Maximum waiting time in heavy-tailed fork-join queues

Abstract

In this paper, we study the maximum waiting time i≤ NWi(·) in an N-server fork-join queue with heavy-tailed services as N∞. The service times are the product of two random variables. One random variable has a regularly varying tail probability and is the same among all N servers, and one random variable is Weibull distributed and is independent and identically distributed among all servers. This setup has the physical interpretation that if a job has a large size, then all the subtasks have large sizes, with some variability described by the Weibull-distributed part. We prove that after a temporal and spatial scaling, the maximum waiting time process converges in D[0,T] to the supremum of an extremal process with negative drift. The temporal and spatial scaling are of order L(bN)bNβ(β-1), where β is the shape parameter in the regularly varying distribution, L(x) is a slowly varying function, and (bN,N≥ 1) is a sequence for which holds that i≤ NAi/bNP1, as N∞, where Ai are i.i.d.\ Weibull-distributed random variables. Finally, we prove steady-state convergence.

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