isabelle: src/HOL/Relation.thy@e653cb933293 (annotated)

1475 7f5a4cd08209 expanded tabs; renamed subtype to typedef; clasohm parents: 1454 diff changeset	1	(* Title: Relation.thy
1128 64b30e3cc6d4 Trancl is now based on Relation which used to be in Integ. nipkow parents: diff changeset	2	ID: $Id$
1983 f3f7bf0079fa Simplification and tidying of definitions paulson parents: 1695 diff changeset	3	Author: Lawrence C Paulson, Cambridge University Computer Laboratory
f3f7bf0079fa Simplification and tidying of definitions paulson parents: 1695 diff changeset	4	Copyright 1996 University of Cambridge
1128 64b30e3cc6d4 Trancl is now based on Relation which used to be in Integ. nipkow parents: diff changeset	5	*)
64b30e3cc6d4 Trancl is now based on Relation which used to be in Integ. nipkow parents: diff changeset	6
10212 33fe2d701ddd * empty log message * nipkow parents: 8703 diff changeset	7	Relation = Product_Type +
5978 fa2c2dd74f8c moved diag (diagonal relation) from Univ to Relation paulson parents: 5608 diff changeset	8
fa2c2dd74f8c moved diag (diagonal relation) from Univ to Relation paulson parents: 5608 diff changeset	9	constdefs
7912 0e42be14f136 tidied using modern infix form paulson parents: 7014 diff changeset	10	converse :: "('a'b) set => ('b'a) set" ("(_^-1)" [1000] 999)
0e42be14f136 tidied using modern infix form paulson parents: 7014 diff changeset	11	"r^-1 == {(y,x). (x,y):r}"
0e42be14f136 tidied using modern infix form paulson parents: 7014 diff changeset	12
0e42be14f136 tidied using modern infix form paulson parents: 7014 diff changeset	13	comp :: "[('b * 'c)set, ('a * 'b)set] => ('a * 'c)set" (infixr "O" 60)
0e42be14f136 tidied using modern infix form paulson parents: 7014 diff changeset	14	"r O s == {(x,z). ? y. (x,y):s & (y,z):r}"
5978 fa2c2dd74f8c moved diag (diagonal relation) from Univ to Relation paulson parents: 5608 diff changeset	15
7912 0e42be14f136 tidied using modern infix form paulson parents: 7014 diff changeset	16	Image :: "[('a*'b) set,'a set] => 'b set" (infixl "^^" 90)
0e42be14f136 tidied using modern infix form paulson parents: 7014 diff changeset	17	"r ^^ s == {y. ? x:s. (x,y):r}"
0e42be14f136 tidied using modern infix form paulson parents: 7014 diff changeset	18
0e42be14f136 tidied using modern infix form paulson parents: 7014 diff changeset	19	Id :: "('a * 'a)set" (the identity relation)
0e42be14f136 tidied using modern infix form paulson parents: 7014 diff changeset	20	"Id == {p. ? x. p = (x,x)}"
0e42be14f136 tidied using modern infix form paulson parents: 7014 diff changeset	21
0e42be14f136 tidied using modern infix form paulson parents: 7014 diff changeset	22	diag :: "'a set => ('a * 'a)set" (diagonal: identity over a set)
5978 fa2c2dd74f8c moved diag (diagonal relation) from Univ to Relation paulson parents: 5608 diff changeset	23	"diag(A) == UN x:A. {(x,x)}"
fa2c2dd74f8c moved diag (diagonal relation) from Univ to Relation paulson parents: 5608 diff changeset	24
6806 43c081a0858d new preficates refl, sym [from Integ/Equiv], antisym paulson parents: 5978 diff changeset	25	Domain :: "('a*'b) set => 'a set"
5978 fa2c2dd74f8c moved diag (diagonal relation) from Univ to Relation paulson parents: 5608 diff changeset	26	"Domain(r) == {x. ? y. (x,y):r}"
fa2c2dd74f8c moved diag (diagonal relation) from Univ to Relation paulson parents: 5608 diff changeset	27
6806 43c081a0858d new preficates refl, sym [from Integ/Equiv], antisym paulson parents: 5978 diff changeset	28	Range :: "('a*'b) set => 'b set"
5978 fa2c2dd74f8c moved diag (diagonal relation) from Univ to Relation paulson parents: 5608 diff changeset	29	"Range(r) == Domain(r^-1)"
