isabelle: src/HOL/Predicate.thy@f3d5111a9c4b (annotated)

22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	1	(* Title: HOL/Predicate.thy
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	2	ID: $Id$
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	3	Author: Stefan Berghofer, TU Muenchen
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	4	*)
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	5
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	6	header {* Predicates *}
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	7
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	8	theory Predicate
23708 b5eb0b4dd17d clarified import haftmann parents: 23389 diff changeset	9	imports Inductive Relation
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	10	begin
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	11
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	12	subsection {* Equality and Subsets *}
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	13
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	14	lemma pred_equals_eq [pred_set_conv]: "((\<lambda>x. x \<in> R) = (\<lambda>x. x \<in> S)) = (R = S)"
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	15	by (auto simp add: expand_fun_eq)
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	16
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	17	lemma pred_equals_eq2 [pred_set_conv]: "((\<lambda>x y. (x, y) \<in> R) = (\<lambda>x y. (x, y) \<in> S)) = (R = S)"
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	18	by (auto simp add: expand_fun_eq)
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	19
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	20	lemma pred_subset_eq [pred_set_conv]: "((\<lambda>x. x \<in> R) <= (\<lambda>x. x \<in> S)) = (R <= S)"
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	21	by fast
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	22
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	23	lemma pred_subset_eq2 [pred_set_conv]: "((\<lambda>x y. (x, y) \<in> R) <= (\<lambda>x y. (x, y) \<in> S)) = (R <= S)"
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	24	by fast
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	25
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	26
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	27	subsection {* Top and bottom elements *}
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	28
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	29	lemma top1I [intro!]: "top x"
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	30	by (simp add: top_fun_eq top_bool_eq)
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	31
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	32	lemma top2I [intro!]: "top x y"
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	33	by (simp add: top_fun_eq top_bool_eq)
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	34
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	35	lemma bot1E [elim!]: "bot x \<Longrightarrow> P"
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	36	by (simp add: bot_fun_eq bot_bool_eq)
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	37
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	38	lemma bot2E [elim!]: "bot x y \<Longrightarrow> P"
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	39	by (simp add: bot_fun_eq bot_bool_eq)
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	40
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	41
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	42	subsection {* The empty set *}
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	43
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	44	lemma bot_empty_eq: "bot = (\<lambda>x. x \<in> {})"
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	45	by (auto simp add: expand_fun_eq)
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	46
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	47	lemma bot_empty_eq2: "bot = (\<lambda>x y. (x, y) \<in> {})"
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	48	by (auto simp add: expand_fun_eq)
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	49
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	50
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	51	subsection {* Binary union *}
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	52
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22259 diff changeset	53	lemma sup1_iff [simp]: "sup A B x \<longleftrightarrow> A x \| B x"
ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22259 diff changeset	54	by (simp add: sup_fun_eq sup_bool_eq)
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	55
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22259 diff changeset	56	lemma sup2_iff [simp]: "sup A B x y \<longleftrightarrow> A x y \| B x y"
ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22259 diff changeset	57	by (simp add: sup_fun_eq sup_bool_eq)
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	58
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	59	lemma sup_Un_eq [pred_set_conv]: "sup (\<lambda>x. x \<in> R) (\<lambda>x. x \<in> S) = (\<lambda>x. x \<in> R \<union> S)"
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	60	by (simp add: expand_fun_eq)
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	61
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	62	lemma sup_Un_eq2 [pred_set_conv]: "sup (\<lambda>x y. (x, y) \<in> R) (\<lambda>x y. (x, y) \<in> S) = (\<lambda>x y. (x, y) \<in> R \<union> S)"
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	63	by (simp add: expand_fun_eq)
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	64
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22259 diff changeset	65	lemma sup1I1 [elim?]: "A x \<Longrightarrow> sup A B x"
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	66	by simp
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	67
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22259 diff changeset	68	lemma sup2I1 [elim?]: "A x y \<Longrightarrow> sup A B x y"
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	69	by simp
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	70
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	71	lemma sup1I2 [elim?]: "B x \<Longrightarrow> sup A B x"
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	72	by simp
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	73
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	74	lemma sup2I2 [elim?]: "B x y \<Longrightarrow> sup A B x y"
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	75	by simp
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	76
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	77	text {*
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	78	\medskip Classical introduction rule: no commitment to @{text A} vs
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	79	@{text B}.
