isabelle: src/ZF/Constructible/Relative.thy@c82e63b11b8b (annotated)

13505 52a16cb7fefb Relativized right up to L satisfies V=L! paulson parents: 13436 diff changeset	1	(* Title: ZF/Constructible/Relative.thy
52a16cb7fefb Relativized right up to L satisfies V=L! paulson parents: 13436 diff changeset	2	Author: Lawrence C Paulson, Cambridge University Computer Laboratory
52a16cb7fefb Relativized right up to L satisfies V=L! paulson parents: 13436 diff changeset	3	*)
52a16cb7fefb Relativized right up to L satisfies V=L! paulson parents: 13436 diff changeset	4
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	5	section \<open>Relativization and Absoluteness\<close>
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	6
65449 c82e63b11b8b clarified main ZF.thy / ZFC.thy, and avoid name clash with global HOL/Main.thy; wenzelm parents: 61798 diff changeset	7	theory Relative imports ZF begin
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	8
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	9	subsection\<open>Relativized versions of standard set-theoretic concepts\<close>
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	10
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 16417 diff changeset	11	definition
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	12	empty :: "[i=>o,i] => o" where
13254 5146ccaedf42 class quantifiers (some) paulson parents: 13251 diff changeset	13	"empty(M,z) == \<forall>x[M]. x \<notin> z"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	14
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	15	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	16	subset :: "[i=>o,i,i] => o" where
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	17	"subset(M,A,B) == \<forall>x[M]. x\<in>A \<longrightarrow> x \<in> B"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	18
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	19	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	20	upair :: "[i=>o,i,i,i] => o" where
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	21	"upair(M,a,b,z) == a \<in> z & b \<in> z & (\<forall>x[M]. x\<in>z \<longrightarrow> x = a \| x = b)"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	22
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	23	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	24	pair :: "[i=>o,i,i,i] => o" where
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	25	"pair(M,a,b,z) == \<exists>x[M]. upair(M,a,a,x) &
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	26	(\<exists>y[M]. upair(M,a,b,y) & upair(M,x,y,z))"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	27
13306 6eebcddee32b more internalized formulas and separation proofs paulson parents: 13299 diff changeset	28
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	29	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	30	union :: "[i=>o,i,i,i] => o" where
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	31	"union(M,a,b,z) == \<forall>x[M]. x \<in> z \<longleftrightarrow> x \<in> a \| x \<in> b"
13245 714f7a423a15 development and tweaks paulson parents: 13223 diff changeset	32
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	33	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	34	is_cons :: "[i=>o,i,i,i] => o" where
13306 6eebcddee32b more internalized formulas and separation proofs paulson parents: 13299 diff changeset	35	"is_cons(M,a,b,z) == \<exists>x[M]. upair(M,a,a,x) & union(M,x,b,z)"
6eebcddee32b more internalized formulas and separation proofs paulson parents: 13299 diff changeset	36
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	37	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	38	successor :: "[i=>o,i,i] => o" where
13306 6eebcddee32b more internalized formulas and separation proofs paulson parents: 13299 diff changeset	39	"successor(M,a,z) == is_cons(M,a,a,z)"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	40
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	41	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	42	number1 :: "[i=>o,i] => o" where
13436 8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	43	"number1(M,a) == \<exists>x[M]. empty(M,x) & successor(M,x,a)"
13363 c26eeb000470 instantiation of locales M_trancl and M_wfrank; paulson parents: 13353 diff changeset	44
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	45	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	46	number2 :: "[i=>o,i] => o" where
13436 8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	47	"number2(M,a) == \<exists>x[M]. number1(M,x) & successor(M,x,a)"
13363 c26eeb000470 instantiation of locales M_trancl and M_wfrank; paulson parents: 13353 diff changeset	48
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	49	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	50	number3 :: "[i=>o,i] => o" where
13436 8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	51	"number3(M,a) == \<exists>x[M]. number2(M,x) & successor(M,x,a)"
13363 c26eeb000470 instantiation of locales M_trancl and M_wfrank; paulson parents: 13353 diff changeset	52
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	53	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	54	powerset :: "[i=>o,i,i] => o" where
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	55	"powerset(M,A,z) == \<forall>x[M]. x \<in> z \<longleftrightarrow> subset(M,x,A)"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	56
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	57	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	58	is_Collect :: "[i=>o,i,i=>o,i] => o" where
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	59	"is_Collect(M,A,P,z) == \<forall>x[M]. x \<in> z \<longleftrightarrow> x \<in> A & P(x)"
13436 8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	60
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	61	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	62	is_Replace :: "[i=>o,i,[i,i]=>o,i] => o" where
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	63	"is_Replace(M,A,P,z) == \<forall>u[M]. u \<in> z \<longleftrightarrow> (\<exists>x[M]. x\<in>A & P(x,u))"
13505 52a16cb7fefb Relativized right up to L satisfies V=L! paulson parents: 13436 diff changeset	64
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	65	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	66	inter :: "[i=>o,i,i,i] => o" where
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	67	"inter(M,a,b,z) == \<forall>x[M]. x \<in> z \<longleftrightarrow> x \<in> a & x \<in> b"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	68
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	69	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	70	setdiff :: "[i=>o,i,i,i] => o" where
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	71	"setdiff(M,a,b,z) == \<forall>x[M]. x \<in> z \<longleftrightarrow> x \<in> a & x \<notin> b"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	72
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	73	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	74	big_union :: "[i=>o,i,i] => o" where
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	75	"big_union(M,A,z) == \<forall>x[M]. x \<in> z \<longleftrightarrow> (\<exists>y[M]. y\<in>A & x \<in> y)"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	76
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	77	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	78	big_inter :: "[i=>o,i,i] => o" where
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	79	"big_inter(M,A,z) ==
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	80	(A=0 \<longrightarrow> z=0) &
57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	81	(A\<noteq>0 \<longrightarrow> (\<forall>x[M]. x \<in> z \<longleftrightarrow> (\<forall>y[M]. y\<in>A \<longrightarrow> x \<in> y)))"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	82
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	83	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	84	cartprod :: "[i=>o,i,i,i] => o" where
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	85	"cartprod(M,A,B,z) ==
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	86	\<forall>u[M]. u \<in> z \<longleftrightarrow> (\<exists>x[M]. x\<in>A & (\<exists>y[M]. y\<in>B & pair(M,x,y,u)))"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	87
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	88	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	89	is_sum :: "[i=>o,i,i,i] => o" where
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	90	"is_sum(M,A,B,Z) ==
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	91	\<exists>A0[M]. \<exists>n1[M]. \<exists>s1[M]. \<exists>B1[M].
13350 626b79677dfa tidied paulson parents: 13348 diff changeset	92	number1(M,n1) & cartprod(M,n1,A,A0) & upair(M,n1,n1,s1) &
626b79677dfa tidied paulson parents: 13348 diff changeset	93	cartprod(M,s1,B,B1) & union(M,A0,B1,Z)"
626b79677dfa tidied paulson parents: 13348 diff changeset	94
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	95	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	96	is_Inl :: "[i=>o,i,i] => o" where
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	97	"is_Inl(M,a,z) == \<exists>zero[M]. empty(M,zero) & pair(M,zero,a,z)"
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	98
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	99	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	100	is_Inr :: "[i=>o,i,i] => o" where
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	101	"is_Inr(M,a,z) == \<exists>n1[M]. number1(M,n1) & pair(M,n1,a,z)"
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	102
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	103	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	104	is_converse :: "[i=>o,i,i] => o" where
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	105	"is_converse(M,r,z) ==
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	106	\<forall>x[M]. x \<in> z \<longleftrightarrow>
13299 3a932abf97e8 More use of relativized quantifiers paulson parents: 13298 diff changeset	107	(\<exists>w[M]. w\<in>r & (\<exists>u[M]. \<exists>v[M]. pair(M,u,v,w) & pair(M,v,u,x)))"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	108
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	109	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	110	pre_image :: "[i=>o,i,i,i] => o" where
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	111	"pre_image(M,r,A,z) ==
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	112	\<forall>x[M]. x \<in> z \<longleftrightarrow> (\<exists>w[M]. w\<in>r & (\<exists>y[M]. y\<in>A & pair(M,x,y,w)))"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	113
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	114	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	115	is_domain :: "[i=>o,i,i] => o" where
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	116	"is_domain(M,r,z) ==
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	117	\<forall>x[M]. x \<in> z \<longleftrightarrow> (\<exists>w[M]. w\<in>r & (\<exists>y[M]. pair(M,x,y,w)))"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	118
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	119	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	120	image :: "[i=>o,i,i,i] => o" where
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	121	"image(M,r,A,z) ==
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	122	\<forall>y[M]. y \<in> z \<longleftrightarrow> (\<exists>w[M]. w\<in>r & (\<exists>x[M]. x\<in>A & pair(M,x,y,w)))"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	123
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	124	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	125	is_range :: "[i=>o,i,i] => o" where
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	126	\<comment>\<open>the cleaner
13299 3a932abf97e8 More use of relativized quantifiers paulson parents: 13298 diff changeset	127	@{term "\<exists>r'[M]. is_converse(M,r,r') & is_domain(M,r',z)"}
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	128	unfortunately needs an instance of separation in order to prove
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	129	@{term "M(converse(r))"}.\<close>
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	130	"is_range(M,r,z) ==
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	131	\<forall>y[M]. y \<in> z \<longleftrightarrow> (\<exists>w[M]. w\<in>r & (\<exists>x[M]. pair(M,x,y,w)))"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	132
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	133	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	134	is_field :: "[i=>o,i,i] => o" where
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	135	"is_field(M,r,z) ==
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 22710 diff changeset	136	\<exists>dr[M]. \<exists>rr[M]. is_domain(M,r,dr) & is_range(M,r,rr) &
13436 8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	137	union(M,dr,rr,z)"
13245 714f7a423a15 development and tweaks paulson parents: 13223 diff changeset	138
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	139	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	140	is_relation :: "[i=>o,i] => o" where
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	141	"is_relation(M,r) ==
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	142	(\<forall>z[M]. z\<in>r \<longrightarrow> (\<exists>x[M]. \<exists>y[M]. pair(M,x,y,z)))"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	143
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	144	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	145	is_function :: "[i=>o,i] => o" where
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	146	"is_function(M,r) ==
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 22710 diff changeset	147	\<forall>x[M]. \<forall>y[M]. \<forall>y'[M]. \<forall>p[M]. \<forall>p'[M].
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	148	pair(M,x,y,p) \<longrightarrow> pair(M,x,y',p') \<longrightarrow> p\<in>r \<longrightarrow> p'\<in>r \<longrightarrow> y=y'"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	149
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	150	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	151	fun_apply :: "[i=>o,i,i,i] => o" where
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	152	"fun_apply(M,f,x,y) ==
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	153	(\<exists>xs[M]. \<exists>fxs[M].
13352 3cd767f8d78b new definitions of fun_apply and M_is_recfun paulson parents: 13350 diff changeset	154	upair(M,x,x,xs) & image(M,f,xs,fxs) & big_union(M,fxs,y))"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	155
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	156	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	157	typed_function :: "[i=>o,i,i,i] => o" where
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	158	"typed_function(M,A,B,r) ==
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	159	is_function(M,r) & is_relation(M,r) & is_domain(M,r,A) &
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	160	(\<forall>u[M]. u\<in>r \<longrightarrow> (\<forall>x[M]. \<forall>y[M]. pair(M,x,y,u) \<longrightarrow> y\<in>B))"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	161
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	162	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	163	is_funspace :: "[i=>o,i,i,i] => o" where
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	164	"is_funspace(M,A,B,F) ==
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	165	\<forall>f[M]. f \<in> F \<longleftrightarrow> typed_function(M,A,B,f)"
13268 240509babf00 more use of relativized quantifiers paulson parents: 13254 diff changeset	166
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	167	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	168	composition :: "[i=>o,i,i,i] => o" where
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	169	"composition(M,r,s,t) ==
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	170	\<forall>p[M]. p \<in> t \<longleftrightarrow>
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	171	(\<exists>x[M]. \<exists>y[M]. \<exists>z[M]. \<exists>xy[M]. \<exists>yz[M].
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	172	pair(M,x,z,p) & pair(M,x,y,xy) & pair(M,y,z,yz) &
13323 2c287f50c9f3 More relativization, reflection and proofs of separation paulson parents: 13319 diff changeset	173	xy \<in> s & yz \<in> r)"
13245 714f7a423a15 development and tweaks paulson parents: 13223 diff changeset	174
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	175	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	176	injection :: "[i=>o,i,i,i] => o" where
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	177	"injection(M,A,B,f) ==
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 22710 diff changeset	178	typed_function(M,A,B,f) &
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	179	(\<forall>x[M]. \<forall>x'[M]. \<forall>y[M]. \<forall>p[M]. \<forall>p'[M].
