--- a/Nominal/Manual/Term1.thy Sat Dec 17 17:08:47 2011 +0000
+++ /dev/null Thu Jan 01 00:00:00 1970 +0000
@@ -1,261 +0,0 @@
-theory Term1
-imports "Nominal2_Atoms" "Nominal2_Eqvt" "Nominal2_Supp" "Abs" "Perm" "Fv" "Rsp" "../Attic/Prove"
-begin
-
-atom_decl name
-
-section {*** lets with binding patterns ***}
-
-datatype rtrm1 =
- rVr1 "name"
-| rAp1 "rtrm1" "rtrm1"
-| rLm1 "name" "rtrm1" --"name is bound in trm1"
-| rLt1 "bp" "rtrm1" "rtrm1" --"all variables in bp are bound in the 2nd trm1"
-and bp =
- BUnit
-| BVr "name"
-| BPr "bp" "bp"
-
-print_theorems
-
-(* to be given by the user *)
-
-primrec
- bv1
-where
- "bv1 (BUnit) = {}"
-| "bv1 (BVr x) = {atom x}"
-| "bv1 (BPr bp1 bp2) = (bv1 bp1) \<union> (bv1 bp2)"
-
-setup {* snd o define_raw_perms (Datatype.the_info @{theory} "Term1.rtrm1") 2 *}
-thm permute_rtrm1_permute_bp.simps
-
-local_setup {*
- snd o define_fv_alpha (Datatype.the_info @{theory} "Term1.rtrm1")
- [[[], [], [(NONE, 0, 1)], [(SOME (@{term bv1}, true), 0, 2)]],
- [[], [], []]] [(@{term bv1}, 1, [[], [0], [0, 1]])] *}
-
-notation
- alpha_rtrm1 ("_ \<approx>1 _" [100, 100] 100) and
- alpha_bp ("_ \<approx>1b _" [100, 100] 100)
-thm alpha_rtrm1_alpha_bp_alpha_bv1.intros
-(*thm fv_rtrm1_fv_bp.simps[no_vars]*)
-
-local_setup {* (fn ctxt => snd (Local_Theory.note ((@{binding alpha1_inj}, []), (build_alpha_inj @{thms alpha_rtrm1_alpha_bp_alpha_bv1.intros} @{thms rtrm1.distinct rtrm1.inject bp.distinct bp.inject} @{thms alpha_rtrm1.cases alpha_bp.cases alpha_bv1.cases} ctxt)) ctxt)) *}
-thm alpha1_inj
-
-local_setup {*
-snd o (build_eqvts @{binding bv1_eqvt} [@{term bv1}] (build_eqvts_tac @{thm rtrm1_bp.inducts(2)} @{thms bv1.simps permute_rtrm1_permute_bp.simps} @{context}))
-*}
-
-local_setup {*
-snd o build_eqvts @{binding fv_rtrm1_fv_bp_eqvt} [@{term fv_rtrm1}, @{term fv_bp}] (build_eqvts_tac @{thm rtrm1_bp.induct} @{thms fv_rtrm1_fv_bp.simps permute_rtrm1_permute_bp.simps} @{context})
-*}
-
-(*local_setup {*
-snd o build_eqvts @{binding fv_rtrm1_fv_bv1_eqvt} [@{term fv_rtrm1}, @{term fv_bv1}] (build_eqvts_tac @{thm rtrm1_bp.induct} @{thms fv_rtrm1_fv_bv1.simps permute_rtrm1_permute_bp.simps} @{context})
-*}
-print_theorems
-
-local_setup {*
-snd o build_eqvts @{binding fv_bp_eqvt} [@{term fv_bp}] (build_eqvts_tac @{thm rtrm1_bp.inducts(2)} @{thms fv_rtrm1_fv_bv1.simps fv_bp.simps permute_rtrm1_permute_bp.simps} @{context})
-*}
-print_theorems
-*)
-
-local_setup {*
-(fn ctxt => snd (Local_Theory.note ((@{binding alpha1_eqvt}, []),
-build_alpha_eqvts [@{term alpha_rtrm1}, @{term alpha_bp}, @{term alpha_bv1}] (fn _ => alpha_eqvt_tac @{thm alpha_rtrm1_alpha_bp_alpha_bv1.induct} @{thms permute_rtrm1_permute_bp.simps alpha1_inj} ctxt 1) ctxt) ctxt)) *}
-
-lemma alpha1_eqvt_proper[eqvt]:
