A fixed-point approximation for a routing model in equilibrium
Abstract
We use a method of Luczak (arXiv:1212.3231) to investigate the equilibrium distribution of a dynamic routing model on a network. In this model, there are nodes, each pair joined by a link of capacity . For each pair of nodes, calls arrive for this pair of endpoints as a Poisson process with rate . A call for endpoints is routed directly onto the link between the two nodes if there is spare capacity; otherwise two-link paths between and are considered, and the call is routed along a path with lowest maximum load, if possible. The duration of each call is an exponential random variable with unit mean. In the case , it was suggested by Gibbens, Hunt and Kelly in 1990 that the equilibrium of this process is related to the fixed points of a certain equation. We show that this is indeed the case, for every , provided the arrival rate is either sufficiently small or sufficiently large. In either regime, we show that the equation has a unique fixed point, and that, in equilibrium, for each , the proportion of links at each node with load is strongly concentrated around the th coordinate of the fixed point.
Keywords
Cite
@article{arxiv.1306.5002,
title = {A fixed-point approximation for a routing model in equilibrium},
author = {Graham Brightwell and Malwina Luczak},
journal= {arXiv preprint arXiv:1306.5002},
year = {2013}
}
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33 pages