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	180	pair(M,x,y,p) \<longrightarrow> pair(M,x',y,p') \<longrightarrow> p\<in>f \<longrightarrow> p'\<in>f \<longrightarrow> x=x')"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	181
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	182	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	183	surjection :: "[i=>o,i,i,i] => o" where
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	184	"surjection(M,A,B,f) ==
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	185	typed_function(M,A,B,f) &
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	186	(\<forall>y[M]. y\<in>B \<longrightarrow> (\<exists>x[M]. x\<in>A & fun_apply(M,f,x,y)))"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	187
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	188	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	189	bijection :: "[i=>o,i,i,i] => o" where
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	190	"bijection(M,A,B,f) == injection(M,A,B,f) & surjection(M,A,B,f)"
45be08fbdcff new theory of inner models paulson parents: diff changeset	191
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	192	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	193	restriction :: "[i=>o,i,i,i] => o" where
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	194	"restriction(M,r,A,z) ==
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	195	\<forall>x[M]. x \<in> z \<longleftrightarrow> (x \<in> r & (\<exists>u[M]. u\<in>A & (\<exists>v[M]. pair(M,u,v,x))))"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	196
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	197	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	198	transitive_set :: "[i=>o,i] => o" where
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	199	"transitive_set(M,a) == \<forall>x[M]. x\<in>a \<longrightarrow> subset(M,x,a)"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	200
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	201	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	202	ordinal :: "[i=>o,i] => o" where
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	203	\<comment>\<open>an ordinal is a transitive set of transitive sets\<close>
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	204	"ordinal(M,a) == transitive_set(M,a) & (\<forall>x[M]. x\<in>a \<longrightarrow> transitive_set(M,x))"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	205
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	206	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	207	limit_ordinal :: "[i=>o,i] => o" where
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	208	\<comment>\<open>a limit ordinal is a non-empty, successor-closed ordinal\<close>
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	209	"limit_ordinal(M,a) ==
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 22710 diff changeset	210	ordinal(M,a) & ~ empty(M,a) &
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	211	(\<forall>x[M]. x\<in>a \<longrightarrow> (\<exists>y[M]. y\<in>a & successor(M,x,y)))"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	212
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	213	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	214	successor_ordinal :: "[i=>o,i] => o" where
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	215	\<comment>\<open>a successor ordinal is any ordinal that is neither empty nor limit\<close>
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	216	"successor_ordinal(M,a) ==
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 22710 diff changeset	217	ordinal(M,a) & ~ empty(M,a) & ~ limit_ordinal(M,a)"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	218
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	219	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	220	finite_ordinal :: "[i=>o,i] => o" where
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	221	\<comment>\<open>an ordinal is finite if neither it nor any of its elements are limit\<close>
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	222	"finite_ordinal(M,a) ==
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 22710 diff changeset	223	ordinal(M,a) & ~ limit_ordinal(M,a) &
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	224	(\<forall>x[M]. x\<in>a \<longrightarrow> ~ limit_ordinal(M,x))"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	225
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	226	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	227	omega :: "[i=>o,i] => o" where
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	228	\<comment>\<open>omega is a limit ordinal none of whose elements are limit\<close>
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	229	"omega(M,a) == limit_ordinal(M,a) & (\<forall>x[M]. x\<in>a \<longrightarrow> ~ limit_ordinal(M,x))"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	230
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	231	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	232	is_quasinat :: "[i=>o,i] => o" where
13350 626b79677dfa tidied paulson parents: 13348 diff changeset	233	"is_quasinat(M,z) == empty(M,z) \| (\<exists>m[M]. successor(M,m,z))"
626b79677dfa tidied paulson parents: 13348 diff changeset	234
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	235	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	236	is_nat_case :: "[i=>o, i, [i,i]=>o, i, i] => o" where
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	237	"is_nat_case(M, a, is_b, k, z) ==
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	238	(empty(M,k) \<longrightarrow> z=a) &
57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	239	(\<forall>m[M]. successor(M,m,k) \<longrightarrow> is_b(m,z)) &
13363 c26eeb000470 instantiation of locales M_trancl and M_wfrank; paulson parents: 13353 diff changeset	240	(is_quasinat(M,k) \| empty(M,z))"
13350 626b79677dfa tidied paulson parents: 13348 diff changeset	241
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	242	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	243	relation1 :: "[i=>o, [i,i]=>o, i=>i] => o" where
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	244	"relation1(M,is_f,f) == \<forall>x[M]. \<forall>y[M]. is_f(x,y) \<longleftrightarrow> y = f(x)"
13353 1800e7134d2e towards relativization of "iterates" and "wfrec" paulson parents: 13352 diff changeset	245
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	246	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	247	Relation1 :: "[i=>o, i, [i,i]=>o, i=>i] => o" where
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	248	\<comment>\<open>as above, but typed\<close>
13634 99a593b49b04 Re-organization of Constructible theories paulson parents: 13628 diff changeset	249	"Relation1(M,A,is_f,f) ==
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	250	\<forall>x[M]. \<forall>y[M]. x\<in>A \<longrightarrow> is_f(x,y) \<longleftrightarrow> y = f(x)"
13423 7ec771711c09 More lemmas, working towards relativization of "satisfies" paulson parents: 13418 diff changeset	251
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	252	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	253	relation2 :: "[i=>o, [i,i,i]=>o, [i,i]=>i] => o" where
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	254	"relation2(M,is_f,f) == \<forall>x[M]. \<forall>y[M]. \<forall>z[M]. is_f(x,y,z) \<longleftrightarrow> z = f(x,y)"
13353 1800e7134d2e towards relativization of "iterates" and "wfrec" paulson parents: 13352 diff changeset	255
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	256	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	257	Relation2 :: "[i=>o, i, i, [i,i,i]=>o, [i,i]=>i] => o" where
13634 99a593b49b04 Re-organization of Constructible theories paulson parents: 13628 diff changeset	258	"Relation2(M,A,B,is_f,f) ==
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	259	\<forall>x[M]. \<forall>y[M]. \<forall>z[M]. x\<in>A \<longrightarrow> y\<in>B \<longrightarrow> is_f(x,y,z) \<longleftrightarrow> z = f(x,y)"
13423 7ec771711c09 More lemmas, working towards relativization of "satisfies" paulson parents: 13418 diff changeset	260
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	261	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	262	relation3 :: "[i=>o, [i,i,i,i]=>o, [i,i,i]=>i] => o" where
13634 99a593b49b04 Re-organization of Constructible theories paulson parents: 13628 diff changeset	263	"relation3(M,is_f,f) ==
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	264	\<forall>x[M]. \<forall>y[M]. \<forall>z[M]. \<forall>u[M]. is_f(x,y,z,u) \<longleftrightarrow> u = f(x,y,z)"
13353 1800e7134d2e towards relativization of "iterates" and "wfrec" paulson parents: 13352 diff changeset	265
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	266	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	267	Relation3 :: "[i=>o, i, i, i, [i,i,i,i]=>o, [i,i,i]=>i] => o" where
13634 99a593b49b04 Re-organization of Constructible theories paulson parents: 13628 diff changeset	268	"Relation3(M,A,B,C,is_f,f) ==
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	269	\<forall>x[M]. \<forall>y[M]. \<forall>z[M]. \<forall>u[M].
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	270	x\<in>A \<longrightarrow> y\<in>B \<longrightarrow> z\<in>C \<longrightarrow> is_f(x,y,z,u) \<longleftrightarrow> u = f(x,y,z)"
13423 7ec771711c09 More lemmas, working towards relativization of "satisfies" paulson parents: 13418 diff changeset	271
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	272	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	273	relation4 :: "[i=>o, [i,i,i,i,i]=>o, [i,i,i,i]=>i] => o" where
13634 99a593b49b04 Re-organization of Constructible theories paulson parents: 13628 diff changeset	274	"relation4(M,is_f,f) ==
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	275	\<forall>u[M]. \<forall>x[M]. \<forall>y[M]. \<forall>z[M]. \<forall>a[M]. is_f(u,x,y,z,a) \<longleftrightarrow> a = f(u,x,y,z)"
13423 7ec771711c09 More lemmas, working towards relativization of "satisfies" paulson parents: 13418 diff changeset	276
7ec771711c09 More lemmas, working towards relativization of "satisfies" paulson parents: 13418 diff changeset	277
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	278	text\<open>Useful when absoluteness reasoning has replaced the predicates by terms\<close>
13634 99a593b49b04 Re-organization of Constructible theories paulson parents: 13628 diff changeset	279	lemma triv_Relation1:
99a593b49b04 Re-organization of Constructible theories paulson parents: 13628 diff changeset	280	"Relation1(M, A, \<lambda>x y. y = f(x), f)"
99a593b49b04 Re-organization of Constructible theories paulson parents: 13628 diff changeset	281	by (simp add: Relation1_def)
13423 7ec771711c09 More lemmas, working towards relativization of "satisfies" paulson parents: 13418 diff changeset	282
13634 99a593b49b04 Re-organization of Constructible theories paulson parents: 13628 diff changeset	283	lemma triv_Relation2:
99a593b49b04 Re-organization of Constructible theories paulson parents: 13628 diff changeset	284	"Relation2(M, A, B, \<lambda>x y a. a = f(x,y), f)"
99a593b49b04 Re-organization of Constructible theories paulson parents: 13628 diff changeset	285	by (simp add: Relation2_def)
13423 7ec771711c09 More lemmas, working towards relativization of "satisfies" paulson parents: 13418 diff changeset	286
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	287
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	288	subsection \<open>The relativized ZF axioms\<close>
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	289
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 16417 diff changeset	290	definition
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	291	extensionality :: "(i=>o) => o" where
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	292	"extensionality(M) ==
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	293	\<forall>x[M]. \<forall>y[M]. (\<forall>z[M]. z \<in> x \<longleftrightarrow> z \<in> y) \<longrightarrow> x=y"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	294
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	295	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	296	separation :: "[i=>o, i=>o] => o" where
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	297	\<comment>\<open>The formula \<open>P\<close> should only involve parameters
27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	298	belonging to \<open>M\<close> and all its quantifiers must be relativized
27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	299	to \<open>M\<close>. We do not have separation as a scheme; every instance
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	300	that we need must be assumed (and later proved) separately.\<close>
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	301	"separation(M,P) ==
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	302	\<forall>z[M]. \<exists>y[M]. \<forall>x[M]. x \<in> y \<longleftrightarrow> x \<in> z & P(x)"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	303
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	304	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	305	upair_ax :: "(i=>o) => o" where
13563 7d6c9817c432 tweaks paulson parents: 13543 diff changeset	306	"upair_ax(M) == \<forall>x[M]. \<forall>y[M]. \<exists>z[M]. upair(M,x,y,z)"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	307
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	308	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	309	Union_ax :: "(i=>o) => o" where
13514 cc3bbaf1b8d3 tweaked paulson parents: 13505 diff changeset	310	"Union_ax(M) == \<forall>x[M]. \<exists>z[M]. big_union(M,x,z)"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	311
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	312	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	313	power_ax :: "(i=>o) => o" where
13514 cc3bbaf1b8d3 tweaked paulson parents: 13505 diff changeset	314	"power_ax(M) == \<forall>x[M]. \<exists>z[M]. powerset(M,x,z)"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	315
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	316	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	317	univalent :: "[i=>o, i, [i,i]=>o] => o" where
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	318	"univalent(M,A,P) ==
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	319	\<forall>x[M]. x\<in>A \<longrightarrow> (\<forall>y[M]. \<forall>z[M]. P(x,y) & P(x,z) \<longrightarrow> y=z)"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	320
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	321	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	322	replacement :: "[i=>o, [i,i]=>o] => o" where
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	323	"replacement(M,P) ==
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	324	\<forall>A[M]. univalent(M,A,P) \<longrightarrow>
57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	325	(\<exists>Y[M]. \<forall>b[M]. (\<exists>x[M]. x\<in>A & P(x,b)) \<longrightarrow> b \<in> Y)"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	326
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	327	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	328	strong_replacement :: "[i=>o, [i,i]=>o] => o" where
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	329	"strong_replacement(M,P) ==
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	330	\<forall>A[M]. univalent(M,A,P) \<longrightarrow>
57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	331	(\<exists>Y[M]. \<forall>b[M]. b \<in> Y \<longleftrightarrow> (\<exists>x[M]. x\<in>A & P(x,b)))"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	332
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	333	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	334	foundation_ax :: "(i=>o) => o" where
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	335	"foundation_ax(M) ==
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	336	\<forall>x[M]. (\<exists>y[M]. y\<in>x) \<longrightarrow> (\<exists>y[M]. y\<in>x & ~(\<exists>z[M]. z\<in>x & z \<in> y))"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	337
45be08fbdcff new theory of inner models paulson parents: diff changeset	338
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	339	subsection\<open>A trivial consistency proof for $V_\omega$\<close>
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	340
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	341	text\<open>We prove that $V_\omega$
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	342	(or \<open>univ\<close> in Isabelle) satisfies some ZF axioms.
