A rate balance principle and its application to queueing models
Probability
2015-10-12 v1
Abstract
We introduce a rate balance principle for general (not necessarily Markovian) stochastic processes. Special attention is given to processes with birth and death like transitions, for which it is shown that for any state , the rate of two consecutive transitions from to , coincides with the corresponding rate from to . This observation appears to be useful in deriving well-known, as well as new, results for the Mn/Gn/1 and G/Mn/1 queueing systems, such as a recursion on the conditional distributions of the residual service times (in the former model) and of the residual inter-arrival times (in the latter one), given the queue length.
Cite
@article{arxiv.1510.02779,
title = {A rate balance principle and its application to queueing models},
author = {Binyamin Oz and Ivo Adan and Moshe Haviv},
journal= {arXiv preprint arXiv:1510.02779},
year = {2015}
}