离散时间有限缓冲空间GI / Geom / 1 / N 工作休假排队系统稳态概率算法及性能分析

综合使用离散补充变量方法和嵌入Markov链技术研究了离散时间有限缓冲空间工作休假GI/Geom/1/N排队系统.首先运用离散补充变量方法给出一个重要等式,从而获得系统在稳态情形下任意时刻队长分布和顾客到达前夕队长分布的迭代关系.然后,再利用嵌入Markov链技术通过求解不变概率测度方程获得顾客到达前夕队长分布的数值解.而后将顾客到达前夕队长分布代入迭代公式求得稳态情形下任意时刻的队长分布.最后给出几个特殊情形下的数值计算实例,并讨论了系统参数对几个主要性能指标的影响.     

负顾客、带启动期和备用服务员的M/M/1休假排队系统

考虑一类有正、负顾客, 带启动期和有备用服务员的M/M/1休假排队系统. 负顾客一对一抵消队尾的正顾客(若有), 若系统中无正顾客, 到达的负顾客自动消失, 负顾客不接受服务.系统中两个服务员, 其中一个在岗工作时另外一个备用.上岗服务员若因为某种原因休假, 备用服务员立即替换上岗.当系统变空时, 系统关闭.用拟生灭过程和矩阵几何解方法, 得到了稳态队长的分布, 此外, 证明了稳态条件下队长的条件随机分解并得到了附加队长的分布. 最后, 通过两个数值例子说明该模型可以较好的模拟一些实际问题.     

具有负顾客到达和RCH移除策略的GI/D-MSP/1/N离散时间排队系统

综合运用补充变量方法和基于条件概率矩阵迭代的嵌入Markov链方法研究了具有负顾客到达和RCH移除策略的离散时间GI/D-MSP/1/N排队系统. 获得了稳态情形下正顾客到达前夕, 任意时隙分点以及外部观测时刻的三种队长分布. 并进一步讨论了可入系统正顾客的等待时间分布. 最后通过几个特殊情形下的数值算例验证了计算方法理论分析的正确性.     

具有温储备失效的M/G/1可修排队系统

本文把“服务台在系统闲期中可能温储备失效”引入到M/G/1可修排队系统中,考虑了具有温储备失效特征的M/G/1可修排队系统.使用全概率分解技术和利用拉普拉斯变换工具,导出了在任意时刻t队长的瞬态分布的拉普拉斯变换的表达式,进一步获得了队长的稳态分布的递推式,同时,给出了稳态队长和稳态等待时间的随机分解结果. 最后通过数值计算实例讨论了平均附加队长随温储备失效参数和修复参数的变化情况.     

非强占型优先权的M/M/N可修排队系统

研究一类带有非强占型优先权、服务台忙时与闲时故障率不同的M/M/N可修排队系统,在画出系统状态转移图的基础上,得到系统瞬态概率密度满足的微分方程组。利用拟生灭过程的方法求出系统稳态条件,并在此基础上得到系统的稳态平衡方程组。通过对稳态方程组的分析得到系统中关键的N(N+1)/2个稳态概率值的求解思路,使用Mathematica软件编程实现了稳态概率值的求取过程,并举出一个具体实例。在得到稳态概率值的基础上给出了有效服务台数的稳态分布、稳态队长的母函数这两个系统指标。     

基于多重休假的min(N,V)-策略M/G/1排队系统的队长分布

运用全概率分解技术和拉普拉斯变换工具，研究了基于服务员多重休假的min（N，V）-策略M/G/1排队系统，其中N是预设的休假终止的门限值.讨论了从任意初始状态出发队长的瞬态分布，获得了队长瞬态分布的拉普拉斯变换的递推表达式和稳态队长分布的递推表达式，同时求出了附加队长分布的显示表达式.进一步讨论了当休假时间V分别服从负指数分布和定长分布P{V=T}=1，以及当N=1，N→∞，P{V=0}=1与P{V=∞}=1时的特殊情形.最后，通过数值实例阐述了获得便于计算的稳态队长分布的表达式在系统容量设计中的重要价值.     

急诊非强占优先权下Geom/NB/1排队系统常规病人等待时间及损失率

考虑CT室具有急诊非强占优先权和常规病人有限容量的Geom/NB/1排队系统.首先构造一个二维拟生灭链,用矩阵几何解方法获得平稳分布.对同一排队系统再构造一个一维生死链,用全概率分解技术获得处于等待队列第J相位的常规病人的等待时间.然后用平稳分布获得任意一个常规病人的期望等待时间和他被拒绝进入的概率.最后以医院实际数据为基础给出数值算例.分析可变参数对常规病人队列等待时间,损失率和医疗资源利用率的影响.     

