isabelle: src/HOL/Basic_BNFs.thy@4920ebbde486 (annotated)

55075 b3d0a02a756d dissolved BNF session blanchet parents: 55062 diff changeset	1	(* Title: HOL/Basic_BNFs.thy
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	2	Author: Dmitriy Traytel, TU Muenchen
7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	3	Author: Andrei Popescu, TU Muenchen
7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	4	Author: Jasmin Blanchette, TU Muenchen
75625 0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	5	Author: Jan van Brügge, TU Muenchen
75624 22d1c5f2b9f4 strict bounds for BNFs (by Jan van Brügge) traytel parents: 67399 diff changeset	6	Copyright 2012, 2022
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	7
49309 f20b24214ac2 split basic BNFs into really basic ones and others, and added Andreas Lochbihler's "option" BNF blanchet parents: 49236 diff changeset	8	Registration of basic types as bounded natural functors.
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	9	*)
7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	10
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 58916 diff changeset	11	section \<open>Registration of Basic Types as Bounded Natural Functors\<close>
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	12
7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	13	theory Basic_BNFs
49310 6e30078de4f0 renamed "Ordinals_and_Cardinals" to "Cardinals" blanchet parents: 49309 diff changeset	14	imports BNF_Def
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	15	begin
7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	16
58916 229765cc3414 more complete fp_sugars for sum and prod; traytel parents: 58889 diff changeset	17	inductive_set setl :: "'a + 'b \<Rightarrow> 'a set" for s :: "'a + 'b" where
229765cc3414 more complete fp_sugars for sum and prod; traytel parents: 58889 diff changeset	18	"s = Inl x \<Longrightarrow> x \<in> setl s"
229765cc3414 more complete fp_sugars for sum and prod; traytel parents: 58889 diff changeset	19	inductive_set setr :: "'a + 'b \<Rightarrow> 'b set" for s :: "'a + 'b" where
229765cc3414 more complete fp_sugars for sum and prod; traytel parents: 58889 diff changeset	20	"s = Inr x \<Longrightarrow> x \<in> setr s"
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	21
58916 229765cc3414 more complete fp_sugars for sum and prod; traytel parents: 58889 diff changeset	22	lemma sum_set_defs[code]:
67091 1393c2340eec more symbols; wenzelm parents: 62335 diff changeset	23	"setl = (\<lambda>x. case x of Inl z \<Rightarrow> {z} \| _ \<Rightarrow> {})"
1393c2340eec more symbols; wenzelm parents: 62335 diff changeset	24	"setr = (\<lambda>x. case x of Inr z \<Rightarrow> {z} \| _ \<Rightarrow> {})"
58916 229765cc3414 more complete fp_sugars for sum and prod; traytel parents: 58889 diff changeset	25	by (auto simp: fun_eq_iff intro: setl.intros setr.intros elim: setl.cases setr.cases split: sum.splits)
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	26
58916 229765cc3414 more complete fp_sugars for sum and prod; traytel parents: 58889 diff changeset	27	lemma rel_sum_simps[code, simp]:
55943 5c2df04e97d1 renamed 'sum_rel' to 'rel_sum' blanchet parents: 55935 diff changeset	28	"rel_sum R1 R2 (Inl a1) (Inl b1) = R1 a1 b1"
5c2df04e97d1 renamed 'sum_rel' to 'rel_sum' blanchet parents: 55935 diff changeset	29	"rel_sum R1 R2 (Inl a1) (Inr b2) = False"
5c2df04e97d1 renamed 'sum_rel' to 'rel_sum' blanchet parents: 55935 diff changeset	30	"rel_sum R1 R2 (Inr a2) (Inl b1) = False"
5c2df04e97d1 renamed 'sum_rel' to 'rel_sum' blanchet parents: 55935 diff changeset	31	"rel_sum R1 R2 (Inr a2) (Inr b2) = R2 a2 b2"
58916 229765cc3414 more complete fp_sugars for sum and prod; traytel parents: 58889 diff changeset	32	by (auto intro: rel_sum.intros elim: rel_sum.cases)
