Gaussian queues in light and heavy traffic

Abstract

In this paper we investigate Gaussian queues in the light-traffic and in the heavy-traffic regime. The setting considered is that of a centered Gaussian process X\X(t):t∈ R\ with stationary increments and variance function σ2X(·), equipped with a deterministic drift c>0, reflected at 0: \[QX(c)(t)=-∞<s t(X(t)-X(s)-c(t-s)).\] We study the resulting stationary workload process Q(c)X\QX(c)(t):t0\ in the limiting regimes c 0 (heavy traffic) and c∞ (light traffic). The primary contribution is that we show for both limiting regimes that, under mild regularity conditions on the variance function, there exists a normalizing function δ(c) such that Q(c)X(δ(c)·)/σX(δ(c)) converges to a non-trivial limit in C[0,∞).