isabelle: src/HOL/ZF/Zet.thy@bdc2c6b40bf2 (annotated)

19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	1	(* Title: HOL/ZF/Zet.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
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	4	Introduces a type 'a zet of ZF representable sets.
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	5	See "Partizan Games in Isabelle/HOLZF", available from http://www4.in.tum.de/~obua/partizan
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 Zet
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	9	imports HOLZF
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	10	begin
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	11
45694 4a8743618257 prefer typedef without extra definition and alternative name; wenzelm parents: 44011 diff changeset	12	definition "zet = {A :: 'a set \| A f z. inj_on f A \<and> f ` A \<subseteq> explode z}"
4a8743618257 prefer typedef without extra definition and alternative name; wenzelm parents: 44011 diff changeset	13
49834 b27bbb021df1 discontinued obsolete typedef (open) syntax; wenzelm parents: 45694 diff changeset	14	typedef 'a zet = "zet :: 'a set set"
45694 4a8743618257 prefer typedef without extra definition and alternative name; wenzelm parents: 44011 diff changeset	15	unfolding zet_def by blast
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	16
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 33057 diff changeset	17	definition zin :: "'a \<Rightarrow> 'a zet \<Rightarrow> bool" where
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	18	"zin x A == x \<in> (Rep_zet A)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	19
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	20	lemma zet_ext_eq: "(A = B) = (! x. zin x A = zin x B)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	21	by (auto simp add: Rep_zet_inject[symmetric] zin_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	22
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 33057 diff changeset	23	definition zimage :: "('a \<Rightarrow> 'b) \<Rightarrow> 'a zet \<Rightarrow> 'b zet" where
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	24	"zimage f A == Abs_zet (image f (Rep_zet A))"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	25
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	26	lemma zet_def': "zet = {A :: 'a set \| A f z. inj_on f A \<and> f ` A = explode z}"
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 35502 diff changeset	27	apply (rule set_eqI)
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	28	apply (auto simp add: zet_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	29	apply (rule_tac x=f in exI)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	30	apply auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	31	apply (rule_tac x="Sep z (\<lambda> y. y \<in> (f ` x))" in exI)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	32	apply (auto simp add: explode_def Sep)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	33	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	34
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	35	lemma image_zet_rep: "A \<in> zet \<Longrightarrow> ? z . g ` A = explode z"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	36	apply (auto simp add: zet_def')
33057 764547b68538 inv_onto -> inv_into nipkow parents: 32988 diff changeset	37	apply (rule_tac x="Repl z (g o (inv_into A f))" in exI)
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	38	apply (simp add: explode_Repl_eq)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	39	apply (subgoal_tac "explode z = f ` A")
56154 f0a927235162 more complete set of lemmas wrt. image and composition haftmann parents: 49834 diff changeset	40	apply (simp_all add: image_comp [symmetric])
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	41	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	42
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	43	lemma zet_image_mem:
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	44	assumes Azet: "A \<in> zet"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	45	shows "g ` A \<in> zet"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	46	proof -
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	47	from Azet have "? (f :: _ \<Rightarrow> ZF). inj_on f A"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	48	by (auto simp add: zet_def')
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	49	then obtain f where injf: "inj_on (f :: _ \<Rightarrow> ZF) A"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	50	by auto
33057 764547b68538 inv_onto -> inv_into nipkow parents: 32988 diff changeset	51	let ?w = "f o (inv_into A g)"
764547b68538 inv_onto -> inv_into nipkow parents: 32988 diff changeset	52	have subset: "(inv_into A g) ` (g ` A) \<subseteq> A"
764547b68538 inv_onto -> inv_into nipkow parents: 32988 diff changeset	53	by (auto simp add: inv_into_into)
764547b68538 inv_onto -> inv_into nipkow parents: 32988 diff changeset	54	have "inj_on (inv_into A g) (g ` A)" by (simp add: inj_on_inv_into)
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	55	then have injw: "inj_on ?w (g ` A)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	56	apply (rule comp_inj_on)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	57	apply (rule subset_inj_on[where B=A])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	58	apply (auto simp add: subset injf)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	59	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	60	show ?thesis
56154 f0a927235162 more complete set of lemmas wrt. image and composition haftmann parents: 49834 diff changeset	61	apply (simp add: zet_def' image_comp)
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	62	apply (rule exI[where x="?w"])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	63	apply (simp add: injw image_zet_rep Azet)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	64	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	65	qed
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	66
