prec> u \<Longrightarrow> t \<lhd> s \<prec> u \<lhd> s"
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by (induct u) auto
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lemma agreement: "(t \<lhd> r = t \<lhd> s) \<longleftrightarrow> (\<forall>v \<in> vars_of t. Var v \<lhd> r = Var v \<lhd> s)"
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by (induct t) auto
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lemma repl_invariance: "v \<notin> vars_of t \<Longrightarrow> t \<lhd> (v,u) # s = t \<lhd> s"
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by (simp add: agreement)
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lemma remove_var: "v \<notin> vars_of s \<Longrightarrow> v \<notin> vars_of (t \<lhd> [(v, s)])"
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by (induct t) simp_all
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lemma subst_refl[iff]: "s \<doteq> s"
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  by (auto simp:subst_eq_def)
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lemma subst_sym[sym]: "\<lbrakk>s1 \<doteq> s2\<rbrakk> \<Longrightarrow> s2 \<doteq> s1"
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  by (auto simp:subst_eq_def)
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lemma subst_trans[trans]: "\<lbrakk>s1 \<doteq> s2; s2 \<doteq> s3\<rbrakk> \<Longrightarrow> s1 \<doteq> s3"
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  by (auto simp:subst_eq_def)
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lemma subst_no_occs: "\<not> Var v \<prec> t \<Longrightarrow> Var v \<noteq> t
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  \<Longrightarrow> t \<lhd> [(v,s)] = t"
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by (induct t) auto
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lemma comp_Nil[simp]: "\<sigma> \<lozenge> [] = \<sigma>"
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by (induct \<sigma>) auto
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lemma subst_comp[simp]: "t \<lhd> (r \<lozenge> s) = t \<lhd> r \<lhd> s"
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proof (induct t)
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  case (Var v) thus ?case
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    by (induct r) auto
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qed auto
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lemma subst_eq_intro[intro]: "(\<And>t. t \<lhd> \<sigma> = t \<lhd> \<theta>) \<Longrightarrow> \<sigma> \<doteq> \<theta>"
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  by (auto simp:subst_eq_def)
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lemma subst_eq_dest[dest]: "s1 \<doteq> s2 \<Longrightarrow> t \<lhd> s1 = t \<lhd> s2"
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  by (auto simp:subst_eq_def)
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lemma comp_assoc: "(a \<lozenge> b) \<lozenge> c \<doteq> a \<lozenge> (b \<lozenge> c)"
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  by auto
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lemma subst_cong: "\<lbrakk>\<sigma> \<doteq> \<sigma>'; \<theta> \<doteq> \<theta>'\<rbrakk> \<Longrightarrow> (\<sigma> \<lozenge> \<theta>) \<doteq> (\<sigma>' \<lozenge> \<theta>')"
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  by (auto simp: subst_eq_def)
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lemma var_self: "[(v, Var v)] \<doteq> []"
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proof
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  fix t show "t \<lhd> [(v, Var v)] = t \<lhd> []"
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    by (induct t) simp_all
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qed
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lemma var_same[simp]: "[(v, t)] \<doteq> [] \<longleftrightarrow> t = Var v"
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by (metis assoc.simps(2) subst.simps(1) subst_eq_def var_self)
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subsection {* Unifiers and Most General Unifiers *}
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definition Unifier :: "'a subst \<Rightarrow> 'a trm \<Rightarrow> 'a trm \<Rightarrow> bool"
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where "Unifier \<sigma> t u \<longleftrightarrow> (t \<lhd> \<sigma> = u \<lhd> \<sigma>)"
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definition MGU :: "'a subst \<Rightarrow> 'a trm \<Rightarrow> 'a trm \<Rightarrow> bool" where
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  "MGU \<sigma> t u \<longleftrightarrow> 
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   Unifier \<sigma> t u \<and> (\<forall>\<theta>. Unifier \<theta> t u \<longrightarrow> (\<exists>\<gamma>. \<theta> \<doteq> \<sigma> \<lozenge> \<gamma>))"
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lemma MGUI[intro]:
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  "\<lbrakk>t \<lhd> \<sigma> = u \<lhd> \<sigma>; \<And>\<theta>. t \<lhd> \<theta> = u \<lhd> \<theta> \<Longrightarrow> \<exists>\<gamma>. \<theta> \<doteq> \<sigma> \<lozenge> \<gamma>\<rbrakk>
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  \<Longrightarrow> MGU \<sigma> t u"
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  by (simp only:Unifier_def MGU_def, auto)
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lemma MGU_sym[sym]:
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  "MGU \<sigma> s t \<Longrightarrow> MGU \<sigma> t s"
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  by (auto simp:MGU_def Unifier_def)
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lemma MGU_is_Unifier: "MGU \<sigma> t u \<Longrightarrow> Unifier \<sigma> t u"
