Moderate deviations and local limit theorems for the coefficients of random walks on the general linear group

Abstract

Consider the random walk Gn : = gn … g1, n ≥ 1, where (gn)n≥ 1 is a sequence of independent and identically distributed random elements with law μ on the general linear group GL(V) with V= Rd. Under suitable conditions on μ, we establish Cram\'er type moderate deviation expansions and local limit theorems with moderate deviations for the coefficients f, Gn v , where v ∈ V and f ∈ V*. Our approach is based on the H\"older regularity of the invariant measure of the Markov chain Gn \!· \! x = R Gn v on the projective space of V with the starting point x = R v, under the changed measure.