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	343	Kunen, Theorem IV 3.13, page 123.\<close>
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	344
45be08fbdcff new theory of inner models paulson parents: diff changeset	345	lemma univ0_downwards_mem: "[\| y \<in> x; x \<in> univ(0) \|] ==> y \<in> univ(0)"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	346	apply (insert Transset_univ [OF Transset_0])
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	347	apply (simp add: Transset_def, blast)
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	348	done
45be08fbdcff new theory of inner models paulson parents: diff changeset	349
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	350	lemma univ0_Ball_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	351	"A \<in> univ(0) ==> (\<forall>x\<in>A. x \<in> univ(0) \<longrightarrow> P(x)) \<longleftrightarrow> (\<forall>x\<in>A. P(x))"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	352	by (blast intro: univ0_downwards_mem)
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	353
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	354	lemma univ0_Bex_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	355	"A \<in> univ(0) ==> (\<exists>x\<in>A. x \<in> univ(0) & P(x)) \<longleftrightarrow> (\<exists>x\<in>A. P(x))"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	356	by (blast intro: univ0_downwards_mem)
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	357
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	358	text\<open>Congruence rule for separation: can assume the variable is in \<open>M\<close>\<close>
13254 5146ccaedf42 class quantifiers (some) paulson parents: 13251 diff changeset	359	lemma separation_cong [cong]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	360	"(!!x. M(x) ==> P(x) \<longleftrightarrow> P'(x))
57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	361	==> separation(M, %x. P(x)) \<longleftrightarrow> separation(M, %x. P'(x))"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	362	by (simp add: separation_def)
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	363
13254 5146ccaedf42 class quantifiers (some) paulson parents: 13251 diff changeset	364	lemma univalent_cong [cong]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	365	"[\| A=A'; !!x y. [\| x\<in>A; M(x); M(y) \|] ==> P(x,y) \<longleftrightarrow> P'(x,y) \|]
57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	366	==> univalent(M, A, %x y. P(x,y)) \<longleftrightarrow> univalent(M, A', %x y. P'(x,y))"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	367	by (simp add: univalent_def)
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	368
13505 52a16cb7fefb Relativized right up to L satisfies V=L! paulson parents: 13436 diff changeset	369	lemma univalent_triv [intro,simp]:
52a16cb7fefb Relativized right up to L satisfies V=L! paulson parents: 13436 diff changeset	370	"univalent(M, A, \<lambda>x y. y = f(x))"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	371	by (simp add: univalent_def)
13505 52a16cb7fefb Relativized right up to L satisfies V=L! paulson parents: 13436 diff changeset	372
52a16cb7fefb Relativized right up to L satisfies V=L! paulson parents: 13436 diff changeset	373	lemma univalent_conjI2 [intro,simp]:
52a16cb7fefb Relativized right up to L satisfies V=L! paulson parents: 13436 diff changeset	374	"univalent(M,A,Q) ==> univalent(M, A, \<lambda>x y. P(x,y) & Q(x,y))"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	375	by (simp add: univalent_def, blast)
13505 52a16cb7fefb Relativized right up to L satisfies V=L! paulson parents: 13436 diff changeset	376
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	377	text\<open>Congruence rule for replacement\<close>
13254 5146ccaedf42 class quantifiers (some) paulson parents: 13251 diff changeset	378	lemma strong_replacement_cong [cong]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	379	"[\| !!x y. [\| M(x); M(y) \|] ==> P(x,y) \<longleftrightarrow> P'(x,y) \|]
57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	380	==> strong_replacement(M, %x y. P(x,y)) \<longleftrightarrow>
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	381	strong_replacement(M, %x y. P'(x,y))"
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	382	by (simp add: strong_replacement_def)
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	383
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	384	text\<open>The extensionality axiom\<close>
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	385	lemma "extensionality(\<lambda>x. x \<in> univ(0))"
45be08fbdcff new theory of inner models paulson parents: diff changeset	386	apply (simp add: extensionality_def)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	387	apply (blast intro: univ0_downwards_mem)
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	388	done
45be08fbdcff new theory of inner models paulson parents: diff changeset	389
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	390	text\<open>The separation axiom requires some lemmas\<close>
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	391	lemma Collect_in_Vfrom:
45be08fbdcff new theory of inner models paulson parents: diff changeset	392	"[\| X \<in> Vfrom(A,j); Transset(A) \|] ==> Collect(X,P) \<in> Vfrom(A, succ(j))"
45be08fbdcff new theory of inner models paulson parents: diff changeset	393	apply (drule Transset_Vfrom)
45be08fbdcff new theory of inner models paulson parents: diff changeset	394	apply (rule subset_mem_Vfrom)
45be08fbdcff new theory of inner models paulson parents: diff changeset	395	apply (unfold Transset_def, blast)
45be08fbdcff new theory of inner models paulson parents: diff changeset	396	done
45be08fbdcff new theory of inner models paulson parents: diff changeset	397
45be08fbdcff new theory of inner models paulson parents: diff changeset	398	lemma Collect_in_VLimit:
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	399	"[\| X \<in> Vfrom(A,i); Limit(i); Transset(A) \|]
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	400	==> Collect(X,P) \<in> Vfrom(A,i)"
45be08fbdcff new theory of inner models paulson parents: diff changeset	401	apply (rule Limit_VfromE, assumption+)
45be08fbdcff new theory of inner models paulson parents: diff changeset	402	apply (blast intro: Limit_has_succ VfromI Collect_in_Vfrom)
45be08fbdcff new theory of inner models paulson parents: diff changeset	403	done
45be08fbdcff new theory of inner models paulson parents: diff changeset	404
45be08fbdcff new theory of inner models paulson parents: diff changeset	405	lemma Collect_in_univ:
45be08fbdcff new theory of inner models paulson parents: diff changeset	406	"[\| X \<in> univ(A); Transset(A) \|] ==> Collect(X,P) \<in> univ(A)"
45be08fbdcff new theory of inner models paulson parents: diff changeset	407	by (simp add: univ_def Collect_in_VLimit Limit_nat)
45be08fbdcff new theory of inner models paulson parents: diff changeset	408
45be08fbdcff new theory of inner models paulson parents: diff changeset	409	lemma "separation(\<lambda>x. x \<in> univ(0), P)"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	410	apply (simp add: separation_def, clarify)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	411	apply (rule_tac x = "Collect(z,P)" in bexI)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	412	apply (blast intro: Collect_in_univ Transset_0)+
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	413	done
45be08fbdcff new theory of inner models paulson parents: diff changeset	414
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	415	text\<open>Unordered pairing axiom\<close>
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	416	lemma "upair_ax(\<lambda>x. x \<in> univ(0))"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	417	apply (simp add: upair_ax_def upair_def)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	418	apply (blast intro: doubleton_in_univ)
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	419	done
45be08fbdcff new theory of inner models paulson parents: diff changeset	420
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	421	text\<open>Union axiom\<close>
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	422	lemma "Union_ax(\<lambda>x. x \<in> univ(0))"
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	423	apply (simp add: Union_ax_def big_union_def, clarify)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	424	apply (rule_tac x="\<Union>x" in bexI)
13299 3a932abf97e8 More use of relativized quantifiers paulson parents: 13298 diff changeset	425	apply (blast intro: univ0_downwards_mem)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	426	apply (blast intro: Union_in_univ Transset_0)
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	427	done
45be08fbdcff new theory of inner models paulson parents: diff changeset	428
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	429	text\<open>Powerset axiom\<close>
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	430
45be08fbdcff new theory of inner models paulson parents: diff changeset	431	lemma Pow_in_univ:
45be08fbdcff new theory of inner models paulson parents: diff changeset	432	"[\| X \<in> univ(A); Transset(A) \|] ==> Pow(X) \<in> univ(A)"
45be08fbdcff new theory of inner models paulson parents: diff changeset	433	apply (simp add: univ_def Pow_in_VLimit Limit_nat)
45be08fbdcff new theory of inner models paulson parents: diff changeset	434	done
45be08fbdcff new theory of inner models paulson parents: diff changeset	435
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	436	lemma "power_ax(\<lambda>x. x \<in> univ(0))"
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	437	apply (simp add: power_ax_def powerset_def subset_def, clarify)
13299 3a932abf97e8 More use of relativized quantifiers paulson parents: 13298 diff changeset	438	apply (rule_tac x="Pow(x)" in bexI)
3a932abf97e8 More use of relativized quantifiers paulson parents: 13298 diff changeset	439	apply (blast intro: univ0_downwards_mem)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	440	apply (blast intro: Pow_in_univ Transset_0)
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	441	done
45be08fbdcff new theory of inner models paulson parents: diff changeset	442
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	443	text\<open>Foundation axiom\<close>
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	444	lemma "foundation_ax(\<lambda>x. x \<in> univ(0))"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	445	apply (simp add: foundation_ax_def, clarify)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	446	apply (cut_tac A=x in foundation)
13299 3a932abf97e8 More use of relativized quantifiers paulson parents: 13298 diff changeset	447	apply (blast intro: univ0_downwards_mem)
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	448	done
45be08fbdcff new theory of inner models paulson parents: diff changeset	449
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	450	lemma "replacement(\<lambda>x. x \<in> univ(0), P)"
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	451	apply (simp add: replacement_def, clarify)
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	452	oops
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	453	text\<open>no idea: maybe prove by induction on the rank of A?\<close>
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	454
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	455	text\<open>Still missing: Replacement, Choice\<close>
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	456
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	457	subsection\<open>Lemmas Needed to Reduce Some Set Constructions to Instances
240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	458	of Separation\<close>
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	459
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	460	lemma image_iff_Collect: "r `` A = {y \<in> \<Union>(\<Union>(r)). \<exists>p\<in>r. \<exists>x\<in>A. p=<x,y>}"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	461	apply (rule equalityI, auto)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	462	apply (simp add: Pair_def, blast)
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	463	done
45be08fbdcff new theory of inner models paulson parents: diff changeset	464
45be08fbdcff new theory of inner models paulson parents: diff changeset	465	lemma vimage_iff_Collect:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	466	"r -`` A = {x \<in> \<Union>(\<Union>(r)). \<exists>p\<in>r. \<exists>y\<in>A. p=<x,y>}"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	467	apply (rule equalityI, auto)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	468	apply (simp add: Pair_def, blast)
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	469	done
45be08fbdcff new theory of inner models paulson parents: diff changeset	470
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	471	text\<open>These two lemmas lets us prove \<open>domain_closed\<close> and
27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	472	\<open>range_closed\<close> without new instances of separation\<close>
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	473
45be08fbdcff new theory of inner models paulson parents: diff changeset	474	lemma domain_eq_vimage: "domain(r) = r -`` Union(Union(r))"
45be08fbdcff new theory of inner models paulson parents: diff changeset	475	apply (rule equalityI, auto)
45be08fbdcff new theory of inner models paulson parents: diff changeset	476	apply (rule vimageI, assumption)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	477	apply (simp add: Pair_def, blast)
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	478	done
45be08fbdcff new theory of inner models paulson parents: diff changeset	479
45be08fbdcff new theory of inner models paulson parents: diff changeset	480	lemma range_eq_image: "range(r) = r `` Union(Union(r))"
45be08fbdcff new theory of inner models paulson parents: diff changeset	481	apply (rule equalityI, auto)
45be08fbdcff new theory of inner models paulson parents: diff changeset	482	apply (rule imageI, assumption)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	483	apply (simp add: Pair_def, blast)
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	484	done
45be08fbdcff new theory of inner models paulson parents: diff changeset	485
45be08fbdcff new theory of inner models paulson parents: diff changeset	486	lemma replacementD:
45be08fbdcff new theory of inner models paulson parents: diff changeset	487	"[\| replacement(M,P); M(A); univalent(M,A,P) \|]
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	488	==> \<exists>Y[M]. (\<forall>b[M]. ((\<exists>x[M]. x\<in>A & P(x,b)) \<longrightarrow> b \<in> Y))"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	489	by (simp add: replacement_def)
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	490
45be08fbdcff new theory of inner models paulson parents: diff changeset	491	lemma strong_replacementD:
45be08fbdcff new theory of inner models paulson parents: diff changeset	492	"[\| strong_replacement(M,P); M(A); univalent(M,A,P) \|]
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	493	==> \<exists>Y[M]. (\<forall>b[M]. (b \<in> Y \<longleftrightarrow> (\<exists>x[M]. x\<in>A & P(x,b))))"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	494	by (simp add: strong_replacement_def)
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	495
45be08fbdcff new theory of inner models paulson parents: diff changeset	496	lemma separationD:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	497	"[\| separation(M,P); M(z) \|] ==> \<exists>y[M]. \<forall>x[M]. x \<in> y \<longleftrightarrow> x \<in> z & P(x)"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	498	by (simp add: separation_def)
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	499
45be08fbdcff new theory of inner models paulson parents: diff changeset	500
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	501	text\<open>More constants, for order types\<close>
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	502
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 16417 diff changeset	503	definition
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	504	order_isomorphism :: "[i=>o,i,i,i,i,i] => o" where
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	505	"order_isomorphism(M,A,r,B,s,f) ==
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	506	bijection(M,A,B,f) &
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	507	(\<forall>x[M]. x\<in>A \<longrightarrow> (\<forall>y[M]. y\<in>A \<longrightarrow>
13306 6eebcddee32b more internalized formulas and separation proofs paulson parents: 13299 diff changeset	508	(\<forall>p[M]. \<forall>fx[M]. \<forall>fy[M]. \<forall>q[M].
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	509	pair(M,x,y,p) \<longrightarrow> fun_apply(M,f,x,fx) \<longrightarrow> fun_apply(M,f,y,fy) \<longrightarrow>
57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	510	pair(M,fx,fy,q) \<longrightarrow> (p\<in>r \<longleftrightarrow> q\<in>s))))"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	511
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	512	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	513	pred_set :: "[i=>o,i,i,i,i] => o" where
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	514	"pred_set(M,A,x,r,B) ==
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	515	\<forall>y[M]. y \<in> B \<longleftrightarrow> (\<exists>p[M]. p\<in>r & y \<in> A & pair(M,y,x,p))"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	516
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	517	definition
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	518	membership :: "[i=>o,i,i] => o" where \<comment>\<open>membership relation\<close>
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	519	"membership(M,A,r) ==
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	520	\<forall>p[M]. p \<in> r \<longleftrightarrow> (\<exists>x[M]. x\<in>A & (\<exists>y[M]. y\<in>A & x\<in>y & pair(M,x,y,p)))"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	521
45be08fbdcff new theory of inner models paulson parents: diff changeset	522
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	523	subsection\<open>Introducing a Transitive Class Model\<close>
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	524
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	525	text\<open>The class M is assumed to be transitive and to satisfy some
240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	526	relativized ZF axioms\<close>
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	527	locale M_trivial =
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	528	fixes M
45be08fbdcff new theory of inner models paulson parents: diff changeset	529	assumes transM: "[\| y\<in>x; M(x) \|] ==> M(y)"
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 22710 diff changeset	530	and upair_ax: "upair_ax(M)"
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 22710 diff changeset	531	and Union_ax: "Union_ax(M)"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	532	and power_ax: "power_ax(M)"
45be08fbdcff new theory of inner models paulson parents: diff changeset	533	and replacement: "replacement(M,P)"
13268 240509babf00 more use of relativized quantifiers paulson parents: 13254 diff changeset	534	and M_nat [iff]: "M(nat)" (i.e. the axiom of infinity)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	535
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	536
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	537	text\<open>Automatically discovers the proof using \<open>transM\<close>, \<open>nat_0I\<close>
27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	538	and \<open>M_nat\<close>.\<close>
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	539	lemma (in M_trivial) nonempty [simp]: "M(0)"
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	540	by (blast intro: transM)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	541
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	542	lemma (in M_trivial) rall_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	543	"M(A) ==> (\<forall>x[M]. x\<in>A \<longrightarrow> P(x)) \<longleftrightarrow> (\<forall>x\<in>A. P(x))"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	544	by (blast intro: transM)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	545
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	546	lemma (in M_trivial) rex_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	547	"M(A) ==> (\<exists>x[M]. x\<in>A & P(x)) \<longleftrightarrow> (\<exists>x\<in>A. P(x))"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	548	by (blast intro: transM)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	549
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	550	lemma (in M_trivial) ball_iff_equiv:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	551	"M(A) ==> (\<forall>x[M]. (x\<in>A \<longleftrightarrow> P(x))) \<longleftrightarrow>
57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	552	(\<forall>x\<in>A. P(x)) & (\<forall>x. P(x) \<longrightarrow> M(x) \<longrightarrow> x\<in>A)"
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	553	by (blast intro: transM)
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	554
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	555	text\<open>Simplifies proofs of equalities when there's an iff-equality
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	556	available for rewriting, universally quantified over M.
