Some aspects of fluctuations of random walks on R and applications to random walks on R+ with non-elastic reflection at 0

Abstract

In this article we refine well-known results concerning the fluctuations of one-dimensional random walks. More precisely, if (Sn)n ≥ 0 is a random walk starting from 0 and r≥ 0, we obtain the precise asymptotic behavior as n∞ of P[τ>r=n, Sn∈ K] and P[τ>r>n, Sn∈ K], where τ>r is the first time that the random walk reaches the set ]r,∞[, and K is a compact set. Our assumptions on the jumps of the random walks are optimal. Our results give an answer to a question of Lalley stated in [9], and are applied to obtain the asymptotic behavior of the return probabilities for random walks on R+ with non-elastic reflection at 0.