Conditioned local limit theorems for random walks defined on finite Markov chains

Abstract

Let (Xn)n≥ 0 be a Markov chain with values in a finite state space X starting at X0=x ∈ X and let f be a real function defined on X. Set Sn=Σk=1n f(Xk), n≥slant 1. For any y ∈ R denote by τy the first time when y+Sn becomes non-positive. We study the asymptotic behaviour of the probability Px ( y+Sn ∈ [z,z+a] \,,\, τy > n ) as n+∞. We first establish for this probability a conditional version of the local limit theorem of Stone. Then we find for it an asymptotic equivalent of order n3/2 and give a generalization which is useful in applications. We also describe the asymptotic behaviour of the probability Px ( τy = n ) as n+∞.