isabelle: src/HOL/ZF/HOLZF.thy@764547b68538 (annotated)

19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	1	(* Title: HOL/ZF/HOLZF.thy
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	2	Author: Steven Obua
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	3
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	4	Axiomatizes the ZFC universe as an HOL type. See "Partizan Games in
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	5	Isabelle/HOLZF", available from http://www4.in.tum.de/~obua/partizan
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	6	*)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	7
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	8	theory HOLZF
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	9	imports Helper
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	10	begin
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	11
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	12	typedecl ZF
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	13
22690 0b08f218f260 replaced axioms/finalconsts by proper axiomatization; wenzelm parents: 20565 diff changeset	14	axiomatization
0b08f218f260 replaced axioms/finalconsts by proper axiomatization; wenzelm parents: 20565 diff changeset	15	Empty :: ZF and
0b08f218f260 replaced axioms/finalconsts by proper axiomatization; wenzelm parents: 20565 diff changeset	16	Elem :: "ZF \<Rightarrow> ZF \<Rightarrow> bool" and
0b08f218f260 replaced axioms/finalconsts by proper axiomatization; wenzelm parents: 20565 diff changeset	17	Sum :: "ZF \<Rightarrow> ZF" and
0b08f218f260 replaced axioms/finalconsts by proper axiomatization; wenzelm parents: 20565 diff changeset	18	Power :: "ZF \<Rightarrow> ZF" and
0b08f218f260 replaced axioms/finalconsts by proper axiomatization; wenzelm parents: 20565 diff changeset	19	Repl :: "ZF \<Rightarrow> (ZF \<Rightarrow> ZF) \<Rightarrow> ZF" and
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	20	Inf :: ZF
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	21
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	22	constdefs
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	23	Upair:: "ZF \<Rightarrow> ZF \<Rightarrow> ZF"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	24	"Upair a b == Repl (Power (Power Empty)) (% x. if x = Empty then a else b)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	25	Singleton:: "ZF \<Rightarrow> ZF"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	26	"Singleton x == Upair x x"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	27	union :: "ZF \<Rightarrow> ZF \<Rightarrow> ZF"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	28	"union A B == Sum (Upair A B)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	29	SucNat:: "ZF \<Rightarrow> ZF"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	30	"SucNat x == union x (Singleton x)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	31	subset :: "ZF \<Rightarrow> ZF \<Rightarrow> bool"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	32	"subset A B == ! x. Elem x A \<longrightarrow> Elem x B"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	33
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	34	axioms
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	35	Empty: "Not (Elem x Empty)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	36	Ext: "(x = y) = (! z. Elem z x = Elem z y)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	37	Sum: "Elem z (Sum x) = (? y. Elem z y & Elem y x)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	38	Power: "Elem y (Power x) = (subset y x)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	39	Repl: "Elem b (Repl A f) = (? a. Elem a A & b = f a)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	40	Regularity: "A \<noteq> Empty \<longrightarrow> (? x. Elem x A & (! y. Elem y x \<longrightarrow> Not (Elem y A)))"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	41	Infinity: "Elem Empty Inf & (! x. Elem x Inf \<longrightarrow> Elem (SucNat x) Inf)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	42
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	43	constdefs
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	44	Sep:: "ZF \<Rightarrow> (ZF \<Rightarrow> bool) \<Rightarrow> ZF"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	45	"Sep A p == (if (!x. Elem x A \<longrightarrow> Not (p x)) then Empty else
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	46	(let z = (\<some> x. Elem x A & p x) in
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	47	let f = % x. (if p x then x else z) in Repl A f))"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	48
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	49	thm Power[unfolded subset_def]
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	50
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	51	theorem Sep: "Elem b (Sep A p) = (Elem b A & p b)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	52	apply (auto simp add: Sep_def Empty)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	53	apply (auto simp add: Let_def Repl)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	54	apply (rule someI2, auto)+
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	55	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	56
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	57	lemma subset_empty: "subset Empty A"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	58	by (simp add: subset_def Empty)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	59
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	60	theorem Upair: "Elem x (Upair a b) = (x = a \| x = b)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	61	apply (auto simp add: Upair_def Repl)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	62	apply (rule exI[where x=Empty])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	63	apply (simp add: Power subset_empty)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	64	apply (rule exI[where x="Power Empty"])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	65	apply (auto)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	66	apply (auto simp add: Ext Power subset_def Empty)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	67	apply (drule spec[where x=Empty], simp add: Empty)+
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	68	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	69
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	70	lemma Singleton: "Elem x (Singleton y) = (x = y)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	71	by (simp add: Singleton_def Upair)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	72
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	73	constdefs
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	74	Opair:: "ZF \<Rightarrow> ZF \<Rightarrow> ZF"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	75	"Opair a b == Upair (Upair a a) (Upair a b)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	76
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	77	lemma Upair_singleton: "(Upair a a = Upair c d) = (a = c & a = d)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	78	by (auto simp add: Ext[where x="Upair a a"] Upair)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	79
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	80	lemma Upair_fsteq: "(Upair a b = Upair a c) = ((a = b & a = c) \| (b = c))"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	81	by (auto simp add: Ext[where x="Upair a b"] Upair)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	82
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	83	lemma Upair_comm: "Upair a b = Upair b a"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	84	by (auto simp add: Ext Upair)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	85
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	86	theorem Opair: "(Opair a b = Opair c d) = (a = c & b = d)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	87	proof -
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	88	have fst: "(Opair a b = Opair c d) \<Longrightarrow> a = c"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	89	apply (simp add: Opair_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	90	apply (simp add: Ext[where x="Upair (Upair a a) (Upair a b)"])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	91	apply (drule spec[where x="Upair a a"])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	92	apply (auto simp add: Upair Upair_singleton)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	93	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	94	show ?thesis
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	95	apply (auto)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	96	apply (erule fst)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	97	apply (frule fst)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	98	apply (auto simp add: Opair_def Upair_fsteq)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	99	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	100	qed
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	101
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	102	constdefs
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	103	Replacement :: "ZF \<Rightarrow> (ZF \<Rightarrow> ZF option) \<Rightarrow> ZF"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	104	"Replacement A f == Repl (Sep A (% a. f a \<noteq> None)) (the o f)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	105
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	106	theorem Replacement: "Elem y (Replacement A f) = (? x. Elem x A & f x = Some y)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	107	by (auto simp add: Replacement_def Repl Sep)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	108
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	109	constdefs
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	110	Fst :: "ZF \<Rightarrow> ZF"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	111	"Fst q == SOME x. ? y. q = Opair x y"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	112	Snd :: "ZF \<Rightarrow> ZF"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	113	"Snd q == SOME y. ? x. q = Opair x y"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	114
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	115	theorem Fst: "Fst (Opair x y) = x"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	116	apply (simp add: Fst_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	117	apply (rule someI2)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	118	apply (simp_all add: Opair)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	119	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	120
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	121	theorem Snd: "Snd (Opair x y) = y"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	122	apply (simp add: Snd_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	123	apply (rule someI2)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	124	apply (simp_all add: Opair)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	125	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	126
