Moments of the first descending epoch for a random walk with negative drift

Abstract

We consider the first exit time τ = \n 1 : Sn 0\ from the positive halfline of a random walk Sn = Σ1n i, n 1 with i.d.d. summands having a negative drift E = -a< 0. Let + = (0, 1). It is well-known that, for any c>1, the finiteness of E(+)c implies the finiteness of E τc and, for any c>0, the finiteness of E (c+) implies that of E (c'τ) where c'>0 is, in general, another constant that depends on c and on the distribution of 1. We consider the intermediate case, assuming that E (g(+))<∞ for a positive increasing function g such that x∞ g(x)/ x = ∞ and x∞ g(x)/x =0, and that E (c+)=∞, for all c>0. Assuming a few further technical assumptions, we show that then E ((1-)g((1-)aτ))<∞, for any ∈ (0,1).