Analytic Approach to the Non-Preemptive Markovian Priority Queue
Abstract
Explicit and exact results are obtained for the joint queue-length distribution for the two-level non-preemptive Markovian priority queue. Marginal distributions are derived for the general multi-level problem. The results are based on a representation of the joint queue-length probability mass function as a single-variable complex contour integral, that reduces to a real integral on a finite interval arising from a cut on the real axis. Both numerical quadrature rules and exact finite sums, involving Legendre polynomials and their generalization, are presented for the joint and marginal distributions. A high level of accuracy is demonstrated across the entire ergodic region. Relationships are established with the waiting-time distributions. Asymptotic behaviour in the large queue-length regime is extracted.
Cite
@article{arxiv.2312.03992,
title = {Analytic Approach to the Non-Preemptive Markovian Priority Queue},
author = {Josef Zuk and David Kirszenblat},
journal= {arXiv preprint arXiv:2312.03992},
year = {2023}
}
Comments
29 pages, 7 figures