src/ZF/Constructible/Wellorderings.thy
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header {*Relativized Wellorderings*}
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theory Wellorderings = Relative:
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text{*We define functions analogous to @{term ordermap} @{term ordertype} 
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      but without using recursion.  Instead, there is a direct appeal
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      to Replacement.  This will be the basis for a version relativized
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      to some class @{text M}.  The main result is Theorem I 7.6 in Kunen,
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      page 17.*}
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subsection{*Wellorderings*}
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constdefs
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  irreflexive :: "[i=>o,i,i]=>o"
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    "irreflexive(M,A,r) == \<forall>x\<in>A. M(x) --> <x,x> \<notin> r"
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  transitive_rel :: "[i=>o,i,i]=>o"
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    "transitive_rel(M,A,r) == 
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	\<forall>x\<in>A. M(x) --> (\<forall>y\<in>A. M(y) --> (\<forall>z\<in>A. M(z) --> 
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                          <x,y>\<in>r --> <y,z>\<in>r --> <x,z>\<in>r))"
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  linear_rel :: "[i=>o,i,i]=>o"
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    "linear_rel(M,A,r) == 
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	\<forall>x\<in>A. M(x) --> (\<forall>y\<in>A. M(y) --> <x,y>\<in>r | x=y | <y,x>\<in>r)"
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  wellfounded :: "[i=>o,i]=>o"
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    --{*EVERY non-empty set has an @{text r}-minimal element*}
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    "wellfounded(M,r) == 
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	\<forall>x. M(x) --> ~ empty(M,x) 
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                 --> (\<exists>y\<in>x. M(y) & ~(\<exists>z\<in>x. M(z) & <z,y> \<in> r))"
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  wellfounded_on :: "[i=>o,i,i]=>o"
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    --{*every non-empty SUBSET OF @{text A} has an @{text r}-minimal element*}
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    "wellfounded_on(M,A,r) == 
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	\<forall>x. M(x) --> ~ empty(M,x) --> subset(M,x,A)
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                 --> (\<exists>y\<in>x. M(y) & ~(\<exists>z\<in>x. M(z) & <z,y> \<in> r))"
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  wellordered :: "[i=>o,i,i]=>o"
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    --{*every non-empty subset of @{text A} has an @{text r}-minimal element*}
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    "wellordered(M,A,r) == 
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	transitive_rel(M,A,r) & linear_rel(M,A,r) & wellfounded_on(M,A,r)"
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subsubsection {*Trivial absoluteness proofs*}
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lemma (in M_axioms) irreflexive_abs [simp]: 
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     "M(A) ==> irreflexive(M,A,r) <-> irrefl(A,r)"
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by (simp add: irreflexive_def irrefl_def)
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lemma (in M_axioms) transitive_rel_abs [simp]: 
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     "M(A) ==> transitive_rel(M,A,r) <-> trans[A](r)"
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by (simp add: transitive_rel_def trans_on_def)
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lemma (in M_axioms) linear_rel_abs [simp]: 
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     "M(A) ==> linear_rel(M,A,r) <-> linear(A,r)"
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by (simp add: linear_rel_def linear_def)
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lemma (in M_axioms) wellordered_is_trans_on: 
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    "[| wellordered(M,A,r); M(A) |] ==> trans[A](r)"
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by (auto simp add: wellordered_def )
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lemma (in M_axioms) wellordered_is_linear: 
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    "[| wellordered(M,A,r); M(A) |] ==> linear(A,r)"
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by (auto simp add: wellordered_def )
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lemma (in M_axioms) wellordered_is_wellfounded_on: 
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    "[| wellordered(M,A,r); M(A) |] ==> wellfounded_on(M,A,r)"
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by (auto simp add: wellordered_def )
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lemma (in M_axioms) wellfounded_imp_wellfounded_on: 
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    "[| wellfounded(M,r); M(A) |] ==> wellfounded_on(M,A,r)"
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by (auto simp add: wellfounded_def wellfounded_on_def)
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lemma (in M_axioms) wellfounded_on_subset_A:
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     "[| wellfounded_on(M,A,r);  B<=A |] ==> wellfounded_on(M,B,r)"
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by (simp add: wellfounded_on_def, blast)
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subsubsection {*Well-founded relations*}
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lemma  (in M_axioms) wellfounded_on_iff_wellfounded:
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     "wellfounded_on(M,A,r) <-> wellfounded(M, r \<inter> A*A)"
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apply (simp add: wellfounded_on_def wellfounded_def, safe)
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 apply blast 
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apply (drule_tac x=x in spec, blast) 
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done
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lemma (in M_axioms) wellfounded_on_imp_wellfounded:
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     "[|wellfounded_on(M,A,r); r \<subseteq> A*A|] ==> wellfounded(M,r)"
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by (simp add: wellfounded_on_iff_wellfounded subset_Int_iff)
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lemma (in M_axioms) wellfounded_on_field_imp_wellfounded:
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     "wellfounded_on(M, field(r), r) ==> wellfounded(M,r)"
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by (simp add: wellfounded_def wellfounded_on_iff_wellfounded, fast)
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lemma (in M_axioms) wellfounded_iff_wellfounded_on_field:
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     "M(r) ==> wellfounded(M,r) <-> wellfounded_on(M, field(r), r)"
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by (blast intro: wellfounded_imp_wellfounded_on
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                 wellfounded_on_field_imp_wellfounded)
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(*Consider the least z in domain(r) such that P(z) does not hold...*)