- "pi \<bullet> (t \<approx>1 s) = ((pi \<bullet> t) \<approx>1 (pi \<bullet> s))"
- "pi \<bullet> (alpha_bp a b) = (alpha_bp (pi \<bullet> a) (pi \<bullet> b))"
- apply (simp_all only: eqvts)
- apply rule
- apply (simp_all add: alpha1_eqvt)
- apply (subst permute_minus_cancel(2)[symmetric,of "t" "pi"])
- apply (subst permute_minus_cancel(2)[symmetric,of "s" "pi"])
- apply (simp_all only: alpha1_eqvt)
- apply rule
- apply (simp_all add: alpha1_eqvt)
- apply (subst permute_minus_cancel(2)[symmetric,of "a" "pi"])
- apply (subst permute_minus_cancel(2)[symmetric,of "b" "pi"])
- apply (simp_all only: alpha1_eqvt)
-done
-thm eqvts_raw(1)
-
-lemma "(b \<approx>1 a \<longrightarrow> a \<approx>1 b) \<and> (x \<approx>1b y \<longrightarrow> y \<approx>1b x) \<and> (alpha_bv1 x y \<longrightarrow> alpha_bv1 y x)"
-apply (tactic {* symp_tac @{thm alpha_rtrm1_alpha_bp_alpha_bv1.induct} @{thms alpha1_inj} @{thms alpha1_eqvt} @{context} 1 *})
-done
-
-lemma alpha1_equivp:
- "equivp alpha_rtrm1"
- "equivp alpha_bp"
-sorry
-
-(*
-local_setup {* (fn ctxt => snd (Local_Theory.note ((@{binding alpha1_equivp}, []),
- (build_equivps [@{term alpha_rtrm1}, @{term alpha_bp}, @{term alpha_bv1}] @{thm rtrm1_bp.induct} @{thm alpha_rtrm1_alpha_bp_alpha_bv1.induct} @{thms rtrm1.inject bp.inject} @{thms alpha1_inj} @{thms rtrm1.distinct bp.distinct} @{thms alpha_rtrm1.cases alpha_bp.cases} @{thms alpha1_eqvt} ctxt)) ctxt)) *}
-thm alpha1_equivp*)
-
-local_setup {* define_quotient_type [(([], @{binding trm1}, NoSyn), (@{typ rtrm1}, @{term alpha_rtrm1}))]
- (rtac @{thm alpha1_equivp(1)} 1) *}
-
-local_setup {*
-(fn ctxt => ctxt
- |> snd o (Quotient_Def.quotient_lift_const ("Vr1", @{term rVr1}))
- |> snd o (Quotient_Def.quotient_lift_const ("Ap1", @{term rAp1}))
- |> snd o (Quotient_Def.quotient_lift_const ("Lm1", @{term rLm1}))
- |> snd o (Quotient_Def.quotient_lift_const ("Lt1", @{term rLt1}))
- |> snd o (Quotient_Def.quotient_lift_const ("fv_trm1", @{term fv_rtrm1})))
-*}
-print_theorems
-
-local_setup {* snd o prove_const_rsp @{binding fv_rtrm1_rsp} [@{term fv_rtrm1}]
- (fn _ => Skip_Proof.cheat_tac @{theory}) *}
-local_setup {* snd o prove_const_rsp @{binding rVr1_rsp} [@{term rVr1}]
- (fn _ => constr_rsp_tac @{thms alpha1_inj} @{thms fv_rtrm1_rsp} @{thms alpha1_equivp} 1) *}
-local_setup {* snd o prove_const_rsp @{binding rAp1_rsp} [@{term rAp1}]
- (fn _ => constr_rsp_tac @{thms alpha1_inj} @{thms fv_rtrm1_rsp} @{thms alpha1_equivp} 1) *}
-local_setup {* snd o prove_const_rsp @{binding rLm1_rsp} [@{term rLm1}]
- (fn _ => constr_rsp_tac @{thms alpha1_inj} @{thms fv_rtrm1_rsp} @{thms alpha1_equivp} 1) *}
-local_setup {* snd o prove_const_rsp @{binding rLt1_rsp} [@{term rLt1}]
- (fn _ => Skip_Proof.cheat_tac @{theory}) *}