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	67	lemma Rep_zimage_eq: "Rep_zet (zimage f A) = image f (Rep_zet A)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	68	apply (simp add: zimage_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	69	apply (subst Abs_zet_inverse)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	70	apply (simp_all add: Rep_zet zet_image_mem)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	71	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	72
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	73	lemma zimage_iff: "zin y (zimage f A) = (? x. zin x A & y = f x)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	74	by (auto simp add: zin_def Rep_zimage_eq)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	75
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 33057 diff changeset	76	definition zimplode :: "ZF zet \<Rightarrow> ZF" where
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	77	"zimplode A == implode (Rep_zet A)"
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 33057 diff changeset	78
d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 33057 diff changeset	79	definition zexplode :: "ZF \<Rightarrow> ZF zet" where
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	80	"zexplode z == Abs_zet (explode z)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	81
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	82	lemma Rep_zet_eq_explode: "? z. Rep_zet A = explode z"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	83	by (rule image_zet_rep[where g="\<lambda> x. x",OF Rep_zet, simplified])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	84
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	85	lemma zexplode_zimplode: "zexplode (zimplode A) = A"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	86	apply (simp add: zimplode_def zexplode_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	87	apply (simp add: implode_def)
33057 764547b68538 inv_onto -> inv_into nipkow parents: 32988 diff changeset	88	apply (subst f_inv_into_f[where y="Rep_zet A"])
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	89	apply (auto simp add: Rep_zet_inverse Rep_zet_eq_explode image_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	90	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	91
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	92	lemma explode_mem_zet: "explode z \<in> zet"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	93	apply (simp add: zet_def')
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	94	apply (rule_tac x="% x. x" in exI)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	95	apply (auto simp add: inj_on_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	96	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	97
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	98	lemma zimplode_zexplode: "zimplode (zexplode z) = z"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	99	apply (simp add: zimplode_def zexplode_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	100	apply (subst Abs_zet_inverse)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	101	apply (auto simp add: explode_mem_zet implode_explode)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	102	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	103
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	104	lemma zin_zexplode_eq: "zin x (zexplode A) = Elem x A"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	105	apply (simp add: zin_def zexplode_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	106	apply (subst Abs_zet_inverse)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	107	apply (simp_all add: explode_Elem explode_mem_zet)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	108	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	109
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	110	lemma comp_zimage_eq: "zimage g (zimage f A) = zimage (g o f) A"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	111	apply (simp add: zimage_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	112	apply (subst Abs_zet_inverse)
56154 f0a927235162 more complete set of lemmas wrt. image and composition haftmann parents: 49834 diff changeset	113	apply (simp_all add: image_comp zet_image_mem Rep_zet)
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	114	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	115
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 33057 diff changeset	116	definition zunion :: "'a zet \<Rightarrow> 'a zet \<Rightarrow> 'a zet" where
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	117	"zunion a b \<equiv> Abs_zet ((Rep_zet a) \<union> (Rep_zet b))"
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 33057 diff changeset	118
d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 33057 diff changeset	119	definition zsubset :: "'a zet \<Rightarrow> 'a zet \<Rightarrow> bool" where
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	120	"zsubset a b \<equiv> ! x. zin x a \<longrightarrow> zin x b"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	121
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	122	lemma explode_union: "explode (union a b) = (explode a) \<union> (explode b)"
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 35502 diff changeset	123	apply (rule set_eqI)
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	124	apply (simp add: explode_def union)
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	lemma Rep_zet_zunion: "Rep_zet (zunion a b) = (Rep_zet a) \<union> (Rep_zet b)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	128	proof -
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	129	from Rep_zet[of a] have "? f z. inj_on f (Rep_zet a) \<and> f ` (Rep_zet a) = explode z"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	130	by (auto simp add: zet_def')
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	131	then obtain fa za where a:"inj_on fa (Rep_zet a) \<and> fa ` (Rep_zet a) = explode za"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	132	by blast
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	133	from a have fa: "inj_on fa (Rep_zet a)" by blast
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	134	from a have za: "fa ` (Rep_zet a) = explode za" by blast
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	135	from Rep_zet[of b] have "? f z. inj_on f (Rep_zet b) \<and> f ` (Rep_zet b) = explode z"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	136	by (auto simp add: zet_def')
