Slowly varying asymptotics for signed stochastic difference equations

Abstract

For a stochastic difference equation Dn=AnDn-1+Bn which stabilises upon time we study tail distribution asymptotics of Dn under the assumption that the distribution of (1+|A1|+|B1|) is heavy-tailed, that is, all its positive exponential moments are infinite. The aim of the present paper is three-fold. Firstly, we identify the asymptotic behaviour not only of the stationary tail distribution but also of Dn. Secondly, we solve the problem in the general setting when A takes both positive and negative values. Thirdly, we get rid of auxiliary conditions like finiteness of higher moments used in the literature before.