(* Title: ZF/Constructible/Datatype_absolute.thy
ID: $Id$
Author: Lawrence C Paulson, Cambridge University Computer Laboratory
Copyright 2002 University of Cambridge
*)
header {*Absoluteness Properties for Recursive Datatypes*}
theory Datatype_absolute = Formula + WF_absolute:
subsection{*The lfp of a continuous function can be expressed as a union*}
constdefs
directed :: "i=>o"
"directed(A) == A\<noteq>0 & (\<forall>x\<in>A. \<forall>y\<in>A. x \<union> y \<in> A)"
contin :: "(i=>i) => o"
"contin(h) == (\<forall>A. directed(A) --> h(\<Union>A) = (\<Union>X\<in>A. h(X)))"
lemma bnd_mono_iterates_subset: "[|bnd_mono(D, h); n \<in> nat|] ==> h^n (0) <= D"
apply (induct_tac n)
apply (simp_all add: bnd_mono_def, blast)
done
lemma bnd_mono_increasing [rule_format]:
"[|i \<in> nat; j \<in> nat; bnd_mono(D,h)|] ==> i \<le> j --> h^i(0) \<subseteq> h^j(0)"
apply (rule_tac m=i and n=j in diff_induct, simp_all)
apply (blast del: subsetI
intro: bnd_mono_iterates_subset bnd_monoD2 [of concl: h])
done
lemma directed_iterates: "bnd_mono(D,h) ==> directed({h^n (0). n\<in>nat})"
apply (simp add: directed_def, clarify)
apply (rename_tac i j)
apply (rule_tac x="i \<union> j" in bexI)
apply (rule_tac i = i and j = j in Ord_linear_le)
apply (simp_all add: subset_Un_iff [THEN iffD1] le_imp_subset
subset_Un_iff2 [THEN iffD1])
apply (simp_all add: subset_Un_iff [THEN iff_sym] bnd_mono_increasing
subset_Un_iff2 [THEN iff_sym])
done
lemma contin_iterates_eq:
"[|bnd_mono(D, h); contin(h)|]
==> h(\<Union>n\<in>nat. h^n (0)) = (\<Union>n\<in>nat. h^n (0))"
apply (simp add: contin_def directed_iterates)
apply (rule trans)
apply (rule equalityI)
apply (simp_all add: UN_subset_iff)
apply safe
apply (erule_tac [2] natE)
apply (rule_tac a="succ(x)" in UN_I)
apply simp_all
apply blast
done
lemma lfp_subset_Union:
"[|bnd_mono(D, h); contin(h)|] ==> lfp(D,h) <= (\<Union>n\<in>nat. h^n(0))"
apply (rule lfp_lowerbound)
apply (simp add: contin_iterates_eq)
apply (simp add: contin_def bnd_mono_iterates_subset UN_subset_iff)
done
lemma Union_subset_lfp:
"bnd_mono(D,h) ==> (\<Union>n\<in>nat. h^n(0)) <= lfp(D,h)"
apply (simp add: UN_subset_iff)
apply (rule ballI)
apply (induct_tac n, simp_all)
apply (rule subset_trans [of _ "h(lfp(D,h))"])
apply (blast dest: bnd_monoD2 [OF _ _ lfp_subset])
apply (erule lfp_lemma2)
done
lemma lfp_eq_Union:
"[|bnd_mono(D, h); contin(h)|] ==> lfp(D,h) = (\<Union>n\<in>nat. h^n(0))"
by (blast del: subsetI
intro: lfp_subset_Union Union_subset_lfp)
subsubsection{*Some Standard Datatype Constructions Preserve Continuity*}
lemma contin_imp_mono: "[|X\<subseteq>Y; contin(F)|] ==> F(X) \<subseteq> F(Y)"
apply (simp add: contin_def)
apply (drule_tac x="{X,Y}" in spec)
apply (simp add: directed_def subset_Un_iff2 Un_commute)
done
lemma sum_contin: "[|contin(F); contin(G)|] ==> contin(\<lambda>X. F(X) + G(X))"
by (simp add: contin_def, blast)
lemma prod_contin: "[|contin(F); contin(G)|] ==> contin(\<lambda>X. F(X) * G(X))"
apply (subgoal_tac "\<forall>B C. F(B) \<subseteq> F(B \<union> C)")
prefer 2 apply (simp add: Un_upper1 contin_imp_mono)
apply (subgoal_tac "\<forall>B C. G(C) \<subseteq> G(B \<union> C)")
prefer 2 apply (simp add: Un_upper2 contin_imp_mono)
apply (simp add: contin_def, clarify)
apply (rule equalityI)
prefer 2 apply blast
apply clarify
apply (rename_tac B C)
apply (rule_tac a="B \<union> C" in UN_I)
apply (simp add: directed_def, blast)
done
lemma const_contin: "contin(\<lambda>X. A)"
by (simp add: contin_def directed_def)
lemma id_contin: "contin(\<lambda>X. X)"
by (simp add: contin_def)
subsection {*Absoluteness for "Iterates"*}
constdefs
iterates_MH :: "[i=>o, [i,i]=>o, i, i, i, i] => o"
"iterates_MH(M,isF,v,n,g,z) ==
is_nat_case(M, v, \<lambda>m u. \<exists>gm[M]. fun_apply(M,g,m,gm) & isF(gm,u),
n, z)"
iterates_replacement :: "[i=>o, [i,i]=>o, i] => o"
"iterates_replacement(M,isF,v) ==
\<forall>n[M]. n\<in>nat -->
wfrec_replacement(M, iterates_MH(M,isF,v), Memrel(succ(n)))"
lemma (in M_axioms) iterates_MH_abs:
"[| relativize1(M,isF,F); M(n); M(g); M(z) |]
==> iterates_MH(M,isF,v,n,g,z) <-> z = nat_case(v, \<lambda>m. F(g`m), n)"
by (simp add: nat_case_abs [of _ "\<lambda>m. F(g ` m)"]
relativize1_def iterates_MH_def)
lemma (in M_axioms) iterates_imp_wfrec_replacement:
"[|relativize1(M,isF,F); n \<in> nat; iterates_replacement(M,isF,v)|]
==> wfrec_replacement(M, \<lambda>n f z. z = nat_case(v, \<lambda>m. F(f`m), n),
