On the quasi-ergodicity of absorbing Markov chains with unbounded transition densities, including random logistic maps with escape

Abstract

In this paper, we consider absorbing Markov chains Xn admitting a quasi-stationary measure μ on M where the transition kernel P admits an eigenfunction 0≤ η∈ L1(M,μ). We find conditions on the transition densities of P with respect to μ which ensure that η(x) μ( d x) is a quasi-ergodic measure for Xn and that the Yaglom limit converges to the quasi-stationary measure μ-almost surely. We apply this result to the random logistic map Xn+1 = ωn Xn (1-Xn) absorbed at R [0,1], where ωn is an i.i.d sequence of random variables uniformly distributed in [a,b], for 1≤ a <4 and b>4.