13702 c7cf8fa66534 Polishing. paulson parents: 13687 diff changeset	557	But it's not the only way to prove such equalities: its
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	558	premises @{term "M(A)"} and @{term "M(B)"} can be too strong.\<close>
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	559	lemma (in M_trivial) M_equalityI:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	560	"[\| !!x. M(x) ==> x\<in>A \<longleftrightarrow> x\<in>B; M(A); M(B) \|] ==> A=B"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	561	by (blast intro!: equalityI dest: transM)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	562
13418 7c0ba9dba978 tweaks, aiming towards relativization of "satisfies" paulson parents: 13397 diff changeset	563
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	564	subsubsection\<open>Trivial Absoluteness Proofs: Empty Set, Pairs, etc.\<close>
13418 7c0ba9dba978 tweaks, aiming towards relativization of "satisfies" paulson parents: 13397 diff changeset	565
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	566	lemma (in M_trivial) empty_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	567	"M(z) ==> empty(M,z) \<longleftrightarrow> z=0"
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	568	apply (simp add: empty_def)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	569	apply (blast intro: transM)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	570	done
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	571
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	572	lemma (in M_trivial) subset_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	573	"M(A) ==> subset(M,A,B) \<longleftrightarrow> A \<subseteq> B"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	574	apply (simp add: subset_def)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	575	apply (blast intro: transM)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	576	done
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	577
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	578	lemma (in M_trivial) upair_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	579	"M(z) ==> upair(M,a,b,z) \<longleftrightarrow> z={a,b}"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	580	apply (simp add: upair_def)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	581	apply (blast intro: transM)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	582	done
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	583
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	584	lemma (in M_trivial) upair_in_M_iff [iff]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	585	"M({a,b}) \<longleftrightarrow> M(a) & M(b)"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	586	apply (insert upair_ax, simp add: upair_ax_def)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	587	apply (blast intro: transM)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	588	done
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	589
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	590	lemma (in M_trivial) singleton_in_M_iff [iff]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	591	"M({a}) \<longleftrightarrow> M(a)"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	592	by (insert upair_in_M_iff [of a a], simp)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	593
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	594	lemma (in M_trivial) pair_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	595	"M(z) ==> pair(M,a,b,z) \<longleftrightarrow> z=<a,b>"
65449 c82e63b11b8b clarified main ZF.thy / ZFC.thy, and avoid name clash with global HOL/Main.thy; wenzelm parents: 61798 diff changeset	596	apply (simp add: pair_def Pair_def)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	597	apply (blast intro: transM)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	598	done
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	599
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	600	lemma (in M_trivial) pair_in_M_iff [iff]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	601	"M(<a,b>) \<longleftrightarrow> M(a) & M(b)"
65449 c82e63b11b8b clarified main ZF.thy / ZFC.thy, and avoid name clash with global HOL/Main.thy; wenzelm parents: 61798 diff changeset	602	by (simp add: Pair_def)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	603
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	604	lemma (in M_trivial) pair_components_in_M:
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	605	"[\| <x,y> \<in> A; M(A) \|] ==> M(x) & M(y)"
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	606	apply (simp add: Pair_def)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	607	apply (blast dest: transM)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	608	done
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	609
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	610	lemma (in M_trivial) cartprod_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	611	"[\| M(A); M(B); M(z) \|] ==> cartprod(M,A,B,z) \<longleftrightarrow> z = A*B"
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	612	apply (simp add: cartprod_def)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	613	apply (rule iffI)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	614	apply (blast intro!: equalityI intro: transM dest!: rspec)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	615	apply (blast dest: transM)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	616	done
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	617
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	618	subsubsection\<open>Absoluteness for Unions and Intersections\<close>
13418 7c0ba9dba978 tweaks, aiming towards relativization of "satisfies" paulson parents: 13397 diff changeset	619
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	620	lemma (in M_trivial) union_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	621	"[\| M(a); M(b); M(z) \|] ==> union(M,a,b,z) \<longleftrightarrow> z = a \<union> b"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	622	apply (simp add: union_def)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	623	apply (blast intro: transM)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	624	done
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	625
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	626	lemma (in M_trivial) inter_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	627	"[\| M(a); M(b); M(z) \|] ==> inter(M,a,b,z) \<longleftrightarrow> z = a \<inter> b"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	628	apply (simp add: inter_def)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	629	apply (blast intro: transM)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	630	done
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	631
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	632	lemma (in M_trivial) setdiff_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	633	"[\| M(a); M(b); M(z) \|] ==> setdiff(M,a,b,z) \<longleftrightarrow> z = a-b"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	634	apply (simp add: setdiff_def)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	635	apply (blast intro: transM)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	636	done
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	637
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	638	lemma (in M_trivial) Union_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	639	"[\| M(A); M(z) \|] ==> big_union(M,A,z) \<longleftrightarrow> z = \<Union>(A)"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	640	apply (simp add: big_union_def)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	641	apply (blast intro!: equalityI dest: transM)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	642	done
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	643
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	644	lemma (in M_trivial) Union_closed [intro,simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	645	"M(A) ==> M(\<Union>(A))"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	646	by (insert Union_ax, simp add: Union_ax_def)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	647
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	648	lemma (in M_trivial) Un_closed [intro,simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	649	"[\| M(A); M(B) \|] ==> M(A \<union> B)"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	650	by (simp only: Un_eq_Union, blast)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	651
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	652	lemma (in M_trivial) cons_closed [intro,simp]:
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	653	"[\| M(a); M(A) \|] ==> M(cons(a,A))"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	654	by (subst cons_eq [symmetric], blast)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	655
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	656	lemma (in M_trivial) cons_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	657	"[\| M(b); M(z) \|] ==> is_cons(M,a,b,z) \<longleftrightarrow> z = cons(a,b)"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	658	by (simp add: is_cons_def, blast intro: transM)
13306 6eebcddee32b more internalized formulas and separation proofs paulson parents: 13299 diff changeset	659
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	660	lemma (in M_trivial) successor_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	661	"[\| M(a); M(z) \|] ==> successor(M,a,z) \<longleftrightarrow> z = succ(a)"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	662	by (simp add: successor_def, blast)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	663
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	664	lemma (in M_trivial) succ_in_M_iff [iff]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	665	"M(succ(a)) \<longleftrightarrow> M(a)"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	666	apply (simp add: succ_def)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	667	apply (blast intro: transM)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	668	done
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	669
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	670	subsubsection\<open>Absoluteness for Separation and Replacement\<close>
13418 7c0ba9dba978 tweaks, aiming towards relativization of "satisfies" paulson parents: 13397 diff changeset	671
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	672	lemma (in M_trivial) separation_closed [intro,simp]:
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	673	"[\| separation(M,P); M(A) \|] ==> M(Collect(A,P))"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	674	apply (insert separation, simp add: separation_def)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	675	apply (drule rspec, assumption, clarify)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	676	apply (subgoal_tac "y = Collect(A,P)", blast)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	677	apply (blast dest: transM)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	678	done
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	679
13436 8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	680	lemma separation_iff:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	681	"separation(M,P) \<longleftrightarrow> (\<forall>z[M]. \<exists>y[M]. is_Collect(M,z,P,y))"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	682	by (simp add: separation_def is_Collect_def)
13436 8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	683
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	684	lemma (in M_trivial) Collect_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	685	"[\| M(A); M(z) \|] ==> is_Collect(M,A,P,z) \<longleftrightarrow> z = Collect(A,P)"
13436 8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	686	apply (simp add: is_Collect_def)
8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	687	apply (blast intro!: equalityI dest: transM)
8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	688	done
8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	689
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	690	text\<open>Probably the premise and conclusion are equivalent\<close>
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	691	lemma (in M_trivial) strong_replacementI [rule_format]:
13687 22dce9134953 simpler separation/replacement proofs paulson parents: 13634 diff changeset	692	"[\| \<forall>B[M]. separation(M, %u. \<exists>x[M]. x\<in>B & P(x,u)) \|]
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	693	==> strong_replacement(M,P)"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	694	apply (simp add: strong_replacement_def, clarify)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	695	apply (frule replacementD [OF replacement], assumption, clarify)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	696	apply (drule_tac x=A in rspec, clarify)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	697	apply (drule_tac z=Y in separationD, assumption, clarify)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	698	apply (rule_tac x=y in rexI, force, assumption)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	699	done
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	700
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	701	subsubsection\<open>The Operator @{term is_Replace}\<close>
13505 52a16cb7fefb Relativized right up to L satisfies V=L! paulson parents: 13436 diff changeset	702
52a16cb7fefb Relativized right up to L satisfies V=L! paulson parents: 13436 diff changeset	703
52a16cb7fefb Relativized right up to L satisfies V=L! paulson parents: 13436 diff changeset	704	lemma is_Replace_cong [cong]:
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	705	"[\| A=A';
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	706	!!x y. [\| M(x); M(y) \|] ==> P(x,y) \<longleftrightarrow> P'(x,y);
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	707	z=z' \|]
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	708	==> is_Replace(M, A, %x y. P(x,y), z) \<longleftrightarrow>
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	709	is_Replace(M, A', %x y. P'(x,y), z')"
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	710	by (simp add: is_Replace_def)
13505 52a16cb7fefb Relativized right up to L satisfies V=L! paulson parents: 13436 diff changeset	711
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	712	lemma (in M_trivial) univalent_Replace_iff:
13505 52a16cb7fefb Relativized right up to L satisfies V=L! paulson parents: 13436 diff changeset	713	"[\| M(A); univalent(M,A,P);
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	714	!!x y. [\| x\<in>A; P(x,y) \|] ==> M(y) \|]
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	715	==> u \<in> Replace(A,P) \<longleftrightarrow> (\<exists>x. x\<in>A & P(x,u))"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	716	apply (simp add: Replace_iff univalent_def)
13505 52a16cb7fefb Relativized right up to L satisfies V=L! paulson parents: 13436 diff changeset	717	apply (blast dest: transM)
52a16cb7fefb Relativized right up to L satisfies V=L! paulson parents: 13436 diff changeset	718	done
52a16cb7fefb Relativized right up to L satisfies V=L! paulson parents: 13436 diff changeset	719
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	720	(The last premise expresses that P takes M to M)
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	721	lemma (in M_trivial) strong_replacement_closed [intro,simp]:
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	722	"[\| strong_replacement(M,P); M(A); univalent(M,A,P);
13505 52a16cb7fefb Relativized right up to L satisfies V=L! paulson parents: 13436 diff changeset	723	!!x y. [\| x\<in>A; P(x,y) \|] ==> M(y) \|] ==> M(Replace(A,P))"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	724	apply (simp add: strong_replacement_def)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	725	apply (drule_tac x=A in rspec, safe)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	726	apply (subgoal_tac "Replace(A,P) = Y")
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	727	apply simp
13505 52a16cb7fefb Relativized right up to L satisfies V=L! paulson parents: 13436 diff changeset	728	apply (rule equality_iffI)
52a16cb7fefb Relativized right up to L satisfies V=L! paulson parents: 13436 diff changeset	729	apply (simp add: univalent_Replace_iff)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	730	apply (blast dest: transM)
13505 52a16cb7fefb Relativized right up to L satisfies V=L! paulson parents: 13436 diff changeset	731	done
52a16cb7fefb Relativized right up to L satisfies V=L! paulson parents: 13436 diff changeset	732
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	733	lemma (in M_trivial) Replace_abs:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	734	"[\| M(A); M(z); univalent(M,A,P);
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	735	!!x y. [\| x\<in>A; P(x,y) \|] ==> M(y) \|]
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	736	==> is_Replace(M,A,P,z) \<longleftrightarrow> z = Replace(A,P)"
13505 52a16cb7fefb Relativized right up to L satisfies V=L! paulson parents: 13436 diff changeset	737	apply (simp add: is_Replace_def)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	738	apply (rule iffI)
13702 c7cf8fa66534 Polishing. paulson parents: 13687 diff changeset	739	apply (rule equality_iffI)
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	740	apply (simp_all add: univalent_Replace_iff)
13702 c7cf8fa66534 Polishing. paulson parents: 13687 diff changeset	741	apply (blast dest: transM)+
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	742	done
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	743
13702 c7cf8fa66534 Polishing. paulson parents: 13687 diff changeset	744
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	745	(*The first premise can't simply be assumed as a schema.
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	746	It is essential to take care when asserting instances of Replacement.
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	747	Let K be a nonconstructible subset of nat and define
46953 2b6e55924af3 replacing ":" by "\<in>" paulson parents: 46823 diff changeset	748	f(x) = x if x \<in> K and f(x)=0 otherwise. Then RepFun(nat,f) = cons(0,K), a
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	749	nonconstructible set. So we cannot assume that M(X) implies M(RepFun(X,f))
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	750	even for f \<in> M -> M.
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	751	*)
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	752	lemma (in M_trivial) RepFun_closed:
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	753	"[\| strong_replacement(M, \<lambda>x y. y = f(x)); M(A); \<forall>x\<in>A. M(f(x)) \|]
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	754	==> M(RepFun(A,f))"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	755	apply (simp add: RepFun_def)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	756	done
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	757
13353 1800e7134d2e towards relativization of "iterates" and "wfrec" paulson parents: 13352 diff changeset	758	lemma Replace_conj_eq: "{y . x \<in> A, x\<in>A & y=f(x)} = {y . x\<in>A, y=f(x)}"
1800e7134d2e towards relativization of "iterates" and "wfrec" paulson parents: 13352 diff changeset	759	by simp
1800e7134d2e towards relativization of "iterates" and "wfrec" paulson parents: 13352 diff changeset	760
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	761	text\<open>Better than \<open>RepFun_closed\<close> when having the formula @{term "x\<in>A"}
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	762	makes relativization easier.\<close>
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	763	lemma (in M_trivial) RepFun_closed2:
13353 1800e7134d2e towards relativization of "iterates" and "wfrec" paulson parents: 13352 diff changeset	764	"[\| strong_replacement(M, \<lambda>x y. x\<in>A & y = f(x)); M(A); \<forall>x\<in>A. M(f(x)) \|]
1800e7134d2e towards relativization of "iterates" and "wfrec" paulson parents: 13352 diff changeset	765	==> M(RepFun(A, %x. f(x)))"
1800e7134d2e towards relativization of "iterates" and "wfrec" paulson parents: 13352 diff changeset	766	apply (simp add: RepFun_def)
1800e7134d2e towards relativization of "iterates" and "wfrec" paulson parents: 13352 diff changeset	767	apply (frule strong_replacement_closed, assumption)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	768	apply (auto dest: transM simp add: Replace_conj_eq univalent_def)
13353 1800e7134d2e towards relativization of "iterates" and "wfrec" paulson parents: 13352 diff changeset	769	done
1800e7134d2e towards relativization of "iterates" and "wfrec" paulson parents: 13352 diff changeset	770
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	771	subsubsection \<open>Absoluteness for @{term Lambda}\<close>
13418 7c0ba9dba978 tweaks, aiming towards relativization of "satisfies" paulson parents: 13397 diff changeset	772
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 16417 diff changeset	773	definition
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	774	is_lambda :: "[i=>o, i, [i,i]=>o, i] => o" where
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	775	"is_lambda(M, A, is_b, z) ==
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	776	\<forall>p[M]. p \<in> z \<longleftrightarrow>
13418 7c0ba9dba978 tweaks, aiming towards relativization of "satisfies" paulson parents: 13397 diff changeset	777	(\<exists>u[M]. \<exists>v[M]. u\<in>A & pair(M,u,v,p) & is_b(u,v))"
7c0ba9dba978 tweaks, aiming towards relativization of "satisfies" paulson parents: 13397 diff changeset	778
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	779	lemma (in M_trivial) lam_closed:
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	780	"[\| strong_replacement(M, \<lambda>x y. y = <x,b(x)>); M(A); \<forall>x\<in>A. M(b(x)) \|]
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	781	==> M(\<lambda>x\<in>A. b(x))"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	782	by (simp add: lam_def, blast intro: RepFun_closed dest: transM)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	783
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	784	text\<open>Better than \<open>lam_closed\<close>: has the formula @{term "x\<in>A"}\<close>
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	785	lemma (in M_trivial) lam_closed2:
13418 7c0ba9dba978 tweaks, aiming towards relativization of "satisfies" paulson parents: 13397 diff changeset	786	"[\|strong_replacement(M, \<lambda>x y. x\<in>A & y = \<langle>x, b(x)\<rangle>);
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	787	M(A); \<forall>m[M]. m\<in>A \<longrightarrow> M(b(m))\|] ==> M(Lambda(A,b))"
13418 7c0ba9dba978 tweaks, aiming towards relativization of "satisfies" paulson parents: 13397 diff changeset	788	apply (simp add: lam_def)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	789	apply (blast intro: RepFun_closed2 dest: transM)
13418 7c0ba9dba978 tweaks, aiming towards relativization of "satisfies" paulson parents: 13397 diff changeset	790	done
7c0ba9dba978 tweaks, aiming towards relativization of "satisfies" paulson parents: 13397 diff changeset	791
13702 c7cf8fa66534 Polishing. paulson parents: 13687 diff changeset	792	lemma (in M_trivial) lambda_abs2:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	793	"[\| Relation1(M,A,is_b,b); M(A); \<forall>m[M]. m\<in>A \<longrightarrow> M(b(m)); M(z) \|]
57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	794	==> is_lambda(M,A,is_b,z) \<longleftrightarrow> z = Lambda(A,b)"
13634 99a593b49b04 Re-organization of Constructible theories paulson parents: 13628 diff changeset	795	apply (simp add: Relation1_def is_lambda_def)
13418 7c0ba9dba978 tweaks, aiming towards relativization of "satisfies" paulson parents: 13397 diff changeset	796	apply (rule iffI)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	797	prefer 2 apply (simp add: lam_def)
13702 c7cf8fa66534 Polishing. paulson parents: 13687 diff changeset	798	apply (rule equality_iffI)
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	799	apply (simp add: lam_def)
57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	800	apply (rule iffI)
57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	801	apply (blast dest: transM)
57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	802	apply (auto simp add: transM [of _ A])
13418 7c0ba9dba978 tweaks, aiming towards relativization of "satisfies" paulson parents: 13397 diff changeset	803	done
7c0ba9dba978 tweaks, aiming towards relativization of "satisfies" paulson parents: 13397 diff changeset	804
13423 7ec771711c09 More lemmas, working towards relativization of "satisfies" paulson parents: 13418 diff changeset	805	lemma is_lambda_cong [cong]:
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	806	"[\| A=A'; z=z';
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	807	!!x y. [\| x\<in>A; M(x); M(y) \|] ==> is_b(x,y) \<longleftrightarrow> is_b'(x,y) \|]
57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	808	==> is_lambda(M, A, %x y. is_b(x,y), z) \<longleftrightarrow>
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	809	is_lambda(M, A', %x y. is_b'(x,y), z')"
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	810	by (simp add: is_lambda_def)
13423 7ec771711c09 More lemmas, working towards relativization of "satisfies" paulson parents: 13418 diff changeset	811
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	812	lemma (in M_trivial) image_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	813	"[\| M(r); M(A); M(z) \|] ==> image(M,r,A,z) \<longleftrightarrow> z = r``A"
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	814	apply (simp add: image_def)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	815	apply (rule iffI)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	816	apply (blast intro!: equalityI dest: transM, blast)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	817	done
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	818
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	819	text\<open>What about \<open>Pow_abs\<close>? Powerset is NOT absolute!
