Heavy-tail asymptotics for the length of a busy period in a Generalised Jackson Network

Abstract

We consider a Generalised Jackson Network with finitely many servers, a renewal input and i.i.d. service times at each queue. We assume the network to be stable and, in addition, the distribution of the inter-arrival times to have unbounded support. This implies that the length of a typical busy period B, which is the time between two successive idle periods, is finite a.s. and has a finite mean. We assume that the distributions of the service times with the heaviest tails belong to the class of so-called intermediate regularly varying distributions. We obtain the exact asymptotics for the probability P (B>x), as x∞. For that, we show that the Principle of a Single Big Jump holds: B takes a large value mainly due to a single unusually large service time.