On almost-sure versions of classical limit theorems for dynamical systems

J. R. Chazottes; S. Gouëzel

doi:10.1007/s00440-006-0021-6

On almost-sure versions of classical limit theorems for dynamical systems

J. R. Chazottes
, S. Gouëzel

UMR 6625

Research output: Contribution to journal › Article › peer-review

Abstract

The purpose of this article is to support the idea that "whenever we can prove a limit theorem in the classical sense for a dynamical system, we can prove a suitable almost-sure version based on an empirical measure with log-average". We follow three different approaches: martingale methods, spectral methods and induction arguments. Our results apply, among others, to Axiom A maps or flows, to systems inducing a Gibbs-Markov map, and to the stadium billiard.

Original language	English
Pages (from-to)	195-234
Number of pages	40
Journal	Probability Theory and Related Fields
Volume	138
Issue number	1-2
DOIs	https://doi.org/10.1007/s00440-006-0021-6
Publication status	Published - 1 Jan 2007

Keywords

Almost-sure central limit theorem
Almost-sure convergence to stable laws
Gibbs-Markov map
Inducing
Martingales
Stadium billiard
Suspension flow
hyperbolic flow

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10.1007/s00440-006-0021-6

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N2 - The purpose of this article is to support the idea that "whenever we can prove a limit theorem in the classical sense for a dynamical system, we can prove a suitable almost-sure version based on an empirical measure with log-average". We follow three different approaches: martingale methods, spectral methods and induction arguments. Our results apply, among others, to Axiom A maps or flows, to systems inducing a Gibbs-Markov map, and to the stadium billiard.

AB - The purpose of this article is to support the idea that "whenever we can prove a limit theorem in the classical sense for a dynamical system, we can prove a suitable almost-sure version based on an empirical measure with log-average". We follow three different approaches: martingale methods, spectral methods and induction arguments. Our results apply, among others, to Axiom A maps or flows, to systems inducing a Gibbs-Markov map, and to the stadium billiard.

KW - Almost-sure central limit theorem

KW - Almost-sure convergence to stable laws

KW - Gibbs-Markov map

KW - Inducing

KW - Martingales

KW - Stadium billiard

KW - Suspension flow

KW - hyperbolic flow

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JO - Probability Theory and Related Fields

JF - Probability Theory and Related Fields

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ER -

On almost-sure versions of classical limit theorems for dynamical systems

Abstract

Keywords

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