An iterated random function with Lipschitz number one

Abstract

Consider the set of functions fθ(x)=|θ -x| on R. Define a Markov process that starts with a point x0 ∈ R and continues with xk+1=fθk+1(xk) with each θ k+1 picked from a fixed bounded distribution μ on R+. We prove the conjecture of G. Letac that if μ is not supported on a lattice, then this process has a unique stationary distribution πμ and any distribution converges under iteration to πμ (in the weak-* topology). We also give a bound on the rate of convergence in the special case that μ is supported on a two-point set. We hope that the techniques will be useful for the study of other Markov processes where the transition functions have Lipschitz number one.