Limit theorems for Markov walks conditioned to stay positive under a spectral gap assumption

Abstract

Consider a Markov chain (Xn)n≥slant 0 with values in the state space X. Let f be a real function on X and set S0=0, Sn = f(X1)+·s + f(Xn), n≥slant 1. Let Px be the probability measure generated by the Markov chain starting at X0=x. For a starting point y ∈ R denote by τy the first moment when the Markov walk (y+Sn)n≥slant 1 becomes non-positive. Under the condition that Sn has zero drift, we find the asymptotics of the probability Px ( τy >n ) and of the conditional law Px ( y+Sn≤slant ·n | τy >n ) as n +∞.