Central limit theorems for iterated random Lipschitz mappings

Abstract

Let M be a noncompact metric space in which every closed ball is compact, and let G be a semigroup of Lipschitz mappings of M. Denote by (Yn)n≥1 a sequence of independent G-valued, identically distributed random variables (r.v.'s), and by Z an M-valued r.v. which is independent of the r.v. Yn, n≥1. We consider the Markov chain (Zn)n≥0 with state space M which is defined recursively by Z0=Z and Zn+1=Yn+1Zn for n≥0. Let be a real-valued function on G× M. The aim of this paper is to prove central limit theorems for the sequence of r.v.'s ((Yn,Zn-1))n≥1. The main hypothesis is a condition of contraction in the mean for the action on M of the mappings Yn; we use a spectral method based on a quasi-compactness property of the transition probability of the chain mentioned above, and on a special perturbation theorem.

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