Quantitative recurrence properties and strong dynamical Borel-Cantelli lemma for dynamical systems with exponential decay of correlations

Abstract

Let ([0,1]d,T,μ) be a measure-preserving dynamical system so that the correlations decay exponentially for H\"older continuous functions. Suppose that μ is absolutely continuous with a density function h∈ Lq( Ld) for some q>1 , where Ld is the d -dimensional Lebesgue measure. Under mild conditions on the underlying dynamical system, we obtain a strong dynamical Borel-Cantelli lemma for recurrence: For any sequence \Rn\ of hyperrectangles with sides parallel to the axes and centered at the origin, \[Σn=1∞ Ld(Rn)=∞n∞Σk=1nRk+x(Tkx)Σk=1n Ld(Rk)=h(x) μ -a.e.x,\] where x∈[0,1]d and Rk+x is the translation of Rk . The result applies to Gauss map, β-transformation and expanding toral endomorphisms.

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