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unfolding MGU_def by (rule conjunct1)
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lemma MGU_Var: 
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  assumes "\<not> Var v \<prec> t"
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  shows "MGU [(v,t)] (Var v) t"
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proof (intro MGUI exI)
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  show "Var v \<lhd> [(v,t)] = t \<lhd> [(v,t)]" using assms
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    by (metis assoc.simps(2) repl_invariance subst.simps(1) subst_Nil vars_iff_occseq)
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next
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  fix \<theta> assume th: "Var v \<lhd> \<theta> = t \<lhd> \<theta>" 
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  show "\<theta> \<doteq> [(v,t)] \<lozenge> \<theta>" 
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  proof
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    fix s show "s \<lhd> \<theta> = s \<lhd> [(v,t)] \<lozenge> \<theta>" using th 
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      by (induct s) auto
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  qed
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qed
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lemma MGU_Const: "MGU [] (Const c) (Const d) \<longleftrightarrow> c = d"
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  by (auto simp: MGU_def Unifier_def)
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subsection {* The unification algorithm *}
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function unify :: "'a trm \<Rightarrow> 'a trm \<Rightarrow> 'a subst option"
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where
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  "unify (Const c) (M \<cdot> N)   = None"
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| "unify (M \<cdot> N)   (Const c) = None"
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| "unify (Const c) (Var v)   = Some [(v, Const c)]"
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| "unify (M \<cdot> N)   (Var v)   = (if Var v \<prec> M \<cdot> N 
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                                        then None
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                                        else Some [(v, M \<cdot> N)])"
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| "unify (Var v)   M         = (if Var v \<prec> M
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                                        then None
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                                        else Some [(v, M)])"
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| "unify (Const c) (Const d) = (if c=d then Some [] else None)"
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| "unify (M \<cdot> N) (M' \<cdot> N') = (case unify M M' of
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                                    None \<Rightarrow> None |
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                                    Some \<theta> \<Rightarrow> (case unify (N \<lhd> \<theta>) (N' \<lhd> \<theta>)
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                                      of None \<Rightarrow> None |
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                                         Some \<sigma> \<Rightarrow> Some (\<theta> \<lozenge> \<sigma>)))"
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  by pat_completeness auto
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subsection {* Properties used in termination proof *}
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text {* Elimination of variables by a substitution: *}
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definition
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  "elim \<sigma> v \<equiv> \<forall>t. v \<notin> vars_of (t \<lhd> \<sigma>)"
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lemma elim_intro[intro]: "(\<And>t. v \<notin> vars_of (t \<lhd> \<sigma>)) \<Longrightarrow> elim \<sigma> v"
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  by (auto simp:elim_def)
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lemma elim_dest[dest]: "elim \<sigma> v \<Longrightarrow> v \<notin> vars_of (t \<lhd> \<sigma>)"
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  by (auto simp:elim_def)
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lemma elim_eq: "\<sigma> \<doteq> \<theta> \<Longrightarrow> elim \<sigma> x = elim \<theta> x"
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  by (auto simp:elim_def subst_eq_def)
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lemma occs_elim: "\<not> Var v \<prec> t 
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  \<Longrightarrow> elim [(v,t)] v \<or> [(v,t)] \<doteq> []"
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by (metis elim_intro remove_var var_same vars_iff_occseq)
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text {* The result of a unification never introduces new variables: *}
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declare unify.psimps[simp]
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lemma unify_vars: 
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  assumes "unify_dom (M, N)"
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  assumes "unify M N = Some \<sigma>"
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  shows "vars_of (t \<lhd> \<sigma>) \<subseteq> vars_of M \<union> vars_of N \<union> vars_of t"
