具有等待服务和不耐烦顾客的M/M/C假期排队模型的数学分析

Ganesh Sapkota, R. Ghimire
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引用次数: 1

摘要

摘要:本文研究了在服务器单一休假和客户流失的情况下,M/M/C排队系统的暂态分析。客户以泊松过程到达系统,并以指数分布过程由多个服务器提供服务。我们按照顾客到达的时间顺序为他们服务。本研究的主要目的是推导出(i)概率分布函数,(ii)系统和队列中显式形式的预期客户数量的公式,(iii)预期逗留时间和预期排队等待时间。此外,由于休假率γ、不耐烦率ξ和服务器等待率η的微小变化,性能指标的敏感性也得到了图形化的显示。为了说明所研究模型的适用性,给出了大量的数值结果。文中还列举了休假期和繁忙期的误差计算。排队模型替代算法在多通道通信、机场、火车站安全系统和制造系统中具有广泛的应用前景。
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Mathematical Analysis of M/M/C Vacation Queueing Model with a Waiting Server and Impatient Customers
Corresponding Author: Ganesh Sapkota Department of Mathematics, Kathmandu University, Nepal Email: sapkotaganesh15005@gmail.com Abstract: In this study, the transient analysis of the M/M/C queueing system has been made under the provision of servers' single vacation and loss of impatient customers. Customers arrive in the system in the Poisson process and are served by multiple servers in an exponential distribution process. Customers are served in the chronological order of their arrival. The main purpose of this investigation is to derive (i) the probability distribution functions, (ii) the formulas for the expected number of the customers in the system as well as in queue in the explicit form, (iii) the expected sojourn time and the expected time spent in waiting in the queue. Moreover, the sensitiveness of performance measures due to the small change of vacation rate γ, impatient rate ξ, and server’s waiting rate η has also been shown graphically. To show the applicability of the model under study, ample numerical results have been illustrated. The error computations have also been cited during the vacation period and busy period. Queueing model understudy may have its applications in multichannel telecommunications, security systems in the airport, train stations, and the manufacturing system.
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自引率
33.30%
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