-local_setup {* snd o prove_const_rsp @{binding permute_rtrm1_rsp} [@{term "permute :: perm \<Rightarrow> rtrm1 \<Rightarrow> rtrm1"}]
- (fn _ => asm_simp_tac (HOL_ss addsimps @{thms alpha1_eqvt}) 1) *}
-
-lemmas trm1_bp_induct = rtrm1_bp.induct[quot_lifted]
-lemmas trm1_bp_inducts = rtrm1_bp.inducts[quot_lifted]
-
-setup {* define_lifted_perms ["Term1.trm1"] [("permute_trm1", @{term "permute :: perm \<Rightarrow> rtrm1 \<Rightarrow> rtrm1"})]
- @{thms permute_rtrm1_permute_bp_zero permute_rtrm1_permute_bp_append} *}
-
-lemmas
- permute_trm1 = permute_rtrm1_permute_bp.simps[quot_lifted]
-and fv_trm1 = fv_rtrm1_fv_bp.simps[quot_lifted]
-and fv_trm1_eqvt = fv_rtrm1_fv_bp_eqvt[quot_lifted]
-and alpha1_INJ = alpha1_inj[unfolded alpha_gen2, unfolded alpha_gen, quot_lifted, folded alpha_gen2, folded alpha_gen]
-
-lemma supports:
- "(supp (atom x)) supports (Vr1 x)"
- "(supp t \<union> supp s) supports (Ap1 t s)"
- "(supp (atom x) \<union> supp t) supports (Lm1 x t)"
- "(supp b \<union> supp t \<union> supp s) supports (Lt1 b t s)"
- "{} supports BUnit"
- "(supp (atom x)) supports (BVr x)"
- "(supp a \<union> supp b) supports (BPr a b)"
-apply(tactic {* ALLGOALS (supports_tac @{thms permute_trm1}) *})
-done
-
-prove rtrm1_bp_fs: {* snd (mk_fs [@{typ trm1}, @{typ bp}]) *}
-apply (tactic {* fs_tac @{thm trm1_bp_induct} @{thms supports} 1 *})
-done
-
-instance trm1 and bp :: fs
-apply default
-apply (simp_all add: rtrm1_bp_fs)
-done
-
-lemma fv_eq_bv_pre: "fv_bp bp = bv1 bp"
-apply(induct bp rule: trm1_bp_inducts(2))
-apply(simp_all)
-done
-
-lemma fv_eq_bv: "fv_bp = bv1"
-apply(rule ext)
-apply(rule fv_eq_bv_pre)
-done
-
-lemma helper2: "{b. \<forall>pi. pi \<bullet> (a \<rightleftharpoons> b) \<bullet> bp \<noteq> bp} = {}"
-apply auto
-apply (rule_tac x="(x \<rightleftharpoons> a)" in exI)
-apply auto
-done
-
-lemma alpha_bp_eq_eq: "alpha_bp a b = (a = b)"
-apply rule
-apply (induct a b rule: alpha_rtrm1_alpha_bp_alpha_bv1.inducts(2))
-apply (simp_all add: equivp_reflp[OF alpha1_equivp(2)])
-done
-
-lemma alpha_bp_eq: "alpha_bp = (op =)"
-apply (rule ext)+
-apply (rule alpha_bp_eq_eq)
-done
-
-lemma ex_out:
- "(\<exists>x. Z x \<and> Q) = (Q \<and> (\<exists>x. Z x))"
- "(\<exists>x. Q \<and> Z x) = (Q \<and> (\<exists>x. Z x))"
- "(\<exists>x. P x \<and> Q \<and> Z x) = (Q \<and> (\<exists>x. P x \<and> Z x))"
- "(\<exists>x. Q \<and> P x \<and> Z x) = (Q \<and> (\<exists>x. P x \<and> Z x))"
- "(\<exists>x. Q \<and> P x \<and> Z x \<and> W x) = (Q \<and> (\<exists>x. P x \<and> Z x \<and> W x))"
-apply (blast)+
-done
-
-lemma Collect_neg_conj: "{x. \<not>(P x \<and> Q x)} = {x. \<not>(P x)} \<union> {x. \<not>(Q x)}"
-by (simp add: Collect_imp_eq Collect_neg_eq[symmetric])
-
-lemma supp_fv_let:
