Local limit theorem for the maximum of a random walk

Abstract

Consider a family of -latticed aperiodic random walks \S(a),0 a a0\ with increments Xi(a) and non-positive drift -a. Suppose that a a0E[(X(a))2]<∞ and a a0E[\0,X(a)\2+]<∞ for some >0. Assume that X(a)[]w X(0) as a 0 and denote by M(a)=k 0 Sk(a) the maximum of the random walk S(a). In this paper we provide the asymptotics of P(M(a)=y) as a 0 in the case, when y ∞ and ay=O(1). This asymptotics follows from a representation of P(M(a)=y) via a geometric sum and a uniform renewal theorem, which is also proved in this paper.