On the affine recursion on R+d

Abstract

We fix d ≥ 2 and denote S the semi-group of d × d matrices with non negative entries. We consider a sequence (An, Bn)n ≥ 1 of i. i. d. random variables with values in S× R+d and study the asymptotic behavior of the Markov chain (Xn)n ≥ 0 on R+d defined by: \[ ∀ n ≥ 0, Xn+1=An+1Xn+Bn+1, \] where X0 is a fixed random variable. We assume that the Lyapunov exponent of the matrices An equals 0 and prove, under quite general hypotheses, that there exists a unique (infinite) Radon measure λ on ( R+)d which is invariant for the chain (Xn)n ≥ 0. The existence of λ relies on a recent work by T.D.C. Pham about fluctuations of the norm of product of random matrices . Its unicity is a consequence of a general property, called "local contractivity", highlighted about 20 years ago by M. Babillot, Ph. Bougerol et L. Elie in the case of the one dimensional affine recursion .