(* Title: ZF/Constructible/Reflection.thy ID: $Id: Reflection.thy,v 1.11 2005/06/17 14:15:10 haftmann Exp $ Author: Lawrence C Paulson, Cambridge University Computer Laboratory *) header {* The Reflection Theorem*} theory Reflection imports Normal begin lemma all_iff_not_ex_not: "(\x. P(x)) <-> (~ (\x. ~ P(x)))"; by blast lemma ball_iff_not_bex_not: "(\x\A. P(x)) <-> (~ (\x\A. ~ P(x)))"; by blast text{*From the notes of A. S. Kechris, page 6, and from Andrzej Mostowski, \emph{Constructible Sets with Applications}, North-Holland, 1969, page 23.*} subsection{*Basic Definitions*} text{*First part: the cumulative hierarchy defining the class @{text M}. To avoid handling multiple arguments, we assume that @{text "Mset(l)"} is closed under ordered pairing provided @{text l} is limit. Possibly this could be avoided: the induction hypothesis @{term Cl_reflects} (in locale @{text ex_reflection}) could be weakened to @{term "\y\Mset(a). \z\Mset(a). P() <-> Q(a,)"}, removing most uses of @{term Pair_in_Mset}. But there isn't much point in doing so, since ultimately the @{text ex_reflection} proof is packaged up using the predicate @{text Reflects}. *} locale reflection = fixes Mset and M and Reflects assumes Mset_mono_le : "mono_le_subset(Mset)" and Mset_cont : "cont_Ord(Mset)" and Pair_in_Mset : "[| x \ Mset(a); y \ Mset(a); Limit(a) |] ==> \ Mset(a)" defines "M(x) == \a. Ord(a) & x \ Mset(a)" and "Reflects(Cl,P,Q) == Closed_Unbounded(Cl) & (\a. Cl(a) --> (\x\Mset(a). P(x) <-> Q(a,x)))" fixes F0 --{*ordinal for a specific value @{term y}*} fixes FF --{*sup over the whole level, @{term "y\Mset(a)"}*} fixes ClEx --{*Reflecting ordinals for the formula @{term "\z. P"}*} defines "F0(P,y) == \ b. (\z. M(z) & P()) --> (\z\Mset(b). P())" and "FF(P) == \a. \y\Mset(a). F0(P,y)" and "ClEx(P,a) == Limit(a) & normalize(FF(P),a) = a" lemma (in reflection) Mset_mono: "i\j ==> Mset(i) <= Mset(j)" apply (insert Mset_mono_le) apply (simp add: mono_le_subset_def leI) done text{*Awkward: we need a version of @{text ClEx_def} as an equality at the level of classes, which do not really exist*} lemma (in reflection) ClEx_eq: "ClEx(P) == \a. Limit(a) & normalize(FF(P),a) = a" by (simp add: ClEx_def [symmetric]) subsection{*Easy Cases of the Reflection Theorem*} theorem (in reflection) Triv_reflection [intro]: "Reflects(Ord, P, \a x. P(x))" by (simp add: Reflects_def) theorem (in reflection) Not_reflection [intro]: "Reflects(Cl,P,Q) ==> Reflects(Cl, \x. ~P(x), \a x. ~Q(a,x))" by (simp add: Reflects_def) theorem (in reflection) And_reflection [intro]: "[| Reflects(Cl,P,Q); Reflects(C',P',Q') |] ==> Reflects(\a. Cl(a) & C'(a), \x. P(x) & P'(x), \a x. Q(a,x) & Q'(a,x))" by (simp add: Reflects_def Closed_Unbounded_Int, blast) theorem (in reflection) Or_reflection [intro]: "[| Reflects(Cl,P,Q); Reflects(C',P',Q') |] ==> Reflects(\a. Cl(a) & C'(a), \x. P(x) | P'(x), \a