基于(p,N)-策略和不中断休假排队模型生产厂启动生产的控制策略

doi:10.12005/orms.2025.0122

运筹与管理 ›› 2025, Vol. 34 ›› Issue (4): 142-147.DOI: 10.12005/orms.2025.0122

基于(p,N)-策略和不中断休假排队模型生产厂启动生产的控制策略

袁雨梅^1,3, 唐应辉¹, 魏瑛源²

1.四川师范大学数学科学学院,四川成都 610068;
2.河西学院数学与统计学院,甘肃张掖 734000;
3.西华大学理学院, 四川成都 610039

收稿日期:2023-04-23 发布日期:2025-07-31
通讯作者: 唐应辉(1963-),男,四川广安人,博士,博士生导师,研究方向:排队论和决策理论及应用等, Email: tangyh@sicnu.edu.cn
作者简介:袁雨梅(1998-), 女,四川宜宾人,硕士,研究方向:排队论和决策理论及应用等
基金资助:
国家自然科学基金资助项目(71571127);四川师范大学学科建设专项 (XKZX2021- 04);河西学院校长基金创新团队项目(CXTD2022013)

The Control Strategy for Starting Production in a Factory Based on a Queueing Model with (p,N)-Policy and Uninterrupted Vacations

YUAN Yumei^1,3, TANG Yinghui¹, WEI Yingyuan²

1. School of Mathematical Sciences, Sichuan Normal University, Chengdu 610068, China;
2. School of Mathematics and Statistics, Hexi University, Zhangye 734000, China;
3. School of Science, Xihua University, Chengdu 610039, China

Received:2023-04-23 Published:2025-07-31

摘要/Abstract

摘要： 本文将生产厂接受订单及其生产过程用排队服务过程刻画,研究了基于(p,N)-策略和不中断多重休假M/G/1排队模型的系统性能指标。利用排队系统稳态队长的随机分解定理得到了稳态下系统中订单数的随机分解结果与平均订单数的表达式,同时应用Little公式获得了任意订单在系统中的平均等待时间表达式。进一步通过建立费用结构模型,利用更新报酬定理推导出了系统长期运行单位时间内所产生的期望成本费用函数的显示表达式。在没有等待时间约束下和有等待时间约束下分别讨论了系统的费用优化问题,并用数值计算实例确定了使系统期望成本费用最小的启动生产的一维最优控制策略N^*和当休假时间为定长T时的二维最优控制策略(N^*,T^*)。

关键词: (p,N)-策略, 不中断多重休假, 随机分解, 更新报酬定理, 最优控制策略

Abstract: In order to effectively control the queue size and reduce the cost caused by the frequent switching, the investigation concerning queueing models with control policy and server vacation is worth doing. The earliest works on the control policy of queueing systems were the N-policy, T-policy and D-policy. As to the study of vacation models, most works concentrated on studying models with multiple vacations, single vacation and multiple adaptive vacations. Based on the actual background of the production plant, this paper characterizes the acceptance of orders and their production process by a queueing service process, and studies the performance indicators of the system based on an M/G/1 queueing model with (p,N)-policy and uninterrupted multiple vacations. Here, the (p,N)-policy and uninterrupted multiple vacations mean that once the system becomes empty, the server immediately turns the system off and takes an uninterrupted vacation. When the server returns from vacation and finds the number of customers waiting in the system is greater than or equal to the threshold N, he/she immediately begins serving the waiting customers until the system becomes empty again. If there are arrivals in the vacation but the number of customers arriving in the system is less than N, the server is activated for work with probability p(0p1) or the server is idle but on duty with probability (1-p) until the number of arriving customers in the system reaches N and immediately begins serving the waiting customers. If there is no arrival in the vacation, the server begins another vacation at once.
Firstly, applying the well-known stochastic decomposition theorem of the steady-state queue size of the queueing system, we obtain the steady-state stochastic decomposition result of the system's order number and present the expression of the expected order number through direct algebraic operations. Meanwhile, we use the Little's formula to obtain the expression of the expected waiting time for any order in the system. Secondly, under a given cost structure model, we derive the explicit expression of the long-run expected cost per unit time of the system by using the renewal reward theorem. Without the constraint of average waiting time, we discuss the cost optimization problem of the system. Several numerical examples are presented to investigate the one-dimensional optimal threshold N^* for starting production to minimize the long-run expected cost as well as the two-dimensional optimal threshold (N^*,T^*) when the vacation time is fixed as T. Obviously, if the waiting time is too long, it will reduce customer satisfaction and may even lead to system congestion and customer loss. Therefore, it is of great theoretical importance and application value to consider the cost optimization problem of the system under the expected waiting time constraint. Inspired by the fact above, we further discuss the cost optimization problem of the system under the constraint of average waiting time, and also numerically determine the one-dimensional optimal control policy N^* and the two-dimensional optimal control policy (N^*,T^*). At last, the effects of the probability p on the optimal threshold and the minimum cost are also discussed.
From our study, it is suggested that in some systems where customers are not sensitive to waiting time, system managers can disregard the waiting time constraint and directly choose the threshold value that minimizes the cost of starting the service. In systems such as hospitals and transportation, where customers are more sensitive to waiting time, managers adopt a control policy that minimizes the cost of starting the service within the acceptable waiting time of customers. For future research, the continuous time queueing model studied in this paper can be extended to discrete-time queueing model.