fa2c2dd74f8c moved diag (diagonal relation) from Univ to Relation paulson parents: 5608 diff changeset	30
6806 43c081a0858d new preficates refl, sym [from Integ/Equiv], antisym paulson parents: 5978 diff changeset	31	refl :: "['a set, ('a'a) set] => bool" (reflexivity over a set*)
8703 816d8f6513be Times -> <> nipkow* parents: 8268 diff changeset	32	"refl A r == r <= A <*> A & (ALL x: A. (x,x) : r)"
6806 43c081a0858d new preficates refl, sym [from Integ/Equiv], antisym paulson parents: 5978 diff changeset	33
43c081a0858d new preficates refl, sym [from Integ/Equiv], antisym paulson parents: 5978 diff changeset	34	sym :: "('a'a) set=>bool" (symmetry predicate*)
43c081a0858d new preficates refl, sym [from Integ/Equiv], antisym paulson parents: 5978 diff changeset	35	"sym(r) == ALL x y. (x,y): r --> (y,x): r"
43c081a0858d new preficates refl, sym [from Integ/Equiv], antisym paulson parents: 5978 diff changeset	36
43c081a0858d new preficates refl, sym [from Integ/Equiv], antisym paulson parents: 5978 diff changeset	37	antisym:: "('a * 'a)set => bool" (antisymmetry predicate)
43c081a0858d new preficates refl, sym [from Integ/Equiv], antisym paulson parents: 5978 diff changeset	38	"antisym(r) == ALL x y. (x,y):r --> (y,x):r --> x=y"
43c081a0858d new preficates refl, sym [from Integ/Equiv], antisym paulson parents: 5978 diff changeset	39
43c081a0858d new preficates refl, sym [from Integ/Equiv], antisym paulson parents: 5978 diff changeset	40	trans :: "('a * 'a)set => bool" (transitivity predicate)
5978 fa2c2dd74f8c moved diag (diagonal relation) from Univ to Relation paulson parents: 5608 diff changeset	41	"trans(r) == (!x y z. (x,y):r --> (y,z):r --> (x,z):r)"
fa2c2dd74f8c moved diag (diagonal relation) from Univ to Relation paulson parents: 5608 diff changeset	42
8268 722074b93cdd renamed Univalent to univalent oheimb parents: 7912 diff changeset	43	univalent :: "('a * 'b)set => bool"
722074b93cdd renamed Univalent to univalent oheimb parents: 7912 diff changeset	44	"univalent r == !x y. (x,y):r --> (!z. (x,z):r --> y=z)"
5978 fa2c2dd74f8c moved diag (diagonal relation) from Univ to Relation paulson parents: 5608 diff changeset	45
7014 11ee650edcd2 Added some definitions and theorems needed for the berghofe parents: 6806 diff changeset	46	fun_rel_comp :: "['a => 'b, ('b * 'c) set] => ('a => 'c) set"
11ee650edcd2 Added some definitions and theorems needed for the berghofe parents: 6806 diff changeset	47	"fun_rel_comp f R == {g. !x. (f x, g x) : R}"
11ee650edcd2 Added some definitions and theorems needed for the berghofe parents: 6806 diff changeset	48
6806 43c081a0858d new preficates refl, sym [from Integ/Equiv], antisym paulson parents: 5978 diff changeset	49	syntax
43c081a0858d new preficates refl, sym [from Integ/Equiv], antisym paulson parents: 5978 diff changeset	50	reflexive :: "('a * 'a)set => bool" (reflexivity over a type)
43c081a0858d new preficates refl, sym [from Integ/Equiv], antisym paulson parents: 5978 diff changeset	51
43c081a0858d new preficates refl, sym [from Integ/Equiv], antisym paulson parents: 5978 diff changeset	52	translations
43c081a0858d new preficates refl, sym [from Integ/Equiv], antisym paulson parents: 5978 diff changeset	53	"reflexive" == "refl UNIV"
43c081a0858d new preficates refl, sym [from Integ/Equiv], antisym paulson parents: 5978 diff changeset	54
1128 64b30e3cc6d4 Trancl is now based on Relation which used to be in Integ. nipkow parents: diff changeset	55	end

author	nipkow
	Tue, 17 Oct 2000 08:00:46 +0200
changeset 10228	e653cb933293
parent 10212	33fe2d701ddd
child 10358	ef2a753cda2a
permissions	-rw-r--r--