x. Q(a,x) | Q'(a,x))" by (simp add: Reflects_def Closed_Unbounded_Int, blast) theorem (in reflection) Imp_reflection [intro]: "[| Reflects(Cl,P,Q); Reflects(C',P',Q') |] ==> Reflects(\a. Cl(a) & C'(a), \x. P(x) --> P'(x), \a x. Q(a,x) --> Q'(a,x))" by (simp add: Reflects_def Closed_Unbounded_Int, blast) theorem (in reflection) Iff_reflection [intro]: "[| Reflects(Cl,P,Q); Reflects(C',P',Q') |] ==> Reflects(\a. Cl(a) & C'(a), \x. P(x) <-> P'(x), \a x. Q(a,x) <-> Q'(a,x))" by (simp add: Reflects_def Closed_Unbounded_Int, blast) subsection{*Reflection for Existential Quantifiers*} lemma (in reflection) F0_works: "[| y\Mset(a); Ord(a); M(z); P() |] ==> \z\Mset(F0(P,y)). P()" apply (unfold F0_def M_def, clarify) apply (rule LeastI2) apply (blast intro: Mset_mono [THEN subsetD]) apply (blast intro: lt_Ord2, blast) done lemma (in reflection) Ord_F0 [intro,simp]: "Ord(F0(P,y))" by (simp add: F0_def) lemma (in reflection) Ord_FF [intro,simp]: "Ord(FF(P,y))" by (simp add: FF_def) lemma (in reflection) cont_Ord_FF: "cont_Ord(FF(P))" apply (insert Mset_cont) apply (simp add: cont_Ord_def FF_def, blast) done text{*Recall that @{term F0} depends upon @{term "y\Mset(a)"}, while @{term FF} depends only upon @{term a}. *} lemma (in reflection) FF_works: "[| M(z); y\Mset(a); P(); Ord(a) |] ==> \z\Mset(FF(P,a)). P()" apply (simp add: FF_def) apply (simp_all add: cont_Ord_Union [of concl: Mset] Mset_cont Mset_mono_le not_emptyI Ord_F0) apply (blast intro: F0_works) done lemma (in reflection) FFN_works: "[| M(z); y\Mset(a); P(); Ord(a) |] ==> \z\Mset(normalize(FF(P),a)). P()" apply (drule FF_works [of concl: P], assumption+) apply (blast intro: cont_Ord_FF le_normalize [THEN Mset_mono, THEN subsetD]) done text{*Locale for the induction hypothesis*} locale ex_reflection = reflection + fixes P --"the original formula" fixes Q --"the reflected formula" fixes Cl --"the class of reflecting ordinals" assumes Cl_reflects: "[| Cl(a); Ord(a) |] ==> \x\Mset(a). P(x) <-> Q(a,x)" lemma (in ex_reflection) ClEx_downward: "[| M(z); y\Mset(a); P(); Cl(a); ClEx(P,a) |] ==> \z\Mset(a). Q(a,)" apply (simp add: ClEx_def, clarify) apply (frule Limit_is_Ord) apply (frule FFN_works [of concl: P], assumption+) apply (drule Cl_reflects, assumption+) apply (auto simp add: Limit_is_Ord Pair_in_Mset) done lemma (in ex_reflection) ClEx_upward: "[| z\Mset(a); y\Mset(a); Q(a,); Cl(a); ClEx(P,a) |] ==> \z. M(z) & P()" apply (simp add: ClEx_def M_def) apply (blast dest: Cl_reflects intro: Limit_is_Ord Pair_in_Mset) done text{*Class @{text ClEx} indeed consists of reflecting ordinals...*} lemma (in ex_reflection) ZF_ClEx_iff: "[| y\Mset(a); Cl(a); ClEx(P,a) |] ==> (\z. M(z) & P()) <-> (\z\Mset(a). Q(a,))" by (blast intro: dest: ClEx_downward ClEx_upward) text{*...and it is closed and unbounded*} lemma (in ex_reflection) ZF_Closed_Unbounded_ClEx: "Closed_Unbounded(ClEx(P))" apply (simp add: ClEx_eq) apply (fast intro: Closed_Unbounded_Int Normal_imp_fp_Closed_Unbounded Closed_Unbounded_Limit Normal_normalize) done text{*The same two theorems, exported to locale @{text reflection}.