Martingale approach to subexponential asymptotics for random walks

Abstract

Consider the random walk Sn=1+...+n with independent and identically distributed increments and negative mean E=-m<0. Let M=0 i Si be the supremum of the random walk. In this note we present derivation of asymptotics for P(M>x), x∞ for long-tailed distributions. This derivation is based on the martingale arguments and does not require any prior knowledge of the theory of long-tailed distributions. In addition the same approach allows to obtain asymptotics for P(Mτ>x), where Mτ=0 i<τSi and τ=\n 1: Sn 0 \.