Memrel(succ(n)))"
by (simp add: iterates_replacement_def iterates_MH_abs)
theorem (in M_trancl) iterates_abs:
"[| iterates_replacement(M,isF,v); relativize1(M,isF,F);
n \<in> nat; M(v); M(z); \<forall>x[M]. M(F(x)) |]
==> is_wfrec(M, iterates_MH(M,isF,v), Memrel(succ(n)), n, z) <->
z = iterates(F,n,v)"
apply (frule iterates_imp_wfrec_replacement, assumption+)
apply (simp add: wf_Memrel trans_Memrel relation_Memrel nat_into_M
relativize2_def iterates_MH_abs
iterates_nat_def recursor_def transrec_def
eclose_sing_Ord_eq nat_into_M
trans_wfrec_abs [of _ _ _ _ "\<lambda>n g. nat_case(v, \<lambda>m. F(g`m), n)"])
done
lemma (in M_wfrank) iterates_closed [intro,simp]:
"[| iterates_replacement(M,isF,v); relativize1(M,isF,F);
n \<in> nat; M(v); \<forall>x[M]. M(F(x)) |]
==> M(iterates(F,n,v))"
apply (frule iterates_imp_wfrec_replacement, assumption+)
apply (simp add: wf_Memrel trans_Memrel relation_Memrel nat_into_M
relativize2_def iterates_MH_abs
iterates_nat_def recursor_def transrec_def
eclose_sing_Ord_eq nat_into_M
trans_wfrec_closed [of _ _ _ "\<lambda>n g. nat_case(v, \<lambda>m. F(g`m), n)"])
done
subsection {*lists without univ*}
lemmas datatype_univs = Inl_in_univ Inr_in_univ
Pair_in_univ nat_into_univ A_into_univ
lemma list_fun_bnd_mono: "bnd_mono(univ(A), \<lambda>X. {0} + A*X)"
apply (rule bnd_monoI)
apply (intro subset_refl zero_subset_univ A_subset_univ
sum_subset_univ Sigma_subset_univ)
apply (rule subset_refl sum_mono Sigma_mono | assumption)+
done
lemma list_fun_contin: "contin(\<lambda>X. {0} + A*X)"
by (intro sum_contin prod_contin id_contin const_contin)
text{*Re-expresses lists using sum and product*}
lemma list_eq_lfp2: "list(A) = lfp(univ(A), \<lambda>X. {0} + A*X)"
apply (simp add: list_def)
apply (rule equalityI)
apply (rule lfp_lowerbound)
prefer 2 apply (rule lfp_subset)
apply (clarify, subst lfp_unfold [OF list_fun_bnd_mono])
apply (simp add: Nil_def Cons_def)
apply blast
txt{*Opposite inclusion*}
apply (rule lfp_lowerbound)
prefer 2 apply (rule lfp_subset)
apply (clarify, subst lfp_unfold [OF list.bnd_mono])
apply (simp add: Nil_def Cons_def)
apply (blast intro: datatype_univs
dest: lfp_subset [THEN subsetD])
done
text{*Re-expresses lists using "iterates", no univ.*}
lemma list_eq_Union:
"list(A) = (\<Union>n\<in>nat. (\<lambda>X. {0} + A*X) ^ n (0))"
by (simp add: list_eq_lfp2 lfp_eq_Union list_fun_bnd_mono list_fun_contin)
constdefs
is_list_functor :: "[i=>o,i,i,i] => o"
"is_list_functor(M,A,X,Z) ==
\<exists>n1[M]. \<exists>AX[M].
number1(M,n1) & cartprod(M,A,X,AX) & is_sum(M,n1,AX,Z)"
lemma (in M_axioms) list_functor_abs [simp]:
"[| M(A); M(X); M(Z) |] ==> is_list_functor(M,A,X,Z) <-> (Z = {0} + A*X)"
by (simp add: is_list_functor_def singleton_0 nat_into_M)
subsection {*formulas without univ*}
lemma formula_fun_bnd_mono:
"bnd_mono(univ(0), \<lambda>X. ((nat*nat) + (nat*nat)) + (X*X + X))"
apply (rule bnd_monoI)
apply (intro subset_refl zero_subset_univ A_subset_univ
sum_subset_univ Sigma_subset_univ nat_subset_univ)
apply (rule subset_refl sum_mono Sigma_mono | assumption)+
done
lemma formula_fun_contin:
"contin(\<lambda>X. ((nat*nat) + (nat*nat)) + (X*X + X))"
by (intro sum_contin prod_contin id_contin const_contin)
text{*Re-expresses formulas using sum and product*}
lemma formula_eq_lfp2:
"formula = lfp(univ(0), \<lambda>X. ((nat*nat) + (nat*nat)) + (X*X + X))"
apply (simp add: formula_def)
apply (rule equalityI)
apply (rule lfp_lowerbound)
prefer 2 apply (rule lfp_subset)
apply (clarify, subst lfp_unfold [OF formula_fun_bnd_mono])
apply (simp add: Member_def Equal_def Nand_def Forall_def)
apply blast
txt{*Opposite inclusion*}
apply (rule lfp_lowerbound)
prefer 2 apply (rule lfp_subset, clarify)
apply (subst lfp_unfold [OF formula.bnd_mono, simplified])
apply (simp add: Member_def Equal_def Nand_def Forall_def)
apply (elim sumE SigmaE, simp_all)
apply (blast intro: datatype_univs dest: lfp_subset [THEN subsetD])+
done
text{*Re-expresses formulas using "iterates", no univ.*}
lemma formula_eq_Union:
"formula =
(\<Union>n\<in>nat. (\<lambda>X. ((nat*nat) + (nat*nat)) + (X*X + X)) ^ n (0))"
by (simp add: formula_eq_lfp2 lfp_eq_Union formula_fun_bnd_mono
formula_fun_contin)
constdefs
is_formula_functor :: "[i=>o,i,i] => o"
"is_formula_functor(M,X,Z) ==
\<exists>nat'[M]. \<exists>natnat[M]. \<exists>natnatsum[M]. \<exists>XX[M]. \<exists>X3[M].