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	127	constdefs
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	128	isOpair :: "ZF \<Rightarrow> bool"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	129	"isOpair q == ? x y. q = Opair x y"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	130
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	131	lemma isOpair: "isOpair (Opair x y) = True"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	132	by (auto simp add: isOpair_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	133
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	134	lemma FstSnd: "isOpair x \<Longrightarrow> Opair (Fst x) (Snd x) = x"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	135	by (auto simp add: isOpair_def Fst Snd)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	136
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	137	constdefs
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	138	CartProd :: "ZF \<Rightarrow> ZF \<Rightarrow> ZF"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	139	"CartProd A B == Sum(Repl A (% a. Repl B (% b. Opair a b)))"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	140
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	141	lemma CartProd: "Elem x (CartProd A B) = (? a b. Elem a A & Elem b B & x = (Opair a b))"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	142	apply (auto simp add: CartProd_def Sum Repl)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	143	apply (rule_tac x="Repl B (Opair a)" in exI)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	144	apply (auto simp add: Repl)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	145	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	146
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	147	constdefs
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	148	explode :: "ZF \<Rightarrow> ZF set"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	149	"explode z == { x. Elem x z }"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	150
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	151	lemma explode_Empty: "(explode x = {}) = (x = Empty)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	152	by (auto simp add: explode_def Ext Empty)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	153
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	154	lemma explode_Elem: "(x \<in> explode X) = (Elem x X)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	155	by (simp add: explode_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	156
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	157	lemma Elem_explode_in: "\<lbrakk> Elem a A; explode A \<subseteq> B\<rbrakk> \<Longrightarrow> a \<in> B"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	158	by (auto simp add: explode_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	159
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	160	lemma explode_CartProd_eq: "explode (CartProd a b) = (% (x,y). Opair x y) ` ((explode a) \<times> (explode b))"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	161	by (simp add: explode_def expand_set_eq CartProd image_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	162
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	163	lemma explode_Repl_eq: "explode (Repl A f) = image f (explode A)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	164	by (simp add: explode_def Repl image_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	165
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	166	constdefs
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	167	Domain :: "ZF \<Rightarrow> ZF"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	168	"Domain f == Replacement f (% p. if isOpair p then Some (Fst p) else None)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	169	Range :: "ZF \<Rightarrow> ZF"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	170	"Range f == Replacement f (% p. if isOpair p then Some (Snd p) else None)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	171
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	172	theorem Domain: "Elem x (Domain f) = (? y. Elem (Opair x y) f)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	173	apply (auto simp add: Domain_def Replacement)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	174	apply (rule_tac x="Snd x" in exI)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	175	apply (simp add: FstSnd)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	176	apply (rule_tac x="Opair x y" in exI)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	177	apply (simp add: isOpair Fst)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	178	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	179
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	180	theorem Range: "Elem y (Range f) = (? x. Elem (Opair x y) f)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	181	apply (auto simp add: Range_def Replacement)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	182	apply (rule_tac x="Fst x" in exI)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	183	apply (simp add: FstSnd)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	184	apply (rule_tac x="Opair x y" in exI)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	185	apply (simp add: isOpair Snd)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	186	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	187
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	188	theorem union: "Elem x (union A B) = (Elem x A \| Elem x B)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	189	by (auto simp add: union_def Sum Upair)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	190
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	191	constdefs
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	192	Field :: "ZF \<Rightarrow> ZF"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	193	"Field A == union (Domain A) (Range A)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	194
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	195	constdefs
24784 102e0e732495 avoid unnamed infixes; wenzelm parents: 24124 diff changeset	196	app :: "ZF \<Rightarrow> ZF => ZF" (infixl "\<acute>" 90) --{function application}
102e0e732495 avoid unnamed infixes; wenzelm parents: 24124 diff changeset	197	"f \<acute> x == (THE y. Elem (Opair x y) f)"
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	198
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	199	constdefs
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	200	isFun :: "ZF \<Rightarrow> bool"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	201	"isFun f == (! x y1 y2. Elem (Opair x y1) f & Elem (Opair x y2) f \<longrightarrow> y1 = y2)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	202
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	203	constdefs
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	204	Lambda :: "ZF \<Rightarrow> (ZF \<Rightarrow> ZF) \<Rightarrow> ZF"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	205	"Lambda A f == Repl A (% x. Opair x (f x))"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	206
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	207	lemma Lambda_app: "Elem x A \<Longrightarrow> (Lambda A f)\<acute>x = f x"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	208	by (simp add: app_def Lambda_def Repl Opair)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	209
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	210	lemma isFun_Lambda: "isFun (Lambda A f)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	211	by (auto simp add: isFun_def Lambda_def Repl Opair)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	212
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	213	lemma domain_Lambda: "Domain (Lambda A f) = A"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	214	apply (auto simp add: Domain_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	215	apply (subst Ext)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	216	apply (auto simp add: Replacement)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	217	apply (simp add: Lambda_def Repl)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	218	apply (auto simp add: Fst)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	219	apply (simp add: Lambda_def Repl)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	220	apply (rule_tac x="Opair z (f z)" in exI)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	221	apply (auto simp add: Fst isOpair_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	222	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	223
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	224	lemma Lambda_ext: "(Lambda s f = Lambda t g) = (s = t & (! x. Elem x s \<longrightarrow> f x = g x))"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	225	proof -
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	226	have "Lambda s f = Lambda t g \<Longrightarrow> s = t"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	227	apply (subst domain_Lambda[where A = s and f = f, symmetric])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	228	apply (subst domain_Lambda[where A = t and f = g, symmetric])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	229	apply auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	230	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	231	then show ?thesis
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	232	apply auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	233	apply (subst Lambda_app[where f=f, symmetric], simp)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	234	apply (subst Lambda_app[where f=g, symmetric], simp)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	235	apply auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	236	apply (auto simp add: Lambda_def Repl Ext)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	237	apply (auto simp add: Ext[symmetric])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	238	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	239	qed
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	240
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	241	constdefs
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	242	PFun :: "ZF \<Rightarrow> ZF \<Rightarrow> ZF"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	243	"PFun A B == Sep (Power (CartProd A B)) isFun"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	244	Fun :: "ZF \<Rightarrow> ZF \<Rightarrow> ZF"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	245	"Fun A B == Sep (PFun A B) (\<lambda> f. Domain f = A)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	246
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	247	lemma Fun_Range: "Elem f (Fun U V) \<Longrightarrow> subset (Range f) V"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	248	apply (simp add: Fun_def Sep PFun_def Power subset_def CartProd)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	249	apply (auto simp add: Domain Range)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	250	apply (erule_tac x="Opair xa x" in allE)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	251	apply (auto simp add: Opair)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	252	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	253