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	820	This result is one direction of absoluteness.\<close>
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	821
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	822	lemma (in M_trivial) powerset_Pow:
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	823	"powerset(M, x, Pow(x))"
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	824	by (simp add: powerset_def)
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	825
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	826	text\<open>But we can't prove that the powerset in \<open>M\<close> includes the
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	827	real powerset.\<close>
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	828	lemma (in M_trivial) powerset_imp_subset_Pow:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	829	"[\| powerset(M,x,y); M(y) \|] ==> y \<subseteq> Pow(x)"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	830	apply (simp add: powerset_def)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	831	apply (blast dest: transM)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	832	done
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	833
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	834	subsubsection\<open>Absoluteness for the Natural Numbers\<close>
13418 7c0ba9dba978 tweaks, aiming towards relativization of "satisfies" paulson parents: 13397 diff changeset	835
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	836	lemma (in M_trivial) nat_into_M [intro]:
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	837	"n \<in> nat ==> M(n)"
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	838	by (induct n rule: nat_induct, simp_all)
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	839
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	840	lemma (in M_trivial) nat_case_closed [intro,simp]:
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	841	"[\|M(k); M(a); \<forall>m[M]. M(b(m))\|] ==> M(nat_case(a,b,k))"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	842	apply (case_tac "k=0", simp)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	843	apply (case_tac "\<exists>m. k = succ(m)", force)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	844	apply (simp add: nat_case_def)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	845	done
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	846
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	847	lemma (in M_trivial) quasinat_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	848	"M(z) ==> is_quasinat(M,z) \<longleftrightarrow> quasinat(z)"
13350 626b79677dfa tidied paulson parents: 13348 diff changeset	849	by (auto simp add: is_quasinat_def quasinat_def)
626b79677dfa tidied paulson parents: 13348 diff changeset	850
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	851	lemma (in M_trivial) nat_case_abs [simp]:
13634 99a593b49b04 Re-organization of Constructible theories paulson parents: 13628 diff changeset	852	"[\| relation1(M,is_b,b); M(k); M(z) \|]
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	853	==> is_nat_case(M,a,is_b,k,z) \<longleftrightarrow> z = nat_case(a,b,k)"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	854	apply (case_tac "quasinat(k)")
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	855	prefer 2
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	856	apply (simp add: is_nat_case_def non_nat_case)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	857	apply (force simp add: quasinat_def)
13350 626b79677dfa tidied paulson parents: 13348 diff changeset	858	apply (simp add: quasinat_def is_nat_case_def)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	859	apply (elim disjE exE)
13634 99a593b49b04 Re-organization of Constructible theories paulson parents: 13628 diff changeset	860	apply (simp_all add: relation1_def)
13350 626b79677dfa tidied paulson parents: 13348 diff changeset	861	done
626b79677dfa tidied paulson parents: 13348 diff changeset	862
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	863	(*NOT for the simplifier. The assumption M(z') is apparently necessary, but
13363 c26eeb000470 instantiation of locales M_trancl and M_wfrank; paulson parents: 13353 diff changeset	864	causes the error "Failed congruence proof!" It may be better to replace
c26eeb000470 instantiation of locales M_trancl and M_wfrank; paulson parents: 13353 diff changeset	865	is_nat_case by nat_case before attempting congruence reasoning.*)
13434 78b93a667c01 better sats rules for higher-order operators paulson parents: 13428 diff changeset	866	lemma is_nat_case_cong:
13352 3cd767f8d78b new definitions of fun_apply and M_is_recfun paulson parents: 13350 diff changeset	867	"[\| a = a'; k = k'; z = z'; M(z');
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	868	!!x y. [\| M(x); M(y) \|] ==> is_b(x,y) \<longleftrightarrow> is_b'(x,y) \|]
57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	869	==> is_nat_case(M, a, is_b, k, z) \<longleftrightarrow> is_nat_case(M, a', is_b', k', z')"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	870	by (simp add: is_nat_case_def)
13352 3cd767f8d78b new definitions of fun_apply and M_is_recfun paulson parents: 13350 diff changeset	871
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	872
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	873	subsection\<open>Absoluteness for Ordinals\<close>
240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	874	text\<open>These results constitute Theorem IV 5.1 of Kunen (page 126).\<close>
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	875
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	876	lemma (in M_trivial) lt_closed:
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	877	"[\| j<i; M(i) \|] ==> M(j)"
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	878	by (blast dest: ltD intro: transM)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	879
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	880	lemma (in M_trivial) transitive_set_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	881	"M(a) ==> transitive_set(M,a) \<longleftrightarrow> Transset(a)"
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	882	by (simp add: transitive_set_def Transset_def)
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	883
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	884	lemma (in M_trivial) ordinal_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	885	"M(a) ==> ordinal(M,a) \<longleftrightarrow> Ord(a)"
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	886	by (simp add: ordinal_def Ord_def)
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	887
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	888	lemma (in M_trivial) limit_ordinal_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	889	"M(a) ==> limit_ordinal(M,a) \<longleftrightarrow> Limit(a)"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	890	apply (unfold Limit_def limit_ordinal_def)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	891	apply (simp add: Ord_0_lt_iff)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	892	apply (simp add: lt_def, blast)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	893	done
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	894
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	895	lemma (in M_trivial) successor_ordinal_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	896	"M(a) ==> successor_ordinal(M,a) \<longleftrightarrow> Ord(a) & (\<exists>b[M]. a = succ(b))"
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	897	apply (simp add: successor_ordinal_def, safe)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	898	apply (drule Ord_cases_disj, auto)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	899	done
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	900
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	901	lemma finite_Ord_is_nat:
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	902	"[\| Ord(a); ~ Limit(a); \<forall>x\<in>a. ~ Limit(x) \|] ==> a \<in> nat"
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	903	by (induct a rule: trans_induct3, simp_all)
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	904
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	905	lemma (in M_trivial) finite_ordinal_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	906	"M(a) ==> finite_ordinal(M,a) \<longleftrightarrow> a \<in> nat"
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	907	apply (simp add: finite_ordinal_def)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	908	apply (blast intro: finite_Ord_is_nat intro: nat_into_Ord
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	909	dest: Ord_trans naturals_not_limit)
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	910	done
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	911
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	912	lemma Limit_non_Limit_implies_nat:
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	913	"[\| Limit(a); \<forall>x\<in>a. ~ Limit(x) \|] ==> a = nat"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	914	apply (rule le_anti_sym)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	915	apply (rule all_lt_imp_le, blast, blast intro: Limit_is_Ord)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	916	apply (simp add: lt_def)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	917	apply (blast intro: Ord_in_Ord Ord_trans finite_Ord_is_nat)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	918	apply (erule nat_le_Limit)
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	919	done
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	920
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	921	lemma (in M_trivial) omega_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	922	"M(a) ==> omega(M,a) \<longleftrightarrow> a = nat"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	923	apply (simp add: omega_def)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	924	apply (blast intro: Limit_non_Limit_implies_nat dest: naturals_not_limit)
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	925	done
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	926
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	927	lemma (in M_trivial) number1_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	928	"M(a) ==> number1(M,a) \<longleftrightarrow> a = 1"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	929	by (simp add: number1_def)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	930
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	931	lemma (in M_trivial) number2_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	932	"M(a) ==> number2(M,a) \<longleftrightarrow> a = succ(1)"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	933	by (simp add: number2_def)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	934
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	935	lemma (in M_trivial) number3_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	936	"M(a) ==> number3(M,a) \<longleftrightarrow> a = succ(succ(1))"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	937	by (simp add: number3_def)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	938
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	939	text\<open>Kunen continued to 20...\<close>
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	940
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	941	(*Could not get this to work. The \<lambda>x\<in>nat is essential because everything
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	942	but the recursion variable must stay unchanged. But then the recursion
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	943	equations only hold for x\<in>nat (or in some other set) and not for the
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	944	whole of the class M.
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	945	consts
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	946	natnumber_aux :: "[i=>o,i] => i"
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	947
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	948	primrec
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	949	"natnumber_aux(M,0) = (\<lambda>x\<in>nat. if empty(M,x) then 1 else 0)"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	950	"natnumber_aux(M,succ(n)) =
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 22710 diff changeset	951	(\<lambda>x\<in>nat. if (\<exists>y[M]. natnumber_aux(M,n)`y=1 & successor(M,y,x))
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 22710 diff changeset	952	then 1 else 0)"
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	953
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 16417 diff changeset	954	definition
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	955	natnumber :: "[i=>o,i,i] => o"
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	956	"natnumber(M,n,x) == natnumber_aux(M,n)`x = 1"
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	957
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	958	lemma (in M_trivial) [simp]:
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	959	"natnumber(M,0,x) == x=0"
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	960	*)
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	961
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	962	subsection\<open>Some instances of separation and strong replacement\<close>
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	963
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	964	locale M_basic = M_trivial +
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	965	assumes Inter_separation:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	966	"M(A) ==> separation(M, \<lambda>x. \<forall>y[M]. y\<in>A \<longrightarrow> x\<in>y)"
13436 8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	967	and Diff_separation:
8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	968	"M(B) ==> separation(M, \<lambda>x. x \<notin> B)"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	969	and cartprod_separation:
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	970	"[\| M(A); M(B) \|]
13298 b4f370679c65 Constructible: some separation axioms paulson parents: 13290 diff changeset	971	==> separation(M, \<lambda>z. \<exists>x[M]. x\<in>A & (\<exists>y[M]. y\<in>B & pair(M,x,y,z)))"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	972	and image_separation:
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	973	"[\| M(A); M(r) \|]
13268 240509babf00 more use of relativized quantifiers paulson parents: 13254 diff changeset	974	==> separation(M, \<lambda>y. \<exists>p[M]. p\<in>r & (\<exists>x[M]. x\<in>A & pair(M,x,y,p)))"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	975	and converse_separation:
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	976	"M(r) ==> separation(M,
13298 b4f370679c65 Constructible: some separation axioms paulson parents: 13290 diff changeset	977	\<lambda>z. \<exists>p[M]. p\<in>r & (\<exists>x[M]. \<exists>y[M]. pair(M,x,y,p) & pair(M,y,x,z)))"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	978	and restrict_separation:
13268 240509babf00 more use of relativized quantifiers paulson parents: 13254 diff changeset	979	"M(A) ==> separation(M, \<lambda>z. \<exists>x[M]. x\<in>A & (\<exists>y[M]. pair(M,x,y,z)))"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	980	and comp_separation:
45be08fbdcff new theory of inner models paulson parents: diff changeset	981	"[\| M(r); M(s) \|]
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	982	==> separation(M, \<lambda>xz. \<exists>x[M]. \<exists>y[M]. \<exists>z[M]. \<exists>xy[M]. \<exists>yz[M].
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 22710 diff changeset	983	pair(M,x,z,xz) & pair(M,x,y,xy) & pair(M,y,z,yz) &
13268 240509babf00 more use of relativized quantifiers paulson parents: 13254 diff changeset	984	xy\<in>s & yz\<in>r)"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	985	and pred_separation:
13298 b4f370679c65 Constructible: some separation axioms paulson parents: 13290 diff changeset	986	"[\| M(r); M(x) \|] ==> separation(M, \<lambda>y. \<exists>p[M]. p\<in>r & pair(M,y,x,p))"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	987	and Memrel_separation:
13298 b4f370679c65 Constructible: some separation axioms paulson parents: 13290 diff changeset	988	"separation(M, \<lambda>z. \<exists>x[M]. \<exists>y[M]. pair(M,x,y,z) & x \<in> y)"
13268 240509babf00 more use of relativized quantifiers paulson parents: 13254 diff changeset	989	and funspace_succ_replacement:
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	990	"M(n) ==>
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	991	strong_replacement(M, \<lambda>p z. \<exists>f[M]. \<exists>b[M]. \<exists>nb[M]. \<exists>cnbf[M].
13306 6eebcddee32b more internalized formulas and separation proofs paulson parents: 13299 diff changeset	992	pair(M,f,b,p) & pair(M,n,b,nb) & is_cons(M,nb,f,cnbf) &
6eebcddee32b more internalized formulas and separation proofs paulson parents: 13299 diff changeset	993	upair(M,cnbf,cnbf,z))"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	994	and is_recfun_separation:
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	995	\<comment>\<open>for well-founded recursion: used to prove \<open>is_recfun_equal\<close>\<close>
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	996	"[\| M(r); M(f); M(g); M(a); M(b) \|]
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	997	==> separation(M,
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	998	\<lambda>x. \<exists>xa[M]. \<exists>xb[M].