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  (is "?P M N \<sigma> t")
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using assms
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proof (induct M N arbitrary:\<sigma> t)
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  case (3 c v) 
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  hence "\<sigma> = [(v, Const c)]" by simp
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  thus ?case by (induct t) auto
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next
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  case (4 M N v) 
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  hence "\<not> Var v \<prec> M \<cdot> N" by auto
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  with 4 have "\<sigma> = [(v, M\<cdot>N)]" by simp
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  thus ?case by (induct t) auto
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next
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  case (5 v M)
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  hence "\<not> Var v \<prec> M" by auto
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  with 5 have "\<sigma> = [(v, M)]" by simp
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  thus ?case by (induct t) auto
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next
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  case (7 M N M' N' \<sigma>)
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  then obtain \<theta>1 \<theta>2 
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    where "unify M M' = Some \<theta>1"
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    and "unify (N \<lhd> \<theta>1) (N' \<lhd> \<theta>1) = Some \<theta>2"
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    and \<sigma>: "\<sigma> = \<theta>1 \<lozenge> \<theta>2"
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    and ih1: "\<And>t. ?P M M' \<theta>1 t"
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    and ih2: "\<And>t. ?P (N\<lhd>\<theta>1) (N'\<lhd>\<theta>1) \<theta>2 t"
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    by (auto split:option.split_asm)
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  show ?case
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  proof
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   263
    fix v assume a: "v \<in> vars_of (t \<lhd> \<sigma>)"
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   264
    
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    show "v \<in> vars_of (M \<cdot> N) \<union> vars_of (M' \<cdot> N') \<union> vars_of t"
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    proof (cases "v \<notin> vars_of M \<and> v \<notin> vars_of M'
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        \<and> v \<notin> vars_of N \<and> v \<notin> vars_of N'")
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      case True
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      with ih1 have l:"\<And>t. v \<in> vars_of (t \<lhd> \<theta>1) \<Longrightarrow> v \<in> vars_of t"
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        by auto
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      from a and ih2[where t="t \<lhd> \<theta>1"]
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      have "v \<in> vars_of (N \<lhd> \<theta>1) \<union> vars_of (N' \<lhd> \<theta>1) 
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        \<or> v \<in> vars_of (t \<lhd> \<theta>1)" unfolding \<sigma>
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        by auto
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      hence "v \<in> vars_of t"
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      proof
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        assume "v \<in> vars_of (N \<lhd> \<theta>1) \<union> vars_of (N' \<lhd> \<theta>1)"
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        with True show ?thesis by (auto dest:l)
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      next
44367
74c08021ab2e changed constant names and notation to match HOL/Subst/*.thy, from which this theory is a clone.
krauss
parents: 42463
diff changeset
   281
        assume "v \<in> vars_of (t \<lhd> \<theta>1)" 
32960
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width;
wenzelm
parents: 30909
diff changeset
   282
        thus ?thesis by (rule l)
22999
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   283
      qed
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   284
      
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   285
      thus ?thesis by auto
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   286
    qed auto
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   287
  qed
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   288
qed (auto split: split_if_asm)
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   289
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   290
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   291
text {* The result of a unification is either the identity
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   292
substitution or it eliminates a variable from one of the terms: *}
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   293
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   294
lemma unify_eliminates: 
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   295
  assumes "unify_dom (M, N)"
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   296
  assumes "unify M N = Some \<sigma>"
44367
74c08021ab2e changed constant names and notation to match HOL/Subst/*.thy, from which this theory is a clone.
