Berry-Esseen bound and precise moderate deviations for products of random matrices

Abstract

Let (gn)n≥ 1 be a sequence of independent and identically distributed (i.i.d.) d× d real random matrices. For n≥ 1 set Gn = gn … g1. Given any starting point x= R v∈Pd-1, consider the Markov chain Xnx = R Gn v on the projective space Pd-1 and the norm cocycle σ(Gn, x)= |Gn v||v|, for an arbitrary norm |·| on Rd. Under suitable conditions we prove a Berry-Esseen type theorem and an Edgeworth expansion for the couple (Xnx, σ(Gn, x)). These results are established using a brand new smoothing inequality on complex plane, the saddle point method and additional spectral gap properties of the transfer operator related to the Markov chain Xnx. Cram\'er type moderate deviation expansions as well as a local limit theorem with moderate deviations are proved for the couple (Xnx, σ(Gn, x)) with a target function on the Markov chain Xnx.