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	999	pair(M,x,a,xa) & xa \<in> r & pair(M,x,b,xb) & xb \<in> r &
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1000	(\<exists>fx[M]. \<exists>gx[M]. fun_apply(M,f,x,fx) & fun_apply(M,g,x,gx) &
13319 23de7b3af453 More Separation proofs paulson parents: 13316 diff changeset	1001	fx \<noteq> gx))"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1002
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1003	lemma (in M_basic) cartprod_iff_lemma:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1004	"[\| M(C); \<forall>u[M]. u \<in> C \<longleftrightarrow> (\<exists>x\<in>A. \<exists>y\<in>B. u = {{x}, {x,y}});
13254 5146ccaedf42 class quantifiers (some) paulson parents: 13251 diff changeset	1005	powerset(M, A \<union> B, p1); powerset(M, p1, p2); M(p2) \|]
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1006	==> C = {u \<in> p2 . \<exists>x\<in>A. \<exists>y\<in>B. u = {{x}, {x,y}}}"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1007	apply (simp add: powerset_def)
13254 5146ccaedf42 class quantifiers (some) paulson parents: 13251 diff changeset	1008	apply (rule equalityI, clarify, simp)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1009	apply (frule transM, assumption)
13611 2edf034c902a Adapted to new simplifier. berghofe parents: 13564 diff changeset	1010	apply (frule transM, assumption, simp (no_asm_simp))
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1011	apply blast
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1012	apply clarify
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1013	apply (frule transM, assumption, force)
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1014	done
45be08fbdcff new theory of inner models paulson parents: diff changeset	1015
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1016	lemma (in M_basic) cartprod_iff:
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1017	"[\| M(A); M(B); M(C) \|]
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1018	==> cartprod(M,A,B,C) \<longleftrightarrow>
57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1019	(\<exists>p1[M]. \<exists>p2[M]. powerset(M,A \<union> B,p1) & powerset(M,p1,p2) &
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1020	C = {z \<in> p2. \<exists>x\<in>A. \<exists>y\<in>B. z = <x,y>})"
45be08fbdcff new theory of inner models paulson parents: diff changeset	1021	apply (simp add: Pair_def cartprod_def, safe)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1022	defer 1
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1023	apply (simp add: powerset_def)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1024	apply blast
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	1025	txt\<open>Final, difficult case: the left-to-right direction of the theorem.\<close>
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1026	apply (insert power_ax, simp add: power_ax_def)
59788 6f7b6adac439 prefer local fixes; wenzelm parents: 58871 diff changeset	1027	apply (frule_tac x="A \<union> B" and P="\<lambda>x. rex(M,Q(x))" for Q in rspec)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1028	apply (blast, clarify)
59788 6f7b6adac439 prefer local fixes; wenzelm parents: 58871 diff changeset	1029	apply (drule_tac x=z and P="\<lambda>x. rex(M,Q(x))" for Q in rspec)
13299 3a932abf97e8 More use of relativized quantifiers paulson parents: 13298 diff changeset	1030	apply assumption
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1031	apply (blast intro: cartprod_iff_lemma)
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1032	done
45be08fbdcff new theory of inner models paulson parents: diff changeset	1033
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1034	lemma (in M_basic) cartprod_closed_lemma:
13299 3a932abf97e8 More use of relativized quantifiers paulson parents: 13298 diff changeset	1035	"[\| M(A); M(B) \|] ==> \<exists>C[M]. cartprod(M,A,B,C)"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1036	apply (simp del: cartprod_abs add: cartprod_iff)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1037	apply (insert power_ax, simp add: power_ax_def)
59788 6f7b6adac439 prefer local fixes; wenzelm parents: 58871 diff changeset	1038	apply (frule_tac x="A \<union> B" and P="\<lambda>x. rex(M,Q(x))" for Q in rspec)
13299 3a932abf97e8 More use of relativized quantifiers paulson parents: 13298 diff changeset	1039	apply (blast, clarify)
59788 6f7b6adac439 prefer local fixes; wenzelm parents: 58871 diff changeset	1040	apply (drule_tac x=z and P="\<lambda>x. rex(M,Q(x))" for Q in rspec, auto)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1041	apply (intro rexI conjI, simp+)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1042	apply (insert cartprod_separation [of A B], simp)
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1043	done
45be08fbdcff new theory of inner models paulson parents: diff changeset	1044
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	1045	text\<open>All the lemmas above are necessary because Powerset is not absolute.
240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	1046	I should have used Replacement instead!\<close>
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1047	lemma (in M_basic) cartprod_closed [intro,simp]:
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1048	"[\| M(A); M(B) \|] ==> M(A*B)"
45be08fbdcff new theory of inner models paulson parents: diff changeset	1049	by (frule cartprod_closed_lemma, assumption, force)
45be08fbdcff new theory of inner models paulson parents: diff changeset	1050
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1051	lemma (in M_basic) sum_closed [intro,simp]:
13268 240509babf00 more use of relativized quantifiers paulson parents: 13254 diff changeset	1052	"[\| M(A); M(B) \|] ==> M(A+B)"
240509babf00 more use of relativized quantifiers paulson parents: 13254 diff changeset	1053	by (simp add: sum_def)
240509babf00 more use of relativized quantifiers paulson parents: 13254 diff changeset	1054
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1055	lemma (in M_basic) sum_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1056	"[\| M(A); M(B); M(Z) \|] ==> is_sum(M,A,B,Z) \<longleftrightarrow> (Z = A+B)"
13350 626b79677dfa tidied paulson parents: 13348 diff changeset	1057	by (simp add: is_sum_def sum_def singleton_0 nat_into_M)
626b79677dfa tidied paulson parents: 13348 diff changeset	1058
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1059	lemma (in M_trivial) Inl_in_M_iff [iff]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1060	"M(Inl(a)) \<longleftrightarrow> M(a)"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1061	by (simp add: Inl_def)
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1062
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1063	lemma (in M_trivial) Inl_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1064	"M(Z) ==> is_Inl(M,a,Z) \<longleftrightarrow> (Z = Inl(a))"
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1065	by (simp add: is_Inl_def Inl_def)
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1066
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1067	lemma (in M_trivial) Inr_in_M_iff [iff]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1068	"M(Inr(a)) \<longleftrightarrow> M(a)"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1069	by (simp add: Inr_def)
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1070
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1071	lemma (in M_trivial) Inr_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1072	"M(Z) ==> is_Inr(M,a,Z) \<longleftrightarrow> (Z = Inr(a))"
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1073	by (simp add: is_Inr_def Inr_def)
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1074
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	1075
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	1076	subsubsection \<open>converse of a relation\<close>
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	1077
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1078	lemma (in M_basic) M_converse_iff:
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1079	"M(r) ==>
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1080	converse(r) =
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1081	{z \<in> \<Union>(\<Union>(r)) * \<Union>(\<Union>(r)).
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	1082	\<exists>p\<in>r. \<exists>x[M]. \<exists>y[M]. p = \<langle>x,y\<rangle> & z = \<langle>y,x\<rangle>}"
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	1083	apply (rule equalityI)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1084	prefer 2 apply (blast dest: transM, clarify, simp)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1085	apply (simp add: Pair_def)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1086	apply (blast dest: transM)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	1087	done
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	1088
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1089	lemma (in M_basic) converse_closed [intro,simp]:
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	1090	"M(r) ==> M(converse(r))"
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	1091	apply (simp add: M_converse_iff)
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	1092	apply (insert converse_separation [of r], simp)
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	1093	done
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	1094
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1095	lemma (in M_basic) converse_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1096	"[\| M(r); M(z) \|] ==> is_converse(M,r,z) \<longleftrightarrow> z = converse(r)"
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	1097	apply (simp add: is_converse_def)
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	1098	apply (rule iffI)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1099	prefer 2 apply blast
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	1100	apply (rule M_equalityI)
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	1101	apply simp
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	1102	apply (blast dest: transM)+
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	1103	done
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	1104
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	1105
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	1106	subsubsection \<open>image, preimage, domain, range\<close>
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	1107
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1108	lemma (in M_basic) image_closed [intro,simp]:
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1109	"[\| M(A); M(r) \|] ==> M(r``A)"
45be08fbdcff new theory of inner models paulson parents: diff changeset	1110	apply (simp add: image_iff_Collect)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1111	apply (insert image_separation [of A r], simp)
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1112	done
45be08fbdcff new theory of inner models paulson parents: diff changeset	1113
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1114	lemma (in M_basic) vimage_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1115	"[\| M(r); M(A); M(z) \|] ==> pre_image(M,r,A,z) \<longleftrightarrow> z = r-``A"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1116	apply (simp add: pre_image_def)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1117	apply (rule iffI)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1118	apply (blast intro!: equalityI dest: transM, blast)
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1119	done
45be08fbdcff new theory of inner models paulson parents: diff changeset	1120
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1121	lemma (in M_basic) vimage_closed [intro,simp]:
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1122	"[\| M(A); M(r) \|] ==> M(r-``A)"
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	1123	by (simp add: vimage_def)
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	1124
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	1125
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	1126	subsubsection\<open>Domain, range and field\<close>
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1127
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1128	lemma (in M_basic) domain_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1129	"[\| M(r); M(z) \|] ==> is_domain(M,r,z) \<longleftrightarrow> z = domain(r)"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1130	apply (simp add: is_domain_def)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1131	apply (blast intro!: equalityI dest: transM)
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1132	done
45be08fbdcff new theory of inner models paulson parents: diff changeset	1133
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1134	lemma (in M_basic) domain_closed [intro,simp]:
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1135	"M(r) ==> M(domain(r))"
45be08fbdcff new theory of inner models paulson parents: diff changeset	1136	apply (simp add: domain_eq_vimage)
45be08fbdcff new theory of inner models paulson parents: diff changeset	1137	done
45be08fbdcff new theory of inner models paulson parents: diff changeset	1138
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1139	lemma (in M_basic) range_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1140	"[\| M(r); M(z) \|] ==> is_range(M,r,z) \<longleftrightarrow> z = range(r)"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1141	apply (simp add: is_range_def)
45be08fbdcff new theory of inner models paulson parents: diff changeset	1142	apply (blast intro!: equalityI dest: transM)
45be08fbdcff new theory of inner models paulson parents: diff changeset	1143	done
45be08fbdcff new theory of inner models paulson parents: diff changeset	1144
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1145	lemma (in M_basic) range_closed [intro,simp]:
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1146	"M(r) ==> M(range(r))"
45be08fbdcff new theory of inner models paulson parents: diff changeset	1147	apply (simp add: range_eq_image)
45be08fbdcff new theory of inner models paulson parents: diff changeset	1148	done
45be08fbdcff new theory of inner models paulson parents: diff changeset	1149
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1150	lemma (in M_basic) field_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1151	"[\| M(r); M(z) \|] ==> is_field(M,r,z) \<longleftrightarrow> z = field(r)"
13245 714f7a423a15 development and tweaks paulson parents: 13223 diff changeset	1152	by (simp add: domain_closed range_closed is_field_def field_def)
714f7a423a15 development and tweaks paulson parents: 13223 diff changeset	1153
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1154	lemma (in M_basic) field_closed [intro,simp]:
13245 714f7a423a15 development and tweaks paulson parents: 13223 diff changeset	1155	"M(r) ==> M(field(r))"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1156	by (simp add: domain_closed range_closed Un_closed field_def)
13245 714f7a423a15 development and tweaks paulson parents: 13223 diff changeset	1157
714f7a423a15 development and tweaks paulson parents: 13223 diff changeset	1158
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	1159	subsubsection\<open>Relations, functions and application\<close>
13254 5146ccaedf42 class quantifiers (some) paulson parents: 13251 diff changeset	1160
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1161	lemma (in M_basic) relation_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1162	"M(r) ==> is_relation(M,r) \<longleftrightarrow> relation(r)"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1163	apply (simp add: is_relation_def relation_def)
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1164	apply (blast dest!: bspec dest: pair_components_in_M)+
45be08fbdcff new theory of inner models paulson parents: diff changeset	1165	done
45be08fbdcff new theory of inner models paulson parents: diff changeset	1166
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1167	lemma (in M_basic) function_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1168	"M(r) ==> is_function(M,r) \<longleftrightarrow> function(r)"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1169	apply (simp add: is_function_def function_def, safe)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1170	apply (frule transM, assumption)
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1171	apply (blast dest: pair_components_in_M)+
45be08fbdcff new theory of inner models paulson parents: diff changeset	1172	done
45be08fbdcff new theory of inner models paulson parents: diff changeset	1173
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1174	lemma (in M_basic) apply_closed [intro,simp]:
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1175	"[\|M(f); M(a)\|] ==> M(f`a)"
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	1176	by (simp add: apply_def)
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1177
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1178	lemma (in M_basic) apply_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1179	"[\| M(f); M(x); M(y) \|] ==> fun_apply(M,f,x,y) \<longleftrightarrow> f`x = y"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1180	apply (simp add: fun_apply_def apply_def, blast)
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1181	done
45be08fbdcff new theory of inner models paulson parents: diff changeset	1182
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1183	lemma (in M_basic) typed_function_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1184	"[\| M(A); M(f) \|] ==> typed_function(M,A,B,f) \<longleftrightarrow> f \<in> A -> B"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1185	apply (auto simp add: typed_function_def relation_def Pi_iff)
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1186	apply (blast dest: pair_components_in_M)+
45be08fbdcff new theory of inner models paulson parents: diff changeset	1187	done
45be08fbdcff new theory of inner models paulson parents: diff changeset	1188
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1189	lemma (in M_basic) injection_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1190	"[\| M(A); M(f) \|] ==> injection(M,A,B,f) \<longleftrightarrow> f \<in> inj(A,B)"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1191	apply (simp add: injection_def apply_iff inj_def apply_closed)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1192	apply (blast dest: transM [of _ A])
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1193	done
45be08fbdcff new theory of inner models paulson parents: diff changeset	1194
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1195	lemma (in M_basic) surjection_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1196	"[\| M(A); M(B); M(f) \|] ==> surjection(M,A,B,f) \<longleftrightarrow> f \<in> surj(A,B)"
13352 3cd767f8d78b new definitions of fun_apply and M_is_recfun paulson parents: 13350 diff changeset	1197	by (simp add: surjection_def surj_def)
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1198
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1199	lemma (in M_basic) bijection_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1200	"[\| M(A); M(B); M(f) \|] ==> bijection(M,A,B,f) \<longleftrightarrow> f \<in> bij(A,B)"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1201	by (simp add: bijection_def bij_def)
45be08fbdcff new theory of inner models paulson parents: diff changeset	1202
45be08fbdcff new theory of inner models paulson parents: diff changeset	1203
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	1204	subsubsection\<open>Composition of relations\<close>
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1205
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1206	lemma (in M_basic) M_comp_iff:
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1207	"[\| M(r); M(s) \|]
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1208	==> r O s =
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1209	{xz \<in> domain(s) * range(r).