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	254	lemma Elem_Elem_PFun: "Elem F (PFun U V) \<Longrightarrow> Elem p F \<Longrightarrow> isOpair p & Elem (Fst p) U & Elem (Snd p) V"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	255	apply (simp add: PFun_def Sep Power subset_def, clarify)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	256	apply (erule_tac x=p in allE)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	257	apply (auto simp add: CartProd isOpair Fst Snd)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	258	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	259
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	260	lemma Fun_implies_PFun[simp]: "Elem f (Fun U V) \<Longrightarrow> Elem f (PFun U V)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	261	by (simp add: Fun_def Sep)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	262
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	263	lemma Elem_Elem_Fun: "Elem F (Fun U V) \<Longrightarrow> Elem p F \<Longrightarrow> isOpair p & Elem (Fst p) U & Elem (Snd p) V"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	264	by (auto simp add: Elem_Elem_PFun dest: Fun_implies_PFun)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	265
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	266	lemma PFun_inj: "Elem F (PFun U V) \<Longrightarrow> Elem x F \<Longrightarrow> Elem y F \<Longrightarrow> Fst x = Fst y \<Longrightarrow> Snd x = Snd y"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	267	apply (frule Elem_Elem_PFun[where p=x], simp)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	268	apply (frule Elem_Elem_PFun[where p=y], simp)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	269	apply (subgoal_tac "isFun F")
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	270	apply (simp add: isFun_def isOpair_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	271	apply (auto simp add: Fst Snd, blast)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	272	apply (auto simp add: PFun_def Sep)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	273	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	274
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	275	lemma Fun_total: "\<lbrakk>Elem F (Fun U V); Elem a U\<rbrakk> \<Longrightarrow> \<exists>x. Elem (Opair a x) F"
24124 4399175e3014 turned simp_depth_limit into configuration option; wenzelm parents: 23315 diff changeset	276	using [[simp_depth_limit = 2]]
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	277	by (auto simp add: Fun_def Sep Domain)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	278
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	279
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	280	lemma unique_fun_value: "\<lbrakk>isFun f; Elem x (Domain f)\<rbrakk> \<Longrightarrow> ?! y. Elem (Opair x y) f"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	281	by (auto simp add: Domain isFun_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	282
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	283	lemma fun_value_in_range: "\<lbrakk>isFun f; Elem x (Domain f)\<rbrakk> \<Longrightarrow> Elem (f\<acute>x) (Range f)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	284	apply (auto simp add: Range)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	285	apply (drule unique_fun_value)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	286	apply simp
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	287	apply (simp add: app_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	288	apply (rule exI[where x=x])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	289	apply (auto simp add: the_equality)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	290	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	291
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	292	lemma fun_range_witness: "\<lbrakk>isFun f; Elem y (Range f)\<rbrakk> \<Longrightarrow> ? x. Elem x (Domain f) & f\<acute>x = y"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	293	apply (auto simp add: Range)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	294	apply (rule_tac x="x" in exI)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	295	apply (auto simp add: app_def the_equality isFun_def Domain)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	296	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	297
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	298	lemma Elem_Fun_Lambda: "Elem F (Fun U V) \<Longrightarrow> ? f. F = Lambda U f"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	299	apply (rule exI[where x= "% x. (THE y. Elem (Opair x y) F)"])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	300	apply (simp add: Ext Lambda_def Repl Domain)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	301	apply (simp add: Ext[symmetric])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	302	apply auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	303	apply (frule Elem_Elem_Fun)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	304	apply auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	305	apply (rule_tac x="Fst z" in exI)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	306	apply (simp add: isOpair_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	307	apply (auto simp add: Fst Snd Opair)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	308	apply (rule theI2')
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	309	apply auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	310	apply (drule Fun_implies_PFun)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	311	apply (drule_tac x="Opair x ya" and y="Opair x yb" in PFun_inj)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	312	apply (auto simp add: Fst Snd)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	313	apply (drule Fun_implies_PFun)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	314	apply (drule_tac x="Opair x y" and y="Opair x ya" in PFun_inj)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	315	apply (auto simp add: Fst Snd)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	316	apply (rule theI2')
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	317	apply (auto simp add: Fun_total)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	318	apply (drule Fun_implies_PFun)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	319	apply (drule_tac x="Opair a x" and y="Opair a y" in PFun_inj)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	320	apply (auto simp add: Fst Snd)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	321	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	322
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	323	lemma Elem_Lambda_Fun: "Elem (Lambda A f) (Fun U V) = (A = U & (! x. Elem x A \<longrightarrow> Elem (f x) V))"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	324	proof -
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	325	have "Elem (Lambda A f) (Fun U V) \<Longrightarrow> A = U"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	326	by (simp add: Fun_def Sep domain_Lambda)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	327	then show ?thesis
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	328	apply auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	329	apply (drule Fun_Range)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	330	apply (subgoal_tac "f x = ((Lambda U f) \<acute> x)")
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	331	prefer 2
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	332	apply (simp add: Lambda_app)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	333	apply simp
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	334	apply (subgoal_tac "Elem (Lambda U f \<acute> x) (Range (Lambda U f))")
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	335	apply (simp add: subset_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	336	apply (rule fun_value_in_range)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	337	apply (simp_all add: isFun_Lambda domain_Lambda)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	338	apply (simp add: Fun_def Sep PFun_def Power domain_Lambda isFun_Lambda)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	339	apply (auto simp add: subset_def CartProd)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	340	apply (rule_tac x="Fst x" in exI)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	341	apply (auto simp add: Lambda_def Repl Fst)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	342	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	343	qed
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	344
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	345
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	346	constdefs
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	347	is_Elem_of :: "(ZF * ZF) set"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	348	"is_Elem_of == { (a,b) \| a b. Elem a b }"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	349
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	350	lemma cond_wf_Elem:
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	351	assumes hyps:"\<forall>x. (\<forall>y. Elem y x \<longrightarrow> Elem y U \<longrightarrow> P y) \<longrightarrow> Elem x U \<longrightarrow> P x" "Elem a U"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	352	shows "P a"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	353	proof -
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	354	{
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	355	fix P
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	356	fix U
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	357	fix a
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	358	assume P_induct: "(\<forall>x. (\<forall>y. Elem y x \<longrightarrow> Elem y U \<longrightarrow> P y) \<longrightarrow> (Elem x U \<longrightarrow> P x))"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	359	assume a_in_U: "Elem a U"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	360	have "P a"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	361	proof -
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	362	term "P"
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	363	term Sep
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	364	let ?Z = "Sep U (Not o P)"
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	365	have "?Z = Empty \<longrightarrow> P a" by (simp add: Ext Sep Empty a_in_U)
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	366	moreover have "?Z \<noteq> Empty \<longrightarrow> False"
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	367	proof
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	368	assume not_empty: "?Z \<noteq> Empty"
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	369	note thereis_x = Regularity[where A="?Z", simplified not_empty, simplified]
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	370	then obtain x where x_def: "Elem x ?Z & (! y. Elem y x \<longrightarrow> Not (Elem y ?Z))" ..