*} text{*Class @{text ClEx} indeed consists of reflecting ordinals...*} lemma (in reflection) ClEx_iff: "[| y\Mset(a); Cl(a); ClEx(P,a); !!a. [| Cl(a); Ord(a) |] ==> \x\Mset(a). P(x) <-> Q(a,x) |] ==> (\z. M(z) & P()) <-> (\z\Mset(a). Q(a,))" apply (unfold ClEx_def FF_def F0_def M_def) apply (rule ex_reflection.ZF_ClEx_iff [OF ex_reflection.intro, OF reflection.intro ex_reflection_axioms.intro, of Mset Cl]) apply (simp_all add: Mset_mono_le Mset_cont Pair_in_Mset) done (*Alternative proof, less unfolding: apply (rule Reflection.ZF_ClEx_iff [of Mset _ _ Cl, folded M_def]) apply (fold ClEx_def FF_def F0_def) apply (rule ex_reflection.intro, assumption) apply (simp add: ex_reflection_axioms.intro, assumption+) *) lemma (in reflection) Closed_Unbounded_ClEx: "(!!a. [| Cl(a); Ord(a) |] ==> \x\Mset(a). P(x) <-> Q(a,x)) ==> Closed_Unbounded(ClEx(P))" apply (unfold ClEx_eq FF_def F0_def M_def) apply (rule Reflection.ZF_Closed_Unbounded_ClEx [of Mset _ _ Cl]) apply (rule ex_reflection.intro, assumption) apply (blast intro: ex_reflection_axioms.intro) done subsection{*Packaging the Quantifier Reflection Rules*} lemma (in reflection) Ex_reflection_0: "Reflects(Cl,P0,Q0) ==> Reflects(\a. Cl(a) & ClEx(P0,a), \x. \z. M(z) & P0(), \a x. \z\Mset(a). Q0(a,))" apply (simp add: Reflects_def) apply (intro conjI Closed_Unbounded_Int) apply blast apply (rule Closed_Unbounded_ClEx [of Cl P0 Q0], blast, clarify) apply (rule_tac Cl=Cl in ClEx_iff, assumption+, blast) done lemma (in reflection) All_reflection_0: "Reflects(Cl,P0,Q0) ==> Reflects(\a. Cl(a) & ClEx(\x.~P0(x), a), \x. \z. M(z) --> P0(), \a x. \z\Mset(a). Q0(a,))" apply (simp only: all_iff_not_ex_not ball_iff_not_bex_not) apply (rule Not_reflection, drule Not_reflection, simp) apply (erule Ex_reflection_0) done theorem (in reflection) Ex_reflection [intro]: "Reflects(Cl, \x. P(fst(x),snd(x)), \a x. Q(a,fst(x),snd(x))) ==> Reflects(\a. Cl(a) & ClEx(\x. P(fst(x),snd(x)), a), \x. \z. M(z) & P(x,z), \a x. \z\Mset(a). Q(a,x,z))" by (rule Ex_reflection_0 [of _ " \x. P(fst(x),snd(x))" "\a x. Q(a,fst(x),snd(x))", simplified]) theorem (in reflection) All_reflection [intro]: "Reflects(Cl, \x. P(fst(x),snd(x)), \a x. Q(a,fst(x),snd(x))) ==> Reflects(\a. Cl(a) & ClEx(\x. ~P(fst(x),snd(x)), a), \x. \z. M(z) --> P(x,z), \a x. \z\Mset(a). Q(a,x,z))" by (rule All_reflection_0 [of _ "\x. P(fst(x),snd(x))" "\a x. Q(a,fst(x),snd(x))", simplified]) text{*And again, this time using class-bounded quantifiers*} theorem (in reflection) Rex_reflection [intro]: "Reflects(Cl, \x. P(fst(x),snd(x)), \a x. Q(a,fst(x),snd(x))) ==> Reflects(\a. Cl(a) & ClEx(\x. P(fst(x),snd(x)), a), \x. \z[M]. P(x,z), \a x. \z\Mset(a). Q(a,x,z))" by (unfold rex_def, blast) theorem (in reflection) Rall_reflection [intro]: "Reflects(Cl, \x. P(fst(x),snd(x)), \a x. Q(a,fst(x),snd(x))) ==> Reflects(\a. Cl(a) & ClEx(\x. ~P(fst(x),snd(x)), a), \x. \z[M]. P(x,z), \a x. \z\Mset(a). Q(a,x,z))" by (unfold rall_def, blast) text{*No point considering bounded quantifiers, where reflection is trivial.