isabelle: src/ZF/AC/AC17_AC1.thy@6142b282b164 (annotated)

41777 1f7cbe39d425 more precise headers; wenzelm parents: 32960 diff changeset	1	(* Title: ZF/AC/AC17_AC1.thy
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	2	Author: Krzysztof Grabczewski
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	3
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	4	The equivalence of AC0, AC1 and AC17
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	5
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	6	Also, the proofs needed to show that each of AC2, AC3, ..., AC6 is equivalent
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	7	to AC0 and AC1.
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	8	*)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	9
27678 85ea2be46c71 dropped locale (open) haftmann parents: 16417 diff changeset	10	theory AC17_AC1
85ea2be46c71 dropped locale (open) haftmann parents: 16417 diff changeset	11	imports HH
85ea2be46c71 dropped locale (open) haftmann parents: 16417 diff changeset	12	begin
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	13
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	14
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	15	(** AC0 is equivalent to AC1.
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	16	AC0 comes from Suppes, AC1 from Rubin & Rubin **)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	17
14171 0cab06e3bbd0 Extended the notion of letter and digit, such that now one may use greek, skalberg parents: 13535 diff changeset	18	lemma AC0_AC1_lemma: "[\| f:(\<Pi> X \<in> A. X); D \<subseteq> A \|] ==> \<exists>g. g:(\<Pi> X \<in> D. X)"
12891 92af5c3a10fb a new definition of "restrict" paulson parents: 12776 diff changeset	19	by (fast intro!: lam_type apply_type)
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	20
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	21	lemma AC0_AC1: "AC0 ==> AC1"
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	22	apply (unfold AC0_def AC1_def)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	23	apply (blast intro: AC0_AC1_lemma)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	24	done
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	25
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	26	lemma AC1_AC0: "AC1 ==> AC0"
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	27	by (unfold AC0_def AC1_def, blast)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	28
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	29
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	30	(** The proof of AC1 ==> AC17 **)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	31
14171 0cab06e3bbd0 Extended the notion of letter and digit, such that now one may use greek, skalberg parents: 13535 diff changeset	32	lemma AC1_AC17_lemma: "f \<in> (\<Pi> X \<in> Pow(A) - {0}. X) ==> f \<in> (Pow(A) - {0} -> A)"
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	33	apply (rule Pi_type, assumption)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	34	apply (drule apply_type, assumption, fast)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	35	done
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	36
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	37	lemma AC1_AC17: "AC1 ==> AC17"
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	38	apply (unfold AC1_def AC17_def)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	39	apply (rule allI)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	40	apply (rule ballI)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	41	apply (erule_tac x = "Pow (A) -{0}" in allE)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	42	apply (erule impE, fast)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	43	apply (erule exE)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	44	apply (rule bexI)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	45	apply (erule_tac [2] AC1_AC17_lemma)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	46	apply (rule apply_type, assumption)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	47	apply (fast dest!: AC1_AC17_lemma elim!: apply_type)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	48	done
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	49
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	50
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	51	(** The proof of AC17 ==> AC1 **)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	52
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	53	(* *********************************************************************** *)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	54	(* more properties of HH *)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	55	(* *********************************************************************** *)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	56
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	57	lemma UN_eq_imp_well_ord:
61394 6142b282b164 tuned syntax -- more symbols; wenzelm parents: 46822 diff changeset	58	"[\| x - (\<Union>j \<in> \<mu> i. HH(\<lambda>X \<in> Pow(x)-{0}. {f`X}, x, i) = {x}.