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	371	then have x_induct:"! y. Elem y x \<longrightarrow> Elem y U \<longrightarrow> P y" by (simp add: Sep)
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	372	have "Elem x U \<longrightarrow> P x"
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	373	by (rule impE[OF spec[OF P_induct, where x=x], OF x_induct], assumption)
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	374	moreover have "Elem x U & Not(P x)"
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	375	apply (insert x_def)
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	376	apply (simp add: Sep)
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	377	done
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	378	ultimately show "False" by auto
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	379	qed
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	380	ultimately show "P a" by auto
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	381	qed
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	382	}
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	383	with hyps show ?thesis by blast
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	384	qed
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	385
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	386	lemma cond2_wf_Elem:
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	387	assumes
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	388	special_P: "? U. ! x. Not(Elem x U) \<longrightarrow> (P x)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	389	and P_induct: "\<forall>x. (\<forall>y. Elem y x \<longrightarrow> P y) \<longrightarrow> P x"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	390	shows
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	391	"P a"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	392	proof -
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	393	have "? U Q. P = (\<lambda> x. (Elem x U \<longrightarrow> Q x))"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	394	proof -
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	395	from special_P obtain U where U:"! x. Not(Elem x U) \<longrightarrow> (P x)" ..
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	396	show ?thesis
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	397	apply (rule_tac exI[where x=U])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	398	apply (rule exI[where x="P"])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	399	apply (rule ext)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	400	apply (auto simp add: U)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	401	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	402	qed
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	403	then obtain U where "? Q. P = (\<lambda> x. (Elem x U \<longrightarrow> Q x))" ..
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	404	then obtain Q where UQ: "P = (\<lambda> x. (Elem x U \<longrightarrow> Q x))" ..
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	405	show ?thesis
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	406	apply (auto simp add: UQ)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	407	apply (rule cond_wf_Elem)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	408	apply (rule P_induct[simplified UQ])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	409	apply simp
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	410	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	411	qed
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	412
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	413	consts
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	414	nat2Nat :: "nat \<Rightarrow> ZF"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	415
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	416	primrec
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	417	nat2Nat_0[intro]: "nat2Nat 0 = Empty"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	418	nat2Nat_Suc[intro]: "nat2Nat (Suc n) = SucNat (nat2Nat n)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	419
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	420	constdefs
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	421	Nat2nat :: "ZF \<Rightarrow> nat"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	422	"Nat2nat == inv nat2Nat"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	423
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	424	lemma Elem_nat2Nat_inf[intro]: "Elem (nat2Nat n) Inf"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	425	apply (induct n)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	426	apply (simp_all add: Infinity)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	427	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	428
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	429	constdefs
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	430	Nat :: ZF
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	431	"Nat == Sep Inf (\<lambda> N. ? n. nat2Nat n = N)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	432
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	433	lemma Elem_nat2Nat_Nat[intro]: "Elem (nat2Nat n) Nat"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	434	by (auto simp add: Nat_def Sep)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	435
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	436	lemma Elem_Empty_Nat: "Elem Empty Nat"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	437	by (auto simp add: Nat_def Sep Infinity)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	438
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	439	lemma Elem_SucNat_Nat: "Elem N Nat \<Longrightarrow> Elem (SucNat N) Nat"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	440	by (auto simp add: Nat_def Sep Infinity)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	441
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	442	lemma no_infinite_Elem_down_chain:
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	443	"Not (? f. isFun f & Domain f = Nat & (! N. Elem N Nat \<longrightarrow> Elem (f\<acute>(SucNat N)) (f\<acute>N)))"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	444	proof -
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	445	{
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	446	fix f
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	447	assume f:"isFun f & Domain f = Nat & (! N. Elem N Nat \<longrightarrow> Elem (f\<acute>(SucNat N)) (f\<acute>N))"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	448	let ?r = "Range f"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	449	have "?r \<noteq> Empty"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	450	apply (auto simp add: Ext Empty)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	451	apply (rule exI[where x="f\<acute>Empty"])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	452	apply (rule fun_value_in_range)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	453	apply (auto simp add: f Elem_Empty_Nat)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	454	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	455	then have "? x. Elem x ?r & (! y. Elem y x \<longrightarrow> Not(Elem y ?r))"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	456	by (simp add: Regularity)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	457	then obtain x where x: "Elem x ?r & (! y. Elem y x \<longrightarrow> Not(Elem y ?r))" ..
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	458	then have "? N. Elem N (Domain f) & f\<acute>N = x"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	459	apply (rule_tac fun_range_witness)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	460	apply (simp_all add: f)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	461	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	462	then have "? N. Elem N Nat & f\<acute>N = x"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	463	by (simp add: f)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	464	then obtain N where N: "Elem N Nat & f\<acute>N = x" ..
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	465	from N have N': "Elem N Nat" by auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	466	let ?y = "f\<acute>(SucNat N)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	467	have Elem_y_r: "Elem ?y ?r"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	468	by (simp_all add: f Elem_SucNat_Nat N fun_value_in_range)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	469	have "Elem ?y (f\<acute>N)" by (auto simp add: f N')
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	470	then have "Elem ?y x" by (simp add: N)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	471	with x have "Not (Elem ?y ?r)" by auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	472	with Elem_y_r have "False" by auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	473	}
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	474	then show ?thesis by auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	475	qed
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	476
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	477	lemma Upair_nonEmpty: "Upair a b \<noteq> Empty"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	478	by (auto simp add: Ext Empty Upair)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	479
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	480	lemma Singleton_nonEmpty: "Singleton x \<noteq> Empty"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	481	by (auto simp add: Singleton_def Upair_nonEmpty)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	482
26304 02fbd0e7954a avoid rebinding of existing facts; wenzelm parents: 24784 diff changeset	483	lemma notsym_Elem: "Not(Elem a b & Elem b a)"
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	484	proof -
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	485	{
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	486	fix a b
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	487	assume ab: "Elem a b"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	488	assume ba: "Elem b a"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	489	let ?Z = "Upair a b"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	490	have "?Z \<noteq> Empty" by (simp add: Upair_nonEmpty)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	491	then have "? x. Elem x ?Z & (! y. Elem y x \<longrightarrow> Not(Elem y ?Z))"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	492	by (simp add: Regularity)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	493	then obtain x where x:"Elem x ?Z & (! y. Elem y x \<longrightarrow> Not(Elem y ?Z))" ..
