A. G. Kachurovskii, I. V. Podvigin, “Large Deviations and the Rate of Convergence in the Birkhoff Ergodic Theorem”, Mat. Zametki, 2013, Volume 94, Issue 4,Pages <nobr>569

This article is cited in 13 papers

Large Deviations and the Rate of Convergence in the Birkhoff Ergodic Theorem

A. G. Kachurovskii^a, I. V. Podvigin^b

^a Sobolev Institute of Mathematics, Siberian Branch of the Russian Academy of Sciences, Novosibirsk
^b Novosibirsk State University

Abstract: For bounded averaged functions, we prove the equivalence of the power-law and exponential rates of convergence in the Birkhoff individual ergodic theorem with the same asymptotics of the probability of large deviations in this theorem.

Keywords: pointwise ergodic theorem, rates of convergence in ergodic theorems, large deviations, billiards, Anosov systems.

UDC: 517.987+519.214

Received: 27.02.2012

DOI: 10.4213/mzm9352