翻訳と辞書
Words near each other
・ "O" Is for Outlaw
・ "O"-Jung.Ban.Hap.
・ "Ode-to-Napoleon" hexachord
・ "Oh Yeah!" Live
・ "Our Contemporary" regional art exhibition (Leningrad, 1975)
・ "P" Is for Peril
・ "Pimpernel" Smith
・ "Polish death camp" controversy
・ "Pro knigi" ("About books")
・ "Prosopa" Greek Television Awards
・ "Pussy Cats" Starring the Walkmen
・ "Q" Is for Quarry
・ "R" Is for Ricochet
・ "R" The King (2016 film)
・ "Rags" Ragland
・ ! (album)
・ ! (disambiguation)
・ !!
・ !!!
・ !!! (album)
・ !!Destroy-Oh-Boy!!
・ !Action Pact!
・ !Arriba! La Pachanga
・ !Hero
・ !Hero (album)
・ !Kung language
・ !Oka Tokat
・ !PAUS3
・ !T.O.O.H.!
・ !Women Art Revolution


Dictionary Lists
翻訳と辞書 辞書検索 [ 開発暫定版 ]
スポンサード リンク

invariant measure : ウィキペディア英語版
invariant measure
In mathematics, an invariant measure is a measure that is preserved by some function. Ergodic theory is the study of invariant measures in dynamical systems. The Krylov–Bogolyubov theorem proves the existence of invariant measures under certain conditions on the function and space under consideration.
==Definition==
Let (''X'', Σ) be a measurable space and let ''f'' be a measurable function from ''X'' to itself. A measure ''μ'' on (''X'', Σ) is said to be invariant under ''f'' if, for every measurable set ''A'' in Σ,
:\mu \left( f^ (A) \right) = \mu (A).
In terms of the push forward, this states that ''f''(''μ'') = ''μ''.
The collection of measures (usually probability measures) on ''X'' that are invariant under ''f'' is sometimes denoted ''M''''f''(''X''). The collection of ergodic measures, ''E''''f''(''X''), is a subset of ''M''''f''(''X''). Moreover, any convex combination of two invariant measures is also invariant, so ''M''''f''(''X'') is a convex set; ''E''''f''(''X'') consists precisely of the extreme points of ''M''''f''(''X'').
In the case of a dynamical system (''X'', ''T'', ''φ''), where (''X'', Σ) is a measurable space as before, ''T'' is a monoid and ''φ'' : ''T'' × ''X'' → ''X'' is the flow map, a measure ''μ'' on (''X'', Σ) is said to be an invariant measure if it is an invariant measure for each map ''φ''''t'' : ''X'' → ''X''. Explicitly, ''μ'' is invariant if and only if
:\mu \left( \varphi_^ (A) \right) = \mu (A) \qquad \forall t \in T, A \in \Sigma.
Put another way, ''μ'' is an invariant measure for a sequence of random variables (''Z''''t'')''t''≥0 (perhaps a Markov chain or the solution to a stochastic differential equation) if, whenever the initial condition ''Z''0 is distributed according to ''μ'', so is ''Z''''t'' for any later time ''t''.

抄文引用元・出典: フリー百科事典『 ウィキペディア(Wikipedia)
ウィキペディアで「invariant measure」の詳細全文を読む



スポンサード リンク
翻訳と辞書 : 翻訳のためのインターネットリソース

Copyright(C) kotoba.ne.jp 1997-2016. All Rights Reserved.