Extremes of nonstationary Gaussian fluid queues

Abstract

This contribution investigates asymptotic properties of transient queue length process Q(t)=(x+X(t)-ct, 0≤ s≤ t(X(t)-X(s)-c(t-s))),\ \ \ t≥ 0 in Gaussian fluid queueing model, where input process X is modeled by a centered Gaussian process with stationary increments, c>0 is the output rate and x=Q(0)0. More specifically, under some mild conditions on X, exact asymptotics of P(Q(Tu)>u) as u∞, is derived. The play between u and Tu leads to two qualitatively different regimes: (A) short-time horizon when Tu is relatively small with respect to u; (B) moderate- or long-time horizon when Tu is asymptotically much larger than u. As a by-product, some implications for the speed of convergence to stationarity of the considered model are discussed.