Convergence to stable laws for multidimensional stochastic recursions: the case of regular matrices

Abstract

Given a sequence (Mn,Qn)n 1 of i.i.d.\ random variables with generic copy (M,Q) ∈ GL(d, ) × d, we consider the random difference equation (RDE) Rn=MnRn-1+Qn, n 1, and assume the existence of >0 such that n ∞(M1 ... Mn)1n = 1 . We prove, under suitable assumptions, that the sequence Sn = R1 + ... + Rn, appropriately normalized, converges in law to a multidimensional stable distribution with index . As a by-product, we show that the unique stationary solution R of the RDE is regularly varying with index , and give a precise description of its tail measure. This extends the prior work http://arxiv.org/abs/1009.1728v3 .