Adapted proofs because of new simplification tactics.
(* Title: Substitution.ML
ID: $Id$
Author: Ole Rasmussen
Copyright 1995 University of Cambridge
Logic Image: ZF
*)
open Substitution;
(* ------------------------------------------------------------------------- *)
(* Arithmetic extensions *)
(* ------------------------------------------------------------------------- *)
goal Arith.thy
"!!m.[| p < n; n:nat|]==> n~=p";
by (Fast_tac 1);
qed "gt_not_eq";
val succ_pred = prove_goal Arith.thy
"!!i.[|j:nat; i:nat|]==> i < j --> succ(j #- 1) = j"
(fn prems =>[(etac nat_induct 1),
(Fast_tac 1),
(Asm_simp_tac 1)]);
goal Arith.thy
"!!i.[|succ(x)<n; n:nat; x:nat|]==> x < n#-1 ";
by (rtac succ_leE 1);
by (forward_tac [nat_into_Ord RS le_refl RS lt_trans] 1 THEN assume_tac 1);
by (asm_simp_tac (simpset() addsimps [succ_pred]) 1);
qed "lt_pred";
goal Arith.thy
"!!i.[|n < succ(x); p<n; p:nat; n:nat; x:nat|]==> n#-1 < x ";
by (rtac succ_leE 1);
by (asm_simp_tac (simpset() addsimps [succ_pred]) 1);
qed "gt_pred";
Addsimps [nat_into_Ord, not_lt_iff_le, if_P, if_not_P];
(* ------------------------------------------------------------------------- *)
(* lift_rec equality rules *)
(* ------------------------------------------------------------------------- *)
goalw Substitution.thy [lift_rec_def]
"!!n.[|n:nat; i:nat|]==> lift_rec(Var(i),n) =if(i<n,Var(i),Var(succ(i)))";
by (Asm_full_simp_tac 1);
qed "lift_rec_Var";
goalw Substitution.thy [lift_rec_def]
"!!n.[|n:nat; i:nat; k:nat; k le i|]==> lift_rec(Var(i),k) = Var(succ(i))";
by (Asm_full_simp_tac 1);
qed "lift_rec_le";
goalw Substitution.thy [lift_rec_def]
"!!n.[|i:nat; k:nat; i<k |]==> lift_rec(Var(i),k) = Var(i)";
by (Asm_full_simp_tac 1);
qed "lift_rec_gt";
goalw Substitution.thy [lift_rec_def]
"!!n.[|n:nat; k:nat|]==> \
\ lift_rec(Fun(t),k) = Fun(lift_rec(t,succ(k)))";
by (Asm_full_simp_tac 1);
qed "lift_rec_Fun";
goalw Substitution.thy [lift_rec_def]
"!!n.[|n:nat; k:nat|]==> \
\ lift_rec(App(b,f,a),k) = App(b,lift_rec(f,k),lift_rec(a,k))";
by (Asm_full_simp_tac 1);
qed "lift_rec_App";
(* ------------------------------------------------------------------------- *)
(* substitution quality rules *)
(* ------------------------------------------------------------------------- *)
goalw Substitution.thy [subst_rec_def]
"!!n.[|i:nat; k:nat; u:redexes|]==> \
\ subst_rec(u,Var(i),k) = if(k<i,Var(i#-1),if(k=i,u,Var(i)))";
by (asm_full_simp_tac (simpset() addsimps [gt_not_eq,leI]) 1);
qed "subst_Var";
goalw Substitution.thy [subst_rec_def]
"!!n.[|n:nat; u:redexes|]==> subst_rec(u,Var(n),n) = u";
by (asm_full_simp_tac (simpset()) 1);
qed "subst_eq";
goalw Substitution.thy [subst_rec_def]
"!!n.[|n:nat; u:redexes; p:nat; p<n|]==> \
\ subst_rec(u,Var(n),p) = Var(n#-1)";
by (asm_full_simp_tac (simpset()) 1);
qed "subst_gt";
goalw Substitution.thy [subst_rec_def]
"!!n.[|n:nat; u:redexes; p:nat; n<p|]==> \
\ subst_rec(u,Var(n),p) = Var(n)";
by (asm_full_simp_tac (simpset() addsimps [gt_not_eq,leI]) 1);
qed "subst_lt";
goalw Substitution.thy [subst_rec_def]
"!!n.[|p:nat; u:redexes|]==> \
\ subst_rec(u,Fun(t),p) = Fun(subst_rec(lift(u),t,succ(p))) ";
by (asm_full_simp_tac (simpset()) 1);
qed "subst_Fun";
goalw Substitution.thy [subst_rec_def]
"!!n.[|p:nat; u:redexes|]==> \
