(* Title: HOL/Proofs/Extraction/Higman.thy Author: Stefan Berghofer, TU Muenchen Author: Monika Seisenberger, LMU Muenchen *) section \Higman's lemma\ theory Higman imports Main begin text \ Formalization by Stefan Berghofer and Monika Seisenberger, based on Coquand and Fridlender @{cite Coquand93}. \ datatype letter = A | B inductive emb :: "letter list \ letter list \ bool" where emb0 [Pure.intro]: "emb [] bs" | emb1 [Pure.intro]: "emb as bs \ emb as (b # bs)" | emb2 [Pure.intro]: "emb as bs \ emb (a # as) (a # bs)" inductive L :: "letter list \ letter list list \ bool" for v :: "letter list" where L0 [Pure.intro]: "emb w v \ L v (w # ws)" | L1 [Pure.intro]: "L v ws \ L v (w # ws)" inductive good :: "letter list list \ bool" where good0 [Pure.intro]: "L w ws \ good (w # ws)" | good1 [Pure.intro]: "good ws \ good (w # ws)" inductive R :: "letter \ letter list list \ letter list list \ bool" for a :: letter where R0 [Pure.intro]: "R a [] []" | R1 [Pure.intro]: "R a vs ws \ R a (w # vs) ((a # w) # ws)" inductive T :: "letter \ letter list list \ letter list list \ bool" for a :: letter where T0 [Pure.intro]: "a \ b \ R b ws zs \ T a (w # zs) ((a # w) # zs)" | T1 [Pure.intro]: "T a ws zs \ T a (w # ws) ((a # w) # zs)" | T2 [Pure.intro]: "a \ b \ T a ws zs \ T a ws ((b # w) # zs)" inductive bar :: "letter list list \ bool" where bar1 [Pure.intro]: "good ws \ bar ws" | bar2 [Pure.intro]: "(\w. bar (w # ws)) \ bar ws" theorem prop1: "bar ([] # ws)" by iprover theorem lemma1: "L as ws \ L (a # as) ws" by (erule L.induct) iprover+ lemma lemma2': "R a vs ws \ L as vs \ L (a # as) ws" apply (induct set: R) apply (erule L.cases) apply simp+ apply (erule L.cases) apply simp_all apply (rule L0) apply (erule emb2) apply (erule L1) done lemma lemma2: "R a vs ws \ good vs \ good ws" apply (induct set: R) apply iprover apply (erule good.cases) apply simp_all apply (rule good0) apply (erule lemma2') apply assumption apply (erule good1) done lemma lemma3': "T a vs ws \ L as vs \ L (a # as) ws" apply (induct set: T) apply (erule L.cases) apply simp_all apply (rule L0) apply (erule emb2) apply (rule L1) apply (erule lemma1) apply (erule L.cases) apply simp_all apply iprover+ done lemma lemma3: "T a ws zs \ good ws \ good zs" apply (induct set: T) apply (erule good.cases) apply simp_all apply (rule good0) apply (erule lemma1) apply (erule good1) apply (erule good.cases) apply simp_all apply (rule good0) apply (erule lemma3') apply iprover+ done lemma lemma4: "R a ws zs \ ws \ [] \ T a ws zs" apply (induct set: R) apply iprover apply (case_tac vs) apply (erule R.cases) apply simp apply (case_tac a) apply (rule_tac b=B in T0) apply simp apply (rule R0) apply (rule_tac b=A in T0) apply simp apply (rule R0) apply simp apply (rule T1) apply simp done lemma letter_neq: "a \ b \ c \ a \ c = b" for a b c :: letter apply (case_tac a) apply (case_tac b) apply (case_tac c, simp, simp) apply (case_tac c, simp, simp) apply (case_tac b) apply (case_tac c, simp, simp) apply (case_tac c, simp, simp) done lemma letter_eq_dec: "a = b \ a \ b" for a b :: letter apply (case_tac a) apply (case_tac b) apply simp apply simp apply (case_tac b) apply simp apply simp done theorem prop2: assumes ab: "a \ b" and bar: "bar xs" shows "\ys zs. bar ys \ T a xs zs \ T b ys zs \ bar zs" using bar proof induct fix xs zs assume "T a xs zs" and "good xs" then have "good zs" by (rule lemma3) then show "bar zs" by (rule bar1) next fix xs ys assume I: "\w ys zs. bar ys \ T a (w # xs) zs \ T b ys zs \ bar zs" assume "bar ys" then show "\zs. T a xs zs \ T b ys zs \ bar zs" proof