Iterated Random Functions and Slowly Varying Tails

Abstract

Consider a sequence of i.i.d. random Lipschitz functions \n\n ≥ 0. Using this sequence we can define a Markov chain via the recursive formula Rn+1 = n+1(Rn). It is a well known fact that under some mild moment assumptions this Markov chain has a unique stationary distribution. We are interested in the tail behaviour of this distribution in the case when 0(t) ≈ A0t+B0. We will show that under subexponential assumptions on the random variable +(A0 B0) the tail asymptotic in question can be described using the integrated tail function of +(A0 B0). In particular we will obtain new results for the random difference equation Rn+1 = An+1Rn+Bn+1..