isabelle: src/HOL/Induct/Sigma_Algebra.thy@3d1780208bf3 (annotated)

10875 1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	1	(* Title: HOL/Induct/Sigma_Algebra.thy
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	2	ID: $Id$
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	3	Author: Markus Wenzel, TU Muenchen
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	4	License: GPL (GNU GENERAL PUBLIC LICENSE)
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	5	*)
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	6
11046 b5f5942781a0 Induct: converted some theories to new-style format; wenzelm parents: 10875 diff changeset	7	header {* Sigma algebras *}
b5f5942781a0 Induct: converted some theories to new-style format; wenzelm parents: 10875 diff changeset	8
10875 1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	9	theory Sigma_Algebra = Main:
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	10
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	11	text {*
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	12	This is just a tiny example demonstrating the use of inductive
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	13	definitions in classical mathematics. We define the least @{text
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	14	\<sigma>}-algebra over a given set of sets.
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	15	*}
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	16
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	17	consts
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	18	sigma_algebra :: "'a set set => 'a set set" ("\<sigma>'_algebra")
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	19
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	20	inductive "\<sigma>_algebra A"
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	21	intros
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	22	basic: "a \<in> A ==> a \<in> \<sigma>_algebra A"
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	23	UNIV: "UNIV \<in> \<sigma>_algebra A"
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	24	complement: "a \<in> \<sigma>_algebra A ==> -a \<in> \<sigma>_algebra A"
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	25	Union: "(!!i::nat. a i \<in> \<sigma>_algebra A) ==> (\<Union>i. a i) \<in> \<sigma>_algebra A"
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	26
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	27	text {*
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	28	The following basic facts are consequences of the closure properties
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	29	of any @{text \<sigma>}-algebra, merely using the introduction rules, but
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	30	no induction nor cases.
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	31	*}
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	32
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	33	theorem sigma_algebra_empty: "{} \<in> \<sigma>_algebra A"
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	34	proof -
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	35	have "UNIV \<in> \<sigma>_algebra A" by (rule sigma_algebra.UNIV)
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	36	hence "-UNIV \<in> \<sigma>_algebra A" by (rule sigma_algebra.complement)
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	37	also have "-UNIV = {}" by simp
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	38	finally show ?thesis .
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	39	qed
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	40
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	41	theorem sigma_algebra_Inter:
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	42	"(!!i::nat. a i \<in> \<sigma>_algebra A) ==> (\<Inter>i. a i) \<in> \<sigma>_algebra A"
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	43	proof -
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	44	assume "!!i::nat. a i \<in> \<sigma>_algebra A"
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	45	hence "!!i::nat. -(a i) \<in> \<sigma>_algebra A" by (rule sigma_algebra.complement)
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	46	hence "(\<Union>i. -(a i)) \<in> \<sigma>_algebra A" by (rule sigma_algebra.Union)
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	47	hence "-(\<Union>i. -(a i)) \<in> \<sigma>_algebra A" by (rule sigma_algebra.complement)
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	48	also have "-(\<Union>i. -(a i)) = (\<Inter>i. a i)" by simp
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	49	finally show ?thesis .
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	50	qed
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	51
1715cb147294 added Induct/Sigma_Algebra.thy; wenzelm parents: diff changeset	52	end

author	wenzelm
	Sat, 27 Oct 2001 00:00:05 +0200
changeset 11954	3d1780208bf3
parent 11046	b5f5942781a0
child 14717	7d8d4c9b36fd
permissions	-rw-r--r--