带有止步和中途退出的M/M/S/N同步多重休假排队系统的性能分析

研究了带有止步和中途退出的M/M/S/N同步多重休假的排队系统.首先,利用马尔科夫过程理论建立了系统稳态概率满足的方程组.其次,利用矩阵解法求出了稳态概率的矩阵解,并得到了系统的平均队长、平均等待队长及顾客的平均损失率等性能指标.在此基础上建立了系统的费用模型来确定最优服务员数,以使系统单位时间的平均费用达到最小.最后进行了敏感性分析并考察了系统各参数值的变化对最优费用和最优服务员数的影响.     

基于服务员休假和等待销售的易逝品排队库存系统的稳态分析

本文考虑等待销售和(s,Q)库存策略的易逝品M/M/1排队库存系统,其中库存为空时服务员多重休假,休假时间服从指数分布.顾客的到达过程服从泊松过程,服务员的服务时间,易逝品的寿命和补货时间均服从指数分布.利用拟生灭过程给出系统的稳态条件和稳态概率的矩阵几何解.根据系统的稳态概率给出了系统的性能指标,并给出系统单位时间的平均费用函数.最后,利用数值算例分析了系统参数对一些主要性能指标和平均费用函数的影响.     

带有止步和中途退出的同步N-策略多重休假的M/M/R/K排队系统的性能分析

研究了带有止步和中途退出的同步N策略多重休假的M/M/R/K排队系统.在服务员全忙或者正在休假时,到达的顾客或者决定进入系统等待服务,或者不进入系统;而进入系统的顾客因为等待的不耐烦在没有接受服务的情况下也可能离开系统.当系统变空时,所有服务员立即进行N策略多重休假.首先,利用马尔科夫过程理论建立了系统稳态概率满足的方程组.其次,利用分块矩阵的解法求出了系统稳态概率的矩阵解,并得到了系统的平均队长、平均等待队长及顾客的平均损失率等性能指标.最后,求出了在服务员全忙时进入系统并最终接受服务的顾客的条件等待时间分布及条件平均等待时间.     

Analysis of G-Queue with Pseudo-Fault and Multiple Working Vacations

This paper presents a new model of discrete time Geo/Geo/1 repairable queueing system with pseudo-fault, negative customers and multiple working vacations. The authors assume that system service may be interrupted by breakdown or pseudo-fault, this system may become disabled only when it is in a regular busy period, and negative customers adopt two types of typical killing strategies. In this paper, the authors know that the evolution of the system can be described by a two-dimensional Markov chain, and the two-dimensional Markov chain satisfies the condition of quasi birth and death chains. Based on the method of matrix-geometric solution, the authors obtain distributions for the stationary queue length in RCH and RCE strategy, respectively. Moreover, the reliability of the system is analyzed and the number of customers and waiting time of a customer in the system in steady state are obtained. The authors analyze the impact of two killing strategies on the system comparatively.This paper studies the individually and socially optimal behaviors of positive customers, and presents a pricing policy for positive customers, therefore, the authors obtain the socially optimal arrival rate.Various numerical results are provided to show the change of performance measures.     

The M/PH/1 queue with working vacations and vacation interruption

We study an M/PH/1 queue with phase type working vacation and vacation interruption where the vacation time follows a phase type distribution. The server serves the customers at a lower rate in a vacation period. The server comes back to the regular busy period at a service completion without completing the vacation. Such policy is called vacation interruption. In terms of quasi birth and death process and matrix-geometric solution method, we obtain the stationary queue length distribution. Moreover we obtain the conditional stochastic decomposition structures of queue length and waiting time when the service time distribution in the regular busy period is exponential.     

带负顾客和不耐烦顾客的离散时间Geo/G/1重试排队

考虑了一个带负顾客和不耐烦顾客且重试时间为一般分布的离散时间Geo/G/1重试排队系统. 负顾客带走一个正在服务的顾客, 而对重试组中的顾客无影响.正顾客到达系统若遇服务器忙则可能进入重试组也可能离开系统.通过对此排队系统的嵌入马氏链进行分析, 得到了重试组队长和系统队长的概率母函数. 进而得到了一系列重要的排队指标. 此外, 还推导出了系统的稳态存在条件. 以及对无负顾客和不耐烦顾客时的特例进行了分析. 最后通过几个具体的数值实例演示了一些参数对系统关键性能指标的影响.     

