On the stability of a class of non-monotonic systems of parallel queues

Abstract

We investigate, under general stationary ergodic assumptions, the stability of systems of S parallel queues in which any incoming customer joins the queue of the server having the p+1-th shortest workload (p < S), or a free server if any. This change in the allocation policy makes the analysis much more challenging with respect to the classical FCFS model with S servers, as it leads to the non-monotonicity of the underlying stochastic recursion. We provide sufficient conditions of existence of a stationary workload, which indicate a "splitting" of the system in heavy traffic, into a loss system of p servers plus a FCFS system of S-p servers. To prove this result, we show en route an original sufficient condition for existence and uniqueness of a stationary workload for a multiple-server loss system.