author | huffman |
Mon, 02 Apr 2012 16:06:24 +0200 | |
changeset 47299 | e705ef5ffe95 |
parent 44428 | ccb8998f70b7 |
child 56790 | f54097170704 |
permissions | -rw-r--r-- |
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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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180 |
qed |
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181 |
|
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182 |
lemma MGU_Const: "MGU [] (Const c) (Const d) \<longleftrightarrow> c = d" |
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183 |
by (auto simp: MGU_def Unifier_def) |
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184 |
|
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185 |
|
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186 |
subsection {* The unification algorithm *} |
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187 |
|
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188 |
function unify :: "'a trm \<Rightarrow> 'a trm \<Rightarrow> 'a subst option" |
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189 |
where |
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190 |
"unify (Const c) (M \<cdot> N) = None" |
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191 |
| "unify (M \<cdot> N) (Const c) = None" |
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192 |
| "unify (Const c) (Var v) = Some [(v, Const c)]" |
44369 | 193 |
| "unify (M \<cdot> N) (Var v) = (if Var v \<prec> M \<cdot> N |
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194 |
then None |
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195 |
else Some [(v, M \<cdot> N)])" |
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| "unify (Var v) M = (if Var v \<prec> M |
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197 |
then None |
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198 |
else Some [(v, M)])" |
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199 |
| "unify (Const c) (Const d) = (if c=d then Some [] else None)" |
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200 |
| "unify (M \<cdot> N) (M' \<cdot> N') = (case unify M M' of |
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201 |
None \<Rightarrow> None | |
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202 |
Some \<theta> \<Rightarrow> (case unify (N \<lhd> \<theta>) (N' \<lhd> \<theta>) |
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203 |
of None \<Rightarrow> None | |
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204 |
Some \<sigma> \<Rightarrow> Some (\<theta> \<lozenge> \<sigma>)))" |
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205 |
by pat_completeness auto |
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206 |
|
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207 |
subsection {* Properties used in termination proof *} |
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208 |
|
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209 |
text {* Elimination of variables by a substitution: *} |
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210 |
|
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211 |
definition |
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212 |
"elim \<sigma> v \<equiv> \<forall>t. v \<notin> vars_of (t \<lhd> \<sigma>)" |
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213 |
|
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214 |
lemma elim_intro[intro]: "(\<And>t. v \<notin> vars_of (t \<lhd> \<sigma>)) \<Longrightarrow> elim \<sigma> v" |
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215 |
by (auto simp:elim_def) |
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216 |
|
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217 |
lemma elim_dest[dest]: "elim \<sigma> v \<Longrightarrow> v \<notin> vars_of (t \<lhd> \<sigma>)" |
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218 |
by (auto simp:elim_def) |
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219 |
|
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220 |
lemma elim_eq: "\<sigma> \<doteq> \<theta> \<Longrightarrow> elim \<sigma> x = elim \<theta> x" |
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221 |
by (auto simp:elim_def subst_eq_def) |
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222 |
|
44369 | 223 |
lemma occs_elim: "\<not> Var v \<prec> t |
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224 |
\<Longrightarrow> elim [(v,t)] v \<or> [(v,t)] \<doteq> []" |
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225 |
by (metis elim_intro remove_var var_same vars_iff_occseq) |
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226 |
|
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227 |
text {* The result of a unification never introduces new variables: *} |
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228 |
|
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229 |
declare unify.psimps[simp] |
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230 |
|
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231 |
lemma unify_vars: |
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232 |
assumes "unify_dom (M, N)" |
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233 |
assumes "unify M N = Some \<sigma>" |
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234 |
shows "vars_of (t \<lhd> \<sigma>) \<subseteq> vars_of M \<union> vars_of N \<union> vars_of t" |
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235 |
(is "?P M N \<sigma> t") |
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236 |
using assms |
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|
237 |
proof (induct M N arbitrary:\<sigma> t) |
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|
238 |
case (3 c v) |
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|
239 |
hence "\<sigma> = [(v, Const c)]" by simp |
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240 |
thus ?case by (induct t) auto |
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241 |
next |
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|
242 |
case (4 M N v) |
44369 | 243 |
hence "\<not> Var v \<prec> M \<cdot> N" by auto |
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244 |