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	59	HH(\<lambda>X \<in> Pow(x)-{0}. {f`X}, x, j)) = 0;
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	60	f \<in> Pow(x)-{0} -> x \|]
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	61	==> \<exists>r. well_ord(x,r)"
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	62	apply (rule exI)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	63	apply (erule well_ord_rvimage
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	64	[OF bij_Least_HH_x [THEN bij_converse_bij, THEN bij_is_inj]
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	65	Ord_Least [THEN well_ord_Memrel]], assumption)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	66	done
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	67
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	68	(* *********************************************************************** *)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	69	(* theorems closer to the proof *)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	70	(* *********************************************************************** *)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	71
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	72	lemma not_AC1_imp_ex:
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	73	"~AC1 ==> \<exists>A. \<forall>f \<in> Pow(A)-{0} -> A. \<exists>u \<in> Pow(A)-{0}. f`u \<notin> u"
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	74	apply (unfold AC1_def)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	75	apply (erule swap)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	76	apply (rule allI)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	77	apply (erule swap)
46822 95f1e700b712 mathematical symbols for Isabelle/ZF example theories paulson parents: 41777 diff changeset	78	apply (rule_tac x = "\<Union>(A)" in exI)
12891 92af5c3a10fb a new definition of "restrict" paulson parents: 12776 diff changeset	79	apply (blast intro: lam_type)
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	80	done
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	81
13535 007559e981c7 * empty log message * wenzelm parents: 13339 diff changeset	82	lemma AC17_AC1_aux1:
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	83	"[\| \<forall>f \<in> Pow(x) - {0} -> x. \<exists>u \<in> Pow(x) - {0}. f`u\<notin>u;
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	84	\<exists>f \<in> Pow(x)-{0}->x.
61394 6142b282b164 tuned syntax -- more symbols; wenzelm parents: 46822 diff changeset	85	x - (\<Union>a \<in> (\<mu> i. HH(\<lambda>X \<in> Pow(x)-{0}. {f`X},x,i)={x}).
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	86	HH(\<lambda>X \<in> Pow(x)-{0}. {f`X},x,a)) = 0 \|]
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	87	==> P"
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	88	apply (erule bexE)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	89	apply (erule UN_eq_imp_well_ord [THEN exE], assumption)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	90	apply (erule ex_choice_fun_Pow [THEN exE])
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	91	apply (erule ballE)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	92	apply (fast intro: apply_type del: DiffE)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	93	apply (erule notE)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	94	apply (rule Pi_type, assumption)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	95	apply (blast dest: apply_type)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	96	done
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	97
13535 007559e981c7 * empty log message * wenzelm parents: 13339 diff changeset	98	lemma AC17_AC1_aux2:
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	99	"~ (\<exists>f \<in> Pow(x)-{0}->x. x - F(f) = 0)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	100	==> (\<lambda>f \<in> Pow(x)-{0}->x . x - F(f))
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	101	\<in> (Pow(x) -{0} -> x) -> Pow(x) - {0}"
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	102	by (fast intro!: lam_type dest!: Diff_eq_0_iff [THEN iffD1])
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	103
13535 007559e981c7 * empty log message * wenzelm parents: 13339 diff changeset	104	lemma AC17_AC1_aux3:
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	105	"[\| f`Z \<in> Z; Z \<in> Pow(x)-{0} \|]
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	106	==> (\<lambda>X \<in> Pow(x)-{0}. {f`X})`Z \<in> Pow(Z)-{0}"
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	107	by auto
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	108
13535 007559e981c7 * empty log message * wenzelm parents: 13339 diff changeset	109	lemma AC17_AC1_aux4:
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	110	"\<exists>f \<in> F. f`((\<lambda>f \<in> F. Q(f))`f) \<in> (\<lambda>f \<in> F. Q(f))`f
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	111	==> \<exists>f \<in> F. f`Q(f) \<in> Q(f)"
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	112	by simp
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	113
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	114	lemma AC17_AC1: "AC17 ==> AC1"
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	115	apply (unfold AC17_def)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	116	apply (rule classical)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	117	apply (erule not_AC1_imp_ex [THEN exE])
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	118	apply (case_tac
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	119	"\<exists>f \<in> Pow(x)-{0} -> x.