krauss
parents: 42463
diff changeset
   297
  shows "(\<exists>v\<in>vars_of M \<union> vars_of N. elim \<sigma> v) \<or> \<sigma> \<doteq> []"
22999
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   298
  (is "?P M N \<sigma>")
24444
448978b61556 induct: proper separation of initial and terminal step;
wenzelm
parents: 23777
diff changeset
   299
using assms
22999
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   300
proof (induct M N arbitrary:\<sigma>)
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   301
  case 1 thus ?case by simp
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   302
next
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   303
  case 2 thus ?case by simp
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   304
next
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   305
  case (3 c v)
44369
02e13192a053 tuned notation
krauss
parents: 44368
diff changeset
   306
  have no_occs: "\<not> Var v \<prec> Const c" by simp
24444
448978b61556 induct: proper separation of initial and terminal step;
wenzelm
parents: 23777
diff changeset
   307
  with 3 have "\<sigma> = [(v, Const c)]" by simp
44367
74c08021ab2e changed constant names and notation to match HOL/Subst/*.thy, from which this theory is a clone.
krauss
parents: 42463
diff changeset
   308
  with occs_elim[OF no_occs]
22999
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   309
  show ?case by auto
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   310
next
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   311
  case (4 M N v)
44369
02e13192a053 tuned notation
krauss
parents: 44368
diff changeset
   312
  hence no_occs: "\<not> Var v \<prec> M \<cdot> N" by auto
24444
448978b61556 induct: proper separation of initial and terminal step;
wenzelm
parents: 23777
diff changeset
   313
  with 4 have "\<sigma> = [(v, M\<cdot>N)]" by simp
44367
74c08021ab2e changed constant names and notation to match HOL/Subst/*.thy, from which this theory is a clone.
krauss
parents: 42463
diff changeset
   314
  with occs_elim[OF no_occs]
22999
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   315
  show ?case by auto 
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   316
next
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   317
  case (5 v M) 
44369
02e13192a053 tuned notation
krauss
parents: 44368
diff changeset
   318
  hence no_occs: "\<not> Var v \<prec> M" by auto
24444
448978b61556 induct: proper separation of initial and terminal step;
wenzelm
parents: 23777
diff changeset
   319
  with 5 have "\<sigma> = [(v, M)]" by simp
44367
74c08021ab2e changed constant names and notation to match HOL/Subst/*.thy, from which this theory is a clone.
krauss
parents: 42463
diff changeset
   320
  with occs_elim[OF no_occs]
22999
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   321
  show ?case by auto 
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   322
next 
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   323
  case (6 c d) thus ?case
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   324
    by (cases "c = d") auto
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   325
next
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   326
  case (7 M N M' N' \<sigma>)
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   327
  then obtain \<theta>1 \<theta>2 
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   328
    where "unify M M' = Some \<theta>1"
44367
74c08021ab2e changed constant names and notation to match HOL/Subst/*.thy, from which this theory is a clone.
krauss
parents: 42463
diff changeset
   329
    and "unify (N \<lhd> \<theta>1) (N' \<lhd> \<theta>1) = Some \<theta>2"
74c08021ab2e changed constant names and notation to match HOL/Subst/*.thy, from which this theory is a clone.
krauss
parents: 42463
diff changeset
   330
    and \<sigma>: "\<sigma> = \<theta>1 \<lozenge> \<theta>2"
22999
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   331
    and ih1: "?P M M' \<theta>1"
44367
74c08021ab2e changed constant names and notation to match HOL/Subst/*.thy, from which this theory is a clone.
krauss
parents: 42463
diff changeset
   332
    and ih2: "?P (N\<lhd>\<theta>1) (N'\<lhd>\<theta>1) \<theta>2"
22999
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   333
    by (auto split:option.split_asm)
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   334
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   335
  from `unify_dom (M \<cdot> N, M' \<cdot> N')`
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   336
  have "unify_dom (M, M')"
23777
60b7800338d5 Renamed accessible part for predicates to accp.
