Asymptotic results for certain first-passage times and areas of renewal processes

Abstract

We consider the process \x-N(t):t≥ 0\, where x∈R+ and \N(t):t≥ 0\ is a renewal process with light-tailed distributed holding times. We are interested in the joint distribution of (τ(x),A(x)) where τ(x) is the first-passage time of \x-N(t):t≥ 0\ to reach zero or a negative value, and A(x):=∫0τ(x)(x-N(t))dt is the corresponding first-passage (positive) area swept out by the process \x-N(t):t≥ 0\. We remark that we can define the sequence \(τ(n),A(n)):n≥ 1\ by referring to the concept of integrated random walk. Our aim is to prove asymptotic results as x∞ in the fashion of large (and moderate) deviations.