55083 0a689157e3ce move BNF_LFP up the dependency chain blanchet parents: 55075 diff changeset	33
62324 ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	34	inductive
ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	35	pred_sum :: "('a \<Rightarrow> bool) \<Rightarrow> ('b \<Rightarrow> bool) \<Rightarrow> 'a + 'b \<Rightarrow> bool" for P1 P2
ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	36	where
ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	37	"P1 a \<Longrightarrow> pred_sum P1 P2 (Inl a)"
ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	38	\| "P2 b \<Longrightarrow> pred_sum P1 P2 (Inr b)"
ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	39
62335 e85c42f4f30a making 'pred_inject' a first-class BNF citizen blanchet parents: 62324 diff changeset	40	lemma pred_sum_inject[code, simp]:
e85c42f4f30a making 'pred_inject' a first-class BNF citizen blanchet parents: 62324 diff changeset	41	"pred_sum P1 P2 (Inl a) \<longleftrightarrow> P1 a"
e85c42f4f30a making 'pred_inject' a first-class BNF citizen blanchet parents: 62324 diff changeset	42	"pred_sum P1 P2 (Inr b) \<longleftrightarrow> P2 b"
e85c42f4f30a making 'pred_inject' a first-class BNF citizen blanchet parents: 62324 diff changeset	43	by (simp add: pred_sum.simps)+
e85c42f4f30a making 'pred_inject' a first-class BNF citizen blanchet parents: 62324 diff changeset	44
54421 632be352a5a3 more explicit syntax for defining a bnf traytel parents: 54191 diff changeset	45	bnf "'a + 'b"
55931 62156e694f3d renamed 'map_sum' to 'sum_map' blanchet parents: 55811 diff changeset	46	map: map_sum
54421 632be352a5a3 more explicit syntax for defining a bnf traytel parents: 54191 diff changeset	47	sets: setl setr
632be352a5a3 more explicit syntax for defining a bnf traytel parents: 54191 diff changeset	48	bd: natLeq
632be352a5a3 more explicit syntax for defining a bnf traytel parents: 54191 diff changeset	49	wits: Inl Inr
55943 5c2df04e97d1 renamed 'sum_rel' to 'rel_sum' blanchet parents: 55935 diff changeset	50	rel: rel_sum
62324 ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	51	pred: pred_sum
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	52	proof -
55931 62156e694f3d renamed 'map_sum' to 'sum_map' blanchet parents: 55811 diff changeset	53	show "map_sum id id = id" by (rule map_sum.id)
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	54	next
54486 d8d276c922f2 tuned proofs blanchet parents: 54485 diff changeset	55	fix f1 :: "'o \<Rightarrow> 's" and f2 :: "'p \<Rightarrow> 't" and g1 :: "'s \<Rightarrow> 'q" and g2 :: "'t \<Rightarrow> 'r"
67091 1393c2340eec more symbols; wenzelm parents: 62335 diff changeset	56	show "map_sum (g1 \<circ> f1) (g2 \<circ> f2) = map_sum g1 g2 \<circ> map_sum f1 f2"
55931 62156e694f3d renamed 'map_sum' to 'sum_map' blanchet parents: 55811 diff changeset	57	by (rule map_sum.comp[symmetric])
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	58	next
54486 d8d276c922f2 tuned proofs blanchet parents: 54485 diff changeset	59	fix x and f1 :: "'o \<Rightarrow> 'q" and f2 :: "'p \<Rightarrow> 'r" and g1 g2
49451 7a28d22c33c6 renamed "sum_setl" to "setl" and similarly for r blanchet parents: 49450 diff changeset	60	assume a1: "\<And>z. z \<in> setl x \<Longrightarrow> f1 z = g1 z" and
7a28d22c33c6 renamed "sum_setl" to "setl" and similarly for r blanchet parents: 49450 diff changeset	61	a2: "\<And>z. z \<in> setr x \<Longrightarrow> f2 z = g2 z"
55931 62156e694f3d renamed 'map_sum' to 'sum_map' blanchet parents: 55811 diff changeset	62	thus "map_sum f1 f2 x = map_sum g1 g2 x"
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	63	proof (cases x)
58916 229765cc3414 more complete fp_sugars for sum and prod; traytel parents: 58889 diff changeset	64	case Inl thus ?thesis using a1 by (clarsimp simp: sum_set_defs(1))