omega(M,nat') & cartprod(M,nat',nat',natnat) &
is_sum(M,natnat,natnat,natnatsum) &
cartprod(M,X,X,XX) & is_sum(M,XX,X,X3) &
is_sum(M,natnatsum,X3,Z)"
lemma (in M_axioms) formula_functor_abs [simp]:
"[| M(X); M(Z) |]
==> is_formula_functor(M,X,Z) <->
Z = ((nat*nat) + (nat*nat)) + (X*X + X)"
by (simp add: is_formula_functor_def)
subsection{*@{term M} Contains the List and Formula Datatypes*}
constdefs
list_N :: "[i,i] => i"
"list_N(A,n) == (\<lambda>X. {0} + A * X)^n (0)"
lemma Nil_in_list_N [simp]: "[] \<in> list_N(A,succ(n))"
by (simp add: list_N_def Nil_def)
lemma Cons_in_list_N [simp]:
"Cons(a,l) \<in> list_N(A,succ(n)) <-> a\<in>A & l \<in> list_N(A,n)"
by (simp add: list_N_def Cons_def)
text{*These two aren't simprules because they reveal the underlying
list representation.*}
lemma list_N_0: "list_N(A,0) = 0"
by (simp add: list_N_def)
lemma list_N_succ: "list_N(A,succ(n)) = {0} + A * (list_N(A,n))"
by (simp add: list_N_def)
lemma list_N_imp_list:
"[| l \<in> list_N(A,n); n \<in> nat |] ==> l \<in> list(A)"
by (force simp add: list_eq_Union list_N_def)
lemma list_N_imp_length_lt [rule_format]:
"n \<in> nat ==> \<forall>l \<in> list_N(A,n). length(l) < n"
apply (induct_tac n)
apply (auto simp add: list_N_0 list_N_succ
Nil_def [symmetric] Cons_def [symmetric])
done
lemma list_imp_list_N [rule_format]:
"l \<in> list(A) ==> \<forall>n\<in>nat. length(l) < n --> l \<in> list_N(A, n)"
apply (induct_tac l)
apply (force elim: natE)+
done
lemma list_N_imp_eq_length:
"[|n \<in> nat; l \<notin> list_N(A, n); l \<in> list_N(A, succ(n))|]
==> n = length(l)"
apply (rule le_anti_sym)
prefer 2 apply (simp add: list_N_imp_length_lt)
apply (frule list_N_imp_list, simp)
apply (simp add: not_lt_iff_le [symmetric])
apply (blast intro: list_imp_list_N)
done
text{*Express @{term list_rec} without using @{term rank} or @{term Vset},
neither of which is absolute.*}
lemma (in M_triv_axioms) list_rec_eq:
"l \<in> list(A) ==>
list_rec(a,g,l) =
transrec (succ(length(l)),
\<lambda>x h. Lambda (list(A),
list_case' (a,
\<lambda>a l. g(a, l, h ` succ(length(l)) ` l)))) ` l"
apply (induct_tac l)
apply (subst transrec, simp)
apply (subst transrec)
apply (simp add: list_imp_list_N)
done
constdefs
is_list_N :: "[i=>o,i,i,i] => o"
"is_list_N(M,A,n,Z) ==
\<exists>zero[M]. \<exists>sn[M]. \<exists>msn[M].
empty(M,zero) &
successor(M,n,sn) & membership(M,sn,msn) &
is_wfrec(M, iterates_MH(M, is_list_functor(M,A),zero), msn, n, Z)"
mem_list :: "[i=>o,i,i] => o"
"mem_list(M,A,l) ==
\<exists>n[M]. \<exists>listn[M].
finite_ordinal(M,n) & is_list_N(M,A,n,listn) & l \<in> listn"
is_list :: "[i=>o,i,i] => o"
"is_list(M,A,Z) == \<forall>l[M]. l \<in> Z <-> mem_list(M,A,l)"
subsubsection{*Towards Absoluteness of @{term formula_rec}*}
consts depth :: "i=>i"
primrec
"depth(Member(x,y)) = 0"
"depth(Equal(x,y)) = 0"
"depth(Nand(p,q)) = succ(depth(p) \<union> depth(q))"
"depth(Forall(p)) = succ(depth(p))"
lemma depth_type [TC]: "p \<in> formula ==> depth(p) \<in> nat"
by (induct_tac p, simp_all)
constdefs
formula_N :: "i => i"
"formula_N(n) == (\<lambda>X. ((nat*nat) + (nat*nat)) + (X*X + X)) ^ n (0)"
lemma Member_in_formula_N [simp]:
"Member(x,y) \<in> formula_N(succ(n)) <-> x \<in> nat & y \<in> nat"
by (simp add: formula_N_def Member_def)
lemma Equal_in_formula_N [simp]:
"Equal(x,y) \<in> formula_N(succ(n)) <-> x \<in> nat & y \<in> nat"
by (simp add: formula_N_def Equal_def)
lemma Nand_in_formula_N [simp]:
"Nand(x,y) \<in> formula_N(succ(n)) <-> x \<in> formula_N(n) & y \<in> formula_N(n)"
by (simp add: formula_N_def Nand_def)
lemma Forall_in_formula_N [simp]:
"Forall(x) \<in> formula_N(succ(n)) <-> x \<in> formula_N(n)"
by (simp add: formula_N_def Forall_def)
text{*These two aren't simprules because they reveal the underlying
formula representation.*}
lemma formula_N_0: "formula_N(0) = 0"
by (simp add: formula_N_def)
lemma formula_N_succ:
"formula_N(succ(n)) =
((nat*nat) + (nat*nat)) + (formula_N(n) * formula_N(n) + formula_N(n))"
by (simp add: formula_N_def)
lemma formula_N_imp_formula:
"[| p \<in> formula_N(n); n \<in> nat |] ==> p \<in> formula"
by (force simp add: formula_eq_Union formula_N_def)
lemma formula_N_imp_depth_lt [rule_format]:
"n \<in> nat ==> \<forall>p \<in> formula_N(n). depth(p) < n"
apply (induct_tac n)
apply (auto simp add: formula_N_0 formula_N_succ
