Convergence of the all-time supremum of a L\'evy process in the heavy-traffic regime

Abstract

In this paper we derive a technique of obtaining limit theorems for suprema of L\'evy processes from their random walk counterparts. For each a>0, let \Y(a)n:n 1\ be a sequence of independent and identically distributed random variables and \X(a)t:t 0\ be a L\'evy processes such that X1(a)d= Y1(a), E X1(a)<0 and E X1(a)0 as a0. Let S(a)n=Σk=1n Y(a)k. Then, under some mild assumptions, (a)n 0 Sn(a)d R(a)t 0 X(a)td R, for some random variable R and some function (·). We utilize this result to present a number of limit theorems for suprema of L\'evy processes in the heavy-traffic regime.