berghofe
parents: 23373
diff changeset
   337
    by (rule accp_downward) (rule unify_rel.intros)
22999
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   338
  hence no_new_vars: 
44367
74c08021ab2e changed constant names and notation to match HOL/Subst/*.thy, from which this theory is a clone.
krauss
parents: 42463
diff changeset
   339
    "\<And>t. vars_of (t \<lhd> \<theta>1) \<subseteq> vars_of M \<union> vars_of M' \<union> vars_of t"
23373
ead82c82da9e tuned proofs: avoid implicit prems;
wenzelm
parents: 23219
diff changeset
   340
    by (rule unify_vars) (rule `unify M M' = Some \<theta>1`)
22999
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   341
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   342
  from ih2 show ?case 
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   343
  proof 
44367
74c08021ab2e changed constant names and notation to match HOL/Subst/*.thy, from which this theory is a clone.
krauss
parents: 42463
diff changeset
   344
    assume "\<exists>v\<in>vars_of (N \<lhd> \<theta>1) \<union> vars_of (N' \<lhd> \<theta>1). elim \<theta>2 v"
22999
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   345
    then obtain v 
44367
74c08021ab2e changed constant names and notation to match HOL/Subst/*.thy, from which this theory is a clone.
krauss
parents: 42463
diff changeset
   346
      where "v\<in>vars_of (N \<lhd> \<theta>1) \<union> vars_of (N' \<lhd> \<theta>1)"
22999
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   347
      and el: "elim \<theta>2 v" by auto
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   348
    with no_new_vars show ?thesis unfolding \<sigma> 
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   349
      by (auto simp:elim_def)
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   350
  next
44367
74c08021ab2e changed constant names and notation to match HOL/Subst/*.thy, from which this theory is a clone.
krauss
parents: 42463
diff changeset
   351
    assume empty[simp]: "\<theta>2 \<doteq> []"
22999
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   352
44367
74c08021ab2e changed constant names and notation to match HOL/Subst/*.thy, from which this theory is a clone.
krauss
parents: 42463
diff changeset
   353
    have "\<sigma> \<doteq> (\<theta>1 \<lozenge> [])" unfolding \<sigma>
44368
91e8062605d5 ported some lemmas from HOL/Subst/*;
krauss
parents: 44367
diff changeset
   354
      by (rule subst_cong) auto
44367
74c08021ab2e changed constant names and notation to match HOL/Subst/*.thy, from which this theory is a clone.
krauss
parents: 42463
diff changeset
   355
    also have "\<dots> \<doteq> \<theta>1" by auto
74c08021ab2e changed constant names and notation to match HOL/Subst/*.thy, from which this theory is a clone.
krauss
parents: 42463
diff changeset
   356
    finally have "\<sigma> \<doteq> \<theta>1" .
22999
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   357
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   358
    from ih1 show ?thesis
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   359
    proof
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   360
      assume "\<exists>v\<in>vars_of M \<union> vars_of M'. elim \<theta>1 v"
44370
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   361
      with elim_eq[OF `\<sigma> \<doteq> \<theta>1`]
22999
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   362
      show ?thesis by auto
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   363
    next
44367
74c08021ab2e changed constant names and notation to match HOL/Subst/*.thy, from which this theory is a clone.
krauss
parents: 42463
diff changeset
   364
      note `\<sigma> \<doteq> \<theta>1`
74c08021ab2e changed constant names and notation to match HOL/Subst/*.thy, from which this theory is a clone.
krauss
parents: 42463
diff changeset
   365
      also assume "\<theta>1 \<doteq> []"
22999
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   366
      finally show ?thesis ..