depth_type formula_N_imp_formula Un_least_lt_iff
Member_def [symmetric] Equal_def [symmetric]
Nand_def [symmetric] Forall_def [symmetric])
done
lemma formula_imp_formula_N [rule_format]:
"p \<in> formula ==> \<forall>n\<in>nat. depth(p) < n --> p \<in> formula_N(n)"
apply (induct_tac p)
apply (simp_all add: succ_Un_distrib Un_least_lt_iff)
apply (force elim: natE)+
done
lemma formula_N_imp_eq_depth:
"[|n \<in> nat; p \<notin> formula_N(n); p \<in> formula_N(succ(n))|]
==> n = depth(p)"
apply (rule le_anti_sym)
prefer 2 apply (simp add: formula_N_imp_depth_lt)
apply (frule formula_N_imp_formula, simp)
apply (simp add: not_lt_iff_le [symmetric])
apply (blast intro: formula_imp_formula_N)
done
lemma formula_N_mono [rule_format]:
"[| m \<in> nat; n \<in> nat |] ==> m\<le>n --> formula_N(m) \<subseteq> formula_N(n)"
apply (rule_tac m = m and n = n in diff_induct)
apply (simp_all add: formula_N_0 formula_N_succ, blast)
done
lemma formula_N_distrib:
"[| m \<in> nat; n \<in> nat |] ==> formula_N(m \<union> n) = formula_N(m) \<union> formula_N(n)"
apply (rule_tac i = m and j = n in Ord_linear_le, auto)
apply (simp_all add: subset_Un_iff [THEN iffD1] subset_Un_iff2 [THEN iffD1]
le_imp_subset formula_N_mono)
done
constdefs
is_formula_N :: "[i=>o,i,i] => o"
"is_formula_N(M,n,Z) ==
\<exists>zero[M]. \<exists>sn[M]. \<exists>msn[M].
empty(M,zero) &
successor(M,n,sn) & membership(M,sn,msn) &
is_wfrec(M, iterates_MH(M, is_formula_functor(M),zero), msn, n, Z)"
constdefs
mem_formula :: "[i=>o,i] => o"
"mem_formula(M,p) ==
\<exists>n[M]. \<exists>formn[M].
finite_ordinal(M,n) & is_formula_N(M,n,formn) & p \<in> formn"
is_formula :: "[i=>o,i] => o"
"is_formula(M,Z) == \<forall>p[M]. p \<in> Z <-> mem_formula(M,p)"
locale M_datatypes = M_wfrank +
assumes list_replacement1:
"M(A) ==> iterates_replacement(M, is_list_functor(M,A), 0)"
and list_replacement2:
"M(A) ==> strong_replacement(M,
\<lambda>n y. n\<in>nat &
(\<exists>sn[M]. \<exists>msn[M]. successor(M,n,sn) & membership(M,sn,msn) &
is_wfrec(M, iterates_MH(M,is_list_functor(M,A), 0),
msn, n, y)))"
and formula_replacement1:
"iterates_replacement(M, is_formula_functor(M), 0)"
and formula_replacement2:
"strong_replacement(M,
\<lambda>n y. n\<in>nat &
(\<exists>sn[M]. \<exists>msn[M]. successor(M,n,sn) & membership(M,sn,msn) &
is_wfrec(M, iterates_MH(M,is_formula_functor(M), 0),
msn, n, y)))"
and nth_replacement:
"M(l) ==> iterates_replacement(M, %l t. is_tl(M,l,t), l)"
subsubsection{*Absoluteness of the List Construction*}
lemma (in M_datatypes) list_replacement2':
"M(A) ==> strong_replacement(M, \<lambda>n y. n\<in>nat & y = (\<lambda>X. {0} + A * X)^n (0))"
apply (insert list_replacement2 [of A])
apply (rule strong_replacement_cong [THEN iffD1])
apply (rule conj_cong [OF iff_refl iterates_abs [of "is_list_functor(M,A)"]])
apply (simp_all add: list_replacement1 relativize1_def)
done
lemma (in M_datatypes) list_closed [intro,simp]:
"M(A) ==> M(list(A))"
apply (insert list_replacement1)
by (simp add: RepFun_closed2 list_eq_Union
list_replacement2' relativize1_def
iterates_closed [of "is_list_functor(M,A)"])
text{*WARNING: use only with @{text "dest:"} or with variables fixed!*}
lemmas (in M_datatypes) list_into_M = transM [OF _ list_closed]
lemma (in M_datatypes) list_N_abs [simp]:
"[|M(A); n\<in>nat; M(Z)|]
==> is_list_N(M,A,n,Z) <-> Z = list_N(A,n)"
apply (insert list_replacement1)
apply (simp add: is_list_N_def list_N_def relativize1_def nat_into_M
iterates_abs [of "is_list_functor(M,A)" _ "\<lambda>X. {0} + A*X"])
done
lemma (in M_datatypes) list_N_closed [intro,simp]:
"[|M(A); n\<in>nat|] ==> M(list_N(A,n))"
apply (insert list_replacement1)
apply (simp add: is_list_N_def list_N_def relativize1_def nat_into_M
iterates_closed [of "is_list_functor(M,A)"])
done
lemma (in M_datatypes) mem_list_abs [simp]:
"M(A) ==> mem_list(M,A,l) <-> l \<in> list(A)"
apply (insert list_replacement1)
apply (simp add: mem_list_def list_N_def relativize1_def list_eq_Union
iterates_closed [of "is_list_functor(M,A)"])
done
lemma (in M_datatypes) list_abs [simp]:
"[|M(A); M(Z)|] ==> is_list(M,A,Z) <-> Z = list(A)"
apply (simp add: is_list_def, safe)
apply (rule M_equalityI, simp_all)
done
subsubsection{*Absoluteness of Formulas*}
lemma (in M_datatypes) formula_replacement2':
