Stochastic perturbations of iterations of a simple, non-expanding, nonperiodic, piecewise linear, interval-map

Abstract

Let g(x)=x/2 + 17/30 (mod 1), let i, i= 1,2,... be a sequence of independent, identically distributed random variables with uniform distribution on the interval [0,1/15], define gi(x)=g(x)+ i (mod 1) and, for n=1,2,..., define gn(x)=gn(gn-1(...(g1(x))...)). For x ∈ [0,1) let μn,x denote the distribution of gn(x). The purpose of this note is to show that there exists a unique probability measure μ, such that, for all x ∈ [0,1), μn,x tends to μ, as n tends to infinity. This contradicts a claim by Lasota and Mackey from 1987 stating that the process has an asymptotic three-periodicity.