61394 6142b282b164 tuned syntax -- more symbols; wenzelm parents: 46822 diff changeset	120	x - (\<Union>a \<in> (\<mu> i. HH (\<lambda>X \<in> Pow (x) -{0}. {f`X},x,i) ={x}) . HH (\<lambda>X \<in> Pow (x) -{0}. {f`X},x,a)) = 0")
13535 007559e981c7 * empty log message * wenzelm parents: 13339 diff changeset	121	apply (erule AC17_AC1_aux1, assumption)
007559e981c7 * empty log message * wenzelm parents: 13339 diff changeset	122	apply (drule AC17_AC1_aux2)
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	123	apply (erule allE)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	124	apply (drule bspec, assumption)
13535 007559e981c7 * empty log message * wenzelm parents: 13339 diff changeset	125	apply (drule AC17_AC1_aux4)
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	126	apply (erule bexE)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	127	apply (drule apply_type, assumption)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	128	apply (simp add: HH_Least_eq_x del: Diff_iff )
13535 007559e981c7 * empty log message * wenzelm parents: 13339 diff changeset	129	apply (drule AC17_AC1_aux3, assumption)
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	130	apply (fast dest!: subst_elem [OF _ HH_Least_eq_x [symmetric]]
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	131	f_subset_imp_HH_subset elim!: mem_irrefl)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	132	done
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	133
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	134
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	135	(* **********************************************************************
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	136	AC1 ==> AC2 ==> AC1
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	137	AC1 ==> AC4 ==> AC3 ==> AC1
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	138	AC4 ==> AC5 ==> AC4
46822 95f1e700b712 mathematical symbols for Isabelle/ZF example theories paulson parents: 41777 diff changeset	139	AC1 \<longleftrightarrow> AC6
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	140	************************************************************************* *)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	141
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	142	(* ********************************************************************** *)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	143	(* AC1 ==> AC2 *)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	144	(* ********************************************************************** *)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	145
13535 007559e981c7 * empty log message * wenzelm parents: 13339 diff changeset	146	lemma AC1_AC2_aux1:
46822 95f1e700b712 mathematical symbols for Isabelle/ZF example theories paulson parents: 41777 diff changeset	147	"[\| f:(\<Pi> X \<in> A. X); B \<in> A; 0\<notin>A \|] ==> {f`B} \<subseteq> B \<inter> {f`C. C \<in> A}"
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	148	by (fast elim!: apply_type)
1123 5dfdc1464966 Krzysztof Grabczewski's (nearly) complete AC proofs lcp parents: diff changeset	149
13535 007559e981c7 * empty log message * wenzelm parents: 13339 diff changeset	150	lemma AC1_AC2_aux2:
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	151	"[\| pairwise_disjoint(A); B \<in> A; C \<in> A; D \<in> B; D \<in> C \|] ==> f`B = f`C"
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	152	by (unfold pairwise_disjoint_def, fast)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	153
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	154	lemma AC1_AC2: "AC1 ==> AC2"
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	155	apply (unfold AC1_def AC2_def)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	156	apply (rule allI)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	157	apply (rule impI)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	158	apply (elim asm_rl conjE allE exE impE, assumption)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	159	apply (intro exI ballI equalityI)
13535 007559e981c7 * empty log message * wenzelm parents: 13339 diff changeset	160	prefer 2 apply (rule AC1_AC2_aux1, assumption+)
007559e981c7 * empty log message * wenzelm parents: 13339 diff changeset	161	apply (fast elim!: AC1_AC2_aux2 elim: apply_type)
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	162	done
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	163
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	164
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	165	(* ********************************************************************** *)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	166	(* AC2 ==> AC1 *)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	167	(* ********************************************************************** *)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	168
13535 007559e981c7 * empty log message * wenzelm parents: 13339 diff changeset	169	lemma AC2_AC1_aux1: "0\<notin>A ==> 0 \<notin> {B*{B}. B \<in> A}"
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	170	by (fast dest!: sym [THEN Sigma_empty_iff [THEN iffD1]])
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	171
46822 95f1e700b712 mathematical symbols for Isabelle/ZF example theories paulson parents: 41777 diff changeset	172	lemma AC2_AC1_aux2: "[\| X*{X} \<inter> C = {y}; X \<in> A \|]
95f1e700b712 mathematical symbols for Isabelle/ZF example theories paulson parents: 41777 diff changeset	173	==> (THE y. X{X} \<inter> C = {y}): XA"
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	174	apply (rule subst_elem [of y])
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	175	apply (blast elim!: equalityE)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	176	apply (auto simp add: singleton_eq_iff)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	177	done
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	178
13535 007559e981c7 * empty log message * wenzelm parents: 13339 diff changeset	179	lemma AC2_AC1_aux3:
