Stable laws and products of positive random matrices

Abstract

Let S be the multiplicative semigroup of q× q matrices with positive entries such that every row and every column contains a strictly positive element. Denote by (Xn)n≥1 a sequence of independent identically distributed random variables in S and by X(n) = Xn ... X1, n≥ 1, the associated left random walk on S. We assume that (Xn)n≥1 verifies the contraction property (n≥1[X(n) ∈ S])>0, where S is the subset of all matrices which have strictly positive entries. We state conditions on the distribution of the random matrix X1 which ensure that the logarithms of the entries, of the norm, and of the spectral radius of the products X(n), n 1, are in the domain of attraction of a stable law.