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Occupation times of sets of infinite measure for ergodic transformations

Aaronson, J, Thaler, M and Zweimueller, R (2004) Occupation times of sets of infinite measure for ergodic transformations as in: Ergodic Theory Dynam. Systems 25 (2005), no. 4, 959--976..

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Abstract

Assume that $T$ is a conservative ergodic measure preserving transformation of the infinite measure space $(X,\mathcal{A},\mu)$.We study the asymptotic behaviour of occupation times of certain subsets of infinite measure. Specifically, we prove a Darling-Kac type distributional limit theorem for occupation times of barely infinite components which are separated from the rest of the space by a set of finite measure with c.f.-mixing return process. In the same setup we show that the ratios of occupation times of two components separated in this way diverge almost everywhere. These abstract results are illustrated by applications to interval maps with indifferent fixed points.

Item Type: Article
Authors :
NameEmailORCID
Aaronson, JUNSPECIFIEDUNSPECIFIED
Thaler, MUNSPECIFIEDUNSPECIFIED
Zweimueller, Rr.zweimueller@surrey.ac.ukUNSPECIFIED
Date : 28 June 2004
Related URLs :
Depositing User : Symplectic Elements
Date Deposited : 17 May 2017 11:49
Last Modified : 17 May 2017 11:49
URI: http://epubs.surrey.ac.uk/id/eprint/832828

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