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lemma (in M_axioms) wellfounded_induct: 
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     "[| wellfounded(M,r); M(a); M(r); separation(M, \<lambda>x. ~P(x));  
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         \<forall>x. M(x) & (\<forall>y. <y,x> \<in> r --> P(y)) --> P(x) |]
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      ==> P(a)";
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apply (simp (no_asm_use) add: wellfounded_def)
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apply (drule_tac x="{z \<in> domain(r). ~P(z)}" in spec)
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apply (blast dest: transM)
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done
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lemma (in M_axioms) wellfounded_on_induct: 
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     "[| a\<in>A;  wellfounded_on(M,A,r);  M(A);  
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       separation(M, \<lambda>x. x\<in>A --> ~P(x));  
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       \<forall>x\<in>A. M(x) & (\<forall>y\<in>A. <y,x> \<in> r --> P(y)) --> P(x) |]
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      ==> P(a)";
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apply (simp (no_asm_use) add: wellfounded_on_def)
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apply (drule_tac x="{z\<in>A. z\<in>A --> ~P(z)}" in spec)
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apply (blast intro: transM) 
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done
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text{*The assumption @{term "r \<subseteq> A*A"} justifies strengthening the induction
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      hypothesis by removing the restriction to @{term A}.*}
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lemma (in M_axioms) wellfounded_on_induct2: 
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     "[| a\<in>A;  wellfounded_on(M,A,r);  M(A);  r \<subseteq> A*A;  
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       separation(M, \<lambda>x. x\<in>A --> ~P(x));  
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       \<forall>x\<in>A. M(x) & (\<forall>y. <y,x> \<in> r --> P(y)) --> P(x) |]
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      ==> P(a)";
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by (rule wellfounded_on_induct, assumption+, blast)
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subsubsection {*Kunen's lemma IV 3.14, page 123*}
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lemma (in M_axioms) linear_imp_relativized: 
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     "linear(A,r) ==> linear_rel(M,A,r)" 
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by (simp add: linear_def linear_rel_def) 
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lemma (in M_axioms) trans_on_imp_relativized: 
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     "trans[A](r) ==> transitive_rel(M,A,r)" 
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by (unfold transitive_rel_def trans_on_def, blast) 
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lemma (in M_axioms) wf_on_imp_relativized: 
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     "wf[A](r) ==> wellfounded_on(M,A,r)" 
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apply (simp add: wellfounded_on_def wf_def wf_on_def, clarify) 
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apply (drule_tac x="x" in spec, blast) 
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done
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lemma (in M_axioms) wf_imp_relativized: 
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     "wf(r) ==> wellfounded(M,r)" 
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apply (simp add: wellfounded_def wf_def, clarify) 
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apply (drule_tac x="x" in spec, blast) 
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done
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lemma (in M_axioms) well_ord_imp_relativized: 
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     "well_ord(A,r) ==> wellordered(M,A,r)" 
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by (simp add: wellordered_def well_ord_def tot_ord_def part_ord_def
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       linear_imp_relativized trans_on_imp_relativized wf_on_imp_relativized)
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subsection{* Relativized versions of order-isomorphisms and order types *}
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lemma (in M_axioms) order_isomorphism_abs [simp]: 
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     "[| M(A); M(B); M(f) |] 
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      ==> order_isomorphism(M,A,r,B,s,f) <-> f \<in> ord_iso(A,r,B,s)"
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by (simp add: typed_apply_abs [OF bij_is_fun] apply_closed 
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              order_isomorphism_def ord_iso_def)
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lemma (in M_axioms) pred_set_abs [simp]: 
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     "[| M(r); M(B) |] ==> pred_set(M,A,x,r,B) <-> B = Order.pred(A,x,r)"
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apply (simp add: pred_set_def Order.pred_def)
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apply (blast dest: transM) 
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done
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lemma (in M_axioms) pred_closed [intro,simp]: 
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     "[| M(A); M(r); M(x) |] ==> M(Order.pred(A,x,r))"
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apply (simp add: Order.pred_def) 
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apply (insert pred_separation [of r x], simp) 
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done
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lemma (in M_axioms) membership_abs [simp]: 
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     "[| M(r); M(A) |] ==> membership(M,A,r) <-> r = Memrel(A)"
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apply (simp add: membership_def Memrel_def, safe)
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  apply (rule equalityI) 
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   apply clarify 
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   apply (frule transM, assumption)
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   apply blast
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  apply clarify 
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  apply (subgoal_tac "M(<xb,ya>)", blast) 
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  apply (blast dest: transM) 
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 apply auto 
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done
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lemma (in M_axioms) M_Memrel_iff:
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     "M(A) ==> 
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      Memrel(A) = {z \<in> A*A. \<exists>x. M(x) \<and> (\<exists>y. M(y) \<and> z = \<langle>x,y\<rangle> \<and> x \<in> y)}"
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apply (simp add: Memrel_def) 
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apply (blast dest: transM)
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done 
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lemma (in M_axioms) Memrel_closed [intro,simp]: 