\ subst_rec(u,App(b,f,a),p) = App(b,subst_rec(u,f,p),subst_rec(u,a,p))";
by (asm_full_simp_tac (simpset()) 1);
qed "subst_App";
fun addsplit ss = (ss setloop (split_inside_tac [expand_if])
addsimps [lift_rec_Var,subst_Var]);
goal Substitution.thy
"!!n. u:redexes ==> ALL k:nat. lift_rec(u,k):redexes";
by (eresolve_tac [redexes.induct] 1);
by (ALLGOALS(asm_full_simp_tac
((addsplit (simpset())) addsimps [lift_rec_Fun,lift_rec_App])));
qed "lift_rec_type_a";
val lift_rec_type = lift_rec_type_a RS bspec;
goalw Substitution.thy []
"!!n. v:redexes ==> ALL n:nat. ALL u:redexes. subst_rec(u,v,n):redexes";
by (eresolve_tac [redexes.induct] 1);
by (ALLGOALS(asm_full_simp_tac
((addsplit (simpset())) addsimps [subst_Fun,subst_App,
lift_rec_type])));
qed "subst_type_a";
val subst_type = subst_type_a RS bspec RS bspec;
Addsimps [subst_eq, subst_gt, subst_lt, subst_Fun, subst_App, subst_type,
lift_rec_le, lift_rec_gt, lift_rec_Fun, lift_rec_App,
lift_rec_type];
(* ------------------------------------------------------------------------- *)
(* lift and substitution proofs *)
(* ------------------------------------------------------------------------- *)
goalw Substitution.thy []
"!!n. u:redexes ==> ALL n:nat. ALL i:nat. i le n --> \
\ (lift_rec(lift_rec(u,i),succ(n)) = lift_rec(lift_rec(u,n),i))";
by ((eresolve_tac [redexes.induct] 1)
THEN (ALLGOALS Asm_simp_tac));
by Safe_tac;
by (excluded_middle_tac "na < xa" 1);
by ((forward_tac [lt_trans2] 2) THEN (assume_tac 2));
by (ALLGOALS(asm_full_simp_tac
((addsplit (simpset())) addsimps [leI])));
qed "lift_lift_rec";
goalw Substitution.thy []
"!!n.[|u:redexes; n:nat|]==> \
\ lift_rec(lift(u),succ(n)) = lift(lift_rec(u,n))";
by (asm_simp_tac (simpset() addsimps [lift_lift_rec]) 1);
qed "lift_lift";
goal Substitution.thy
"!!n. v:redexes ==> \
\ ALL n:nat. ALL m:nat. ALL u:redexes. n le m-->\
\ lift_rec(subst_rec(u,v,n),m) = \
\ subst_rec(lift_rec(u,m),lift_rec(v,succ(m)),n)";
by ((eresolve_tac [redexes.induct] 1)
THEN (ALLGOALS(asm_simp_tac (simpset() addsimps [lift_lift]))));
by Safe_tac;
by (excluded_middle_tac "na < x" 1);
by (asm_full_simp_tac (simpset()) 1);
by (eres_inst_tac [("j","na")] leE 1);
by (asm_full_simp_tac ((addsplit (simpset()))
addsimps [leI,gt_pred,succ_pred]) 1);
by (hyp_subst_tac 1);
by (asm_full_simp_tac (simpset()) 1);
by (forw_inst_tac [("j","x")] lt_trans2 1);
by (assume_tac 1);
by (asm_full_simp_tac (simpset() addsimps [leI]) 1);
qed "lift_rec_subst_rec";
goalw Substitution.thy []
"!!n.[|v:redexes; u:redexes; n:nat|]==> \
\ lift_rec(u/v,n) = lift_rec(u,n)/lift_rec(v,succ(n))";
by (asm_full_simp_tac (simpset() addsimps [lift_rec_subst_rec]) 1);
qed "lift_subst";
goalw Substitution.thy []
"!!n. v:redexes ==> \
\ ALL n:nat. ALL m:nat. ALL u:redexes. m le n-->\
\ lift_rec(subst_rec(u,v,n),m) = \
\ subst_rec(lift_rec(u,m),lift_rec(v,m),succ(n))";
by ((eresolve_tac [redexes.induct] 1)
THEN (ALLGOALS(asm_simp_tac (simpset() addsimps [lift_lift]))));
by Safe_tac;
by (excluded_middle_tac "na < x" 1);
by (asm_full_simp_tac (simpset()) 1);
by (eres_inst_tac [("i","x")] leE 1);
by (forward_tac [lt_trans1] 1 THEN assume_tac 1);
by (ALLGOALS(asm_full_simp_tac
(simpset() addsimps [succ_pred,leI,gt_pred])));
by (asm_full_simp_tac (simpset() addsimps [leI]) 1);