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	137	then obtain fb zb where b:"inj_on fb (Rep_zet b) \<and> fb ` (Rep_zet b) = explode zb"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	138	by blast
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	139	from b have fb: "inj_on fb (Rep_zet b)" by blast
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	140	from b have zb: "fb ` (Rep_zet b) = explode zb" by blast
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	141	let ?f = "(\<lambda> x. if x \<in> (Rep_zet a) then Opair (fa x) (Empty) else Opair (fb x) (Singleton Empty))"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	142	let ?z = "CartProd (union za zb) (Upair Empty (Singleton Empty))"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	143	have se: "Singleton Empty \<noteq> Empty"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	144	apply (auto simp add: Ext Singleton)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	145	apply (rule exI[where x=Empty])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	146	apply (simp add: Empty)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	147	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	148	show ?thesis
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	149	apply (simp add: zunion_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	150	apply (subst Abs_zet_inverse)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	151	apply (auto simp add: zet_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	152	apply (rule exI[where x = ?f])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	153	apply (rule conjI)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	154	apply (auto simp add: inj_on_def Opair inj_onD[OF fa] inj_onD[OF fb] se se[symmetric])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	155	apply (rule exI[where x = ?z])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	156	apply (insert za zb)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	157	apply (auto simp add: explode_def CartProd union Upair Opair)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	158	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	159	qed
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	160
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	161	lemma zunion: "zin x (zunion a b) = ((zin x a) \<or> (zin x b))"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	162	by (auto simp add: zin_def Rep_zet_zunion)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	163
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	164	lemma zimage_zexplode_eq: "zimage f (zexplode z) = zexplode (Repl z f)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	165	by (simp add: zet_ext_eq zin_zexplode_eq Repl zimage_iff)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	166
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	167	lemma range_explode_eq_zet: "range explode = zet"
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 35502 diff changeset	168	apply (rule set_eqI)
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	169	apply (auto simp add: explode_mem_zet)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	170	apply (drule image_zet_rep)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	171	apply (simp add: image_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	172	apply auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	173	apply (rule_tac x=z in exI)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	174	apply auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	175	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	176
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	177	lemma Elem_zimplode: "(Elem x (zimplode z)) = (zin x z)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	178	apply (simp add: zimplode_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	179	apply (subst Elem_implode)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	180	apply (simp_all add: zin_def Rep_zet range_explode_eq_zet)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	181	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	182
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 33057 diff changeset	183	definition zempty :: "'a zet" where
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	184	"zempty \<equiv> Abs_zet {}"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	185
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	186	lemma zempty[simp]: "\<not> (zin x zempty)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	187	by (auto simp add: zin_def zempty_def Abs_zet_inverse zet_def)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	188
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	189	lemma zimage_zempty[simp]: "zimage f zempty = zempty"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	190	by (auto simp add: zet_ext_eq zimage_iff)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	191
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	192	lemma zunion_zempty_left[simp]: "zunion zempty a = a"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	193	by (simp add: zet_ext_eq zunion)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	194
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	195	lemma zunion_zempty_right[simp]: "zunion a zempty = a"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	196	by (simp add: zet_ext_eq zunion)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	197
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	198	lemma zimage_id[simp]: "zimage id A = A"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	199	by (simp add: zet_ext_eq zimage_iff)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	200
44011 f67c93f52d13 eliminated obsolete recdef/wfrec related declarations krauss parents: 39302 diff changeset	201	lemma zimage_cong[fundef_cong]: "\<lbrakk> M = N; !! x. zin x N \<Longrightarrow> f x = g x \<rbrakk> \<Longrightarrow> zimage f M = zimage g N"
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	202	by (auto simp add: zet_ext_eq zimage_iff)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	203
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	204	end

author	haftmann
	Sat, 05 Jul 2014 11:01:53 +0200
changeset 57514	bdc2c6b40bf2
parent 56154	f0a927235162
child 67613	ce654b0e6d69
permissions	-rw-r--r--