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	65	next
58916 229765cc3414 more complete fp_sugars for sum and prod; traytel parents: 58889 diff changeset	66	case Inr thus ?thesis using a2 by (clarsimp simp: sum_set_defs(2))
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	67	qed
7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	68	next
54486 d8d276c922f2 tuned proofs blanchet parents: 54485 diff changeset	69	fix f1 :: "'o \<Rightarrow> 'q" and f2 :: "'p \<Rightarrow> 'r"
67091 1393c2340eec more symbols; wenzelm parents: 62335 diff changeset	70	show "setl \<circ> map_sum f1 f2 = image f1 \<circ> setl"
58916 229765cc3414 more complete fp_sugars for sum and prod; traytel parents: 58889 diff changeset	71	by (rule ext, unfold o_apply) (simp add: sum_set_defs(1) split: sum.split)
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	72	next
54486 d8d276c922f2 tuned proofs blanchet parents: 54485 diff changeset	73	fix f1 :: "'o \<Rightarrow> 'q" and f2 :: "'p \<Rightarrow> 'r"
67091 1393c2340eec more symbols; wenzelm parents: 62335 diff changeset	74	show "setr \<circ> map_sum f1 f2 = image f2 \<circ> setr"
58916 229765cc3414 more complete fp_sugars for sum and prod; traytel parents: 58889 diff changeset	75	by (rule ext, unfold o_apply) (simp add: sum_set_defs(2) split: sum.split)
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	76	next
7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	77	show "card_order natLeq" by (rule natLeq_card_order)
7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	78	next
7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	79	show "cinfinite natLeq" by (rule natLeq_cinfinite)
7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	80	next
75624 22d1c5f2b9f4 strict bounds for BNFs (by Jan van Brügge) traytel parents: 67399 diff changeset	81	show "regularCard natLeq" by (rule regularCard_natLeq)
22d1c5f2b9f4 strict bounds for BNFs (by Jan van Brügge) traytel parents: 67399 diff changeset	82	next
54486 d8d276c922f2 tuned proofs blanchet parents: 54485 diff changeset	83	fix x :: "'o + 'p"
75624 22d1c5f2b9f4 strict bounds for BNFs (by Jan van Brügge) traytel parents: 67399 diff changeset	84	show "\|setl x\| <o natLeq"
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	85	apply (rule finite_iff_ordLess_natLeq[THEN iffD1])
58916 229765cc3414 more complete fp_sugars for sum and prod; traytel parents: 58889 diff changeset	86	by (simp add: sum_set_defs(1) split: sum.split)
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	87	next
54486 d8d276c922f2 tuned proofs blanchet parents: 54485 diff changeset	88	fix x :: "'o + 'p"
75624 22d1c5f2b9f4 strict bounds for BNFs (by Jan van Brügge) traytel parents: 67399 diff changeset	89	show "\|setr x\| <o natLeq"
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	90	apply (rule finite_iff_ordLess_natLeq[THEN iffD1])
58916 229765cc3414 more complete fp_sugars for sum and prod; traytel parents: 58889 diff changeset	91	by (simp add: sum_set_defs(2) split: sum.split)
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	92	next
54841 af71b753c459 express weak pullback property of bnfs only in terms of the relator traytel parents: 54581 diff changeset	93	fix R1 R2 S1 S2
55943 5c2df04e97d1 renamed 'sum_rel' to 'rel_sum' blanchet parents: 55935 diff changeset	94	show "rel_sum R1 R2 OO rel_sum S1 S2 \<le> rel_sum (R1 OO S1) (R2 OO S2)"
58916 229765cc3414 more complete fp_sugars for sum and prod; traytel parents: 58889 diff changeset	95	by (force elim: rel_sum.cases)
49453 ff0e540d8758 add rel as first-class citizen of BNF blanchet parents: 49451 diff changeset	96	next
ff0e540d8758 add rel as first-class citizen of BNF blanchet parents: 49451 diff changeset	97	fix R S
62324 ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	98	show "rel_sum R S = (\<lambda>x y.
ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	99	\<exists>z. (setl z \<subseteq> {(x, y). R x y} \<and> setr z \<subseteq> {(x, y). S x y}) \<and>
ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	100	map_sum fst fst z = x \<and> map_sum snd snd z = y)"
ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	101	unfolding sum_set_defs relcompp.simps conversep.simps fun_eq_iff
58916 229765cc3414 more complete fp_sugars for sum and prod; traytel parents: 58889 diff changeset	102	by (fastforce elim: rel_sum.cases split: sum.splits)
62324 ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	103	qed (auto simp: sum_set_defs fun_eq_iff pred_sum.simps split: sum.splits)
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	104
58916 229765cc3414 more complete fp_sugars for sum and prod; traytel parents: 58889 diff changeset	105	inductive_set fsts :: "'a \<times> 'b \<Rightarrow> 'a set" for p :: "'a \<times> 'b" where
229765cc3414 more complete fp_sugars for sum and prod; traytel parents: 58889 diff changeset	106	"fst p \<in> fsts p"
229765cc3414 more complete fp_sugars for sum and prod; traytel parents: 58889 diff changeset	107	inductive_set snds :: "'a \<times> 'b \<Rightarrow> 'b set" for p :: "'a \<times> 'b" where
229765cc3414 more complete fp_sugars for sum and prod; traytel parents: 58889 diff changeset	108	"snd p \<in> snds p"
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	109
58916 229765cc3414 more complete fp_sugars for sum and prod; traytel parents: 58889 diff changeset	110	lemma prod_set_defs[code]: "fsts = (\<lambda>p. {fst p})" "snds = (\<lambda>p. {snd p})"
229765cc3414 more complete fp_sugars for sum and prod; traytel parents: 58889 diff changeset	111	by (auto intro: fsts.intros snds.intros elim: fsts.cases snds.cases)
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	112
58916 229765cc3414 more complete fp_sugars for sum and prod; traytel parents: 58889 diff changeset	113	inductive
229765cc3414 more complete fp_sugars for sum and prod; traytel parents: 58889 diff changeset	114	rel_prod :: "('a \<Rightarrow> 'b \<Rightarrow> bool) \<Rightarrow> ('c \<Rightarrow> 'd \<Rightarrow> bool) \<Rightarrow> 'a \<times> 'c \<Rightarrow> 'b \<times> 'd \<Rightarrow> bool" for R1 R2
55083 0a689157e3ce move BNF_LFP up the dependency chain blanchet parents: 55075 diff changeset	115	where
58916 229765cc3414 more complete fp_sugars for sum and prod; traytel parents: 58889 diff changeset	116	"\<lbrakk>R1 a b; R2 c d\<rbrakk> \<Longrightarrow> rel_prod R1 R2 (a, c) (b, d)"
229765cc3414 more complete fp_sugars for sum and prod; traytel parents: 58889 diff changeset	117
62324 ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	118	inductive
ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	119	pred_prod :: "('a \<Rightarrow> bool) \<Rightarrow> ('b \<Rightarrow> bool) \<Rightarrow> 'a \<times> 'b \<Rightarrow> bool" for P1 P2
ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	120	where
ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	121	"\<lbrakk>P1 a; P2 b\<rbrakk> \<Longrightarrow> pred_prod P1 P2 (a, b)"
ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	122
62335 e85c42f4f30a making 'pred_inject' a first-class BNF citizen blanchet parents: 62324 diff changeset	123	lemma rel_prod_inject [code, simp]:
58916 229765cc3414 more complete fp_sugars for sum and prod; traytel parents: 58889 diff changeset	124	"rel_prod R1 R2 (a, b) (c, d) \<longleftrightarrow> R1 a c \<and> R2 b d"