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	494	then have "x = a \<or> x = b" by (simp add: Upair)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	495	moreover have "x = a \<longrightarrow> Not (Elem b ?Z)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	496	by (auto simp add: x ba)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	497	moreover have "x = b \<longrightarrow> Not (Elem a ?Z)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	498	by (auto simp add: x ab)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	499	ultimately have "False"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	500	by (auto simp add: Upair)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	501	}
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	502	then show ?thesis by auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	503	qed
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	504
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	505	lemma irreflexiv_Elem: "Not(Elem a a)"
26304 02fbd0e7954a avoid rebinding of existing facts; wenzelm parents: 24784 diff changeset	506	by (simp add: notsym_Elem[of a a, simplified])
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	507
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	508	lemma antisym_Elem: "Elem a b \<Longrightarrow> Not (Elem b a)"
26304 02fbd0e7954a avoid rebinding of existing facts; wenzelm parents: 24784 diff changeset	509	apply (insert notsym_Elem[of a b])
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	510	apply auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	511	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	512
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	513	consts
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	514	NatInterval :: "nat \<Rightarrow> nat \<Rightarrow> ZF"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	515
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	516	primrec
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	517	"NatInterval n 0 = Singleton (nat2Nat n)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	518	"NatInterval n (Suc m) = union (NatInterval n m) (Singleton (nat2Nat (n+m+1)))"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	519
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	520	lemma n_Elem_NatInterval[rule_format]: "! q. q <= m \<longrightarrow> Elem (nat2Nat (n+q)) (NatInterval n m)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	521	apply (induct m)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	522	apply (auto simp add: Singleton union)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	523	apply (case_tac "q <= m")
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	524	apply auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	525	apply (subgoal_tac "q = Suc m")
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	526	apply auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	527	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	528
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	529	lemma NatInterval_not_Empty: "NatInterval n m \<noteq> Empty"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	530	by (auto intro: n_Elem_NatInterval[where q = 0, simplified] simp add: Empty Ext)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	531
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	532	lemma increasing_nat2Nat[rule_format]: "0 < n \<longrightarrow> Elem (nat2Nat (n - 1)) (nat2Nat n)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	533	apply (case_tac "? m. n = Suc m")
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	534	apply (auto simp add: SucNat_def union Singleton)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	535	apply (drule spec[where x="n - 1"])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	536	apply arith
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	537	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	538
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	539	lemma represent_NatInterval[rule_format]: "Elem x (NatInterval n m) \<longrightarrow> (? u. n \<le> u & u \<le> n+m & nat2Nat u = x)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	540	apply (induct m)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	541	apply (auto simp add: Singleton union)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	542	apply (rule_tac x="Suc (n+m)" in exI)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	543	apply auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	544	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	545
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	546	lemma inj_nat2Nat: "inj nat2Nat"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	547	proof -
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	548	{
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	549	fix n m :: nat
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	550	assume nm: "nat2Nat n = nat2Nat (n+m)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	551	assume mg0: "0 < m"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	552	let ?Z = "NatInterval n m"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	553	have "?Z \<noteq> Empty" by (simp add: NatInterval_not_Empty)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	554	then have "? x. (Elem x ?Z) & (! y. Elem y x \<longrightarrow> Not (Elem y ?Z))"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	555	by (auto simp add: Regularity)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	556	then obtain x where x:"Elem x ?Z & (! y. Elem y x \<longrightarrow> Not (Elem y ?Z))" ..
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	557	then have "? u. n \<le> u & u \<le> n+m & nat2Nat u = x"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	558	by (simp add: represent_NatInterval)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	559	then obtain u where u: "n \<le> u & u \<le> n+m & nat2Nat u = x" ..
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	560	have "n < u \<longrightarrow> False"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	561	proof
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	562	assume n_less_u: "n < u"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	563	let ?y = "nat2Nat (u - 1)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	564	have "Elem ?y (nat2Nat u)"
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	565	apply (rule increasing_nat2Nat)
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	566	apply (insert n_less_u)
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	567	apply arith
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	568	done
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	569	with u have "Elem ?y x" by auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	570	with x have "Not (Elem ?y ?Z)" by auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	571	moreover have "Elem ?y ?Z"
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	572	apply (insert n_Elem_NatInterval[where q = "u - n - 1" and n=n and m=m])
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	573	apply (insert n_less_u)
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	574	apply (insert u)
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	575	apply auto
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	576	done
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	577	ultimately show False by auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	578	qed
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	579	moreover have "u = n \<longrightarrow> False"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	580	proof
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	581	assume "u = n"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	582	with u have "nat2Nat n = x" by auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	583	then have nm_eq_x: "nat2Nat (n+m) = x" by (simp add: nm)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	584	let ?y = "nat2Nat (n+m - 1)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	585	have "Elem ?y (nat2Nat (n+m))"
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	586	apply (rule increasing_nat2Nat)
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	587	apply (insert mg0)
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	588	apply arith
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	589	done
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	590	with nm_eq_x have "Elem ?y x" by auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	591	with x have "Not (Elem ?y ?Z)" by auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	592	moreover have "Elem ?y ?Z"
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	593	apply (insert n_Elem_NatInterval[where q = "m - 1" and n=n and m=m])
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	594	apply (insert mg0)
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	595	apply auto
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	596	done
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	597	ultimately show False by auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	598	qed
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	599	ultimately have "False" using u by arith
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	600	}
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	601	note lemma_nat2Nat = this
23315 df3a7e9ebadb tuned Proof chaieb parents: 22690 diff changeset	602	have th:"\<And>x y. \<not> (x < y \<and> (\<forall>(m\<Colon>nat). y \<noteq> x + m))" by presburger
df3a7e9ebadb tuned Proof chaieb parents: 22690 diff changeset	603	have th': "\<And>x y. \<not> (x \<noteq> y \<and> (\<not> x < y) \<and> (\<forall>(m\<Colon>nat). x \<noteq> y + m))" by presburger
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	604	show ?thesis
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	605	apply (auto simp add: inj_on_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	606	apply (case_tac "x = y")