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     "M(A) ==> M(Memrel(A))"
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apply (simp add: M_Memrel_iff) 
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apply (insert Memrel_separation, simp)
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done
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subsection {* Main results of Kunen, Chapter 1 section 6 *}
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text{*Subset properties-- proved outside the locale*}
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lemma linear_rel_subset: 
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    "[| linear_rel(M,A,r);  B<=A |] ==> linear_rel(M,B,r)"
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by (unfold linear_rel_def, blast)
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lemma transitive_rel_subset: 
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    "[| transitive_rel(M,A,r);  B<=A |] ==> transitive_rel(M,B,r)"
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by (unfold transitive_rel_def, blast)
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lemma wellfounded_on_subset: 
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    "[| wellfounded_on(M,A,r);  B<=A |] ==> wellfounded_on(M,B,r)"
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by (unfold wellfounded_on_def subset_def, blast)
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lemma wellordered_subset: 
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    "[| wellordered(M,A,r);  B<=A |] ==> wellordered(M,B,r)"
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apply (unfold wellordered_def)
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apply (blast intro: linear_rel_subset transitive_rel_subset 
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		    wellfounded_on_subset)
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done
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text{*Inductive argument for Kunen's Lemma 6.1, etc.
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      Simple proof from Halmos, page 72*}
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lemma  (in M_axioms) wellordered_iso_subset_lemma: 
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     "[| wellordered(M,A,r);  f \<in> ord_iso(A,r, A',r);  A'<= A;  y \<in> A;  
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       M(A);  M(f);  M(r) |] ==> ~ <f`y, y> \<in> r"
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apply (unfold wellordered_def ord_iso_def)
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apply (elim conjE CollectE) 
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apply (erule wellfounded_on_induct, assumption+)
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 apply (insert well_ord_iso_separation [of A f r])
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 apply (simp add: typed_apply_abs [OF bij_is_fun] apply_closed, clarify) 
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apply (drule_tac a = x in bij_is_fun [THEN apply_type], assumption, blast)
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done
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text{*Kunen's Lemma 6.1: there's no order-isomorphism to an initial segment
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      of a well-ordering*}
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lemma (in M_axioms) wellordered_iso_predD:
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     "[| wellordered(M,A,r);  f \<in> ord_iso(A, r, Order.pred(A,x,r), r);  
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       M(A);  M(f);  M(r) |] ==> x \<notin> A"
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apply (rule notI) 
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apply (frule wellordered_iso_subset_lemma, assumption)
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apply (auto elim: predE)  
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(*Now we know  ~ (f`x < x) *)
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apply (drule ord_iso_is_bij [THEN bij_is_fun, THEN apply_type], assumption)
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(*Now we also know f`x  \<in> pred(A,x,r);  contradiction! *)
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apply (simp add: Order.pred_def)
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done
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lemma (in M_axioms) wellordered_iso_pred_eq_lemma:
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     "[| f \<in> \<langle>Order.pred(A,y,r), r\<rangle> \<cong> \<langle>Order.pred(A,x,r), r\<rangle>;
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       wellordered(M,A,r); x\<in>A; y\<in>A; M(A); M(f); M(r) |] ==> <x,y> \<notin> r"
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apply (frule wellordered_is_trans_on, assumption)
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apply (rule notI) 
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apply (drule_tac x2=y and x=x and r2=r in 
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         wellordered_subset [OF _ pred_subset, THEN wellordered_iso_predD]) 
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apply (simp add: trans_pred_pred_eq) 
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apply (blast intro: predI dest: transM)+
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done
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text{*Simple consequence of Lemma 6.1*}
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lemma (in M_axioms) wellordered_iso_pred_eq:
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     "[| wellordered(M,A,r);
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       f \<in> ord_iso(Order.pred(A,a,r), r, Order.pred(A,c,r), r);   
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       M(A);  M(f);  M(r);  a\<in>A;  c\<in>A |] ==> a=c"
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apply (frule wellordered_is_trans_on, assumption)
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apply (frule wellordered_is_linear, assumption)
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apply (erule_tac x=a and y=c in linearE, auto) 
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apply (drule ord_iso_sym)
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(*two symmetric cases*)
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apply (blast dest: wellordered_iso_pred_eq_lemma)+ 
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done
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lemma (in M_axioms) wellfounded_on_asym:
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     "[| wellfounded_on(M,A,r);  <a,x>\<in>r;  a\<in>A; x\<in>A;  M(A) |] ==> <x,a>\<notin>r"
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apply (simp add: wellfounded_on_def) 
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apply (drule_tac x="{x,a}" in spec) 
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apply (simp add: cons_closed) 
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apply (blast dest: transM) 
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done
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lemma (in M_axioms) wellordered_asym:
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     "[| wellordered(M,A,r);  <a,x>\<in>r;  a\<in>A; x\<in>A;  M(A) |] ==> <x,a>\<notin>r"
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by (simp add: wellordered_def, blast dest: wellfounded_on_asym)
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text{*Surely a shorter proof using lemmas in @{text Order}?