229765cc3414 more complete fp_sugars for sum and prod; traytel parents: 58889 diff changeset	125	by (auto intro: rel_prod.intros elim: rel_prod.cases)
229765cc3414 more complete fp_sugars for sum and prod; traytel parents: 58889 diff changeset	126
62335 e85c42f4f30a making 'pred_inject' a first-class BNF citizen blanchet parents: 62324 diff changeset	127	lemma pred_prod_inject [code, simp]:
62324 ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	128	"pred_prod P1 P2 (a, b) \<longleftrightarrow> P1 a \<and> P2 b"
ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	129	by (auto intro: pred_prod.intros elim: pred_prod.cases)
ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	130
58916 229765cc3414 more complete fp_sugars for sum and prod; traytel parents: 58889 diff changeset	131	lemma rel_prod_conv:
55944 7ab8f003fe41 renamed 'prod_rel' to 'rel_prod' blanchet parents: 55943 diff changeset	132	"rel_prod R1 R2 = (\<lambda>(a, b) (c, d). R1 a c \<and> R2 b d)"
58916 229765cc3414 more complete fp_sugars for sum and prod; traytel parents: 58889 diff changeset	133	by (rule ext, rule ext) auto
55083 0a689157e3ce move BNF_LFP up the dependency chain blanchet parents: 55075 diff changeset	134
62324 ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	135	definition
ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	136	pred_fun :: "('a \<Rightarrow> bool) \<Rightarrow> ('b \<Rightarrow> bool) \<Rightarrow> ('a \<Rightarrow> 'b) \<Rightarrow> bool"
ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	137	where
ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	138	"pred_fun A B = (\<lambda>f. \<forall>x. A x \<longrightarrow> B (f x))"
ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	139
ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	140	lemma pred_funI: "(\<And>x. A x \<Longrightarrow> B (f x)) \<Longrightarrow> pred_fun A B f"
ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	141	unfolding pred_fun_def by simp
ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	142
54421 632be352a5a3 more explicit syntax for defining a bnf traytel parents: 54191 diff changeset	143	bnf "'a \<times> 'b"
55932 68c5104d2204 renamed 'map_pair' to 'map_prod' blanchet parents: 55931 diff changeset	144	map: map_prod
54421 632be352a5a3 more explicit syntax for defining a bnf traytel parents: 54191 diff changeset	145	sets: fsts snds
632be352a5a3 more explicit syntax for defining a bnf traytel parents: 54191 diff changeset	146	bd: natLeq
55944 7ab8f003fe41 renamed 'prod_rel' to 'rel_prod' blanchet parents: 55943 diff changeset	147	rel: rel_prod
62324 ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	148	pred: pred_prod
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	149	proof (unfold prod_set_defs)
55932 68c5104d2204 renamed 'map_pair' to 'map_prod' blanchet parents: 55931 diff changeset	150	show "map_prod id id = id" by (rule map_prod.id)
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	151	next
7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	152	fix f1 f2 g1 g2
67091 1393c2340eec more symbols; wenzelm parents: 62335 diff changeset	153	show "map_prod (g1 \<circ> f1) (g2 \<circ> f2) = map_prod g1 g2 \<circ> map_prod f1 f2"
55932 68c5104d2204 renamed 'map_pair' to 'map_prod' blanchet parents: 55931 diff changeset	154	by (rule map_prod.comp[symmetric])
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	155	next
7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	156	fix x f1 f2 g1 g2