13268 240509babf00 more use of relativized quantifiers paulson parents: 13254 diff changeset	1210	\<exists>x[M]. \<exists>y[M]. \<exists>z[M]. xz = \<langle>x,z\<rangle> & \<langle>x,y\<rangle> \<in> s & \<langle>y,z\<rangle> \<in> r}"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1211	apply (simp add: comp_def)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1212	apply (rule equalityI)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1213	apply clarify
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1214	apply simp
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1215	apply (blast dest: transM)+
45be08fbdcff new theory of inner models paulson parents: diff changeset	1216	done
45be08fbdcff new theory of inner models paulson parents: diff changeset	1217
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1218	lemma (in M_basic) comp_closed [intro,simp]:
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1219	"[\| M(r); M(s) \|] ==> M(r O s)"
45be08fbdcff new theory of inner models paulson parents: diff changeset	1220	apply (simp add: M_comp_iff)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1221	apply (insert comp_separation [of r s], simp)
13245 714f7a423a15 development and tweaks paulson parents: 13223 diff changeset	1222	done
714f7a423a15 development and tweaks paulson parents: 13223 diff changeset	1223
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1224	lemma (in M_basic) composition_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1225	"[\| M(r); M(s); M(t) \|] ==> composition(M,r,s,t) \<longleftrightarrow> t = r O s"
13247 e3c289f0724b towards absoluteness of wfrec-defined functions paulson parents: 13245 diff changeset	1226	apply safe
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	1227	txt\<open>Proving @{term "composition(M, r, s, r O s)"}\<close>
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1228	prefer 2
13245 714f7a423a15 development and tweaks paulson parents: 13223 diff changeset	1229	apply (simp add: composition_def comp_def)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1230	apply (blast dest: transM)
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	1231	txt\<open>Opposite implication\<close>
13245 714f7a423a15 development and tweaks paulson parents: 13223 diff changeset	1232	apply (rule M_equalityI)
714f7a423a15 development and tweaks paulson parents: 13223 diff changeset	1233	apply (simp add: composition_def comp_def)
714f7a423a15 development and tweaks paulson parents: 13223 diff changeset	1234	apply (blast del: allE dest: transM)+
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1235	done
45be08fbdcff new theory of inner models paulson parents: diff changeset	1236
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	1237	text\<open>no longer needed\<close>
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1238	lemma (in M_basic) restriction_is_function:
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1239	"[\| restriction(M,f,A,z); function(f); M(f); M(A); M(z) \|]
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	1240	==> function(z)"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1241	apply (simp add: restriction_def ball_iff_equiv)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1242	apply (unfold function_def, blast)
13269 3ba9be497c33 Tidying and introduction of various new theorems paulson parents: 13268 diff changeset	1243	done
3ba9be497c33 Tidying and introduction of various new theorems paulson parents: 13268 diff changeset	1244
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1245	lemma (in M_basic) restriction_abs [simp]:
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1246	"[\| M(f); M(A); M(z) \|]
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1247	==> restriction(M,f,A,z) \<longleftrightarrow> z = restrict(f,A)"
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	1248	apply (simp add: ball_iff_equiv restriction_def restrict_def)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1249	apply (blast intro!: equalityI dest: transM)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	1250	done
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	1251
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1252
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1253	lemma (in M_basic) M_restrict_iff:
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	1254	"M(r) ==> restrict(r,A) = {z \<in> r . \<exists>x\<in>A. \<exists>y[M]. z = \<langle>x, y\<rangle>}"
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	1255	by (simp add: restrict_def, blast dest: transM)
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	1256
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1257	lemma (in M_basic) restrict_closed [intro,simp]:
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	1258	"[\| M(A); M(r) \|] ==> M(restrict(r,A))"
28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	1259	apply (simp add: M_restrict_iff)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1260	apply (insert restrict_separation [of A], simp)
13290 28ce81eff3de separation of M_axioms into M_triv_axioms and M_axioms paulson parents: 13269 diff changeset	1261	done
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1262
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1263	lemma (in M_basic) Inter_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1264	"[\| M(A); M(z) \|] ==> big_inter(M,A,z) \<longleftrightarrow> z = \<Inter>(A)"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1265	apply (simp add: big_inter_def Inter_def)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1266	apply (blast intro!: equalityI dest: transM)
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1267	done
45be08fbdcff new theory of inner models paulson parents: diff changeset	1268
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1269	lemma (in M_basic) Inter_closed [intro,simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1270	"M(A) ==> M(\<Inter>(A))"
13245 714f7a423a15 development and tweaks paulson parents: 13223 diff changeset	1271	by (insert Inter_separation, simp add: Inter_def)
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1272
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1273	lemma (in M_basic) Int_closed [intro,simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1274	"[\| M(A); M(B) \|] ==> M(A \<inter> B)"
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1275	apply (subgoal_tac "M({A,B})")
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1276	apply (frule Inter_closed, force+)
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1277	done
45be08fbdcff new theory of inner models paulson parents: diff changeset	1278
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1279	lemma (in M_basic) Diff_closed [intro,simp]:
13436 8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	1280	"[\|M(A); M(B)\|] ==> M(A-B)"
8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	1281	by (insert Diff_separation, simp add: Diff_def)
8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	1282
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	1283	subsubsection\<open>Some Facts About Separation Axioms\<close>
13436 8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	1284
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1285	lemma (in M_basic) separation_conj:
13436 8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	1286	"[\|separation(M,P); separation(M,Q)\|] ==> separation(M, \<lambda>z. P(z) & Q(z))"
8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	1287	by (simp del: separation_closed
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1288	add: separation_iff Collect_Int_Collect_eq [symmetric])
13436 8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	1289
8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	1290	(???equalities)
8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	1291	lemma Collect_Un_Collect_eq:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1292	"Collect(A,P) \<union> Collect(A,Q) = Collect(A, %x. P(x) \| Q(x))"
13436 8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	1293	by blast
8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	1294
8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	1295	lemma Diff_Collect_eq:
8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	1296	"A - Collect(A,P) = Collect(A, %x. ~ P(x))"
8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	1297	by blast
8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	1298
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1299	lemma (in M_trivial) Collect_rall_eq:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1300	"M(Y) ==> Collect(A, %x. \<forall>y[M]. y\<in>Y \<longrightarrow> P(x,y)) =
13436 8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	1301	(if Y=0 then A else (\<Inter>y \<in> Y. {x \<in> A. P(x,y)}))"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1302	apply simp
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1303	apply (blast intro!: equalityI dest: transM)
13436 8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	1304	done
8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	1305
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1306	lemma (in M_basic) separation_disj:
13436 8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	1307	"[\|separation(M,P); separation(M,Q)\|] ==> separation(M, \<lambda>z. P(z) \| Q(z))"
8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	1308	by (simp del: separation_closed
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1309	add: separation_iff Collect_Un_Collect_eq [symmetric])
13436 8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	1310
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1311	lemma (in M_basic) separation_neg:
13436 8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	1312	"separation(M,P) ==> separation(M, \<lambda>z. ~P(z))"
8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	1313	by (simp del: separation_closed
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1314	add: separation_iff Diff_Collect_eq [symmetric])
13436 8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	1315
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1316	lemma (in M_basic) separation_imp:
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1317	"[\|separation(M,P); separation(M,Q)\|]
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1318	==> separation(M, \<lambda>z. P(z) \<longrightarrow> Q(z))"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1319	by (simp add: separation_neg separation_disj not_disj_iff_imp [symmetric])
13436 8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	1320
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	1321	text\<open>This result is a hint of how little can be done without the Reflection
13436 8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	1322	Theorem. The quantifier has to be bounded by a set. We also need another
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	1323	instance of Separation!\<close>
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1324	lemma (in M_basic) separation_rall:
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1325	"[\|M(Y); \<forall>y[M]. separation(M, \<lambda>x. P(x,y));
13436 8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	1326	\<forall>z[M]. strong_replacement(M, \<lambda>x y. y = {u \<in> z . P(u,x)})\|]
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1327	==> separation(M, \<lambda>x. \<forall>y[M]. y\<in>Y \<longrightarrow> P(x,y))"
13436 8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	1328	apply (simp del: separation_closed rall_abs
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1329	add: separation_iff Collect_rall_eq)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1330	apply (blast intro!: Inter_closed RepFun_closed dest: transM)
13436 8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	1331	done
8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	1332
8fd1d803a3d3 tweaks involving Separation paulson parents: 13434 diff changeset	1333
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	1334	subsubsection\<open>Functions and function space\<close>
13268 240509babf00 more use of relativized quantifiers paulson parents: 13254 diff changeset	1335
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	1336	text\<open>The assumption @{term "M(A->B)"} is unusual, but essential: in
240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	1337	all but trivial cases, A->B cannot be expected to belong to @{term M}.\<close>
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1338	lemma (in M_basic) is_funspace_abs [simp]:
58860 fee7cfa69c50 eliminated spurious semicolons; wenzelm parents: 52458 diff changeset	1339	"[\|M(A); M(B); M(F); M(A->B)\|] ==> is_funspace(M,A,B,F) \<longleftrightarrow> F = A->B"
13268 240509babf00 more use of relativized quantifiers paulson parents: 13254 diff changeset	1340	apply (simp add: is_funspace_def)
240509babf00 more use of relativized quantifiers paulson parents: 13254 diff changeset	1341	apply (rule iffI)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1342	prefer 2 apply blast
13268 240509babf00 more use of relativized quantifiers paulson parents: 13254 diff changeset	1343	apply (rule M_equalityI)
240509babf00 more use of relativized quantifiers paulson parents: 13254 diff changeset	1344	apply simp_all
240509babf00 more use of relativized quantifiers paulson parents: 13254 diff changeset	1345	done
240509babf00 more use of relativized quantifiers paulson parents: 13254 diff changeset	1346
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1347	lemma (in M_basic) succ_fun_eq2:
13268 240509babf00 more use of relativized quantifiers paulson parents: 13254 diff changeset	1348	"[\|M(B); M(n->B)\|] ==>
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1349	succ(n) -> B =
13268 240509babf00 more use of relativized quantifiers paulson parents: 13254 diff changeset	1350	\<Union>{z. p \<in> (n->B)*B, \<exists>f[M]. \<exists>b[M]. p = <f,b> & z = {cons(<n,b>, f)}}"
240509babf00 more use of relativized quantifiers paulson parents: 13254 diff changeset	1351	apply (simp add: succ_fun_eq)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1352	apply (blast dest: transM)
13268 240509babf00 more use of relativized quantifiers paulson parents: 13254 diff changeset	1353	done
240509babf00 more use of relativized quantifiers paulson parents: 13254 diff changeset	1354
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1355	lemma (in M_basic) funspace_succ:
13268 240509babf00 more use of relativized quantifiers paulson parents: 13254 diff changeset	1356	"[\|M(n); M(B); M(n->B) \|] ==> M(succ(n) -> B)"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1357	apply (insert funspace_succ_replacement [of n], simp)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1358	apply (force simp add: succ_fun_eq2 univalent_def)
13268 240509babf00 more use of relativized quantifiers paulson parents: 13254 diff changeset	1359	done
240509babf00 more use of relativized quantifiers paulson parents: 13254 diff changeset	1360
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	1361	text\<open>@{term M} contains all finite function spaces. Needed to prove the
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1362	absoluteness of transitive closure. See the definition of
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	1363	\<open>rtrancl_alt\<close> in in \<open>WF_absolute.thy\<close>.\<close>
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1364	lemma (in M_basic) finite_funspace_closed [intro,simp]:
13268 240509babf00 more use of relativized quantifiers paulson parents: 13254 diff changeset	1365	"[\|n\<in>nat; M(B)\|] ==> M(n->B)"
240509babf00 more use of relativized quantifiers paulson parents: 13254 diff changeset	1366	apply (induct_tac n, simp)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1367	apply (simp add: funspace_succ nat_into_M)
13268 240509babf00 more use of relativized quantifiers paulson parents: 13254 diff changeset	1368	done
240509babf00 more use of relativized quantifiers paulson parents: 13254 diff changeset	1369
13350 626b79677dfa tidied paulson parents: 13348 diff changeset	1370
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	1371	subsection\<open>Relativization and Absoluteness for Boolean Operators\<close>
13423 7ec771711c09 More lemmas, working towards relativization of "satisfies" paulson parents: 13418 diff changeset	1372
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 16417 diff changeset	1373	definition
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	1374	is_bool_of_o :: "[i=>o, o, i] => o" where
13423 7ec771711c09 More lemmas, working towards relativization of "satisfies" paulson parents: 13418 diff changeset	1375	"is_bool_of_o(M,P,z) == (P & number1(M,z)) \| (~P & empty(M,z))"
7ec771711c09 More lemmas, working towards relativization of "satisfies" paulson parents: 13418 diff changeset	1376
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	1377	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	1378	is_not :: "[i=>o, i, i] => o" where
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1379	"is_not(M,a,z) == (number1(M,a) & empty(M,z)) \|
13423 7ec771711c09 More lemmas, working towards relativization of "satisfies" paulson parents: 13418 diff changeset	1380	(~number1(M,a) & number1(M,z))"
7ec771711c09 More lemmas, working towards relativization of "satisfies" paulson parents: 13418 diff changeset	1381
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	1382	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	1383	is_and :: "[i=>o, i, i, i] => o" where
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1384	"is_and(M,a,b,z) == (number1(M,a) & z=b) \|
13423 7ec771711c09 More lemmas, working towards relativization of "satisfies" paulson parents: 13418 diff changeset	1385	(~number1(M,a) & empty(M,z))"
7ec771711c09 More lemmas, working towards relativization of "satisfies" paulson parents: 13418 diff changeset	1386
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	1387	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	1388	is_or :: "[i=>o, i, i, i] => o" where
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1389	"is_or(M,a,b,z) == (number1(M,a) & number1(M,z)) \|
13423 7ec771711c09 More lemmas, working towards relativization of "satisfies" paulson parents: 13418 diff changeset	1390	(~number1(M,a) & z=b)"
7ec771711c09 More lemmas, working towards relativization of "satisfies" paulson parents: 13418 diff changeset	1391
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1392	lemma (in M_trivial) bool_of_o_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1393	"M(z) ==> is_bool_of_o(M,P,z) \<longleftrightarrow> z = bool_of_o(P)"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1394	by (simp add: is_bool_of_o_def bool_of_o_def)
13423 7ec771711c09 More lemmas, working towards relativization of "satisfies" paulson parents: 13418 diff changeset	1395
7ec771711c09 More lemmas, working towards relativization of "satisfies" paulson parents: 13418 diff changeset	1396
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1397	lemma (in M_trivial) not_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1398	"[\| M(a); M(z)\|] ==> is_not(M,a,z) \<longleftrightarrow> z = not(a)"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1399	by (simp add: Bool.not_def cond_def is_not_def)
13423 7ec771711c09 More lemmas, working towards relativization of "satisfies" paulson parents: 13418 diff changeset	1400
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1401	lemma (in M_trivial) and_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1402	"[\| M(a); M(b); M(z)\|] ==> is_and(M,a,b,z) \<longleftrightarrow> z = a and b"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1403	by (simp add: Bool.and_def cond_def is_and_def)
13423 7ec771711c09 More lemmas, working towards relativization of "satisfies" paulson parents: 13418 diff changeset	1404