by (excluded_middle_tac "na < xa" 1);
by (asm_full_simp_tac (simpset()) 1);
by (asm_full_simp_tac (simpset() addsimps [leI]) 1);
qed "lift_rec_subst_rec_lt";
goalw Substitution.thy []
"!!n. u:redexes ==> \
\ ALL n:nat. ALL v:redexes. subst_rec(v,lift_rec(u,n),n) = u";
by ((eresolve_tac [redexes.induct] 1)
THEN (ALLGOALS Asm_simp_tac));
by Safe_tac;
by (excluded_middle_tac "na < x" 1);
(* x <= na *)
by (asm_full_simp_tac (simpset()) 1);
by (asm_full_simp_tac (simpset()) 1);
qed "subst_rec_lift_rec";
goal Substitution.thy
"!!n. v:redexes ==> \
\ ALL m:nat. ALL n:nat. ALL u:redexes. ALL w:redexes. m le n --> \
\ subst_rec(subst_rec(w,u,n),subst_rec(lift_rec(w,m),v,succ(n)),m)=\
\ subst_rec(w,subst_rec(u,v,m),n)";
by ((eresolve_tac [redexes.induct] 1) THEN
(ALLGOALS(asm_simp_tac (simpset() addsimps
[lift_lift RS sym,lift_rec_subst_rec_lt]))));
by Safe_tac;
by (excluded_middle_tac "na le succ(xa)" 1);
by (asm_full_simp_tac (simpset()) 1);
by (forward_tac [nat_into_Ord RS le_refl RS lt_trans] 1 THEN assume_tac 1);
by (etac leE 1);
by (asm_simp_tac (simpset() addsimps [succ_pred,lt_pred]) 2);
by (forward_tac [succ_leI RS lt_trans] 1 THEN assume_tac 1);
by (forw_inst_tac [("i","x")]
(nat_into_Ord RS le_refl RS lt_trans) 1 THEN assume_tac 1);
by (asm_simp_tac (simpset() addsimps [succ_pred,lt_pred]) 1);
by (eres_inst_tac [("i","na")] leE 1);
by (asm_full_simp_tac
(simpset() addsimps [succ_pred,subst_rec_lift_rec,leI]) 2);
by (excluded_middle_tac "na < x" 1);
by (asm_full_simp_tac (simpset()) 1);
by (eres_inst_tac [("j","na")] leE 1);
by (asm_simp_tac (simpset() addsimps [gt_pred]) 1);
by (asm_simp_tac (simpset() addsimps [subst_rec_lift_rec]) 1);
by (forward_tac [lt_trans2] 1 THEN assume_tac 1);
by (asm_simp_tac (simpset() addsimps [gt_pred]) 1);
qed "subst_rec_subst_rec";
goalw Substitution.thy []
"!!n.[|v:redexes; u:redexes; w:redexes; n:nat|]==> \
\ subst_rec(w,u,n)/subst_rec(lift(w),v,succ(n)) = subst_rec(w,u/v,n)";
by (asm_simp_tac (simpset() addsimps [subst_rec_subst_rec]) 1);
qed "substitution";
(* ------------------------------------------------------------------------- *)
(* Preservation lemmas *)
(* Substitution preserves comp and regular *)
(* ------------------------------------------------------------------------- *)
goal Substitution.thy
"!!n.[|n:nat; u ~ v|]==> ALL m:nat. lift_rec(u,m) ~ lift_rec(v,m)";
by (etac Scomp.induct 1);
by (ALLGOALS(asm_simp_tac (simpset() addsimps [comp_refl])));
qed "lift_rec_preserve_comp";
goal Substitution.thy
"!!n. u2 ~ v2 ==> ALL m:nat. ALL u1:redexes. ALL v1:redexes.\
\ u1 ~ v1--> subst_rec(u1,u2,m) ~ subst_rec(v1,v2,m)";
by (etac Scomp.induct 1);
by (ALLGOALS(asm_full_simp_tac ((addsplit (simpset())) addsimps
([lift_rec_preserve_comp,comp_refl]))));
qed "subst_rec_preserve_comp";
goal Substitution.thy
"!!n. regular(u) ==> ALL m:nat. regular(lift_rec(u,m))";
by (eresolve_tac [Sreg.induct] 1);
by (ALLGOALS(asm_full_simp_tac (addsplit (simpset()))));
qed "lift_rec_preserve_reg";
goal Substitution.thy
"!!n. regular(v) ==> \
\ ALL m:nat. ALL u:redexes. regular(u)-->regular(subst_rec(u,v,m))";
by (eresolve_tac [Sreg.induct] 1);
by (ALLGOALS(asm_full_simp_tac ((addsplit (simpset())) addsimps
[lift_rec_preserve_reg])));
qed "subst_rec_preserve_reg";