(* Title: HOL/Proofs/Lambda/StrongNorm.thy Author: Stefan Berghofer Copyright 2000 TU Muenchen *) section \Strong normalization for simply-typed lambda calculus\ theory StrongNorm imports LambdaType InductTermi begin text \ Formalization by Stefan Berghofer. Partly based on a paper proof by Felix Joachimski and Ralph Matthes @{cite "Matthes-Joachimski-AML"}. \ subsection \Properties of \IT\\ lemma lift_IT [intro!]: "IT t \ IT (lift t i)" apply (induct arbitrary: i set: IT) apply (simp (no_asm)) apply (rule conjI) apply (rule impI, rule IT.Var, erule listsp.induct, simp (no_asm), simp (no_asm), rule listsp.Cons, blast, assumption)+ apply auto done lemma lifts_IT: "listsp IT ts \ listsp IT (map (\t. lift t 0) ts)" by (induct ts) auto lemma subst_Var_IT: "IT r \ IT (r[Var i/j])" apply (induct arbitrary: i j set: IT) txt \Case \<^term>\Var\:\ apply (simp (no_asm) add: subst_Var) apply ((rule conjI impI)+, rule IT.Var, erule listsp.induct, simp (no_asm), simp (no_asm), rule listsp.Cons, fast, assumption)+ txt \Case \<^term>\Lambda\:\ apply atomize apply simp apply (rule IT.Lambda) apply fast txt \Case \<^term>\Beta\:\ apply atomize apply (simp (no_asm_use) add: subst_subst [symmetric]) apply (rule IT.Beta) apply auto done lemma Var_IT: "IT (Var n)" apply (subgoal_tac "IT (Var n \\ [])") apply simp apply (rule IT.Var) apply (rule listsp.Nil) done lemma app_Var_IT: "IT t \ IT (t \ Var i)" apply (induct set: IT) apply (subst app_last) apply (rule IT.Var) apply simp apply (rule listsp.Cons) apply (rule Var_IT) apply (rule listsp.Nil) apply (rule IT.Beta [where ?ss = "[]", unfolded foldl_Nil [THEN eq_reflection]]) apply (erule subst_Var_IT) apply (rule Var_IT) apply (subst app_last) apply (rule IT.Beta) apply (subst app_last [symmetric]) apply assumption apply assumption done subsection \Well-typed substitution preserves termination\ lemma subst_type_IT: "\t e T u i. IT t \ e\i:U\ \ t : T \ IT u \ e \ u : U \ IT (t[u/i])" (is "PROP ?P U" is "\t e T u i. _ \ PROP ?Q t e T u i U") proof (induct U) fix T t assume MI1: "\T1 T2. T = T1 \ T2 \ PROP ?P T1" assume MI2: "\T1 T2. T = T1 \ T2 \ PROP ?P T2" assume "IT t" thus "\e T' u i. PROP ?Q t e T' u i T" proof induct fix e T' u i assume uIT: "IT u" assume uT: "e \ u : T" { case (Var rs n e1 T'1 u1 i1) assume nT: "e\i:T\ \ Var n \\ rs : T'" let ?ty = "\t. \T'. e\i:T\ \ t : T'" let ?R = "\t. \e T' u i. e\i:T\ \ t : T' \ IT u \ e \ u : T \ IT (t[u/i])" show "IT ((Var n \\ rs)[u/i])" proof (cases "n = i") case True show ?thesis proof (cases rs) case Nil with uIT True show ?thesis by simp next case (Cons a as) with nT have "e\i:T\ \ Var n \ a \\ as : T'" by simp then obtain Ts where headT: "e\i:T\ \ Var n \ a : Ts \ T'" and argsT: "e\i:T\ \ as : Ts" by (rule list_app_typeE) from headT obtain T'' where varT: "e\i:T\ \ Var n : T'' \ Ts \ T'" and argT: "e\i:T\ \ a : T''" by cases simp_all from varT True have T: "T = T'' \ Ts \ T'" by cases auto with uT have uT': "e \ u : T'' \ Ts \ T'" by simp from T have "IT ((Var 0 \\ map (\t. lift t 0) (map (\t. t[u/i]) as))[(u \ a[u/i])/0])" proof (rule MI2) from T have "IT ((lift u 0 \ Var 0)[a[u/i]/0])" proof (rule MI1) have "IT (lift u 0)" by (rule lift_IT [OF uIT]) thus "IT (lift u 0 \ Var 0)" by (rule app_Var_IT) show "e\0:T''\ \ lift u 0 \ Var 0 : Ts \ T'" proof (rule typing.App) show "e\0:T''\ \ lift u 0 : T'' \ Ts \ T'" by (rule lift_type) (rule uT') show "e\0:T''\ \ Var 0 : T''" by (rule typing.Var) simp qed from Var have "?R a" by cases (simp_all add: Cons) with argT uIT uT show "IT (a[u/i])" by simp from argT uT show "e \ a[u/i] : T''" by (rule subst_lemma) simp qed thus "IT (u \ a[u/i])" by simp from Var have "listsp ?R as" by cases (simp_all add: Cons) moreover