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	80	*}
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	81
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22259 diff changeset	82	lemma sup1CI [intro!]: "(~ B x ==> A x) ==> sup A B x"
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	83	by auto
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	84
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22259 diff changeset	85	lemma sup2CI [intro!]: "(~ B x y ==> A x y) ==> sup A B x y"
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	86	by auto
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	87
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22259 diff changeset	88	lemma sup1E [elim!]: "sup A B x ==> (A x ==> P) ==> (B x ==> P) ==> P"
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	89	by simp iprover
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	90
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22259 diff changeset	91	lemma sup2E [elim!]: "sup A B x y ==> (A x y ==> P) ==> (B x y ==> P) ==> P"
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	92	by simp iprover
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	93
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	94
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	95	subsection {* Binary intersection *}
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	96
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22259 diff changeset	97	lemma inf1_iff [simp]: "inf A B x \<longleftrightarrow> A x \<and> B x"
ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22259 diff changeset	98	by (simp add: inf_fun_eq inf_bool_eq)
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	99
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22259 diff changeset	100	lemma inf2_iff [simp]: "inf A B x y \<longleftrightarrow> A x y \<and> B x y"
ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22259 diff changeset	101	by (simp add: inf_fun_eq inf_bool_eq)
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	102
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	103	lemma inf_Int_eq [pred_set_conv]: "inf (\<lambda>x. x \<in> R) (\<lambda>x. x \<in> S) = (\<lambda>x. x \<in> R \<inter> S)"
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	104	by (simp add: expand_fun_eq)
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	105
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	106	lemma inf_Int_eq2 [pred_set_conv]: "inf (\<lambda>x y. (x, y) \<in> R) (\<lambda>x y. (x, y) \<in> S) = (\<lambda>x y. (x, y) \<in> R \<inter> S)"
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	107	by (simp add: expand_fun_eq)
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	108
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22259 diff changeset	109	lemma inf1I [intro!]: "A x ==> B x ==> inf A B x"
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	110	by simp
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	111
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22259 diff changeset	112	lemma inf2I [intro!]: "A x y ==> B x y ==> inf A B x y"
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	113	by simp
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	114
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22259 diff changeset	115	lemma inf1D1: "inf A B x ==> A x"
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	116	by simp
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	117
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22259 diff changeset	118	lemma inf2D1: "inf A B x y ==> A x y"
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	119	by simp
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	120
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22259 diff changeset	121	lemma inf1D2: "inf A B x ==> B x"
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	122	by simp
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	123
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22259 diff changeset	124	lemma inf2D2: "inf A B x y ==> B x y"
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	125	by simp
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	126
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22259 diff changeset	127	lemma inf1E [elim!]: "inf A B x ==> (A x ==> B x ==> P) ==> P"
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	128	by simp
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	129
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22259 diff changeset	130	lemma inf2E [elim!]: "inf A B x y ==> (A x y ==> B x y ==> P) ==> P"
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	131	by simp
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	132
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	133
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	134	subsection {* Unions of families *}
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	135
22430 6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	136	lemma SUP1_iff [simp]: "(SUP x:A. B x) b = (EX x:A. B x b)"
24345 86a3557a9ebb Sup now explicit parameter of complete_lattice haftmann parents: 23741 diff changeset	137	by (simp add: SUPR_def Sup_fun_def Sup_bool_def) blast
22430 6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	138
6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	139	lemma SUP2_iff [simp]: "(SUP x:A. B x) b c = (EX x:A. B x b c)"
24345 86a3557a9ebb Sup now explicit parameter of complete_lattice haftmann parents: 23741 diff changeset	140	by (simp add: SUPR_def Sup_fun_def Sup_bool_def) blast
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	141
22430 6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	142	lemma SUP1_I [intro]: "a : A ==> B a b ==> (SUP x:A. B x) b"
6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	143	by auto
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	144
22430 6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	145	lemma SUP2_I [intro]: "a : A ==> B a b c ==> (SUP x:A. B x) b c"
6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	146	by auto
6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	147
6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	148	lemma SUP1_E [elim!]: "(SUP x:A. B x) b ==> (!!x. x : A ==> B x b ==> R) ==> R"
6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	149	by auto
6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	150
6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	151	lemma SUP2_E [elim!]: "(SUP x:A. B x) b c ==> (!!x. x : A ==> B x b c ==> R) ==> R"
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	152	by auto
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	153
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	154	lemma SUP_UN_eq: "(SUP i. (\<lambda>x. x \<in> r i)) = (\<lambda>x. x \<in> (UN i. r i))"
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	155	by (simp add: expand_fun_eq)
22430 6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	156
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	157	lemma SUP_UN_eq2: "(SUP i. (\<lambda>x y. (x, y) \<in> r i)) = (\<lambda>x y. (x, y) \<in> (UN i. r i))"
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	158	by (simp add: expand_fun_eq)