*} subsection{*Simple Examples of Reflection*} text{*Example 1: reflecting a simple formula. The reflecting class is first given as the variable @{text ?Cl} and later retrieved from the final proof state.*} lemma (in reflection) "Reflects(?Cl, \x. \y. M(y) & x \ y, \a x. \y\Mset(a). x \ y)" by fast text{*Problem here: there needs to be a conjunction (class intersection) in the class of reflecting ordinals. The @{term "Ord(a)"} is redundant, though harmless.*} lemma (in reflection) "Reflects(\a. Ord(a) & ClEx(\x. fst(x) \ snd(x), a), \x. \y. M(y) & x \ y, \a x. \y\Mset(a). x \ y)" by fast text{*Example 2*} lemma (in reflection) "Reflects(?Cl, \x. \y. M(y) & (\z. M(z) --> z \ x --> z \ y), \a x. \y\Mset(a). \z\Mset(a). z \ x --> z \ y)" by fast text{*Example 2'. We give the reflecting class explicitly. *} lemma (in reflection) "Reflects (\a. (Ord(a) & ClEx(\x. ~ (snd(x) \ fst(fst(x)) --> snd(x) \ snd(fst(x))), a)) & ClEx(\x. \z. M(z) --> z \ fst(x) --> z \ snd(x), a), \x. \y. M(y) & (\z. M(z) --> z \ x --> z \ y), \a x. \y\Mset(a). \z\Mset(a). z \ x --> z \ y)" by fast text{*Example 2''. We expand the subset relation.*} lemma (in reflection) "Reflects(?Cl, \x. \y. M(y) & (\z. M(z) --> (\w. M(w) --> w\z --> w\x) --> z\y), \a x. \y\Mset(a). \z\Mset(a). (\w\Mset(a). w\z --> w\x) --> z\y)" by fast text{*Example 2'''. Single-step version, to reveal the reflecting class.*} lemma (in reflection) "Reflects(?Cl, \x. \y. M(y) & (\z. M(z) --> z \ x --> z \ y), \a x. \y\Mset(a). \z\Mset(a). z \ x --> z \ y)" apply (rule Ex_reflection) txt{* @{goals[display,indent=0,margin=60]} *} apply (rule All_reflection) txt{* @{goals[display,indent=0,margin=60]} *} apply (rule Triv_reflection) txt{* @{goals[display,indent=0,margin=60]} *} done text{*Example 3. Warning: the following examples make sense only if @{term P} is quantifier-free, since it is not being relativized.*} lemma (in reflection) "Reflects(?Cl, \x. \y. M(y) & (\z. M(z) --> z \ y <-> z \ x & P(z)), \a x. \y\Mset(a). \z\Mset(a). z \ y <-> z \ x & P(z))" by fast text{*Example 3'*} lemma (in reflection) "Reflects(?Cl, \x. \y. M(y) & y = Collect(x,P), \a x. \y\Mset(a). y = Collect(x,P))"; by fast text{*Example 3''*} lemma (in reflection) "Reflects(?Cl, \x. \y. M(y) & y = Replace(x,P), \a x. \y\Mset(a). y = Replace(x,P))"; by fast text{*Example 4: Axiom of Choice. Possibly wrong, since @{text \} needs to be relativized.*} lemma (in reflection) "Reflects(?Cl, \A. 0\A --> (\f. M(f) & f \ (\ X \ A. X)), \a A. 0\A --> (\f\Mset(a). f \ (\ X \ A. X)))" by fast end