"strong_replacement(M, \<lambda>n y. n\<in>nat & y = (\<lambda>X. ((nat*nat) + (nat*nat)) + (X*X + X))^n (0))"
apply (insert formula_replacement2)
apply (rule strong_replacement_cong [THEN iffD1])
apply (rule conj_cong [OF iff_refl iterates_abs [of "is_formula_functor(M)"]])
apply (simp_all add: formula_replacement1 relativize1_def)
done
lemma (in M_datatypes) formula_closed [intro,simp]:
"M(formula)"
apply (insert formula_replacement1)
apply (simp add: RepFun_closed2 formula_eq_Union
formula_replacement2' relativize1_def
iterates_closed [of "is_formula_functor(M)"])
done
lemmas (in M_datatypes) formula_into_M = transM [OF _ formula_closed]
lemma (in M_datatypes) formula_N_abs [simp]:
"[|n\<in>nat; M(Z)|]
==> is_formula_N(M,n,Z) <-> Z = formula_N(n)"
apply (insert formula_replacement1)
apply (simp add: is_formula_N_def formula_N_def relativize1_def nat_into_M
iterates_abs [of "is_formula_functor(M)" _
"\<lambda>X. ((nat*nat) + (nat*nat)) + (X*X + X)"])
done
lemma (in M_datatypes) formula_N_closed [intro,simp]:
"n\<in>nat ==> M(formula_N(n))"
apply (insert formula_replacement1)
apply (simp add: is_formula_N_def formula_N_def relativize1_def nat_into_M
iterates_closed [of "is_formula_functor(M)"])
done
lemma (in M_datatypes) mem_formula_abs [simp]:
"mem_formula(M,l) <-> l \<in> formula"
apply (insert formula_replacement1)
apply (simp add: mem_formula_def relativize1_def formula_eq_Union formula_N_def
iterates_closed [of "is_formula_functor(M)"])
done
lemma (in M_datatypes) formula_abs [simp]:
"[|M(Z)|] ==> is_formula(M,Z) <-> Z = formula"
apply (simp add: is_formula_def, safe)
apply (rule M_equalityI, simp_all)
done
subsection{*Absoluteness for Some List Operators*}
subsection{*Absoluteness for @{text \<epsilon>}-Closure: the @{term eclose} Operator*}
text{*Re-expresses eclose using "iterates"*}
lemma eclose_eq_Union:
"eclose(A) = (\<Union>n\<in>nat. Union^n (A))"
apply (simp add: eclose_def)
apply (rule UN_cong)
apply (rule refl)
apply (induct_tac n)
apply (simp add: nat_rec_0)
apply (simp add: nat_rec_succ)
done
constdefs
is_eclose_n :: "[i=>o,i,i,i] => o"
"is_eclose_n(M,A,n,Z) ==
\<exists>sn[M]. \<exists>msn[M].
successor(M,n,sn) & membership(M,sn,msn) &
is_wfrec(M, iterates_MH(M, big_union(M), A), msn, n, Z)"
mem_eclose :: "[i=>o,i,i] => o"
"mem_eclose(M,A,l) ==
\<exists>n[M]. \<exists>eclosen[M].
finite_ordinal(M,n) & is_eclose_n(M,A,n,eclosen) & l \<in> eclosen"
is_eclose :: "[i=>o,i,i] => o"
"is_eclose(M,A,Z) == \<forall>u[M]. u \<in> Z <-> mem_eclose(M,A,u)"
locale M_eclose = M_datatypes +
assumes eclose_replacement1:
"M(A) ==> iterates_replacement(M, big_union(M), A)"
and eclose_replacement2:
"M(A) ==> strong_replacement(M,
\<lambda>n y. n\<in>nat &
(\<exists>sn[M]. \<exists>msn[M]. successor(M,n,sn) & membership(M,sn,msn) &
is_wfrec(M, iterates_MH(M,big_union(M), A),
msn, n, y)))"
lemma (in M_eclose) eclose_replacement2':
"M(A) ==> strong_replacement(M, \<lambda>n y. n\<in>nat & y = Union^n (A))"
apply (insert eclose_replacement2 [of A])
apply (rule strong_replacement_cong [THEN iffD1])
apply (rule conj_cong [OF iff_refl iterates_abs [of "big_union(M)"]])
apply (simp_all add: eclose_replacement1 relativize1_def)
done
lemma (in M_eclose) eclose_closed [intro,simp]:
"M(A) ==> M(eclose(A))"
apply (insert eclose_replacement1)
by (simp add: RepFun_closed2 eclose_eq_Union
eclose_replacement2' relativize1_def
iterates_closed [of "big_union(M)"])
lemma (in M_eclose) is_eclose_n_abs [simp]:
"[|M(A); n\<in>nat; M(Z)|] ==> is_eclose_n(M,A,n,Z) <-> Z = Union^n (A)"
apply (insert eclose_replacement1)
apply (simp add: is_eclose_n_def relativize1_def nat_into_M
iterates_abs [of "big_union(M)" _ "Union"])
done
lemma (in M_eclose) mem_eclose_abs [simp]:
"M(A) ==> mem_eclose(M,A,l) <-> l \<in> eclose(A)"
apply (insert eclose_replacement1)
apply (simp add: mem_eclose_def relativize1_def eclose_eq_Union
iterates_closed [of "big_union(M)"])
done
lemma (in M_eclose) eclose_abs [simp]:
"[|M(A); M(Z)|] ==> is_eclose(M,A,Z) <-> Z = eclose(A)"
apply (simp add: is_eclose_def, safe)
apply (rule M_equalityI, simp_all)
done
subsection {*Absoluteness for @{term transrec}*}
text{* @{term "transrec(a,H) \<equiv> wfrec(Memrel(eclose({a})), a, H)"} *}
constdefs
is_transrec :: "[i=>o, [i,i,i]=>o, i, i] => o"
"is_transrec(M,MH,a,z) ==
\<exists>sa[M]. \<exists>esa[M]. \<exists>mesa[M].