7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	157	assume "\<And>z. z \<in> {fst x} \<Longrightarrow> f1 z = g1 z" "\<And>z. z \<in> {snd x} \<Longrightarrow> f2 z = g2 z"
55932 68c5104d2204 renamed 'map_pair' to 'map_prod' blanchet parents: 55931 diff changeset	158	thus "map_prod f1 f2 x = map_prod g1 g2 x" by (cases x) simp
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	159	next
7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	160	fix f1 f2
67091 1393c2340eec more symbols; wenzelm parents: 62335 diff changeset	161	show "(\<lambda>x. {fst x}) \<circ> map_prod f1 f2 = image f1 \<circ> (\<lambda>x. {fst x})"
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	162	by (rule ext, unfold o_apply) simp
7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	163	next
7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	164	fix f1 f2
67091 1393c2340eec more symbols; wenzelm parents: 62335 diff changeset	165	show "(\<lambda>x. {snd x}) \<circ> map_prod f1 f2 = image f2 \<circ> (\<lambda>x. {snd x})"
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	166	by (rule ext, unfold o_apply) simp
7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	167	next
52635 4f84b730c489 got rid of in_bd BNF property (derivable from set_bd+map_cong+map_comp+map_id) traytel parents: 52545 diff changeset	168	show "card_order natLeq" by (rule natLeq_card_order)
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	169	next
52635 4f84b730c489 got rid of in_bd BNF property (derivable from set_bd+map_cong+map_comp+map_id) traytel parents: 52545 diff changeset	170	show "cinfinite natLeq" by (rule natLeq_cinfinite)
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	171	next
75624 22d1c5f2b9f4 strict bounds for BNFs (by Jan van Brügge) traytel parents: 67399 diff changeset	172	show "regularCard natLeq" by (rule regularCard_natLeq)
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	173	next
52635 4f84b730c489 got rid of in_bd BNF property (derivable from set_bd+map_cong+map_comp+map_id) traytel parents: 52545 diff changeset	174	fix x
75624 22d1c5f2b9f4 strict bounds for BNFs (by Jan van Brügge) traytel parents: 67399 diff changeset	175	show "\|{fst x}\| <o natLeq"
22d1c5f2b9f4 strict bounds for BNFs (by Jan van Brügge) traytel parents: 67399 diff changeset	176	by (simp add: finite_iff_ordLess_natLeq[symmetric])
22d1c5f2b9f4 strict bounds for BNFs (by Jan van Brügge) traytel parents: 67399 diff changeset	177	next
22d1c5f2b9f4 strict bounds for BNFs (by Jan van Brügge) traytel parents: 67399 diff changeset	178	fix x
22d1c5f2b9f4 strict bounds for BNFs (by Jan van Brügge) traytel parents: 67399 diff changeset	179	show "\|{snd x}\| <o natLeq"
22d1c5f2b9f4 strict bounds for BNFs (by Jan van Brügge) traytel parents: 67399 diff changeset	180	by (simp add: finite_iff_ordLess_natLeq[symmetric])
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	181	next
54841 af71b753c459 express weak pullback property of bnfs only in terms of the relator traytel parents: 54581 diff changeset	182	fix R1 R2 S1 S2
55944 7ab8f003fe41 renamed 'prod_rel' to 'rel_prod' blanchet parents: 55943 diff changeset	183	show "rel_prod R1 R2 OO rel_prod S1 S2 \<le> rel_prod (R1 OO S1) (R2 OO S2)" by auto
49453 ff0e540d8758 add rel as first-class citizen of BNF blanchet parents: 49451 diff changeset	184	next
ff0e540d8758 add rel as first-class citizen of BNF blanchet parents: 49451 diff changeset	185	fix R S
62324 ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	186	show "rel_prod R S = (\<lambda>x y.
ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	187	\<exists>z. ({fst z} \<subseteq> {(x, y). R x y} \<and> {snd z} \<subseteq> {(x, y). S x y}) \<and>
ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	188	map_prod fst fst z = x \<and> map_prod snd snd z = y)"
62335 e85c42f4f30a making 'pred_inject' a first-class BNF citizen blanchet parents: 62324 diff changeset	189	unfolding prod_set_defs rel_prod_inject relcompp.simps conversep.simps fun_eq_iff
49453 ff0e540d8758 add rel as first-class citizen of BNF blanchet parents: 49451 diff changeset	190	by auto
62324 ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	191	qed auto
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	192
75625 0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	193	lemma card_order_bd_fun: "card_order (natLeq +c card_suc ( \|UNIV\| ))"
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	194	by (auto simp: card_order_csum natLeq_card_order card_order_card_suc card_of_card_order_on)
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	195
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	196	lemma Cinfinite_bd_fun: "Cinfinite (natLeq +c card_suc ( \|UNIV\| ))"
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	197	by (auto simp: Cinfinite_csum natLeq_Cinfinite)
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	198
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	199	lemma regularCard_bd_fun: "regularCard (natLeq +c card_suc ( \|UNIV\| ))"
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	200	(is "regularCard (_ +c card_suc ?U)")
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	201	apply (cases "Cinfinite ?U")
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	202	apply (rule regularCard_csum)
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	203	apply (rule natLeq_Cinfinite)
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	204	apply (rule Cinfinite_card_suc)
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	205	apply assumption
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	206	apply (rule card_of_card_order_on)
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	207	apply (rule regularCard_natLeq)
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	208	apply (rule regularCard_card_suc)
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	209	apply (rule card_of_card_order_on)
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	210	apply assumption
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	211	apply (rule regularCard_ordIso[of natLeq])
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	212	apply (rule csum_absorb1[THEN ordIso_symmetric])
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	213	apply (rule natLeq_Cinfinite)
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	214	apply (rule card_suc_least)
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	215	apply (rule card_of_card_order_on)
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	216	apply (rule natLeq_Card_order)
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	217	apply (subst finite_iff_ordLess_natLeq[symmetric])
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	218	apply (simp add: cinfinite_def Field_card_of card_of_card_order_on)
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	219	apply (rule natLeq_Cinfinite)
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	220	apply (rule regularCard_natLeq)
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	221	done
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	222
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	223	lemma ordLess_bd_fun: "\|UNIV::'a set\| <o natLeq +c card_suc ( \|UNIV::'a set\| )"
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	224	(is "_ <o (_ +c card_suc (?U :: 'a rel))")
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	225	proof (cases "Cinfinite ?U")
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	226	case True
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	227	have "?U <o card_suc ?U" using card_of_card_order_on natLeq_card_order card_suc_greater by blast
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	228	also have "card_suc ?U =o natLeq +c card_suc ?U" by (rule csum_absorb2[THEN ordIso_symmetric])
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	229	(auto simp: True card_of_card_order_on intro!: Cinfinite_card_suc natLeq_ordLeq_cinfinite)
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	230	finally show ?thesis .
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	231	next
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	232	case False
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	233	then have "?U <o natLeq"
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	234	by (auto simp: cinfinite_def Field_card_of card_of_card_order_on finite_iff_ordLess_natLeq[symmetric])
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	235	then show ?thesis
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	236	by (rule ordLess_ordLeq_trans[OF _ ordLeq_csum1[OF natLeq_Card_order]])
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	237	qed
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	238
54421 632be352a5a3 more explicit syntax for defining a bnf traytel parents: 54191 diff changeset	239	bnf "'a \<Rightarrow> 'b"
67399 eab6ce8368fa ran isabelle update_op on all sources nipkow parents: 67091 diff changeset	240	map: "(\<circ>)"
54421 632be352a5a3 more explicit syntax for defining a bnf traytel parents: 54191 diff changeset	241	sets: range
75625 0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	242	bd: "natLeq +c card_suc ( \|UNIV::'a set\| )"
67399 eab6ce8368fa ran isabelle update_op on all sources nipkow parents: 67091 diff changeset	243	rel: "rel_fun (=)"
62324 ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	244	pred: "pred_fun (\<lambda>_. True)"
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	245	proof
7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	246	fix f show "id \<circ> f = id f" by simp
7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	247	next
67399 eab6ce8368fa ran isabelle update_op on all sources nipkow parents: 67091 diff changeset	248	fix f g show "(\<circ>) (g \<circ> f) = (\<circ>) g \<circ> (\<circ>) f"
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	249	unfolding comp_def[abs_def] ..