Key words: (p,N)-policy, uninterrupted multiple vacations, stochastic decomposition, renewal reward theorem, optimal control policy

中图分类号:

60K25
O226

袁雨梅, 唐应辉, 魏瑛源. 基于(p,N)-策略和不中断休假排队模型生产厂启动生产的控制策略[J]. 运筹与管理, 2025, 34(4): 142-147.

YUAN Yumei, TANG Yinghui, WEI Yingyuan. The Control Strategy for Starting Production in a Factory Based on a Queueing Model with (p,N)-Policy and Uninterrupted Vacations[J]. Operations Research and Management Science, 2025, 34(4): 142-147.

参考文献

[1] 田乃硕.休假随机服务系统[M].北京:北京大学出版社,2001.
[2] 唐应辉,唐小我.排队论—基础与分析技术[M].北京:科学出版社,2006.
[3] 唐应辉,吴文青,刘云颇.基于单重休假的Min(N,V)-策略M/G/1排队系统分析[J].应用数学学报,2014,37(6):976-995.
[4] 蒋书丽,唐应辉.具有多级适应性休假和Min(N,V)-策略控制的M/G/1排队系统[J].系统科学与数学,2017,37(8):1866-1884.
[5] 余玅妙,唐应辉,付永红.具有中途准入机制和多重休假的离散时间GI/Geom^(a,b)/1/N早到达排队系统[J].应用数学学报,2011,34(5):853-872.
[6] LAN S J,TANG Y H. An N-policy discrete time Geo/G/1queue with modified multiple server vacations and Bernoulli feedback[J]. RAIRO—Operations Research, 2019, 53(2): 367-387.
[7] LAN S J, TANG Y H, YU M M. System capacity optimization design and optimal threshold N^* for a Geo/G/1 discrete-time queue with single server vacation and under the control of Min(N,V)-policy[J].Journal of Industrial and Management Optimization, 2016, 12(4): 1435-1464.
[8] BALACHANDRAN K R, TIJMS H C. On the D-policy for the M/G/1 queue[J]. Management Science, 1975, 21(9): 1073-1076.
[9] LIU R B, ALFA A S,YU M M. Analysis of an Min(N,D)-policy Geo/G/1 queue and its application to wireless sensor networks[J]. Operational Research, 2019, 19(2): 449-477.
[10] LIU Q L,TANG Y H,YU M M. Analysis of M^{(λ₁,λ₂)}/G/1 queue with uninterrupted single vacation and server's workload controlled D-policy[J]. Journal of Industrial and Management Optimization, 2023,19(6): 4523-4550.
[11] KE J C. Bi-level control for batch arrival queues with an early startup and unreliable server[J]. Applied Mathematical Modelling, 2004, 28(5): 469-485.
[12] 旷欣宇,唐应辉.带随机启动时间与双阈值(m,N)-策略的M/G/1可修排队系统的最优控制策略[J].运筹与管理,2021,30(10):64-70.
[13] FEINBERG E A, KIM D J. Bi-criterion optimization of an M/G/1 queue with a removable server[J]. Probability in the Engineering and Informational Sciences, 1996, 10(5): 57-73.
[14] KUANG X Y, TANG Y H,YU M M, et al. Performance analysis of an M/G/1 queue with bi-level randomized (p,N₁,N₂)-policy[J]. RAIRO—Operations Research, 2022, 56(1): 395-414.
[15] FUHRMANN S W, COOPER R B. Stochastic decompositions in the M/G/1 queue with generalized vacations[J]. Operations Research, 1985, 33(5): 1117-129.
[16] ROSS S M. Stochastic Processes[M]. New York: John Wiley and Sons, Inc., 1996.

基于(p,N)-策略和不中断休假排队模型生产厂启动生产的控制策略

The Control Strategy for Starting Production in a Factory Based on a Queueing Model with (p,N)-Policy and Uninterrupted Vacations

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