upair(M,a,a,sa) & is_eclose(M,sa,esa) & membership(M,esa,mesa) &
is_wfrec(M,MH,mesa,a,z)"
transrec_replacement :: "[i=>o, [i,i,i]=>o, i] => o"
"transrec_replacement(M,MH,a) ==
\<exists>sa[M]. \<exists>esa[M]. \<exists>mesa[M].
upair(M,a,a,sa) & is_eclose(M,sa,esa) & membership(M,esa,mesa) &
wfrec_replacement(M,MH,mesa)"
text{*The condition @{term "Ord(i)"} lets us use the simpler
@{text "trans_wfrec_abs"} rather than @{text "trans_wfrec_abs"},
which I haven't even proved yet. *}
theorem (in M_eclose) transrec_abs:
"[|transrec_replacement(M,MH,i); relativize2(M,MH,H);
Ord(i); M(i); M(z);
\<forall>x[M]. \<forall>g[M]. function(g) --> M(H(x,g))|]
==> is_transrec(M,MH,i,z) <-> z = transrec(i,H)"
apply (rotate_tac 2)
apply (simp add: trans_wfrec_abs transrec_replacement_def is_transrec_def
transrec_def eclose_sing_Ord_eq wf_Memrel trans_Memrel relation_Memrel)
done
theorem (in M_eclose) transrec_closed:
"[|transrec_replacement(M,MH,i); relativize2(M,MH,H);
Ord(i); M(i);
\<forall>x[M]. \<forall>g[M]. function(g) --> M(H(x,g))|]
==> M(transrec(i,H))"
apply (rotate_tac 2)
apply (simp add: trans_wfrec_closed transrec_replacement_def is_transrec_def
transrec_def eclose_sing_Ord_eq wf_Memrel trans_Memrel relation_Memrel)
done
text{*Helps to prove instances of @{term transrec_replacement}*}
lemma (in M_eclose) transrec_replacementI:
"[|M(a);
strong_replacement (M,
\<lambda>x z. \<exists>y[M]. pair(M, x, y, z) \<and> is_wfrec(M,MH,Memrel(eclose({a})),x,y))|]
==> transrec_replacement(M,MH,a)"
by (simp add: transrec_replacement_def wfrec_replacement_def)
subsection{*Absoluteness for the List Operator @{term length}*}
constdefs
is_length :: "[i=>o,i,i,i] => o"
"is_length(M,A,l,n) ==
\<exists>sn[M]. \<exists>list_n[M]. \<exists>list_sn[M].
is_list_N(M,A,n,list_n) & l \<notin> list_n &
successor(M,n,sn) & is_list_N(M,A,sn,list_sn) & l \<in> list_sn"
lemma (in M_datatypes) length_abs [simp]:
"[|M(A); l \<in> list(A); n \<in> nat|] ==> is_length(M,A,l,n) <-> n = length(l)"
apply (subgoal_tac "M(l) & M(n)")
prefer 2 apply (blast dest: transM)
apply (simp add: is_length_def)
apply (blast intro: list_imp_list_N nat_into_Ord list_N_imp_eq_length
dest: list_N_imp_length_lt)
done
text{*Proof is trivial since @{term length} returns natural numbers.*}
lemma (in M_triv_axioms) length_closed [intro,simp]:
"l \<in> list(A) ==> M(length(l))"
by (simp add: nat_into_M)
subsection {*Absoluteness for @{term nth}*}
lemma nth_eq_hd_iterates_tl [rule_format]:
"xs \<in> list(A) ==> \<forall>n \<in> nat. nth(n,xs) = hd' (tl'^n (xs))"
apply (induct_tac xs)
apply (simp add: iterates_tl_Nil hd'_Nil, clarify)
apply (erule natE)
apply (simp add: hd'_Cons)
apply (simp add: tl'_Cons iterates_commute)
done
lemma (in M_axioms) iterates_tl'_closed:
"[|n \<in> nat; M(x)|] ==> M(tl'^n (x))"
apply (induct_tac n, simp)
apply (simp add: tl'_Cons tl'_closed)
done
text{*Immediate by type-checking*}
lemma (in M_datatypes) nth_closed [intro,simp]:
"[|xs \<in> list(A); n \<in> nat; M(A)|] ==> M(nth(n,xs))"
apply (case_tac "n < length(xs)")
apply (blast intro: nth_type transM)
apply (simp add: not_lt_iff_le nth_eq_0)
done
constdefs
is_nth :: "[i=>o,i,i,i] => o"
"is_nth(M,n,l,Z) ==
\<exists>X[M]. \<exists>sn[M]. \<exists>msn[M].
