isabelle: src/HOL/Typedef.thy@baefae13ad37 (annotated)

11608 c760ea8154ee renamed theory "subset" to "Typedef"; wenzelm parents: diff changeset	1	(* Title: HOL/Typedef.thy
c760ea8154ee renamed theory "subset" to "Typedef"; wenzelm parents: diff changeset	2	ID: $Id$
c760ea8154ee renamed theory "subset" to "Typedef"; wenzelm parents: diff changeset	3	Author: Markus Wenzel, TU Munich
11743 b9739c85dd44 tuned; wenzelm parents: 11659 diff changeset	4	*)
11608 c760ea8154ee renamed theory "subset" to "Typedef"; wenzelm parents: diff changeset	5
11979 0a3dace545c5 converted theory "Set"; wenzelm parents: 11770 diff changeset	6	header {* HOL type definitions *}
11608 c760ea8154ee renamed theory "subset" to "Typedef"; wenzelm parents: diff changeset	7
c760ea8154ee renamed theory "subset" to "Typedef"; wenzelm parents: diff changeset	8	theory Typedef = Set
11979 0a3dace545c5 converted theory "Set"; wenzelm parents: 11770 diff changeset	9	files ("Tools/typedef_package.ML"):
11608 c760ea8154ee renamed theory "subset" to "Typedef"; wenzelm parents: diff changeset	10
13412 666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	11	locale type_definition =
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	12	fixes Rep and Abs and A
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	13	assumes Rep: "Rep x \<in> A"
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	14	and Rep_inverse: "Abs (Rep x) = x"
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	15	and Abs_inverse: "y \<in> A ==> Rep (Abs y) = y"
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	16	-- {* This will be axiomatized for each typedef! *}
11608 c760ea8154ee renamed theory "subset" to "Typedef"; wenzelm parents: diff changeset	17
13412 666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	18	lemma (in type_definition) Rep_inject:
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	19	"(Rep x = Rep y) = (x = y)"
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	20	proof
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	21	assume "Rep x = Rep y"
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	22	hence "Abs (Rep x) = Abs (Rep y)" by (simp only:)
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	23	also have "Abs (Rep x) = x" by (rule Rep_inverse)
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	24	also have "Abs (Rep y) = y" by (rule Rep_inverse)
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	25	finally show "x = y" .
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	26	next
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	27	assume "x = y"
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	28	thus "Rep x = Rep y" by (simp only:)
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	29	qed
11608 c760ea8154ee renamed theory "subset" to "Typedef"; wenzelm parents: diff changeset	30
13412 666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	31	lemma (in type_definition) Abs_inject:
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	32	assumes x: "x \<in> A" and y: "y \<in> A"
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	33	shows "(Abs x = Abs y) = (x = y)"
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	34	proof
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	35	assume "Abs x = Abs y"
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	36	hence "Rep (Abs x) = Rep (Abs y)" by (simp only:)
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	37	also from x have "Rep (Abs x) = x" by (rule Abs_inverse)
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	38	also from y have "Rep (Abs y) = y" by (rule Abs_inverse)
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	39	finally show "x = y" .
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	40	next
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	41	assume "x = y"
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	42	thus "Abs x = Abs y" by (simp only:)
11608 c760ea8154ee renamed theory "subset" to "Typedef"; wenzelm parents: diff changeset	43	qed
c760ea8154ee renamed theory "subset" to "Typedef"; wenzelm parents: diff changeset	44
13412 666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	45	lemma (in type_definition) Rep_cases [cases set]:
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	46	assumes y: "y \<in> A"
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	47	and hyp: "!!x. y = Rep x ==> P"
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	48	shows P
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	49	proof (rule hyp)
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	50	from y have "Rep (Abs y) = y" by (rule Abs_inverse)
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	51	thus "y = Rep (Abs y)" ..
11608 c760ea8154ee renamed theory "subset" to "Typedef"; wenzelm parents: diff changeset	52	qed
c760ea8154ee renamed theory "subset" to "Typedef"; wenzelm parents: diff changeset	53
13412 666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	54	lemma (in type_definition) Abs_cases [cases type]:
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	55	assumes r: "!!y. x = Abs y ==> y \<in> A ==> P"
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	56	shows P
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	57	proof (rule r)
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	58	have "Abs (Rep x) = x" by (rule Rep_inverse)
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	59	thus "x = Abs (Rep x)" ..
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	60	show "Rep x \<in> A" by (rule Rep)
11608 c760ea8154ee renamed theory "subset" to "Typedef"; wenzelm parents: diff changeset	61	qed
c760ea8154ee renamed theory "subset" to "Typedef"; wenzelm parents: diff changeset	62
13412 666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	63	lemma (in type_definition) Rep_induct [induct set]:
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	64	assumes y: "y \<in> A"
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	65	and hyp: "!!x. P (Rep x)"
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	66	shows "P y"
11608 c760ea8154ee renamed theory "subset" to "Typedef"; wenzelm parents: diff changeset	67	proof -
13412 666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	68	have "P (Rep (Abs y))" by (rule hyp)
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	69	also from y have "Rep (Abs y) = y" by (rule Abs_inverse)
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	70	finally show "P y" .
11608 c760ea8154ee renamed theory "subset" to "Typedef"; wenzelm parents: diff changeset	71	qed
c760ea8154ee renamed theory "subset" to "Typedef"; wenzelm parents: diff changeset	72
13412 666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	73	lemma (in type_definition) Abs_induct [induct type]:
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	74	assumes r: "!!y. y \<in> A ==> P (Abs y)"
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	75	shows "P x"
11608 c760ea8154ee renamed theory "subset" to "Typedef"; wenzelm parents: diff changeset	76	proof -
13412 666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	77	have "Rep x \<in> A" by (rule Rep)
11608 c760ea8154ee renamed theory "subset" to "Typedef"; wenzelm parents: diff changeset	78	hence "P (Abs (Rep x))" by (rule r)
13412 666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	79	also have "Abs (Rep x) = x" by (rule Rep_inverse)
666137b488a4 predicate defs via locales; wenzelm parents: 12023 diff changeset	80	finally show "P x" .
11608 c760ea8154ee renamed theory "subset" to "Typedef"; wenzelm parents: diff changeset	81	qed
c760ea8154ee renamed theory "subset" to "Typedef"; wenzelm parents: diff changeset	82
c760ea8154ee renamed theory "subset" to "Typedef"; wenzelm parents: diff changeset	83	use "Tools/typedef_package.ML"
c760ea8154ee renamed theory "subset" to "Typedef"; wenzelm parents: diff changeset	84
c760ea8154ee renamed theory "subset" to "Typedef"; wenzelm parents: diff changeset	85	end

author	paulson
	Thu, 30 Jan 2003 18:08:09 +0100
changeset 13797	baefae13ad37
parent 13421	8fcdf4a26468
child 15131	c69542757a4d
permissions	-rw-r--r--