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	607	apply auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	608	apply (case_tac "x < y")
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	609	apply (case_tac "? m. y = x + m & 0 < m")
23315 df3a7e9ebadb tuned Proof chaieb parents: 22690 diff changeset	610	apply (auto intro: lemma_nat2Nat)
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	611	apply (case_tac "y < x")
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	612	apply (case_tac "? m. x = y + m & 0 < m")
23315 df3a7e9ebadb tuned Proof chaieb parents: 22690 diff changeset	613	apply simp
df3a7e9ebadb tuned Proof chaieb parents: 22690 diff changeset	614	apply simp
df3a7e9ebadb tuned Proof chaieb parents: 22690 diff changeset	615	using th apply blast
df3a7e9ebadb tuned Proof chaieb parents: 22690 diff changeset	616	apply (case_tac "? m. x = y + m")
df3a7e9ebadb tuned Proof chaieb parents: 22690 diff changeset	617	apply (auto intro: lemma_nat2Nat)
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	618	apply (drule sym)
23315 df3a7e9ebadb tuned Proof chaieb parents: 22690 diff changeset	619	using lemma_nat2Nat apply blast
df3a7e9ebadb tuned Proof chaieb parents: 22690 diff changeset	620	using th' apply blast
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	621	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	622	qed
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	623
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	624	lemma Nat2nat_nat2Nat[simp]: "Nat2nat (nat2Nat n) = n"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	625	by (simp add: Nat2nat_def inv_f_f[OF inj_nat2Nat])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	626
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	627	lemma nat2Nat_Nat2nat[simp]: "Elem n Nat \<Longrightarrow> nat2Nat (Nat2nat n) = n"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	628	apply (simp add: Nat2nat_def)
33057 764547b68538 inv_onto -> inv_into nipkow parents: 32989 diff changeset	629	apply (rule_tac f_inv_into_f)
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	630	apply (auto simp add: image_def Nat_def Sep)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	631	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	632
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	633	lemma Nat2nat_SucNat: "Elem N Nat \<Longrightarrow> Nat2nat (SucNat N) = Suc (Nat2nat N)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	634	apply (auto simp add: Nat_def Sep Nat2nat_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	635	apply (auto simp add: inv_f_f[OF inj_nat2Nat])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	636	apply (simp only: nat2Nat.simps[symmetric])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	637	apply (simp only: inv_f_f[OF inj_nat2Nat])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	638	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	639
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	640
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	641	(*lemma Elem_induct: "(\<And>x. \<forall>y. Elem y x \<longrightarrow> P y \<Longrightarrow> P x) \<Longrightarrow> P a"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	642	by (erule wf_induct[OF wf_is_Elem_of, simplified is_Elem_of_def, simplified])*)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	643
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	644	lemma Elem_Opair_exists: "? z. Elem x z & Elem y z & Elem z (Opair x y)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	645	apply (rule exI[where x="Upair x y"])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	646	by (simp add: Upair Opair_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	647
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	648	lemma UNIV_is_not_in_ZF: "UNIV \<noteq> explode R"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	649	proof
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	650	let ?Russell = "{ x. Not(Elem x x) }"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	651	have "?Russell = UNIV" by (simp add: irreflexiv_Elem)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	652	moreover assume "UNIV = explode R"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	653	ultimately have russell: "?Russell = explode R" by simp
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	654	then show "False"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	655	proof(cases "Elem R R")
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	656	case True
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	657	then show ?thesis
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	658	by (insert irreflexiv_Elem, auto)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	659	next
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	660	case False
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	661	then have "R \<in> ?Russell" by auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	662	then have "Elem R R" by (simp add: russell explode_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	663	with False show ?thesis by auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	664	qed
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	665	qed
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	666
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	667	constdefs
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	668	SpecialR :: "(ZF * ZF) set"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	669	"SpecialR \<equiv> { (x, y) . x \<noteq> Empty \<and> y = Empty}"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	670
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	671	lemma "wf SpecialR"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	672	apply (subst wf_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	673	apply (auto simp add: SpecialR_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	674	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	675
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	676	constdefs
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	677	Ext :: "('a * 'b) set \<Rightarrow> 'b \<Rightarrow> 'a set"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	678	"Ext R y \<equiv> { x . (x, y) \<in> R }"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	679
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	680	lemma Ext_Elem: "Ext is_Elem_of = explode"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	681	by (auto intro: ext simp add: Ext_def is_Elem_of_def explode_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	682
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	683	lemma "Ext SpecialR Empty \<noteq> explode z"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	684	proof
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	685	have "Ext SpecialR Empty = UNIV - {Empty}"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	686	by (auto simp add: Ext_def SpecialR_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	687	moreover assume "Ext SpecialR Empty = explode z"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	688	ultimately have "UNIV = explode(union z (Singleton Empty)) "
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	689	by (auto simp add: explode_def union Singleton)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	690	then show "False" by (simp add: UNIV_is_not_in_ZF)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	691	qed
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	692
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	693	constdefs
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	694	implode :: "ZF set \<Rightarrow> ZF"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	695	"implode == inv explode"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	696
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	697	lemma inj_explode: "inj explode"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	698	by (auto simp add: inj_on_def explode_def Ext)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	699
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	700	lemma implode_explode[simp]: "implode (explode x) = x"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	701	by (simp add: implode_def inj_explode)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	702
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	703	constdefs
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	704	regular :: "(ZF * ZF) set \<Rightarrow> bool"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	705	"regular R == ! A. A \<noteq> Empty \<longrightarrow> (? x. Elem x A & (! y. (y, x) \<in> R \<longrightarrow> Not (Elem y A)))"
20565 4440dd392048 replaced implodeable_Ext by set_like obua parents: 20217 diff changeset	706	set_like :: "(ZF * ZF) set \<Rightarrow> bool"
4440dd392048 replaced implodeable_Ext by set_like obua parents: 20217 diff changeset	707	"set_like R == ! y. Ext R y \<in> range explode"
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	708	wfzf :: "(ZF * ZF) set \<Rightarrow> bool"
20565 4440dd392048 replaced implodeable_Ext by set_like obua parents: 20217 diff changeset	709	"wfzf R == regular R & set_like R"
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	710
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	711	lemma regular_Elem: "regular is_Elem_of"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	712	by (simp add: regular_def is_Elem_of_def Regularity)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	713
20565 4440dd392048 replaced implodeable_Ext by set_like obua parents: 20217 diff changeset	714	lemma set_like_Elem: "set_like is_Elem_of"
4440dd392048 replaced implodeable_Ext by set_like obua parents: 20217 diff changeset	715	by (auto simp add: set_like_def image_def Ext_Elem)
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	716