46822 95f1e700b712 mathematical symbols for Isabelle/ZF example theories paulson parents: 41777 diff changeset	180	"\<forall>D \<in> {E*{E}. E \<in> A}. \<exists>y. D \<inter> C = {y}
95f1e700b712 mathematical symbols for Isabelle/ZF example theories paulson parents: 41777 diff changeset	181	==> (\<lambda>x \<in> A. fst(THE z. (x*{x} \<inter> C = {z}))) \<in> (\<Pi> X \<in> A. X)"
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	182	apply (rule lam_type)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	183	apply (drule bspec, blast)
13535 007559e981c7 * empty log message * wenzelm parents: 13339 diff changeset	184	apply (blast intro: AC2_AC1_aux2 fst_type)
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	185	done
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	186
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	187	lemma AC2_AC1: "AC2 ==> AC1"
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	188	apply (unfold AC1_def AC2_def pairwise_disjoint_def)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	189	apply (intro allI impI)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	190	apply (elim allE impE)
13535 007559e981c7 * empty log message * wenzelm parents: 13339 diff changeset	191	prefer 2 apply (fast elim!: AC2_AC1_aux3)
007559e981c7 * empty log message * wenzelm parents: 13339 diff changeset	192	apply (blast intro!: AC2_AC1_aux1)
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	193	done
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	194
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	195
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	196	(* ********************************************************************** *)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	197	(* AC1 ==> AC4 *)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	198	(* ********************************************************************** *)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	199
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	200	lemma empty_notin_images: "0 \<notin> {R``{x}. x \<in> domain(R)}"
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	201	by blast
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	202
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	203	lemma AC1_AC4: "AC1 ==> AC4"
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	204	apply (unfold AC1_def AC4_def)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	205	apply (intro allI impI)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	206	apply (drule spec, drule mp [OF _ empty_notin_images])
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	207	apply (best intro!: lam_type elim!: apply_type)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	208	done
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	209
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	210
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	211	(* ********************************************************************** *)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	212	(* AC4 ==> AC3 *)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	213	(* ********************************************************************** *)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	214
46822 95f1e700b712 mathematical symbols for Isabelle/ZF example theories paulson parents: 41777 diff changeset	215	lemma AC4_AC3_aux1: "f \<in> A->B ==> (\<Union>z \<in> A. {z}f`z) \<subseteq> A\<Union>(B)"
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	216	by (fast dest!: apply_type)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	217
13535 007559e981c7 * empty log message * wenzelm parents: 13339 diff changeset	218	lemma AC4_AC3_aux2: "domain(\<Union>z \<in> A. {z}*f(z)) = {a \<in> A. f(a)\<noteq>0}"
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	219	by blast
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	220
13535 007559e981c7 * empty log message * wenzelm parents: 13339 diff changeset	221	lemma AC4_AC3_aux3: "x \<in> A ==> (\<Union>z \<in> A. {z}*f(z))``{x} = f(x)"
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	222	by fast
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	223
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	224	lemma AC4_AC3: "AC4 ==> AC3"
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	225	apply (unfold AC3_def AC4_def)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	226	apply (intro allI ballI)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	227	apply (elim allE impE)
13535 007559e981c7 * empty log message * wenzelm parents: 13339 diff changeset	228	apply (erule AC4_AC3_aux1)
007559e981c7 * empty log message * wenzelm parents: 13339 diff changeset	229	apply (simp add: AC4_AC3_aux2 AC4_AC3_aux3 cong add: Pi_cong)
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	230	done
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	231
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	232	(* ********************************************************************** *)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	233	(* AC3 ==> AC1 *)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	234	(* ********************************************************************** *)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	235
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	236	lemma AC3_AC1_lemma:
14171 0cab06e3bbd0 Extended the notion of letter and digit, such that now one may use greek, skalberg parents: 13535 diff changeset	237	"b\<notin>A ==> (\<Pi> x \<in> {a \<in> A. id(A)`a\<noteq>b}. id(A)`x) = (\<Pi> x \<in> A. x)"
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	238	apply (simp add: id_def cong add: Pi_cong)
13339 0f89104dd377 Fixed quantified variable name preservation for ball and bex (bounded quants) paulson parents: 12891 diff changeset	239	apply (rule_tac b = A in subst_context, fast)
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	240	done
