Weak invariance principle for the local times of Gibbs-Markov processes

Abstract

The subject of this paper is to prove a functional weak invariance principle for the local time of a process generated by a Gibbs-Markov map. More precisely, let (X,B,m,T,α) is a mixing, probability preserving Gibbs-Markov. and let ∈ L2(m) be an aperiodic function with mean 0. Set Sn=Σk=0nXk and define the hitting time process Ln(x) be the number of times Sk hits x∈ Z up to step n. The normalized local time process ln(x) is defined by ln(t)=Ln( nx )n,\,\, x∈R. We prove under that ln(x) converges in distribution to the local time of the Brownian Motion. The proof also applies to the more classical setting of local times derived from a subshift of finite type endowed with a Gibbs measure.