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	717	lemma wfzf_is_Elem_of: "wfzf is_Elem_of"
20565 4440dd392048 replaced implodeable_Ext by set_like obua parents: 20217 diff changeset	718	by (auto simp add: wfzf_def regular_Elem set_like_Elem)
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	719
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	720	constdefs
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	721	SeqSum :: "(nat \<Rightarrow> ZF) \<Rightarrow> ZF"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	722	"SeqSum f == Sum (Repl Nat (f o Nat2nat))"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	723
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	724	lemma SeqSum: "Elem x (SeqSum f) = (? n. Elem x (f n))"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	725	apply (auto simp add: SeqSum_def Sum Repl)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	726	apply (rule_tac x = "f n" in exI)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	727	apply auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	728	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	729
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	730	constdefs
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	731	Ext_ZF :: "(ZF * ZF) set \<Rightarrow> ZF \<Rightarrow> ZF"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	732	"Ext_ZF R s == implode (Ext R s)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	733
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	734	lemma Elem_implode: "A \<in> range explode \<Longrightarrow> Elem x (implode A) = (x \<in> A)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	735	apply (auto)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	736	apply (simp_all add: explode_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	737	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	738
20565 4440dd392048 replaced implodeable_Ext by set_like obua parents: 20217 diff changeset	739	lemma Elem_Ext_ZF: "set_like R \<Longrightarrow> Elem x (Ext_ZF R s) = ((x,s) \<in> R)"
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	740	apply (simp add: Ext_ZF_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	741	apply (subst Elem_implode)
20565 4440dd392048 replaced implodeable_Ext by set_like obua parents: 20217 diff changeset	742	apply (simp add: set_like_def)
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	743	apply (simp add: Ext_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	744	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	745
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	746	consts
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	747	Ext_ZF_n :: "(ZF * ZF) set \<Rightarrow> ZF \<Rightarrow> nat \<Rightarrow> ZF"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	748
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	749	primrec
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	750	"Ext_ZF_n R s 0 = Ext_ZF R s"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	751	"Ext_ZF_n R s (Suc n) = Sum (Repl (Ext_ZF_n R s n) (Ext_ZF R))"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	752
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	753	constdefs
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	754	Ext_ZF_hull :: "(ZF * ZF) set \<Rightarrow> ZF \<Rightarrow> ZF"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	755	"Ext_ZF_hull R s == SeqSum (Ext_ZF_n R s)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	756
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	757	lemma Elem_Ext_ZF_hull:
20565 4440dd392048 replaced implodeable_Ext by set_like obua parents: 20217 diff changeset	758	assumes set_like_R: "set_like R"
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	759	shows "Elem x (Ext_ZF_hull R S) = (? n. Elem x (Ext_ZF_n R S n))"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	760	by (simp add: Ext_ZF_hull_def SeqSum)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	761
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	762	lemma Elem_Elem_Ext_ZF_hull:
20565 4440dd392048 replaced implodeable_Ext by set_like obua parents: 20217 diff changeset	763	assumes set_like_R: "set_like R"
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	764	and x_hull: "Elem x (Ext_ZF_hull R S)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	765	and y_R_x: "(y, x) \<in> R"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	766	shows "Elem y (Ext_ZF_hull R S)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	767	proof -
20565 4440dd392048 replaced implodeable_Ext by set_like obua parents: 20217 diff changeset	768	from Elem_Ext_ZF_hull[OF set_like_R] x_hull
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	769	have "? n. Elem x (Ext_ZF_n R S n)" by auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	770	then obtain n where n:"Elem x (Ext_ZF_n R S n)" ..
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	771	with y_R_x have "Elem y (Ext_ZF_n R S (Suc n))"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	772	apply (auto simp add: Repl Sum)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	773	apply (rule_tac x="Ext_ZF R x" in exI)
20565 4440dd392048 replaced implodeable_Ext by set_like obua parents: 20217 diff changeset	774	apply (auto simp add: Elem_Ext_ZF[OF set_like_R])
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	775	done
20565 4440dd392048 replaced implodeable_Ext by set_like obua parents: 20217 diff changeset	776	with Elem_Ext_ZF_hull[OF set_like_R, where x=y] show ?thesis
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	777	by (auto simp del: Ext_ZF_n.simps)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	778	qed
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	779
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	780	lemma wfzf_minimal:
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	781	assumes hyps: "wfzf R" "C \<noteq> {}"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	782	shows "\<exists>x. x \<in> C \<and> (\<forall>y. (y, x) \<in> R \<longrightarrow> y \<notin> C)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	783	proof -
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	784	from hyps have "\<exists>S. S \<in> C" by auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	785	then obtain S where S:"S \<in> C" by auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	786	let ?T = "Sep (Ext_ZF_hull R S) (\<lambda> s. s \<in> C)"
20565 4440dd392048 replaced implodeable_Ext by set_like obua parents: 20217 diff changeset	787	from hyps have set_like_R: "set_like R" by (simp add: wfzf_def)
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	788	show ?thesis
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	789	proof (cases "?T = Empty")
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	790	case True
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	791	then have "\<forall> z. \<not> (Elem z (Sep (Ext_ZF R S) (\<lambda> s. s \<in> C)))"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	792	apply (auto simp add: Ext Empty Sep Ext_ZF_hull_def SeqSum)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	793	apply (erule_tac x="z" in allE, auto)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	794	apply (erule_tac x=0 in allE, auto)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	795	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	796	then show ?thesis
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	797	apply (rule_tac exI[where x=S])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	798	apply (auto simp add: Sep Empty S)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	799	apply (erule_tac x=y in allE)
20565 4440dd392048 replaced implodeable_Ext by set_like obua parents: 20217 diff changeset	800	apply (simp add: set_like_R Elem_Ext_ZF)
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	801	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	802	next
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	803	case False
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	804	from hyps have regular_R: "regular R" by (simp add: wfzf_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	805	from
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	806	regular_R[simplified regular_def, rule_format, OF False, simplified Sep]
20565 4440dd392048 replaced implodeable_Ext by set_like obua parents: 20217 diff changeset	807	Elem_Elem_Ext_ZF_hull[OF set_like_R]
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	808	show ?thesis by blast
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	809	qed
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	810	qed
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	811
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	812	lemma wfzf_implies_wf: "wfzf R \<Longrightarrow> wf R"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	813	proof (subst wf_def, rule allI)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	814	assume wfzf: "wfzf R"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	815	fix P :: "ZF \<Rightarrow> bool"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	816	let ?C = "{x. P x}"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	817	{
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	818	assume induct: "(\<forall>x. (\<forall>y. (y, x) \<in> R \<longrightarrow> P y) \<longrightarrow> P x)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	819	let ?C = "{x. \<not> (P x)}"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	820	have "?C = {}"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	821	proof (rule ccontr)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	822	assume C: "?C \<noteq> {}"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	823	from
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	824	wfzf_minimal[OF wfzf C]
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	825	obtain x where x: "x \<in> ?C \<and> (\<forall>y. (y, x) \<in> R \<longrightarrow> y \<notin> ?C)" ..