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     Like well_ord_iso_preserving?*}
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lemma (in M_axioms) ord_iso_pred_imp_lt:
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     "[| f \<in> ord_iso(Order.pred(A,x,r), r, i, Memrel(i));
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       g \<in> ord_iso(Order.pred(A,y,r), r, j, Memrel(j));
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       wellordered(M,A,r);  x \<in> A;  y \<in> A; M(A); M(r); M(f); M(g); M(j);
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       Ord(i); Ord(j); \<langle>x,y\<rangle> \<in> r |]
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      ==> i < j"
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apply (frule wellordered_is_trans_on, assumption)
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apply (frule_tac y=y in transM, assumption) 
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apply (rule_tac i=i and j=j in Ord_linear_lt, auto)  
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txt{*case @{term "i=j"} yields a contradiction*}
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 apply (rule_tac x1=x and A1="Order.pred(A,y,r)" in 
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          wellordered_iso_predD [THEN notE]) 
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   apply (blast intro: wellordered_subset [OF _ pred_subset]) 
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  apply (simp add: trans_pred_pred_eq)
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  apply (blast intro: Ord_iso_implies_eq ord_iso_sym ord_iso_trans) 
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 apply (simp_all add: pred_iff pred_closed converse_closed comp_closed)
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txt{*case @{term "j<i"} also yields a contradiction*}
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apply (frule restrict_ord_iso2, assumption+) 
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apply (frule ord_iso_sym [THEN ord_iso_is_bij, THEN bij_is_fun]) 
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apply (frule apply_type, blast intro: ltD) 
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  --{*thus @{term "converse(f)`j \<in> Order.pred(A,x,r)"}*}
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apply (simp add: pred_iff) 
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apply (subgoal_tac
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       "\<exists>h. M(h) & h \<in> ord_iso(Order.pred(A,y,r), r, 
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                               Order.pred(A, converse(f)`j, r), r)")
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 apply (clarify, frule wellordered_iso_pred_eq, assumption+)
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 apply (blast dest: wellordered_asym)  
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apply (intro exI conjI) 
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 prefer 2 apply (blast intro: Ord_iso_implies_eq ord_iso_sym ord_iso_trans)+
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done
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lemma ord_iso_converse1:
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     "[| f: ord_iso(A,r,B,s);  <b, f`a>: s;  a:A;  b:B |] 
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      ==> <converse(f) ` b, a> : r"
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   334
apply (frule ord_iso_converse, assumption+) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   335
apply (blast intro: ord_iso_is_bij [THEN bij_is_fun, THEN apply_funtype]) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   336
apply (simp add: left_inverse_bij [OF ord_iso_is_bij])
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   337
done
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   338
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   339
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   340
subsection {* Order Types: A Direct Construction by Replacement*}
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   341
45be08fbdcff new theory of inner models
paulson
parents:
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   342
text{*This follows Kunen's Theorem I 7.6, page 17.*}
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   343
45be08fbdcff new theory of inner models
paulson
parents:
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   344
constdefs
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   345
  
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   346
  obase :: "[i=>o,i,i,i] => o"
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   347
       --{*the domain of @{text om}, eventually shown to equal @{text A}*}
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   348
   "obase(M,A,r,z) == 
13293
paulson
parents: 13269
diff changeset
   349
	\<forall>a[M]. 
paulson
parents: 13269
diff changeset
   350
         a \<in> z <-> 
13223
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   351
          (a\<in>A & (\<exists>x g mx par. M(x) & M(g) & M(mx) & M(par) & ordinal(M,x) & 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   352
                               membership(M,x,mx) & pred_set(M,A,a,r,par) &  
13293
paulson
parents: 13269
diff changeset
   353
                               order_isomorphism(M,par,r,x,mx,g)))"
13223
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   354
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   355
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   356
  omap :: "[i=>o,i,i,i] => o"  
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   357
    --{*the function that maps wosets to order types*}
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   358
   "omap(M,A,r,f) == 
13293
paulson
parents: 13269
diff changeset
   359
	\<forall>z[M].