successor(M,n,sn) & membership(M,sn,msn) &
is_wfrec(M, iterates_MH(M, is_tl(M), l), msn, n, X) &
is_hd(M,X,Z)"
lemma (in M_datatypes) nth_abs [simp]:
"[|M(A); n \<in> nat; l \<in> list(A); M(Z)|]
==> is_nth(M,n,l,Z) <-> Z = nth(n,l)"
apply (subgoal_tac "M(l)")
prefer 2 apply (blast intro: transM)
apply (simp add: is_nth_def nth_eq_hd_iterates_tl nat_into_M
tl'_closed iterates_tl'_closed
iterates_abs [OF _ relativize1_tl] nth_replacement)
done
subsection{*Relativization and Absoluteness for the @{term formula} Constructors*}
constdefs
is_Member :: "[i=>o,i,i,i] => o"
--{* because @{term "Member(x,y) \<equiv> Inl(Inl(\<langle>x,y\<rangle>))"}*}
"is_Member(M,x,y,Z) ==
\<exists>p[M]. \<exists>u[M]. pair(M,x,y,p) & is_Inl(M,p,u) & is_Inl(M,u,Z)"
lemma (in M_triv_axioms) Member_abs [simp]:
"[|M(x); M(y); M(Z)|] ==> is_Member(M,x,y,Z) <-> (Z = Member(x,y))"
by (simp add: is_Member_def Member_def)
lemma (in M_triv_axioms) Member_in_M_iff [iff]:
"M(Member(x,y)) <-> M(x) & M(y)"
by (simp add: Member_def)
constdefs
is_Equal :: "[i=>o,i,i,i] => o"
--{* because @{term "Equal(x,y) \<equiv> Inl(Inr(\<langle>x,y\<rangle>))"}*}
"is_Equal(M,x,y,Z) ==
\<exists>p[M]. \<exists>u[M]. pair(M,x,y,p) & is_Inr(M,p,u) & is_Inl(M,u,Z)"
lemma (in M_triv_axioms) Equal_abs [simp]:
"[|M(x); M(y); M(Z)|] ==> is_Equal(M,x,y,Z) <-> (Z = Equal(x,y))"
by (simp add: is_Equal_def Equal_def)
lemma (in M_triv_axioms) Equal_in_M_iff [iff]: "M(Equal(x,y)) <-> M(x) & M(y)"
by (simp add: Equal_def)
constdefs
is_Nand :: "[i=>o,i,i,i] => o"
--{* because @{term "Nand(x,y) \<equiv> Inr(Inl(\<langle>x,y\<rangle>))"}*}
"is_Nand(M,x,y,Z) ==
\<exists>p[M]. \<exists>u[M]. pair(M,x,y,p) & is_Inl(M,p,u) & is_Inr(M,u,Z)"
lemma (in M_triv_axioms) Nand_abs [simp]:
"[|M(x); M(y); M(Z)|] ==> is_Nand(M,x,y,Z) <-> (Z = Nand(x,y))"
by (simp add: is_Nand_def Nand_def)
lemma (in M_triv_axioms) Nand_in_M_iff [iff]: "M(Nand(x,y)) <-> M(x) & M(y)"
by (simp add: Nand_def)
constdefs
is_Forall :: "[i=>o,i,i] => o"
--{* because @{term "Forall(x) \<equiv> Inr(Inr(p))"}*}
"is_Forall(M,p,Z) == \<exists>u[M]. is_Inr(M,p,u) & is_Inr(M,u,Z)"
lemma (in M_triv_axioms) Forall_abs [simp]:
"[|M(x); M(Z)|] ==> is_Forall(M,x,Z) <-> (Z = Forall(x))"
by (simp add: is_Forall_def Forall_def)
lemma (in M_triv_axioms) Forall_in_M_iff [iff]: "M(Forall(x)) <-> M(x)"
by (simp add: Forall_def)
subsection {*Absoluteness for @{term formula_rec}*}
subsubsection{*@{term is_formula_case}: relativization of @{term formula_case}*}
constdefs
is_formula_case ::
"[i=>o, [i,i,i]=>o, [i,i,i]=>o, [i,i,i]=>o, [i,i]=>o, i, i] => o"
--{*no constraint on non-formulas*}
"is_formula_case(M, is_a, is_b, is_c, is_d, p, z) ==
(\<forall>x[M]. \<forall>y[M]. finite_ordinal(M,x) --> finite_ordinal(M,y) -->
is_Member(M,x,y,p) --> is_a(x,y,z)) &
(\<forall>x[M]. \<forall>y[M]. finite_ordinal(M,x) --> finite_ordinal(M,y) -->
is_Equal(M,x,y,p) --> is_b(x,y,z)) &
(\<forall>x[M]. \<forall>y[M]. mem_formula(M,x) --> mem_formula(M,y) -->
is_Nand(M,x,y,p) --> is_c(x,y,z)) &
(\<forall>x[M]. mem_formula(M,x) --> is_Forall(M,x,p) --> is_d(x,z))"
lemma (in M_datatypes) formula_case_abs [simp]:
"[| Relativize2(M,nat,nat,is_a,a); Relativize2(M,nat,nat,is_b,b);
Relativize2(M,formula,formula,is_c,c); Relativize1(M,formula,is_d,d);
p \<in> formula; M(z) |]
==> is_formula_case(M,is_a,is_b,is_c,is_d,p,z) <->
z = formula_case(a,b,c,d,p)"
apply (simp add: formula_into_M is_formula_case_def)
apply (erule formula.cases)
apply (simp_all add: Relativize1_def Relativize2_def)
done
subsubsection{*@{term quasiformula}: For Case-Splitting with @{term formula_case'}*}
constdefs
quasiformula :: "i => o"
"quasiformula(p) ==
(\<exists>x y. p = Member(x,y)) |
(\<exists>x y. p = Equal(x,y)) |
(\<exists>x y. p = Nand(x,y)) |
(\<exists>x. p = Forall(x))"
is_quasiformula :: "[i=>o,i] => o"
"is_quasiformula(M,p) ==
(\<exists>x[M]. \<exists>y[M]. is_Member(M,x,y,p)) |
(\<exists>x[M]. \<exists>y[M]. is_Equal(M,x,y,p)) |
(\<exists>x[M]. \<exists>y[M]. is_Nand(M,x,y,p)) |
(\<exists>x[M]. is_Forall(M,x,p))"
lemma [iff]: "quasiformula(Member(x,y))"
by (simp add: quasiformula_def)
lemma [iff]: "quasiformula(Equal(x,y))"
by (simp add: quasiformula_def)
lemma [iff]: "quasiformula(Nand(x,y))"
by (simp add: quasiformula_def)
lemma [iff]: "quasiformula(Forall(x))"
by (simp add: quasiformula_def)
lemma formula_imp_quasiformula: "p \<in> formula ==> quasiformula(p)"
by (erule formula.cases, simp_all)
lemma (in M_triv_axioms) quasiformula_abs [simp]:
"M(z) ==> is_quasiformula(M,z) <-> quasiformula(z)"
by (auto simp add: is_quasiformula_def quasiformula_def)
constdefs