induct fix ys zs assume "T b ys zs" and "good ys" then have "good zs" by (rule lemma3) then show "bar zs" by (rule bar1) next fix ys zs assume I': "\w zs. T a xs zs \ T b (w # ys) zs \ bar zs" and ys: "\w. bar (w # ys)" and Ta: "T a xs zs" and Tb: "T b ys zs" show "bar zs" proof (rule bar2) fix w show "bar (w # zs)" proof (cases w) case Nil then show ?thesis by simp (rule prop1) next case (Cons c cs) from letter_eq_dec show ?thesis proof assume ca: "c = a" from ab have "bar ((a # cs) # zs)" by (iprover intro: I ys Ta Tb) then show ?thesis by (simp add: Cons ca) next assume "c \ a" with ab have cb: "c = b" by (rule letter_neq) from ab have "bar ((b # cs) # zs)" by (iprover intro: I' Ta Tb) then show ?thesis by (simp add: Cons cb) qed qed qed qed qed theorem prop3: assumes bar: "bar xs" shows "\zs. xs \ [] \ R a xs zs \ bar zs" using bar proof induct fix xs zs assume "R a xs zs" and "good xs" then have "good zs" by (rule lemma2) then show "bar zs" by (rule bar1) next fix xs zs assume I: "\w zs. w # xs \ [] \ R a (w # xs) zs \ bar zs" and xsb: "\w. bar (w # xs)" and xsn: "xs \ []" and R: "R a xs zs" show "bar zs" proof (rule bar2) fix w show "bar (w # zs)" proof (induct w) case Nil show ?case by (rule prop1) next case (Cons c cs) from letter_eq_dec show ?case proof assume "c = a" then show ?thesis by (iprover intro: I [simplified] R) next from R xsn have T: "T a xs zs" by (rule lemma4) assume "c \ a" then show ?thesis by (iprover intro: prop2 Cons xsb xsn R T) qed qed qed qed theorem higman: "bar []" proof (rule bar2) fix w show "bar [w]" proof (induct w) show "bar [[]]" by (rule prop1) next fix c cs assume "bar [cs]" then show "bar [c # cs]" by (rule prop3) (simp, iprover) qed qed primrec is_prefix :: "'a list \ (nat \ 'a) \ bool" where "is_prefix [] f = True" | "is_prefix (x # xs) f = (x = f (length xs) \ is_prefix xs f)" theorem L_idx: assumes L: "L w ws" shows "is_prefix ws f \ \i. emb (f i) w \ i < length ws" using L proof induct case (L0 v ws) then have "emb (f (length ws)) w" by simp moreover have "length ws < length (v # ws)" by simp ultimately show ?case by iprover next case (L1 ws v) then obtain i where emb: "emb (f i) w" and "i < length ws" by simp iprover then have "i < length (v # ws)" by simp with emb show ?case by iprover qed theorem good_idx: assumes good: "good ws" shows "is_prefix ws f \ \i j. emb (f i) (f j) \ i < j" using good proof induct case (good0 w ws) then have "w = f (length ws)" and "is_prefix ws f" by simp_all with good0 show ?case by (iprover dest: L_idx) next case (good1 ws w) then show ?case by simp qed theorem bar_idx: assumes bar: "bar ws" shows "is_prefix ws f \ \i j. emb (f i) (f j) \ i < j" using bar proof induct case (bar1 ws) then show ?case by (rule good_idx) next case (bar2 ws) then have "is_prefix (f (length ws) # ws) f" by simp then show ?case by (rule bar2) qed text \ Strong version: yields indices of words that can be embedded into each other. \ theorem higman_idx: "\(i::nat) j. emb (f i) (f j) \ i < j" proof (rule bar_idx) show "bar []" by (rule higman) show "is_prefix [] f" by simp qed text \ Weak version: only yield sequence containing words that can be embedded into each other. \ theorem good_prefix_lemma: assumes bar: "bar ws" shows "is_prefix ws f \ \vs. is_prefix vs f \ good vs" using bar proof induct case bar1 then show ?case by iprover next case (bar2 ws) from bar2.prems have "is_prefix (f (length ws) # ws) f" by simp then show ?case by (iprover intro: bar2) qed theorem good_prefix: "\vs. is_prefix vs f \ good vs" using higman by (rule good_prefix_lemma) simp+ end