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	826	then have "P x"
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	827	apply (rule_tac induct[rule_format])
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	828	apply auto
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 26304 diff changeset	829	done
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	830	with x show "False" by auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	831	qed
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	832	then have "! x. P x" by auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	833	}
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	834	then show "(\<forall>x. (\<forall>y. (y, x) \<in> R \<longrightarrow> P y) \<longrightarrow> P x) \<longrightarrow> (! x. P x)" by blast
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	835	qed
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	836
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	837	lemma wf_is_Elem_of: "wf is_Elem_of"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	838	by (auto simp add: wfzf_is_Elem_of wfzf_implies_wf)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	839
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	840	lemma in_Ext_RTrans_implies_Elem_Ext_ZF_hull:
20565 4440dd392048 replaced implodeable_Ext by set_like obua parents: 20217 diff changeset	841	"set_like R \<Longrightarrow> x \<in> (Ext (R^+) s) \<Longrightarrow> Elem x (Ext_ZF_hull R s)"
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	842	apply (simp add: Ext_def Elem_Ext_ZF_hull)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	843	apply (erule converse_trancl_induct[where r="R"])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	844	apply (rule exI[where x=0])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	845	apply (simp add: Elem_Ext_ZF)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	846	apply auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	847	apply (rule_tac x="Suc n" in exI)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	848	apply (simp add: Sum Repl)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	849	apply (rule_tac x="Ext_ZF R z" in exI)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	850	apply (auto simp add: Elem_Ext_ZF)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	851	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	852
20565 4440dd392048 replaced implodeable_Ext by set_like obua parents: 20217 diff changeset	853	lemma implodeable_Ext_trancl: "set_like R \<Longrightarrow> set_like (R^+)"
4440dd392048 replaced implodeable_Ext by set_like obua parents: 20217 diff changeset	854	apply (subst set_like_def)
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	855	apply (auto simp add: image_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	856	apply (rule_tac x="Sep (Ext_ZF_hull R y) (\<lambda> z. z \<in> (Ext (R^+) y))" in exI)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	857	apply (auto simp add: explode_def Sep set_ext
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	858	in_Ext_RTrans_implies_Elem_Ext_ZF_hull)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	859	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	860
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	861	lemma Elem_Ext_ZF_hull_implies_in_Ext_RTrans[rule_format]:
20565 4440dd392048 replaced implodeable_Ext by set_like obua parents: 20217 diff changeset	862	"set_like R \<Longrightarrow> ! x. Elem x (Ext_ZF_n R s n) \<longrightarrow> x \<in> (Ext (R^+) s)"
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	863	apply (induct_tac n)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	864	apply (auto simp add: Elem_Ext_ZF Ext_def Sum Repl)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	865	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	866
20565 4440dd392048 replaced implodeable_Ext by set_like obua parents: 20217 diff changeset	867	lemma "set_like R \<Longrightarrow> Ext_ZF (R^+) s = Ext_ZF_hull R s"
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	868	apply (frule implodeable_Ext_trancl)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	869	apply (auto simp add: Ext)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	870	apply (erule in_Ext_RTrans_implies_Elem_Ext_ZF_hull)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	871	apply (simp add: Elem_Ext_ZF Ext_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	872	apply (auto simp add: Elem_Ext_ZF Elem_Ext_ZF_hull)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	873	apply (erule Elem_Ext_ZF_hull_implies_in_Ext_RTrans[simplified Ext_def, simplified], assumption)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	874	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	875
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	876	lemma wf_implies_regular: "wf R \<Longrightarrow> regular R"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	877	proof (simp add: regular_def, rule allI)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	878	assume wf: "wf R"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	879	fix A
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	880	show "A \<noteq> Empty \<longrightarrow> (\<exists>x. Elem x A \<and> (\<forall>y. (y, x) \<in> R \<longrightarrow> \<not> Elem y A))"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	881	proof
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	882	assume A: "A \<noteq> Empty"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	883	then have "? x. x \<in> explode A"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	884	by (auto simp add: explode_def Ext Empty)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	885	then obtain x where x:"x \<in> explode A" ..
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	886	from iffD1[OF wf_eq_minimal wf, rule_format, where Q="explode A", OF x]
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	887	obtain z where "z \<in> explode A \<and> (\<forall>y. (y, z) \<in> R \<longrightarrow> y \<notin> explode A)" by auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	888	then show "\<exists>x. Elem x A \<and> (\<forall>y. (y, x) \<in> R \<longrightarrow> \<not> Elem y A)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	889	apply (rule_tac exI[where x = z])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	890	apply (simp add: explode_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	891	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	892	qed
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	893	qed
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	894
20565 4440dd392048 replaced implodeable_Ext by set_like obua parents: 20217 diff changeset	895	lemma wf_eq_wfzf: "(wf R \<and> set_like R) = wfzf R"
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	896	apply (auto simp add: wfzf_implies_wf)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	897	apply (auto simp add: wfzf_def wf_implies_regular)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	898	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	899
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	900	lemma wfzf_trancl: "wfzf R \<Longrightarrow> wfzf (R^+)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	901	by (auto simp add: wf_eq_wfzf[symmetric] implodeable_Ext_trancl wf_trancl)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	902
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	903	lemma Ext_subset_mono: "R \<subseteq> S \<Longrightarrow> Ext R y \<subseteq> Ext S y"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	904	by (auto simp add: Ext_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	905
20565 4440dd392048 replaced implodeable_Ext by set_like obua parents: 20217 diff changeset	906	lemma set_like_subset: "set_like R \<Longrightarrow> S \<subseteq> R \<Longrightarrow> set_like S"
4440dd392048 replaced implodeable_Ext by set_like obua parents: 20217 diff changeset	907	apply (auto simp add: set_like_def)
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	908	apply (erule_tac x=y in allE)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	909	apply (drule_tac y=y in Ext_subset_mono)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	910	apply (auto simp add: image_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	911	apply (rule_tac x="Sep x (% z. z \<in> (Ext S y))" in exI)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	912	apply (auto simp add: explode_def Sep)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	913	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	914
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	915	lemma wfzf_subset: "wfzf S \<Longrightarrow> R \<subseteq> S \<Longrightarrow> wfzf R"
20565 4440dd392048 replaced implodeable_Ext by set_like obua parents: 20217 diff changeset	916	by (auto intro: set_like_subset wf_subset simp add: wf_eq_wfzf[symmetric])
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	917
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	918	end

author	nipkow
	Thu, 22 Oct 2009 09:27:48 +0200
changeset 33057	764547b68538
parent 32989	c28279b29ff1
child 35416	d8d7d1b785af
permissions	-rw-r--r--