paulson
parents: 13269
diff changeset
   360
         z \<in> f <-> 
13223
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   361
          (\<exists>a\<in>A. M(a) & 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   362
           (\<exists>x g mx par. M(x) & M(g) & M(mx) & M(par) & ordinal(M,x) & 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   363
                         pair(M,a,x,z) & membership(M,x,mx) & 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   364
                         pred_set(M,A,a,r,par) &  
13293
paulson
parents: 13269
diff changeset
   365
                         order_isomorphism(M,par,r,x,mx,g)))"
13223
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   366
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   367
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   368
  otype :: "[i=>o,i,i,i] => o"  --{*the order types themselves*}
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   369
   "otype(M,A,r,i) == \<exists>f. M(f) & omap(M,A,r,f) & is_range(M,f,i)"
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   370
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   371
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   372
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   373
lemma (in M_axioms) obase_iff:
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   374
     "[| M(A); M(r); M(z) |] 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   375
      ==> obase(M,A,r,z) <-> 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   376
          z = {a\<in>A. \<exists>x g. M(x) & M(g) & Ord(x) & 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   377
                          g \<in> ord_iso(Order.pred(A,a,r),r,x,Memrel(x))}"
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   378
apply (simp add: obase_def Memrel_closed pred_closed)
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   379
apply (rule iffI) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   380
 prefer 2 apply blast 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   381
apply (rule equalityI) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   382
 apply (clarify, frule transM, assumption, rotate_tac -1, simp) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   383
apply (clarify, frule transM, assumption, force)
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   384
done
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   385
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   386
text{*Can also be proved with the premise @{term "M(z)"} instead of
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   387
      @{term "M(f)"}, but that version is less useful.*}
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   388
lemma (in M_axioms) omap_iff:
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   389
     "[| omap(M,A,r,f); M(A); M(r); M(f) |] 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   390
      ==> z \<in> f <->
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   391
      (\<exists>a\<in>A. \<exists>x g. M(x) & M(g) & z = <a,x> & Ord(x) & 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   392
                   g \<in> ord_iso(Order.pred(A,a,r),r,x,Memrel(x)))"
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   393
apply (rotate_tac 1) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   394
apply (simp add: omap_def Memrel_closed pred_closed) 
13293
paulson
parents: 13269
diff changeset
   395
apply (rule iffI)
paulson
parents: 13269
diff changeset
   396
 apply (drule_tac [2] x=z in rspec)
paulson
parents: 13269
diff changeset
   397
 apply (drule_tac x=z in rspec)
paulson
parents: 13269
diff changeset
   398
 apply (blast dest: transM)+
13223
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   399
done
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   400
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   401
lemma (in M_axioms) omap_unique:
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   402
     "[| omap(M,A,r,f); omap(M,A,r,f'); M(A); M(r); M(f); M(f') |] ==> f' = f" 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   403
apply (rule equality_iffI) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   404
apply (simp add: omap_iff) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   405
done
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   406
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   407
lemma (in M_axioms) omap_yields_Ord:
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   408
     "[| omap(M,A,r,f); \<langle>a,x\<rangle> \<in> f; M(a); M(x) |]  ==> Ord(x)"
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   409
apply (simp add: omap_def, blast) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   410
done
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   411
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   412
lemma (in M_axioms) otype_iff:
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   413
     "[| otype(M,A,r,i); M(A); M(r); M(i) |] 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   414
      ==> x \<in> i <-> 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   415
          (\<exists>a\<in>A. \<exists>g. M(x) & M(g) & Ord(x) & 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   416
                     g \<in> ord_iso(Order.pred(A,a,r),r,x,Memrel(x)))"
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   417
apply (simp add: otype_def, auto)
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   418
  apply (blast dest: transM)
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   419
 apply (blast dest!: omap_iff intro: transM)
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   420
apply (rename_tac a g) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   421
apply (rule_tac a=a in rangeI) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   422
apply (frule transM, assumption)
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   423
apply (simp add: omap_iff, blast)
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   424
done
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   425
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   426
lemma (in M_axioms) otype_eq_range:
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   427
     "[| omap(M,A,r,f); otype(M,A,r,i); M(A); M(r); M(f); M(i) |] ==> i = range(f)"
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   428
apply (auto simp add: otype_def omap_iff)
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   429
apply (blast dest: omap_unique) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   430
done
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   431
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   432
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   433
lemma (in M_axioms) Ord_otype:
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   434
     "[| otype(M,A,r,i); trans[A](r); M(A); M(r); M(i) |] ==> Ord(i)"
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   435
apply (rotate_tac 1) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   436
apply (rule OrdI) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   437
prefer 2 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   438