from argsT have "listsp ?ty as" by (rule lists_typings) ultimately have "listsp (\t. ?R t \ ?ty t) as" by simp hence "listsp IT (map (\t. lift t 0) (map (\t. t[u/i]) as))" (is "listsp IT (?ls as)") proof induct case Nil show ?case by fastforce next case (Cons b bs) hence I: "?R b" by simp from Cons obtain U where "e\i:T\ \ b : U" by fast with uT uIT I have "IT (b[u/i])" by simp hence "IT (lift (b[u/i]) 0)" by (rule lift_IT) hence "listsp IT (lift (b[u/i]) 0 # ?ls bs)" by (rule listsp.Cons) (rule Cons) thus ?case by simp qed thus "IT (Var 0 \\ ?ls as)" by (rule IT.Var) have "e\0:Ts \ T'\ \ Var 0 : Ts \ T'" by (rule typing.Var) simp moreover from uT argsT have "e \ map (\t. t[u/i]) as : Ts" by (rule substs_lemma) hence "e\0:Ts \ T'\ \ ?ls as : Ts" by (rule lift_types) ultimately show "e\0:Ts \ T'\ \ Var 0 \\ ?ls as : T'" by (rule list_app_typeI) from argT uT have "e \ a[u/i] : T''" by (rule subst_lemma) (rule refl) with uT' show "e \ u \ a[u/i] : Ts \ T'" by (rule typing.App) qed with Cons True show ?thesis by (simp add: comp_def) qed next case False from Var have "listsp ?R rs" by simp moreover from nT obtain Ts where "e\i:T\ \ rs : Ts" by (rule list_app_typeE) hence "listsp ?ty rs" by (rule lists_typings) ultimately have "listsp (\t. ?R t \ ?ty t) rs" by simp hence "listsp IT (map (\x. x[u/i]) rs)" proof induct case Nil show ?case by fastforce next case (Cons a as) hence I: "?R a" by simp from Cons obtain U where "e\i:T\ \ a : U" by fast with uT uIT I have "IT (a[u/i])" by simp hence "listsp IT (a[u/i] # map (\t. t[u/i]) as)" by (rule listsp.Cons) (rule Cons) thus ?case by simp qed with False show ?thesis by (auto simp add: subst_Var) qed next case (Lambda r e1 T'1 u1 i1) assume "e\i:T\ \ Abs r : T'" and "\e T' u i. PROP ?Q r e T' u i T" with uIT uT show "IT (Abs r[u/i])" by fastforce next case (Beta r a as e1 T'1 u1 i1) assume T: "e\i:T\ \ Abs r \ a \\ as : T'" assume SI1: "\e T' u i. PROP ?Q (r[a/0] \\ as) e T' u i T" assume SI2: "\e T' u i. PROP ?Q a e T' u i T" have "IT (Abs (r[lift u 0/Suc i]) \ a[u/i] \\ map (\t. t[u/i]) as)" proof (rule IT.Beta) have "Abs r \ a \\ as \\<^sub>\ r[a/0] \\ as" by (rule apps_preserves_beta) (rule beta.beta) with T have "e\i:T\ \ r[a/0] \\ as : T'" by (rule subject_reduction) hence "IT ((r[a/0] \\ as)[u/i])" using uIT uT by (rule SI1) thus "IT (r[lift u 0/Suc i][a[u/i]/0] \\ map (\t. t[u/i]) as)" by (simp del: subst_map add: subst_subst subst_map [symmetric]) from T obtain U where "e\i:T\ \ Abs r \ a : U" by (rule list_app_typeE) fast then obtain T'' where "e\i:T\ \ a : T''" by cases simp_all thus "IT (a[u/i])" using uIT uT by (rule SI2) qed thus "IT ((Abs r \ a \\ as)[u/i])" by simp } qed qed subsection \Well-typed terms are strongly normalizing\ lemma type_implies_IT: assumes "e \ t : T" shows "IT t" using assms proof induct case Var show ?case by (rule Var_IT) next case Abs show ?case by (rule IT.Lambda) (rule Abs) next case (App e s T U t) have "IT ((Var 0 \ lift t 0)[s/0])" proof (rule subst_type_IT) have "IT (lift t 0)" using \IT t\ by (rule lift_IT) hence "listsp IT [lift t 0]" by (rule listsp.Cons) (rule listsp.Nil) hence "IT (Var 0 \\ [lift t 0])" by (rule IT.Var) also have "Var 0 \\ [lift t 0] = Var 0 \ lift t 0" by simp finally show "IT \" . have "e\0:T \ U\ \ Var 0 : T \ U" by (rule typing.Var) simp moreover have "e\0:T \ U\ \ lift t 0 : T" by (rule lift_type) (rule App.hyps) ultimately show "e\0:T \ U\ \ Var 0 \ lift t 0 : U" by (rule typing.App) show "IT s" by fact show "e \ s : T \ U" by fact qed thus ?case by simp qed theorem type_implies_termi: "e \ t : T \ termip beta t" proof - assume "e \ t : T" hence "IT t" by (rule type_implies_IT) thus ?thesis by (rule IT_implies_termi) qed end