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   367
    qed
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   368
  qed
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   369
qed
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   370
44370
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   371
declare unify.psimps[simp del]
22999
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   372
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   373
subsection {* Termination proof *}
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   374
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   375
termination unify
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   376
proof 
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   377
  let ?R = "measures [\<lambda>(M,N). card (vars_of M \<union> vars_of N),
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   378
                           \<lambda>(M, N). size M]"
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   379
  show "wf ?R" by simp
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   380
44370
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   381
  fix M N M' N' :: "'a trm"
22999
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   382
  show "((M, M'), (M \<cdot> N, M' \<cdot> N')) \<in> ?R" -- "Inner call"
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   383
    by (rule measures_lesseq) (auto intro: card_mono)
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   384
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   385
  fix \<theta>                                   -- "Outer call"
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   386
  assume inner: "unify_dom (M, M')"
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   387
    "unify M M' = Some \<theta>"
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   388
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   389
  from unify_eliminates[OF inner]
44367
74c08021ab2e changed constant names and notation to match HOL/Subst/*.thy, from which this theory is a clone.
krauss
parents: 42463
diff changeset
   390
  show "((N \<lhd> \<theta>, N' \<lhd> \<theta>), (M \<cdot> N, M' \<cdot> N')) \<in>?R"
22999
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   391
  proof
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   392
    -- {* Either a variable is eliminated \ldots *}
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   393
    assume "(\<exists>v\<in>vars_of M \<union> vars_of M'. elim \<theta> v)"
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   394
    then obtain v 
32960
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width;
wenzelm
parents: 30909
diff changeset
   395
      where "elim \<theta> v" 
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width;
wenzelm
parents: 30909
diff changeset
   396
      and "v\<in>vars_of M \<union> vars_of M'" by auto
22999
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   397
    with unify_vars[OF inner]
44367
74c08021ab2e changed constant names and notation to match HOL/Subst/*.thy, from which this theory is a clone.
krauss
parents: 42463
diff changeset
   398
    have "vars_of (N\<lhd>\<theta>) \<union> vars_of (N'\<lhd>\<theta>)
32960
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width;
wenzelm
parents: 30909
diff changeset
   399
      \<subset> vars_of (M\<cdot>N) \<union> vars_of (M'\<cdot>N')"
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width;
wenzelm
parents: 30909
diff changeset
   400
      by auto
22999
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   401
    
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   402
    thus ?thesis
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   403
      by (auto intro!: measures_less intro: psubset_card_mono)
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   404
  next
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   405
    -- {* Or the substitution is empty *}
44367
74c08021ab2e changed constant names and notation to match HOL/Subst/*.thy, from which this theory is a clone.
krauss
parents: 42463
diff changeset
   406
    assume "\<theta> \<doteq> []"
74c08021ab2e changed constant names and notation to match HOL/Subst/*.thy, from which this theory is a clone.
krauss
parents: 42463
diff changeset
   407
    hence "N \<lhd> \<theta> = N" 
74c08021ab2e changed constant names and notation to match HOL/Subst/*.thy, from which this theory is a clone.
krauss
parents: 42463
diff changeset
   408
      and "N' \<lhd> \<theta> = N'" by auto
22999
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   409
    thus ?thesis 
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   410
       by (auto intro!: measures_less intro: psubset_card_mono)
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   411
  qed
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   412
qed
c1ce129e6f9c Added unification case study (using new function package)
krauss
parents:
diff changeset
   413
44370
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   414
44372
f9825056dbab more precise authors and comments;
krauss
parents: 44371
diff changeset
   415
subsection {* Unification returns a Most General Unifier *}
44370
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   416
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   417
lemma unify_computes_MGU:
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   418
  "unify M N = Some \<sigma> \<Longrightarrow> MGU \<sigma> M N"
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   419
proof (induct M N arbitrary: \<sigma> rule: unify.induct)