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1405	lemma (in M_trivial) or_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1406	"[\| M(a); M(b); M(z)\|] ==> is_or(M,a,b,z) \<longleftrightarrow> z = a or b"
13423 7ec771711c09 More lemmas, working towards relativization of "satisfies" paulson parents: 13418 diff changeset	1407	by (simp add: Bool.or_def cond_def is_or_def)
7ec771711c09 More lemmas, working towards relativization of "satisfies" paulson parents: 13418 diff changeset	1408
7ec771711c09 More lemmas, working towards relativization of "satisfies" paulson parents: 13418 diff changeset	1409
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1410	lemma (in M_trivial) bool_of_o_closed [intro,simp]:
13423 7ec771711c09 More lemmas, working towards relativization of "satisfies" paulson parents: 13418 diff changeset	1411	"M(bool_of_o(P))"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1412	by (simp add: bool_of_o_def)
13423 7ec771711c09 More lemmas, working towards relativization of "satisfies" paulson parents: 13418 diff changeset	1413
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1414	lemma (in M_trivial) and_closed [intro,simp]:
13423 7ec771711c09 More lemmas, working towards relativization of "satisfies" paulson parents: 13418 diff changeset	1415	"[\| M(p); M(q) \|] ==> M(p and q)"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1416	by (simp add: and_def cond_def)
13423 7ec771711c09 More lemmas, working towards relativization of "satisfies" paulson parents: 13418 diff changeset	1417
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1418	lemma (in M_trivial) or_closed [intro,simp]:
13423 7ec771711c09 More lemmas, working towards relativization of "satisfies" paulson parents: 13418 diff changeset	1419	"[\| M(p); M(q) \|] ==> M(p or q)"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1420	by (simp add: or_def cond_def)
13423 7ec771711c09 More lemmas, working towards relativization of "satisfies" paulson parents: 13418 diff changeset	1421
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1422	lemma (in M_trivial) not_closed [intro,simp]:
13423 7ec771711c09 More lemmas, working towards relativization of "satisfies" paulson parents: 13418 diff changeset	1423	"M(p) ==> M(not(p))"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1424	by (simp add: Bool.not_def cond_def)
13423 7ec771711c09 More lemmas, working towards relativization of "satisfies" paulson parents: 13418 diff changeset	1425
7ec771711c09 More lemmas, working towards relativization of "satisfies" paulson parents: 13418 diff changeset	1426
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	1427	subsection\<open>Relativization and Absoluteness for List Operators\<close>
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1428
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 16417 diff changeset	1429	definition
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	1430	is_Nil :: "[i=>o, i] => o" where
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	1431	\<comment>\<open>because @{prop "[] \<equiv> Inl(0)"}\<close>
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1432	"is_Nil(M,xs) == \<exists>zero[M]. empty(M,zero) & is_Inl(M,zero,xs)"
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1433
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	1434	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	1435	is_Cons :: "[i=>o,i,i,i] => o" where
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	1436	\<comment>\<open>because @{prop "Cons(a, l) \<equiv> Inr(\<langle>a,l\<rangle>)"}\<close>
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1437	"is_Cons(M,a,l,Z) == \<exists>p[M]. pair(M,a,l,p) & is_Inr(M,p,Z)"
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1438
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1439
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1440	lemma (in M_trivial) Nil_in_M [intro,simp]: "M(Nil)"
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1441	by (simp add: Nil_def)
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1442
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1443	lemma (in M_trivial) Nil_abs [simp]: "M(Z) ==> is_Nil(M,Z) \<longleftrightarrow> (Z = Nil)"
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1444	by (simp add: is_Nil_def Nil_def)
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1445
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1446	lemma (in M_trivial) Cons_in_M_iff [iff]: "M(Cons(a,l)) \<longleftrightarrow> M(a) & M(l)"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1447	by (simp add: Cons_def)
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1448
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1449	lemma (in M_trivial) Cons_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1450	"[\|M(a); M(l); M(Z)\|] ==> is_Cons(M,a,l,Z) \<longleftrightarrow> (Z = Cons(a,l))"
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1451	by (simp add: is_Cons_def Cons_def)
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1452
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1453
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 16417 diff changeset	1454	definition
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	1455	quasilist :: "i => o" where
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1456	"quasilist(xs) == xs=Nil \| (\<exists>x l. xs = Cons(x,l))"
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1457
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	1458	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	1459	is_quasilist :: "[i=>o,i] => o" where
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1460	"is_quasilist(M,z) == is_Nil(M,z) \| (\<exists>x[M]. \<exists>l[M]. is_Cons(M,x,l,z))"
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1461
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	1462	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	1463	list_case' :: "[i, [i,i]=>i, i] => i" where
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	1464	\<comment>\<open>A version of @{term list_case} that's always defined.\<close>
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1465	"list_case'(a,b,xs) ==
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1466	if quasilist(xs) then list_case(a,b,xs) else 0"
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1467
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	1468	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	1469	is_list_case :: "[i=>o, i, [i,i,i]=>o, i, i] => o" where
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	1470	\<comment>\<open>Returns 0 for non-lists\<close>
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1471	"is_list_case(M, a, is_b, xs, z) ==
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1472	(is_Nil(M,xs) \<longrightarrow> z=a) &
57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1473	(\<forall>x[M]. \<forall>l[M]. is_Cons(M,x,l,xs) \<longrightarrow> is_b(x,l,z)) &
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1474	(is_quasilist(M,xs) \| empty(M,z))"
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1475
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	1476	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	1477	hd' :: "i => i" where
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	1478	\<comment>\<open>A version of @{term hd} that's always defined.\<close>
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1479	"hd'(xs) == if quasilist(xs) then hd(xs) else 0"
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1480
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	1481	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	1482	tl' :: "i => i" where
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	1483	\<comment>\<open>A version of @{term tl} that's always defined.\<close>
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1484	"tl'(xs) == if quasilist(xs) then tl(xs) else 0"
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1485
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	1486	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	1487	is_hd :: "[i=>o,i,i] => o" where
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	1488	\<comment>\<open>@{term "hd([]) = 0"} no constraints if not a list.
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	1489	Avoiding implication prevents the simplifier's looping.\<close>
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1490	"is_hd(M,xs,H) ==
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1491	(is_Nil(M,xs) \<longrightarrow> empty(M,H)) &
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1492	(\<forall>x[M]. \<forall>l[M]. ~ is_Cons(M,x,l,xs) \| H=x) &
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1493	(is_quasilist(M,xs) \| empty(M,H))"
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1494
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	1495	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	1496	is_tl :: "[i=>o,i,i] => o" where
61798 27f3c10b0b50 isabelle update_cartouches -c -t; wenzelm parents: 60770 diff changeset	1497	\<comment>\<open>@{term "tl([]) = []"}; see comments about @{term is_hd}\<close>
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1498	"is_tl(M,xs,T) ==
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1499	(is_Nil(M,xs) \<longrightarrow> T=xs) &
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1500	(\<forall>x[M]. \<forall>l[M]. ~ is_Cons(M,x,l,xs) \| T=l) &
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1501	(is_quasilist(M,xs) \| empty(M,T))"
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1502
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	1503	subsubsection\<open>@{term quasilist}: For Case-Splitting with @{term list_case'}\<close>
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1504
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1505	lemma [iff]: "quasilist(Nil)"
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1506	by (simp add: quasilist_def)
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1507
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1508	lemma [iff]: "quasilist(Cons(x,l))"
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1509	by (simp add: quasilist_def)
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1510
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1511	lemma list_imp_quasilist: "l \<in> list(A) ==> quasilist(l)"
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1512	by (erule list.cases, simp_all)
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1513
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	1514	subsubsection\<open>@{term list_case'}, the Modified Version of @{term list_case}\<close>
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1515
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1516	lemma list_case'_Nil [simp]: "list_case'(a,b,Nil) = a"
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1517	by (simp add: list_case'_def quasilist_def)
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1518
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1519	lemma list_case'_Cons [simp]: "list_case'(a,b,Cons(x,l)) = b(x,l)"
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1520	by (simp add: list_case'_def quasilist_def)
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1521
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1522	lemma non_list_case: "~ quasilist(x) ==> list_case'(a,b,x) = 0"
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1523	by (simp add: quasilist_def list_case'_def)
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1524
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1525	lemma list_case'_eq_list_case [simp]:
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1526	"xs \<in> list(A) ==>list_case'(a,b,xs) = list_case(a,b,xs)"
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1527	by (erule list.cases, simp_all)
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1528
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1529	lemma (in M_basic) list_case'_closed [intro,simp]:
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1530	"[\|M(k); M(a); \<forall>x[M]. \<forall>y[M]. M(b(x,y))\|] ==> M(list_case'(a,b,k))"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1531	apply (case_tac "quasilist(k)")
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1532	apply (simp add: quasilist_def, force)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1533	apply (simp add: non_list_case)
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1534	done
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1535
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1536	lemma (in M_trivial) quasilist_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1537	"M(z) ==> is_quasilist(M,z) \<longleftrightarrow> quasilist(z)"
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1538	by (auto simp add: is_quasilist_def quasilist_def)
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1539
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1540	lemma (in M_trivial) list_case_abs [simp]:
13634 99a593b49b04 Re-organization of Constructible theories paulson parents: 13628 diff changeset	1541	"[\| relation2(M,is_b,b); M(k); M(z) \|]
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1542	==> is_list_case(M,a,is_b,k,z) \<longleftrightarrow> z = list_case'(a,b,k)"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1543	apply (case_tac "quasilist(k)")
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1544	prefer 2
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1545	apply (simp add: is_list_case_def non_list_case)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1546	apply (force simp add: quasilist_def)
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1547	apply (simp add: quasilist_def is_list_case_def)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1548	apply (elim disjE exE)
13634 99a593b49b04 Re-organization of Constructible theories paulson parents: 13628 diff changeset	1549	apply (simp_all add: relation2_def)
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1550	done
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1551
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1552
60770 240563fbf41d isabelle update_cartouches; wenzelm parents: 59788 diff changeset	1553	subsubsection\<open>The Modified Operators @{term hd'} and @{term tl'}\<close>
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1554
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1555	lemma (in M_trivial) is_hd_Nil: "is_hd(M,[],Z) \<longleftrightarrow> empty(M,Z)"
13505 52a16cb7fefb Relativized right up to L satisfies V=L! paulson parents: 13436 diff changeset	1556	by (simp add: is_hd_def)
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1557
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1558	lemma (in M_trivial) is_hd_Cons:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1559	"[\|M(a); M(l)\|] ==> is_hd(M,Cons(a,l),Z) \<longleftrightarrow> Z = a"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1560	by (force simp add: is_hd_def)
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1561
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1562	lemma (in M_trivial) hd_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1563	"[\|M(x); M(y)\|] ==> is_hd(M,x,y) \<longleftrightarrow> y = hd'(x)"
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1564	apply (simp add: hd'_def)
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1565	apply (intro impI conjI)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1566	prefer 2 apply (force simp add: is_hd_def)
13505 52a16cb7fefb Relativized right up to L satisfies V=L! paulson parents: 13436 diff changeset	1567	apply (simp add: quasilist_def is_hd_def)
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1568	apply (elim disjE exE, auto)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1569	done
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1570
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1571	lemma (in M_trivial) is_tl_Nil: "is_tl(M,[],Z) \<longleftrightarrow> Z = []"
13505 52a16cb7fefb Relativized right up to L satisfies V=L! paulson parents: 13436 diff changeset	1572	by (simp add: is_tl_def)
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1573
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1574	lemma (in M_trivial) is_tl_Cons:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1575	"[\|M(a); M(l)\|] ==> is_tl(M,Cons(a,l),Z) \<longleftrightarrow> Z = l"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1576	by (force simp add: is_tl_def)
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1577
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1578	lemma (in M_trivial) tl_abs [simp]:
46823 57bf0cecb366 More mathematical symbols for ZF examples paulson parents: 32960 diff changeset	1579	"[\|M(x); M(y)\|] ==> is_tl(M,x,y) \<longleftrightarrow> y = tl'(x)"
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1580	apply (simp add: tl'_def)
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1581	apply (intro impI conjI)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1582	prefer 2 apply (force simp add: is_tl_def)
13505 52a16cb7fefb Relativized right up to L satisfies V=L! paulson parents: 13436 diff changeset	1583	apply (simp add: quasilist_def is_tl_def)
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1584	apply (elim disjE exE, auto)
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1585	done
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1586
13634 99a593b49b04 Re-organization of Constructible theories paulson parents: 13628 diff changeset	1587	lemma (in M_trivial) relation1_tl: "relation1(M, is_tl(M), tl')"
99a593b49b04 Re-organization of Constructible theories paulson parents: 13628 diff changeset	1588	by (simp add: relation1_def)
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1589
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1590	lemma hd'_Nil: "hd'([]) = 0"
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1591	by (simp add: hd'_def)
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1592
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1593	lemma hd'_Cons: "hd'(Cons(a,l)) = a"
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1594	by (simp add: hd'_def)
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1595
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1596	lemma tl'_Nil: "tl'([]) = []"
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1597	by (simp add: tl'_def)
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1598
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1599	lemma tl'_Cons: "tl'(Cons(a,l)) = l"
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1600	by (simp add: tl'_def)
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1601
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1602	lemma iterates_tl_Nil: "n \<in> nat ==> tl'^n ([]) = []"
13628 87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1603	apply (induct_tac n)
87482b5e3f2e Various simplifications of the Constructible theories paulson parents: 13615 diff changeset	1604	apply (simp_all add: tl'_Nil)
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1605	done
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1606
13564 1500a2e48d44 renamed M_triv_axioms to M_trivial and M_axioms to M_basic paulson parents: 13563 diff changeset	1607	lemma (in M_basic) tl'_closed: "M(x) ==> M(tl'(x))"
13397 6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1608	apply (simp add: tl'_def)
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1609	apply (force simp add: quasilist_def)
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1610	done
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1611
6e5f4d911435 Absoluteness of the function "nth" paulson parents: 13382 diff changeset	1612
13223 45be08fbdcff new theory of inner models paulson parents: diff changeset	1613	end

author	wenzelm
	Sun, 09 Apr 2017 20:44:35 +0200
changeset 65449	c82e63b11b8b
parent 61798	27f3c10b0b50
child 67443	3abf6a722518
permissions	-rw-r--r--