Precise Tail Asymptotics for Attracting Fixed Points of Multivariate Smoothing Transformations

Abstract

Given d 1, let (Ai)i 1 be a sequence of random d× d real matrices and Q be a random vector in Rd. We consider fixed points of multivariate smoothing transforms, i.e. random variables X∈ Rd satisfying X has the same law as Σi 1 Ai Xi + Q, where (Xi)i 1 are i.i.d. copies of X and independent of (Q, (Ai)i 1). The existence of fixed points that can attract point masses can be shown by means of contraction arguments. Let X be such a fixed point. Assuming that the action of the matrices is expanding as well with positive probability, it was shown in a number of papers that there is β >0 with t ∞ tβ P(<u,X > >t ) = K· f(u), where u denotes an arbitrary element of the unit sphere and f a positive function and K 0. However in many cases it was not established that K is indeed positive. In this paper, under quite general assumptions, we prove that t∞ tβ P (<u,X >> t)> 0, completing, in particular, the results of arXiv:1111.1756 and arXiv:1206.1709.