22430 6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	159
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	160
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	161	subsection {* Intersections of families *}
22430 6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	162
6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	163	lemma INF1_iff [simp]: "(INF x:A. B x) b = (ALL x:A. B x b)"
6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	164	by (simp add: INFI_def Inf_fun_def Inf_bool_def) blast
6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	165
6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	166	lemma INF2_iff [simp]: "(INF x:A. B x) b c = (ALL x:A. B x b c)"
6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	167	by (simp add: INFI_def Inf_fun_def Inf_bool_def) blast
6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	168
6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	169	lemma INF1_I [intro!]: "(!!x. x : A ==> B x b) ==> (INF x:A. B x) b"
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	170	by auto
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	171
22430 6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	172	lemma INF2_I [intro!]: "(!!x. x : A ==> B x b c) ==> (INF x:A. B x) b c"
6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	173	by auto
6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	174
6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	175	lemma INF1_D [elim]: "(INF x:A. B x) b ==> a : A ==> B a b"
6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	176	by auto
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	177
22430 6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	178	lemma INF2_D [elim]: "(INF x:A. B x) b c ==> a : A ==> B a b c"
6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	179	by auto
6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	180
6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	181	lemma INF1_E [elim]: "(INF x:A. B x) b ==> (B a b ==> R) ==> (a ~: A ==> R) ==> R"
6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	182	by auto
6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	183
6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	184	lemma INF2_E [elim]: "(INF x:A. B x) b c ==> (B a b c ==> R) ==> (a ~: A ==> R) ==> R"
6a56bf1b3a64 Generalized version of SUP and INF (with index set). berghofe parents: 22422 diff changeset	185	by auto
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	186
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	187	lemma INF_INT_eq: "(INF i. (\<lambda>x. x \<in> r i)) = (\<lambda>x. x \<in> (INT i. r i))"
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	188	by (simp add: expand_fun_eq)
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	189
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	190	lemma INF_INT_eq2: "(INF i. (\<lambda>x y. (x, y) \<in> r i)) = (\<lambda>x y. (x, y) \<in> (INT i. r i))"
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	191	by (simp add: expand_fun_eq)
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	192
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	193
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	194	subsection {* Composition of two relations *}
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	195
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	196	inductive
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	197	pred_comp :: "['b => 'c => bool, 'a => 'b => bool] => 'a => 'c => bool"
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	198	(infixr "OO" 75)
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	199	for r :: "'b => 'c => bool" and s :: "'a => 'b => bool"
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	200	where
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	201	pred_compI [intro]: "s a b ==> r b c ==> (r OO s) a c"
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	202
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	203	inductive_cases pred_compE [elim!]: "(r OO s) a c"
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	204
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	205	lemma pred_comp_rel_comp_eq [pred_set_conv]:
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	206	"((\<lambda>x y. (x, y) \<in> r) OO (\<lambda>x y. (x, y) \<in> s)) = (\<lambda>x y. (x, y) \<in> r O s)"
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	207	by (auto simp add: expand_fun_eq elim: pred_compE)
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	208
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	209
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	210	subsection {* Converse *}
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	211
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	212	inductive
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	213	conversep :: "('a => 'b => bool) => 'b => 'a => bool"
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	214	("(_^--1)" [1000] 1000)
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	215	for r :: "'a => 'b => bool"
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	216	where
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	217	conversepI: "r a b ==> r^--1 b a"
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	218
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	219	notation (xsymbols)
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	220	conversep ("(_\<inverse>\<inverse>)" [1000] 1000)
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	221
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	222	lemma conversepD:
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	223	assumes ab: "r^--1 a b"
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	224	shows "r b a" using ab
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	225	by cases simp
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	226
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	227	lemma conversep_iff [iff]: "r^--1 a b = r b a"
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	228	by (iprover intro: conversepI dest: conversepD)
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	229
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	230	lemma conversep_converse_eq [pred_set_conv]:
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	231	"(\<lambda>x y. (x, y) \<in> r)^--1 = (\<lambda>x y. (x, y) \<in> r^-1)"
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	232	by (auto simp add: expand_fun_eq)
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	233
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	234	lemma conversep_conversep [simp]: "(r^--1)^--1 = r"
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	235	by (iprover intro: order_antisym conversepI dest: conversepD)
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	236
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	237	lemma converse_pred_comp: "(r OO s)^--1 = s^--1 OO r^--1"
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	238	by (iprover intro: order_antisym conversepI pred_compI
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	239	elim: pred_compE dest: conversepD)