    apply (simp add: Ord_def otype_def omap_def) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   439
    apply clarify 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   440
    apply (frule pair_components_in_M, assumption) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   441
    apply blast 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   442
apply (auto simp add: Transset_def otype_iff) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   443
 apply (blast intro: transM)
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   444
apply (rename_tac y a g)
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   445
apply (frule ord_iso_sym [THEN ord_iso_is_bij, THEN bij_is_fun, 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   446
			  THEN apply_funtype],  assumption)  
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   447
apply (rule_tac x="converse(g)`y" in bexI)
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   448
 apply (frule_tac a="converse(g) ` y" in ord_iso_restrict_pred, assumption) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   449
apply (safe elim!: predE) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   450
apply (intro conjI exI) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   451
prefer 3
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   452
  apply (blast intro: restrict_ord_iso ord_iso_sym ltI)
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   453
 apply (blast intro: transM)
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   454
 apply (blast intro: Ord_in_Ord)
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   455
done
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   456
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   457
lemma (in M_axioms) domain_omap:
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   458
     "[| omap(M,A,r,f);  obase(M,A,r,B); M(A); M(r); M(B); M(f) |] 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   459
      ==> domain(f) = B"
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   460
apply (rotate_tac 2) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   461
apply (simp add: domain_closed obase_iff) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   462
apply (rule equality_iffI) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   463
apply (simp add: domain_iff omap_iff, blast) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   464
done
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   465
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   466
lemma (in M_axioms) omap_subset: 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   467
     "[| omap(M,A,r,f); obase(M,A,r,B); otype(M,A,r,i); 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   468
       M(A); M(r); M(f); M(B); M(i) |] ==> f \<subseteq> B * i"
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   469
apply (rotate_tac 3, clarify) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   470
apply (simp add: omap_iff obase_iff) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   471
apply (force simp add: otype_iff) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   472
done
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   473
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   474
lemma (in M_axioms) omap_funtype: 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   475
     "[| omap(M,A,r,f); obase(M,A,r,B); otype(M,A,r,i); 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   476
       M(A); M(r); M(f); M(B); M(i) |] ==> f \<in> B -> i"
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   477
apply (rotate_tac 3) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   478
apply (simp add: domain_omap omap_subset Pi_iff function_def omap_iff) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   479
apply (blast intro: Ord_iso_implies_eq ord_iso_sym ord_iso_trans) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   480
done
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   481
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   482
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   483
lemma (in M_axioms) wellordered_omap_bij:
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   484
     "[| wellordered(M,A,r); omap(M,A,r,f); obase(M,A,r,B); otype(M,A,r,i); 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   485
       M(A); M(r); M(f); M(B); M(i) |] ==> f \<in> bij(B,i)"
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   486
apply (insert omap_funtype [of A r f B i]) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   487
apply (auto simp add: bij_def inj_def) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   488
prefer 2  apply (blast intro: fun_is_surj dest: otype_eq_range) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   489
apply (frule_tac a="w" in apply_Pair, assumption) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   490
apply (frule_tac a="x" in apply_Pair, assumption) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   491
apply (simp add: omap_iff) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   492
apply (blast intro: wellordered_iso_pred_eq ord_iso_sym ord_iso_trans) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   493
done
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   494
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   495
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   496
text{*This is not the final result: we must show @{term "oB(A,r) = A"}*}
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   497
lemma (in M_axioms) omap_ord_iso:
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   498
     "[| wellordered(M,A,r); omap(M,A,r,f); obase(M,A,r,B); otype(M,A,r,i); 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   499
       M(A); M(r); M(f); M(B); M(i) |] ==> f \<in> ord_iso(B,r,i,Memrel(i))"
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   500
apply (rule ord_isoI)
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   501
 apply (erule wellordered_omap_bij, assumption+) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   502
apply (insert omap_funtype [of A r f B i], simp) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   503
apply (frule_tac a="x" in apply_Pair, assumption) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   504
apply (frule_tac a="y" in apply_Pair, assumption) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   505
apply (auto simp add: omap_iff)
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   506
 txt{*direction 1: assuming @{term "\<langle>x,y\<rangle> \<in> r"}*}
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   507
 apply (blast intro: ltD ord_iso_pred_imp_lt)
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   508
 txt{*direction 2: proving @{term "\<langle>x,y\<rangle> \<in> r"} using linearity of @{term r}*}
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   509
apply (rename_tac x y g ga) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   510
apply (frule wellordered_is_linear, assumption, 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   511
       erule_tac x=x and y=y in linearE, assumption+) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   512
