A simple proof of heavy tail estimates for affine type Lipschitz recursions

Abstract

We study the affine recursion Xn = AnXn-1+Bn where (An,Bn)∈ R+ × R is an i.i.d. sequence and recursions Xn = n(Xn-1) defined by Lipschitz transformations such that (x)≥ Ax+B. It is known that under appropriate hypotheses the stationary solution X has regularly varying tail, i.e. t∞ tα P[X>t] = C. However positivity of C in general is either unknown or requires some additional involved arguments. In this paper we give a simple proof that C>0. This applies, in particular, to the case when Kesten-Goldie assumptions are satisfied.