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	240
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22259 diff changeset	241	lemma converse_meet: "(inf r s)^--1 = inf r^--1 s^--1"
ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22259 diff changeset	242	by (simp add: inf_fun_eq inf_bool_eq)
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	243	(iprover intro: conversepI ext dest: conversepD)
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	244
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22259 diff changeset	245	lemma converse_join: "(sup r s)^--1 = sup r^--1 s^--1"
ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 22259 diff changeset	246	by (simp add: sup_fun_eq sup_bool_eq)
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	247	(iprover intro: conversepI ext dest: conversepD)
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	248
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	249	lemma conversep_noteq [simp]: "(op ~=)^--1 = op ~="
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	250	by (auto simp add: expand_fun_eq)
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	251
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	252	lemma conversep_eq [simp]: "(op =)^--1 = op ="
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	253	by (auto simp add: expand_fun_eq)
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	254
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	255
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	256	subsection {* Domain *}
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	257
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	258	inductive
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	259	DomainP :: "('a => 'b => bool) => 'a => bool"
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	260	for r :: "'a => 'b => bool"
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	261	where
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	262	DomainPI [intro]: "r a b ==> DomainP r a"
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	263
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	264	inductive_cases DomainPE [elim!]: "DomainP r a"
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	265
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	266	lemma DomainP_Domain_eq [pred_set_conv]: "DomainP (\<lambda>x y. (x, y) \<in> r) = (\<lambda>x. x \<in> Domain r)"
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	267	by (blast intro!: Orderings.order_antisym)
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	268
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	269
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	270	subsection {* Range *}
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	271
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	272	inductive
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	273	RangeP :: "('a => 'b => bool) => 'b => bool"
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	274	for r :: "'a => 'b => bool"
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	275	where
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	276	RangePI [intro]: "r a b ==> RangeP r b"
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	277
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	278	inductive_cases RangePE [elim!]: "RangeP r b"
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	279
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	280	lemma RangeP_Range_eq [pred_set_conv]: "RangeP (\<lambda>x y. (x, y) \<in> r) = (\<lambda>x. x \<in> Range r)"
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	281	by (blast intro!: Orderings.order_antisym)
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	282
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	283
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	284	subsection {* Inverse image *}
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	285
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	286	definition
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	287	inv_imagep :: "('b => 'b => bool) => ('a => 'b) => 'a => 'a => bool" where
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	288	"inv_imagep r f == %x y. r (f x) (f y)"
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	289
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	290	lemma [pred_set_conv]: "inv_imagep (\<lambda>x y. (x, y) \<in> r) f = (\<lambda>x y. (x, y) \<in> inv_image r f)"
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	291	by (simp add: inv_image_def inv_imagep_def)
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	292
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	293	lemma in_inv_imagep [simp]: "inv_imagep r f x y = r (f x) (f y)"
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	294	by (simp add: inv_imagep_def)
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	295
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	296
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	297	subsection {* The Powerset operator *}
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	298
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	299	definition Powp :: "('a \<Rightarrow> bool) \<Rightarrow> 'a set \<Rightarrow> bool" where
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	300	"Powp A == \<lambda>B. \<forall>x \<in> B. A x"
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	301
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	302	lemma Powp_Pow_eq [pred_set_conv]: "Powp (\<lambda>x. x \<in> A) = (\<lambda>x. x \<in> Pow A)"
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	303	by (auto simp add: Powp_def expand_fun_eq)
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	304
1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	305
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	306	subsection {* Properties of relations - predicate versions *}
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	307
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	308	abbreviation antisymP :: "('a => 'a => bool) => bool" where
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	309	"antisymP r == antisym {(x, y). r x y}"
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	310
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	311	abbreviation transP :: "('a => 'a => bool) => bool" where
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	312	"transP r == trans {(x, y). r x y}"
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	313
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	314	abbreviation single_valuedP :: "('a => 'b => bool) => bool" where
23741 1801a921df13 - Moved infrastructure for converting between sets and predicates berghofe parents: 23708 diff changeset	315	"single_valuedP r == single_valued {(x, y). r x y}"
22259 476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	316
476604be7d88 New theory for converting between predicates and sets. berghofe parents: diff changeset	317	end

author	wenzelm
	Tue, 20 Nov 2007 14:01:49 +0100
changeset 25449	f3d5111a9c4b
parent 24345	86a3557a9ebb
child 26797	a6cb51c314f2
permissions	-rw-r--r--