txt{*the case @{term "x=y"} leads to immediate contradiction*} 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   513
apply (blast elim: mem_irrefl) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   514
txt{*the case @{term "\<langle>y,x\<rangle> \<in> r"}: handle like the opposite direction*}
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   515
apply (blast dest: ord_iso_pred_imp_lt ltD elim: mem_asym) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   516
done
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   517
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   518
lemma (in M_axioms) Ord_omap_image_pred:
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   519
     "[| wellordered(M,A,r); omap(M,A,r,f); obase(M,A,r,B); otype(M,A,r,i); 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   520
       M(A); M(r); M(f); M(B); M(i); b \<in> A |] ==> Ord(f `` Order.pred(A,b,r))"
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   521
apply (frule wellordered_is_trans_on, assumption)
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   522
apply (rule OrdI) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   523
	prefer 2 apply (simp add: image_iff omap_iff Ord_def, blast) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   524
txt{*Hard part is to show that the image is a transitive set.*}
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   525
apply (rotate_tac 3)
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   526
apply (simp add: Transset_def, clarify) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   527
apply (simp add: image_iff pred_iff apply_iff [OF omap_funtype [of A r f B i]])
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   528
apply (rename_tac c j, clarify)
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   529
apply (frule omap_funtype [of A r f B, THEN apply_funtype], assumption+)
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   530
apply (subgoal_tac "j : i") 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   531
	prefer 2 apply (blast intro: Ord_trans Ord_otype)
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   532
apply (subgoal_tac "converse(f) ` j : B") 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   533
	prefer 2 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   534
	apply (blast dest: wellordered_omap_bij [THEN bij_converse_bij, 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   535
                                      THEN bij_is_fun, THEN apply_funtype])
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   536
apply (rule_tac x="converse(f) ` j" in bexI) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   537
 apply (simp add: right_inverse_bij [OF wellordered_omap_bij]) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   538
apply (intro predI conjI)
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   539
 apply (erule_tac b=c in trans_onD) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   540
 apply (rule ord_iso_converse1 [OF omap_ord_iso [of A r f B i]])
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   541
apply (auto simp add: obase_iff)
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   542
done
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   543
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   544
lemma (in M_axioms) restrict_omap_ord_iso:
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   545
     "[| wellordered(M,A,r); omap(M,A,r,f); obase(M,A,r,B); otype(M,A,r,i); 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   546
       D \<subseteq> B; M(A); M(r); M(f); M(B); M(i) |] 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   547
      ==> restrict(f,D) \<in> (\<langle>D,r\<rangle> \<cong> \<langle>f``D, Memrel(f``D)\<rangle>)"
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   548
apply (frule ord_iso_restrict_image [OF omap_ord_iso [of A r f B i]], 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   549
       assumption+)
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   550
apply (drule ord_iso_sym [THEN subset_ord_iso_Memrel]) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   551
apply (blast dest: subsetD [OF omap_subset]) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   552
apply (drule ord_iso_sym, simp) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   553
done
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   554
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   555
lemma (in M_axioms) obase_equals: 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   556
     "[| wellordered(M,A,r); omap(M,A,r,f); obase(M,A,r,B); otype(M,A,r,i);
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   557
       M(A); M(r); M(f); M(B); M(i) |] ==> B = A"
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   558
apply (rotate_tac 4)
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   559
apply (rule equalityI, force simp add: obase_iff, clarify) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   560
apply (subst obase_iff [of A r B, THEN iffD1], assumption+, simp) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   561
apply (frule wellordered_is_wellfounded_on, assumption)
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   562
apply (erule wellfounded_on_induct, assumption+)
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   563
 apply (insert obase_equals_separation, simp add: Memrel_closed pred_closed, clarify) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   564
apply (rename_tac b) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   565
apply (subgoal_tac "Order.pred(A,b,r) <= B") 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   566
 prefer 2 apply (force simp add: pred_iff obase_iff)  
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   567
apply (intro conjI exI) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   568
    prefer 4 apply (blast intro: restrict_omap_ord_iso) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   569
apply (blast intro: Ord_omap_image_pred)+
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   570
done
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   571
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   572
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   573
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   574
text{*Main result: @{term om} gives the order-isomorphism 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   575
      @{term "\<langle>A,r\<rangle> \<cong> \<langle>i, Memrel(i)\<rangle>"} *}
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   576
theorem (in M_axioms) omap_ord_iso_otype:
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   577
     "[| wellordered(M,A,r); omap(M,A,r,f); obase(M,A,r,B); otype(M,A,r,i);
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   578
       M(A); M(r); M(f); M(B); M(i) |] ==> f \<in> ord_iso(A, r, i, Memrel(i))"
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   579
apply (frule omap_ord_iso, assumption+) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   580
apply (frule obase_equals, assumption+, blast) 
13293
paulson
parents: 13269
diff changeset
   581
done 
13223
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   582
