Asymptotic correlation in a queue

Abstract

Let X_t denote the waiting time of customer t in a stationary GI/G/1 queue, with traffic intensity τ; let ρ_n denote the correlation between X_t and X_t+n. For a rational GI/G/1 queue, in which the distribution of the difference between arrival and service intervals has a rational characteristic function, it is shown that, for large n, ρ_n is asymptotically proportional to n^–3/2e^–βn, where β and the factor of proportionality are calculable. The asymptotic law n^–3/2e^–βn applies also to the approach of the waiting-time distribution to the stationary state in an initially empty rational GI/G/1 queue, and to the correlations in the queueing systems recently analysed by Cohen [1]. Its more general applicability is discussed.