7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	250	next
7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	251	fix x f g
7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	252	assume "\<And>z. z \<in> range x \<Longrightarrow> f z = g z"
7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	253	thus "f \<circ> x = g \<circ> x" by auto
7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	254	next
67399 eab6ce8368fa ran isabelle update_op on all sources nipkow parents: 67091 diff changeset	255	fix f show "range \<circ> (\<circ>) f = (`) f \<circ> range"
56077 d397030fb27e tuned proofs haftmann parents: 55945 diff changeset	256	by (auto simp add: fun_eq_iff)
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	257	next
75625 0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	258	show "card_order (natLeq +c card_suc ( \|UNIV\| ))"
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	259	by (rule card_order_bd_fun)
75624 22d1c5f2b9f4 strict bounds for BNFs (by Jan van Brügge) traytel parents: 67399 diff changeset	260	next
75625 0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	261	show "cinfinite (natLeq +c card_suc ( \|UNIV\| ))"
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	262	by (rule Cinfinite_bd_fun[THEN conjunct1])
75624 22d1c5f2b9f4 strict bounds for BNFs (by Jan van Brügge) traytel parents: 67399 diff changeset	263	next
75625 0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	264	show "regularCard (natLeq +c card_suc ( \|UNIV\| ))"
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	265	by (rule regularCard_bd_fun)
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	266	next
75625 0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	267	fix f :: "'d \<Rightarrow> 'a"
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	268	show "\|range f\| <o natLeq +c card_suc \|UNIV :: 'd set\|"
0dd3ac5fdbaa tuned BNF bounds for function space and bounded sets; NEWS and CONTRIBUTORS traytel parents: 75624 diff changeset	269	by (rule ordLeq_ordLess_trans[OF card_of_image ordLess_bd_fun])
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	270	next
54841 af71b753c459 express weak pullback property of bnfs only in terms of the relator traytel parents: 54581 diff changeset	271	fix R S
67399 eab6ce8368fa ran isabelle update_op on all sources nipkow parents: 67091 diff changeset	272	show "rel_fun (=) R OO rel_fun (=) S \<le> rel_fun (=) (R OO S)" by (auto simp: rel_fun_def)
49453 ff0e540d8758 add rel as first-class citizen of BNF blanchet parents: 49451 diff changeset	273	next
49463 83ac281bcdc2 provide predicator, define relator blanchet parents: 49455 diff changeset	274	fix R
67399 eab6ce8368fa ran isabelle update_op on all sources nipkow parents: 67091 diff changeset	275	show "rel_fun (=) R = (\<lambda>x y.
62324 ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	276	\<exists>z. range z \<subseteq> {(x, y). R x y} \<and> fst \<circ> z = x \<and> snd \<circ> z = y)"
ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	277	unfolding rel_fun_def subset_iff by (force simp: fun_eq_iff[symmetric])
ae44f16dcea5 make predicator a first-class bnf citizen traytel parents: 61681 diff changeset	278	qed (auto simp: pred_fun_def)
54191 7fba375a7e7d removed junk traytel parents: 54189 diff changeset	279
48975 7f79f94a432c added new (co)datatype package + theories of ordinals and cardinals (with Dmitriy and Andrei) blanchet parents: diff changeset	280	end

author	wenzelm
	Fri, 12 Aug 2022 19:47:38 +0200
changeset 75827	4920ebbde486
parent 75625	0dd3ac5fdbaa
child 76953	f70d431b5016
permissions	-rw-r--r--