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   583
lemma (in M_axioms) obase_exists:
13293
paulson
parents: 13269
diff changeset
   584
     "[| M(A); M(r) |] ==> \<exists>z[M]. obase(M,A,r,z)"
13223
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   585
apply (simp add: obase_def) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   586
apply (insert obase_separation [of A r])
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   587
apply (simp add: separation_def)  
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   588
done
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   589
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   590
lemma (in M_axioms) omap_exists:
13293
paulson
parents: 13269
diff changeset
   591
     "[| M(A); M(r) |] ==> \<exists>z[M]. omap(M,A,r,z)"
13223
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   592
apply (insert obase_exists [of A r]) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   593
apply (simp add: omap_def) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   594
apply (insert omap_replacement [of A r])
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   595
apply (simp add: strong_replacement_def, clarify) 
13293
paulson
parents: 13269
diff changeset
   596
apply (drule_tac x=x in spec, clarify) 
13223
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   597
apply (simp add: Memrel_closed pred_closed obase_iff)
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   598
apply (erule impE) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   599
 apply (clarsimp simp add: univalent_def)
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   600
 apply (blast intro: Ord_iso_implies_eq ord_iso_sym ord_iso_trans, clarify)  
13293
paulson
parents: 13269
diff changeset
   601
apply (rule_tac x=Y in rexI) 
paulson
parents: 13269
diff changeset
   602
apply (simp add: Memrel_closed pred_closed obase_iff, blast, assumption)
13223
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   603
done
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   604
13293
paulson
parents: 13269
diff changeset
   605
declare rall_simps [simp] rex_simps [simp]
paulson
parents: 13269
diff changeset
   606
13223
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   607
lemma (in M_axioms) otype_exists:
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   608
     "[| wellordered(M,A,r); M(A); M(r) |] ==> \<exists>i. M(i) & otype(M,A,r,i)"
13293
paulson
parents: 13269
diff changeset
   609
apply (insert omap_exists [of A r])  
paulson
parents: 13269
diff changeset
   610
apply (simp add: otype_def, safe)
paulson
parents: 13269
diff changeset
   611
apply (rule_tac x="range(x)" in exI) 
13223
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   612
apply blast 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   613
done
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   614
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   615
theorem (in M_axioms) omap_ord_iso_otype:
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   616
     "[| wellordered(M,A,r); M(A); M(r) |]
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   617
      ==> \<exists>f. M(f) & (\<exists>i. M(i) & Ord(i) & f \<in> ord_iso(A, r, i, Memrel(i)))"
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   618
apply (insert obase_exists [of A r] omap_exists [of A r] otype_exists [of A r], simp, clarify)
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   619
apply (subgoal_tac "Ord(i)", blast intro: omap_ord_iso_otype) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   620
apply (rule Ord_otype) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   621
    apply (force simp add: otype_def range_closed) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   622
   apply (simp_all add: wellordered_is_trans_on) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   623
done
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   624
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   625
lemma (in M_axioms) ordertype_exists:
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   626
     "[| wellordered(M,A,r); M(A); M(r) |]
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   627
      ==> \<exists>f. M(f) & (\<exists>i. M(i) & Ord(i) & f \<in> ord_iso(A, r, i, Memrel(i)))"
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   628
apply (insert obase_exists [of A r] omap_exists [of A r] otype_exists [of A r], simp, clarify)
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   629
apply (subgoal_tac "Ord(i)", blast intro: omap_ord_iso_otype) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   630
apply (rule Ord_otype) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   631
    apply (force simp add: otype_def range_closed) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   632
   apply (simp_all add: wellordered_is_trans_on) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   633
done
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   634
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   635
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   636
lemma (in M_axioms) relativized_imp_well_ord: 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   637
     "[| wellordered(M,A,r); M(A); M(r) |] ==> well_ord(A,r)" 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   638
apply (insert ordertype_exists [of A r], simp)
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   639
apply (blast intro: well_ord_ord_iso well_ord_Memrel )  
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   640
done
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   641
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   642
subsection {*Kunen's theorem 5.4, poage 127*}
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   643
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   644
text{*(a) The notion of Wellordering is absolute*}
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   645
theorem (in M_axioms) well_ord_abs [simp]: 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   646
     "[| M(A); M(r) |] ==> wellordered(M,A,r) <-> well_ord(A,r)" 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   647
by (blast intro: well_ord_imp_relativized relativized_imp_well_ord)  
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   648
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   649
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   650
text{*(b) Order types are absolute*}
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   651
lemma (in M_axioms) 
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   652
     "[| wellordered(M,A,r); f \<in> ord_iso(A, r, i, Memrel(i));
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   653
       M(A); M(r); M(f); M(i); Ord(i) |] ==> i = ordertype(A,r)"
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   654
by (blast intro: Ord_ordertype relativized_imp_well_ord ordertype_ord_iso
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   655
                 Ord_iso_implies_eq ord_iso_sym ord_iso_trans)
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   656
45be08fbdcff new theory of inner models
paulson
parents:
diff changeset
   657
end