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   420
  case (7 M N M' N' \<sigma>) -- "The interesting case"
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   421
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   422
  then obtain \<theta>1 \<theta>2 
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   423
    where "unify M M' = Some \<theta>1"
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   424
    and "unify (N \<lhd> \<theta>1) (N' \<lhd> \<theta>1) = Some \<theta>2"
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   425
    and \<sigma>: "\<sigma> = \<theta>1 \<lozenge> \<theta>2"
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   426
    and MGU_inner: "MGU \<theta>1 M M'" 
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   427
    and MGU_outer: "MGU \<theta>2 (N \<lhd> \<theta>1) (N' \<lhd> \<theta>1)"
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   428
    by (auto split:option.split_asm)
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   429
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   430
  show ?case
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   431
  proof
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   432
    from MGU_inner and MGU_outer
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   433
    have "M \<lhd> \<theta>1 = M' \<lhd> \<theta>1" 
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   434
      and "N \<lhd> \<theta>1 \<lhd> \<theta>2 = N' \<lhd> \<theta>1 \<lhd> \<theta>2"
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   435
      unfolding MGU_def Unifier_def
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   436
      by auto
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   437
    thus "M \<cdot> N \<lhd> \<sigma> = M' \<cdot> N' \<lhd> \<sigma>" unfolding \<sigma>
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   438
      by simp
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   439
  next
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   440
    fix \<sigma>' assume "M \<cdot> N \<lhd> \<sigma>' = M' \<cdot> N' \<lhd> \<sigma>'"
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   441
    hence "M \<lhd> \<sigma>' = M' \<lhd> \<sigma>'"
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   442
      and Ns: "N \<lhd> \<sigma>' = N' \<lhd> \<sigma>'" by auto
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   443
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   444
    with MGU_inner obtain \<delta>
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   445
      where eqv: "\<sigma>' \<doteq> \<theta>1 \<lozenge> \<delta>"
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   446
      unfolding MGU_def Unifier_def
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   447
      by auto
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   448
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   449
    from Ns have "N \<lhd> \<theta>1 \<lhd> \<delta> = N' \<lhd> \<theta>1 \<lhd> \<delta>"
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   450
      by (simp add:subst_eq_dest[OF eqv])
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   451
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   452
    with MGU_outer obtain \<rho>
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   453
      where eqv2: "\<delta> \<doteq> \<theta>2 \<lozenge> \<rho>"
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   454
      unfolding MGU_def Unifier_def
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   455
      by auto
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   456
    
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   457
    have "\<sigma>' \<doteq> \<sigma> \<lozenge> \<rho>" unfolding \<sigma>
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   458
      by (rule subst_eq_intro, auto simp:subst_eq_dest[OF eqv] subst_eq_dest[OF eqv2])
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   459
    thus "\<exists>\<gamma>. \<sigma>' \<doteq> \<sigma> \<lozenge> \<gamma>" ..
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   460
  qed
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   461
qed (auto simp: MGU_Const intro: MGU_Var MGU_Var[symmetric] split: split_if_asm)
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   462
44372
f9825056dbab more precise authors and comments;
krauss
parents: 44371
diff changeset
   463
f9825056dbab more precise authors and comments;
krauss
parents: 44371
diff changeset
   464
subsection {* Unification returns Idempotent Substitution *}
f9825056dbab more precise authors and comments;
krauss
parents: 44371
diff changeset
   465
f9825056dbab more precise authors and comments;
krauss
parents: 44371
diff changeset
   466
definition Idem :: "'a subst \<Rightarrow> bool"
f9825056dbab more precise authors and comments;
krauss
parents: 44371
diff changeset
   467
where "Idem s \<longleftrightarrow> (s \<lozenge> s) \<doteq> s"
f9825056dbab more precise authors and comments;
krauss
parents: 44371
diff changeset
   468
44371
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   469
lemma Idem_Nil [iff]: "Idem []"
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   470
  by (simp add: Idem_def)
44370
03d91bfad83b tuned proofs, sledgehammering overly verbose parts
krauss
parents: 44369
diff changeset
   471
44371
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   472
lemma Var_Idem: 
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   473
  assumes "~ (Var v \<prec> t)" shows "Idem [(v,t)]"
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   474
