出生-死亡和其他马尔可夫离散时间队列的综述

IF 0.8 Q4 OPERATIONS RESEARCH & MANAGEMENT SCIENCE
Muhammad El-Taha
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引用次数: 0

摘要

在这篇综述文章中,我们考虑离散时间生-死过程及其在离散时间队列中的应用。为了使分析更简单,我们将重点放在无变换方法上,并考虑非生-死马尔可夫离散时间系统的实例。我们在一个离散时间框架内提出了一些结果,这些结果与连续时间模型的处理相似。这种方法有两个优点;首先,它将几个离散时间模型的处理统一在一个框架中,其次,它尽可能地平行于连续时间模型的处理。这使我们能够在离散时间队列和连续时间队列之间进行类比和对比。具体而言,我们将重点放在具有伯努利到达和几何服务时间的单服务器离散时间模型的生-死应用上,并为读者提供了一个简单严谨的详细分析,涵盖了文献中考虑的所有五种调度规则,并注意了槽边、槽中心和到达前时代的平稳分布。我们还讨论了等待时间分布。此外,我们还介绍了适合全局平衡方程的三种马尔可夫模型。我们的方法为离散时间队列的行为提供了有趣的见解。本文的目标读者是熟悉排队理论基础知识并希望对离散时间队列进行简单而严格的介绍。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
A Review of Birth-Death and Other Markovian Discrete-Time Queues
In this review article, we consider discrete-time birth-death processes and their applications to discrete-time queues. To make the analysis simpler to follow, we focus on transform-free methods and consider instances of non-birth-death Markovian discrete-time systems. We present a number of results within one discrete-time framework that parallels the treatment of continuous time models. This approach has two advantages; first, it unifies the treatment of several discrete-time models in one framework, and second, it parallels to the extent possible the treatment of continuous time models. This allows us to draw parallels and contrasts between the discrete and continuous time queues. Specifically, we focus on birth-death applications to the single server discrete-time model with Bernoulli arrivals and geometric service times and provide the reader with a simple rigorous detailed analysis that covers all five scheduling rules considered in the literature, with attention to stationary distributions at slot edges, slot centers, and prearrival epochs. We also cover the waiting time distributions. Moreover, we cover three Markovian models that fit the global balance equations. Our approach provides interesting insights into the behavior of discrete-time queues. The article is intended for those who are familiar with queueing theory basics and would like a simple, yet rigorous introductory treatment to discrete-time queues.
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来源期刊
Advances in Operations Research
Advances in Operations Research OPERATIONS RESEARCH & MANAGEMENT SCIENCE-
CiteScore
2.10
自引率
0.00%
发文量
12
审稿时长
19 weeks
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