- assumes sa : "fv_bp bp = supp bp"
- shows "\<lbrakk>fv_trm1 ta = supp ta; fv_trm1 tb = supp tb; fv_bp bp = supp bp\<rbrakk>
- \<Longrightarrow> supp (Lt1 bp ta tb) = supp ta \<union> (supp (bp, tb) - supp bp)"
-apply(fold supp_Abs)
-apply(simp (no_asm) only: fv_trm1 fv_eq_bv sa[simplified fv_eq_bv,symmetric])
-apply(simp (no_asm) only: supp_def)
-apply(simp only: permute_set_eq permute_trm1)
-apply(simp only: alpha1_INJ alpha_bp_eq)
-apply(simp only: ex_out)
-apply(simp only: Collect_neg_conj)
-apply(simp only: permute_ABS)
-apply(simp only: Abs_eq_iff)
-apply(simp only: alpha_gen supp_Pair split_conv eqvts)
-apply(simp only: infinite_Un)
-apply(simp only: Collect_disj_eq)
-apply(tactic {* Cong_Tac.cong_tac @{thm cong} 1 *}) apply(rule refl)
-apply (simp only: eqvts[symmetric] fv_trm1_eqvt[symmetric])
-apply (simp only: eqvts Pair_eq)
-done
-
-lemma supp_fv:
- "supp t = fv_trm1 t"
- "supp b = fv_bp b"
-apply(induct t and b rule: trm1_bp_inducts)
-apply(simp_all)
-apply(simp add: supp_def permute_trm1 alpha1_INJ fv_trm1)
-apply(simp only: supp_at_base[simplified supp_def])
-apply(simp add: supp_def permute_trm1 alpha1_INJ fv_trm1)
-apply(simp add: Collect_imp_eq Collect_neg_eq Un_commute)
-apply(subgoal_tac "supp (Lm1 name rtrm1) = supp (Abs {atom name} rtrm1)")
-apply(simp add: supp_Abs fv_trm1)
-apply(simp (no_asm) add: supp_def permute_set_eq atom_eqvt permute_trm1)
-apply(simp add: alpha1_INJ)
-apply(simp add: Abs_eq_iff)
-apply(simp add: alpha_gen.simps)
-apply(simp add: supp_eqvt[symmetric] fv_trm1_eqvt[symmetric])
-apply(simp add: supp_fv_let fv_trm1 fv_eq_bv supp_Pair)
-apply blast
-apply(simp add: supp_def permute_trm1 alpha1_INJ fv_trm1)
-apply(simp add: supp_def permute_trm1 alpha1_INJ fv_trm1)
-apply(simp only: supp_at_base[simplified supp_def])
-apply(simp (no_asm) only: supp_def permute_set_eq atom_eqvt permute_trm1 alpha1_INJ[simplified alpha_bp_eq])
-apply(simp add: Collect_imp_eq Collect_neg_eq[symmetric])
-apply(fold supp_def)
-apply simp
-done
-
-lemma trm1_supp:
- "supp (Vr1 x) = {atom x}"
- "supp (Ap1 t1 t2) = supp t1 \<union> supp t2"
- "supp (Lm1 x t) = (supp t) - {atom x}"
- "supp (Lt1 b t s) = supp t \<union> (supp s - bv1 b)"
-by (simp_all add: supp_fv fv_trm1 fv_eq_bv)
-
-lemma trm1_induct_strong:
- assumes "\<And>name b. P b (Vr1 name)"
- and "\<And>rtrm11 rtrm12 b. \<lbrakk>\<And>c. P c rtrm11; \<And>c. P c rtrm12\<rbrakk> \<Longrightarrow> P b (Ap1 rtrm11 rtrm12)"
- and "\<And>name rtrm1 b. \<lbrakk>\<And>c. P c rtrm1; (atom name) \<sharp> b\<rbrakk> \<Longrightarrow> P b (Lm1 name rtrm1)"
- and "\<And>bp rtrm11 rtrm12 b. \<lbrakk>\<And>c. P c rtrm11; \<And>c. P c rtrm12; bv1 bp \<sharp>* b\<rbrakk> \<Longrightarrow> P b (Lt1 bp rtrm11 rtrm12)"
- shows "P a rtrma"
-sorry
-
-end