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	241
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	242	lemma AC3_AC1: "AC3 ==> AC1"
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	243	apply (unfold AC1_def AC3_def)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	244	apply (fast intro!: id_type elim: AC3_AC1_lemma [THEN subst])
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	245	done
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	246
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	247	(* ********************************************************************** *)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	248	(* AC4 ==> AC5 *)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	249	(* ********************************************************************** *)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	250
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	251	lemma AC4_AC5: "AC4 ==> AC5"
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	252	apply (unfold range_def AC4_def AC5_def)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	253	apply (intro allI ballI)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	254	apply (elim allE impE)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	255	apply (erule fun_is_rel [THEN converse_type])
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	256	apply (erule exE)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	257	apply (rename_tac g)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	258	apply (rule_tac x=g in bexI)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	259	apply (blast dest: apply_equality range_type)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	260	apply (blast intro: Pi_type dest: apply_type fun_is_rel)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	261	done
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	262
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	263
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	264	(* ********************************************************************** *)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	265	(* AC5 ==> AC4, Rubin & Rubin, p. 11 *)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	266	(* ********************************************************************** *)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	267
13535 007559e981c7 * empty log message * wenzelm parents: 13339 diff changeset	268	lemma AC5_AC4_aux1: "R \<subseteq> A*B ==> (\<lambda>x \<in> R. fst(x)) \<in> R -> A"
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	269	by (fast intro!: lam_type fst_type)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	270
13535 007559e981c7 * empty log message * wenzelm parents: 13339 diff changeset	271	lemma AC5_AC4_aux2: "R \<subseteq> A*B ==> range(\<lambda>x \<in> R. fst(x)) = domain(R)"
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	272	by (unfold lam_def, force)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	273
13535 007559e981c7 * empty log message * wenzelm parents: 13339 diff changeset	274	lemma AC5_AC4_aux3: "[\| \<exists>f \<in> A->C. P(f,domain(f)); A=B \|] ==> \<exists>f \<in> B->C. P(f,B)"
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	275	apply (erule bexE)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	276	apply (frule domain_of_fun, fast)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	277	done
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	278
13535 007559e981c7 * empty log message * wenzelm parents: 13339 diff changeset	279	lemma AC5_AC4_aux4: "[\| R \<subseteq> A*B; g \<in> C->R; \<forall>x \<in> C. (\<lambda>z \<in> R. fst(z))` (g`x) = x \|]
14171 0cab06e3bbd0 Extended the notion of letter and digit, such that now one may use greek, skalberg parents: 13535 diff changeset	280	==> (\<lambda>x \<in> C. snd(g`x)): (\<Pi> x \<in> C. R``{x})"
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	281	apply (rule lam_type)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	282	apply (force dest: apply_type)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	283	done
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	284
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	285	lemma AC5_AC4: "AC5 ==> AC4"
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	286	apply (unfold AC4_def AC5_def, clarify)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	287	apply (elim allE ballE)
13535 007559e981c7 * empty log message * wenzelm parents: 13339 diff changeset	288	apply (drule AC5_AC4_aux3 [OF _ AC5_AC4_aux2], assumption)
007559e981c7 * empty log message * wenzelm parents: 13339 diff changeset	289	apply (fast elim!: AC5_AC4_aux4)
007559e981c7 * empty log message * wenzelm parents: 13339 diff changeset	290	apply (blast intro: AC5_AC4_aux1)
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	291	done
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	292
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	293
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	294	(* ********************************************************************** *)
46822 95f1e700b712 mathematical symbols for Isabelle/ZF example theories paulson parents: 41777 diff changeset	295	(* AC1 \<longleftrightarrow> AC6 *)
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	296	(* ********************************************************************** *)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	297
46822 95f1e700b712 mathematical symbols for Isabelle/ZF example theories paulson parents: 41777 diff changeset	298	lemma AC1_iff_AC6: "AC1 \<longleftrightarrow> AC6"
12776 249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	299	by (unfold AC1_def AC6_def, blast)
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	300
249600a63ba9 Isar version of AC paulson parents: 1155 diff changeset	301	end

author	wenzelm
	Sat, 10 Oct 2015 22:14:44 +0200
changeset 61394	6142b282b164
parent 46822	95f1e700b712
child 61980	6b780867d426
permissions	-rw-r--r--