  unfolding Idem_def
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   475
proof
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   476
  from assms have [simp]: "t \<lhd> [(v, t)] = t"
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   477
    by (metis assoc.simps(2) subst.simps(1) subst_no_occs)
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   478
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   479
  fix s show "s \<lhd> [(v, t)] \<lozenge> [(v, t)] = s \<lhd> [(v, t)]"
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   480
    by (induct s) auto
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   481
qed
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   482
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   483
lemma Unifier_Idem_subst: 
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   484
  "Idem(r) \<Longrightarrow> Unifier s (t \<lhd> r) (u \<lhd> r) \<Longrightarrow>
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   485
    Unifier (r \<lozenge> s) (t \<lhd> r) (u \<lhd> r)"
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   486
by (simp add: Idem_def Unifier_def subst_eq_def)
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   487
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   488
lemma Idem_comp:
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   489
  "Idem r \<Longrightarrow> Unifier s (t \<lhd> r) (u \<lhd> r) \<Longrightarrow>
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   490
      (!!q. Unifier q (t \<lhd> r) (u \<lhd> r) \<Longrightarrow> s \<lozenge> q \<doteq> q) \<Longrightarrow>
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   491
    Idem (r \<lozenge> s)"
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   492
  apply (frule Unifier_Idem_subst, blast) 
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   493
  apply (force simp add: Idem_def subst_eq_def)
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   494
  done
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   495
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   496
theorem unify_gives_Idem:
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   497
  "unify M N  = Some \<sigma> \<Longrightarrow> Idem \<sigma>"
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   498
proof (induct M N arbitrary: \<sigma> rule: unify.induct)
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   499
  case (7 M M' N N' \<sigma>)
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   500
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   501
  then obtain \<theta>1 \<theta>2 
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   502
    where "unify M N = Some \<theta>1"
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   503
    and \<theta>2: "unify (M' \<lhd> \<theta>1) (N' \<lhd> \<theta>1) = Some \<theta>2"
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   504
    and \<sigma>: "\<sigma> = \<theta>1 \<lozenge> \<theta>2"
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   505
    and "Idem \<theta>1" 
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   506
    and "Idem \<theta>2"
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   507
    by (auto split: option.split_asm)
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   508
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   509
  from \<theta>2 have "Unifier \<theta>2 (M' \<lhd> \<theta>1) (N' \<lhd> \<theta>1)"
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   510
    by (rule unify_computes_MGU[THEN MGU_is_Unifier])
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   511
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   512
  with `Idem \<theta>1`
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   513
  show "Idem \<sigma>" unfolding \<sigma>
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   514
  proof (rule Idem_comp)
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   515
    fix \<sigma> assume "Unifier \<sigma> (M' \<lhd> \<theta>1) (N' \<lhd> \<theta>1)"
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   516
    with \<theta>2 obtain \<gamma> where \<sigma>: "\<sigma> \<doteq> \<theta>2 \<lozenge> \<gamma>"
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   517
      using unify_computes_MGU MGU_def by blast
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   518
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   519
    have "\<theta>2 \<lozenge> \<sigma> \<doteq> \<theta>2 \<lozenge> (\<theta>2 \<lozenge> \<gamma>)" by (rule subst_cong) (auto simp: \<sigma>)
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   520
    also have "... \<doteq> (\<theta>2 \<lozenge> \<theta>2) \<lozenge> \<gamma>" by (rule comp_assoc[symmetric])
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   521
    also have "... \<doteq> \<theta>2 \<lozenge> \<gamma>" by (rule subst_cong) (auto simp: `Idem \<theta>2`[unfolded Idem_def])
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   522
    also have "... \<doteq> \<sigma>" by (rule \<sigma>[symmetric])
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   523
    finally show "\<theta>2 \<lozenge> \<sigma> \<doteq> \<sigma>" .
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   524
  qed
3a10392fb8c3 added proof of idempotence, roughly after HOL/Subst/Unify.thy
krauss
parents: 44370
diff changeset
   525
qed (auto intro!: Var_Idem split: option.splits if_splits)
39754
150f831ce4a3 no longer declare .psimps rules as [simp].
krauss
parents: 32960
diff changeset
   526
23219
87ad6e8a5f2c tuned document;
wenzelm
parents: 23024
diff changeset
   527
end