formula_case' :: "[[i,i]=>i, [i,i]=>i, [i,i]=>i, i=>i, i] => i"
--{*A version of @{term formula_case} that's always defined.*}
"formula_case'(a,b,c,d,p) ==
if quasiformula(p) then formula_case(a,b,c,d,p) else 0"
is_formula_case' ::
"[i=>o, [i,i,i]=>o, [i,i,i]=>o, [i,i,i]=>o, [i,i]=>o, i, i] => o"
--{*Returns 0 for non-formulas*}
"is_formula_case'(M, is_a, is_b, is_c, is_d, p, z) ==
(\<forall>x[M]. \<forall>y[M]. is_Member(M,x,y,p) --> is_a(x,y,z)) &
(\<forall>x[M]. \<forall>y[M]. is_Equal(M,x,y,p) --> is_b(x,y,z)) &
(\<forall>x[M]. \<forall>y[M]. is_Nand(M,x,y,p) --> is_c(x,y,z)) &
(\<forall>x[M]. is_Forall(M,x,p) --> is_d(x,z)) &
(is_quasiformula(M,p) | empty(M,z))"
subsubsection{*@{term formula_case'}, the Modified Version of @{term formula_case}*}
lemma formula_case'_Member [simp]:
"formula_case'(a,b,c,d,Member(x,y)) = a(x,y)"
by (simp add: formula_case'_def)
lemma formula_case'_Equal [simp]:
"formula_case'(a,b,c,d,Equal(x,y)) = b(x,y)"
by (simp add: formula_case'_def)
lemma formula_case'_Nand [simp]:
"formula_case'(a,b,c,d,Nand(x,y)) = c(x,y)"
by (simp add: formula_case'_def)
lemma formula_case'_Forall [simp]:
"formula_case'(a,b,c,d,Forall(x)) = d(x)"
by (simp add: formula_case'_def)
lemma non_formula_case: "~ quasiformula(x) ==> formula_case'(a,b,c,d,x) = 0"
by (simp add: quasiformula_def formula_case'_def)
lemma formula_case'_eq_formula_case [simp]:
"p \<in> formula ==>formula_case'(a,b,c,d,p) = formula_case(a,b,c,d,p)"
by (erule formula.cases, simp_all)
lemma (in M_axioms) formula_case'_closed [intro,simp]:
"[|M(p); \<forall>x[M]. \<forall>y[M]. M(a(x,y));
\<forall>x[M]. \<forall>y[M]. M(b(x,y));
\<forall>x[M]. \<forall>y[M]. M(c(x,y));
\<forall>x[M]. M(d(x))|] ==> M(formula_case'(a,b,c,d,p))"
apply (case_tac "quasiformula(p)")
apply (simp add: quasiformula_def, force)
apply (simp add: non_formula_case)
done
text{*Compared with @{text formula_case_closed'}, the premise on @{term p} is
stronger while the other premises are weaker, incorporating typing
information.*}
lemma (in M_datatypes) formula_case_closed [intro,simp]:
"[|p \<in> formula;
\<forall>x[M]. \<forall>y[M]. x\<in>nat --> y\<in>nat --> M(a(x,y));
\<forall>x[M]. \<forall>y[M]. x\<in>nat --> y\<in>nat --> M(b(x,y));
\<forall>x[M]. \<forall>y[M]. x\<in>formula --> y\<in>formula --> M(c(x,y));
\<forall>x[M]. x\<in>formula --> M(d(x))|] ==> M(formula_case(a,b,c,d,p))"
by (erule formula.cases, simp_all)
lemma (in M_triv_axioms) formula_case'_abs [simp]:
"[| relativize2(M,is_a,a); relativize2(M,is_b,b);
relativize2(M,is_c,c); relativize1(M,is_d,d); M(p); M(z) |]
==> is_formula_case'(M,is_a,is_b,is_c,is_d,p,z) <->
z = formula_case'(a,b,c,d,p)"
apply (case_tac "quasiformula(p)")
prefer 2
apply (simp add: is_formula_case'_def non_formula_case)
apply (force simp add: quasiformula_def)
apply (simp add: quasiformula_def is_formula_case'_def)
apply (elim disjE exE)
apply (simp_all add: relativize1_def relativize2_def)
done
text{*Express @{term formula_rec} without using @{term rank} or @{term Vset},
neither of which is absolute.*}
lemma (in M_triv_axioms) formula_rec_eq:
"p \<in> formula ==>
formula_rec(a,b,c,d,p) =
transrec (succ(depth(p)),
\<lambda>x h. Lambda (formula,
formula_case' (a, b,
\<lambda>u v. c(u, v, h ` succ(depth(u)) ` u,
h ` succ(depth(v)) ` v),
\<lambda>u. d(u, h ` succ(depth(u)) ` u))))
` p"
apply (induct_tac p)
txt{*Base case for @{term Member}*}
apply (subst transrec, simp add: formula.intros)
txt{*Base case for @{term Equal}*}
apply (subst transrec, simp add: formula.intros)
txt{*Inductive step for @{term Nand}*}
apply (subst transrec)
apply (simp add: succ_Un_distrib formula.intros)
txt{*Inductive step for @{term Forall}*}
apply (subst transrec)
apply (simp add: formula_imp_formula_N formula.intros)
done
subsection{*Absoluteness for the Formula Operator @{term depth}*}
constdefs
is_depth :: "[i=>o,i,i] => o"
"is_depth(M,p,n) ==
\<exists>sn[M]. \<exists>formula_n[M]. \<exists>formula_sn[M].
is_formula_N(M,n,formula_n) & p \<notin> formula_n &
successor(M,n,sn) & is_formula_N(M,sn,formula_sn) & p \<in> formula_sn"
lemma (in M_datatypes) depth_abs [simp]:
"[|p \<in> formula; n \<in> nat|] ==> is_depth(M,p,n) <-> n = depth(p)"
apply (subgoal_tac "M(p) & M(n)")
prefer 2 apply (blast dest: transM)
apply (simp add: is_depth_def)
apply (blast intro: formula_imp_formula_N nat_into_Ord formula_N_imp_eq_depth
dest: formula_N_imp_depth_lt)
done
text{*Proof is trivial since @{term depth} returns natural numbers.*}
lemma (in M_triv_axioms) depth_closed [intro,simp]:
"p \<in> formula ==> M(depth(p))"
by (simp add: nat_into_M)
end