with 4 have "\<sigma> = [(v, M\<cdot>N)]" by simp |
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245 |
thus ?case by (induct t) auto |
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246 |
next |
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|
247 |
case (5 v M) |
44369 | 248 |
hence "\<not> Var v \<prec> M" by auto |
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249 |
with 5 have "\<sigma> = [(v, M)]" by simp |
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250 |
thus ?case by (induct t) auto |
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251 |
next |
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|
252 |
case (7 M N M' N' \<sigma>) |
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|
253 |
then obtain \<theta>1 \<theta>2 |
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|
254 |
where "unify M M' = Some \<theta>1" |
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255 |
and "unify (N \<lhd> \<theta>1) (N' \<lhd> \<theta>1) = Some \<theta>2" |
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|
256 |
and \<sigma>: "\<sigma> = \<theta>1 \<lozenge> \<theta>2" |
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257 |
and ih1: "\<And>t. ?P M M' \<theta>1 t" |
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258 |
and ih2: "\<And>t. ?P (N\<lhd>\<theta>1) (N'\<lhd>\<theta>1) \<theta>2 t" |
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259 |
by (auto split:option.split_asm) |
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|
260 |
|
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|
261 |
show ?case |
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|
262 |
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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|
265 |
show "v \<in> vars_of (M \<cdot> N) \<union> vars_of (M' \<cdot> N') \<union> vars_of t" |
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266 |
proof (cases "v \<notin> vars_of M \<and> v \<notin> vars_of M' |
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|
267 |
\<and> v \<notin> vars_of N \<and> v \<notin> vars_of N'") |
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|
268 |
case True |
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|
269 |
with ih1 have l:"\<And>t. v \<in> vars_of (t \<lhd> \<theta>1) \<Longrightarrow> v \<in> vars_of t" |
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|
270 |
by auto |
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|
271 |
|
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272 |
from a and ih2[where t="t \<lhd> \<theta>1"] |
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|
273 |
have "v \<in> vars_of (N \<lhd> \<theta>1) \<union> vars_of (N' \<lhd> \<theta>1) |
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|
274 |
\<or> v \<in> vars_of (t \<lhd> \<theta>1)" unfolding \<sigma> |
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|
275 |
by auto |
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|
276 |
hence "v \<in> vars_of t" |
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|
277 |
proof |
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|
278 |
assume "v \<in> vars_of (N \<lhd> \<theta>1) \<union> vars_of (N' \<lhd> \<theta>1)" |
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|
279 |
with True show ?thesis by (auto dest:l) |
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|
280 |
next |
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|
281 |
assume "v \<in> vars_of (t \<lhd> \<theta>1)" |
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|
282 |
thus ?thesis by (rule l) |
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|
283 |
qed |
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|
284 |
|
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|
285 |
thus ?thesis by auto |
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|
286 |
qed auto |
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|
287 |
qed |
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|
288 |
qed (auto split: split_if_asm) |
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|
289 |
|
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|
290 |
|
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|
291 |
text {* The result of a unification is either the identity |
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|
292 |
substitution or it eliminates a variable from one of the terms: *} |
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|
293 |
|
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|
294 |
lemma unify_eliminates: |
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|
295 |
assumes "unify_dom (M, N)" |
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|
296 |
assumes "unify M N = Some \<sigma>" |
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|
297 |
shows "(\<exists>v\<in>vars_of M \<union> vars_of N. elim \<sigma> v) \<or> \<sigma> \<doteq> []" |
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|
298 |
(is "?P M N \<sigma>") |
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|
299 |
using assms |
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|
300 |
proof (induct M N arbitrary:\<sigma>) |
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|
301 |
case 1 thus ?case by simp |
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|
302 |
next |
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|
303 |
case 2 thus ?case by simp |
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|
304 |
next |
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|
305 |
case (3 c v) |
44369 | 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 | 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 | 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 | 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 | 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 | 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 | 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 | 463 |
|
464 |
subsection {* Unification returns Idempotent Substitution *} |
|
465 |
||
466 |
definition Idem :: "'a subst \<Rightarrow> bool" |
|
467 |
where "Idem s \<longleftrightarrow> (s \<lozenge> s) \<doteq> s" |
|
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 | 526 |
|
23219 | 527 |
end |