A generalization of little's law to moments of queue lengths and waiting times in closed, product-form queueing networks

Abstract

Little's theorem states that under very general conditions L = λW, where L is the time average number in the system, W is the expected sojourn time in the system, and λ is the mean arrival rate to the system. For certain systems it is known that relations of the form E((L)_l) = λ ^lE((W)^l) are also true, where (L)_l = L(L – 1)· ·· (L – l + 1). It is shown in this paper that closely analogous relations hold in closed, product-form queueing networks. Similar expressions relate N_ji and S_ji, where N_ji is the total number of class j jobs at center i and S_ji is the total sojourn time of a class j job at center i, when center i is a single-server, FCFS center. When center i is a c-server, FCFS center, Q_ji and W_ji are related this way, where Q_ji is the number of class j jobs queued, but not in service at center i and W_ji is the waiting time in queue of a class j job at center i. More remarkably, generalizations of these results to joint moments of queue lengths and sojourn times along overtake-free paths are shown to hold.