A discrete-time Geo/G/1 retrial queue with J-vacation policy and general retrial times

The authors discuss a discrete-time Geo/G/1 retrial queue with J-vacation policy and general retrial times. As soon as the orbit is empty, the server takes a vacation. However, the server is allowed to take a maximum number J of vacations, if the system remains empty after the end of a vacation. If there is at least one customer in the orbit at the end of a vacation, the server begins to serve the new arrivals or the arriving customers from the orbit. For this model, the authors focus on the steady-state analysis for the considered queueing system. Firstly, the authors obtain the generating functions of the number of customers in the orbit and in the system. Then, the authors obtain the closed-form expressions of some performance measures of the system and also give a stochastic decomposition result for the system size. Besides, the relationship between this discrete-time model and the corresponding continuous-time model is also investigated. Finally, some numerical results are provided.     

具有多重休假和Min(N,V)-策略控制的Geo/G/1离散时间排队

考虑服务员具有多重休假和系统采用min(N,V)-策略控制的离散时间Geo/G/1排队系统,使用全概率分解技术和更新过程理论,研究了系统在任意时刻n+的瞬态队长分布和稳态队长分布,得到了瞬态队长分布的z-变换表达式和稳态队长分布的递推表达式.进一步,得到了系统在时刻点n,n~-和外部观察时刻点的稳态队长分布.特别地,本文直接获得了一些特殊离散时间排队系统相应的结果.最后,通过数值实例阐述了获得便于计算的稳态队长分布的表达式在系统容量设计中的重要价值.     

The M/M/1 queue with working vacations and vacation interruptions

In this paper, we study the M/M/1 queue with working vacations and vacation interruptions. The working vacation is introduced recently, during which the server can still provide service on the original ongoing work at a lower rate. Meanwhile, we introduce a new policy：, the server can come back from the vacation to the normal working level once some indices of the system, such as the number of customers, achieve a certain value in the vacation period. The server may come back from the vacation without completing the vacation. Such policy is called vacation interruption. We connect the above mentioned two policies and assume that if there are customers in the system after a service completion during the vacation period, the server will come back to the normal working level. In terms of the quasi birth and death process and matrix-geometric solution method, we obtain the distributions and the stochastic decomposition structures for the number of customers and the waiting time and provide some indices of systems.     

Queue Size Distribution of Geo/G/1 Queue Under the Min(N,D)-Policy

This paper considers a discrete-time Geo/G/1 queue under the Min(N,D)-policy in which the idle server resumes its service if either N customers accumulate in the system or the total backlog of the service times of the waiting customers exceeds D,whichever occurs first(Min(N,D)-policy).By using renewal process theory and total probability decomposition technique,the authors study the transient and equilibrium properties of the queue length from the beginning of the arbitrary initial state,and obtain both the recursive expression of the z-transformation of the transient queue length distribution and the recursive formula for calculating the steady state queue length at arbitrary time epoch n~+.Meanwhile,the authors obtain the explicit expressions of the additional queue length distribution.Furthermore,the important relations between the steady state queue length distributions at different time epochs n~-,n and n~+ are also reported.Finally,the authors give numerical examples to illustrate the effect of system parameters on the steady state queue length distribution,and also show from numerical results that the expressions of the steady state queue length distribution is important in the system capacity design.     

Queue size distribution of Geo/G/1 queue under the Min(<Emphasis Type="Italic">N,D</Emphasis>)-policy

This paper considers a discrete-time Geo/G/1 queue under the Min(N,D)-policy in which the idle server resumes its service if either N customers accumulate in the system or the total backlog of the service times of the waiting customers exceeds D, whichever occurs first (Min(N,D)-policy). By using renewal process theory and total probability decomposition technique, the authors study the transient and equilibrium properties of the queue length from the beginning of the arbitrary initial state, and obtain both the recursive expression of the z-transformation of the transient queue length distribution and the recursive formula for calculating the steady state queue length at arbitrary time epoch n ⁺. Meanwhile, the authors obtain the explicit expressions of the additional queue length distribution. Furthermore, the important relations between the steady state queue length distributions at different time epochs n ^-, n and n ⁺ are also reported. Finally, the authors give numerical examples to illustrate the effect of system parameters on the steady state queue length distribution, and also show from numerical results that the expressions of the steady state queue length distribution is important in the system capacity design.     

延迟N-策略Geo/G/1排队系统的队长分布及数值计算

考虑延迟N-策略离散时间Geo/G/1排队系统,使用全概率分解技术,从任意初始状态出发,研究了队长的瞬态和稳态性质,导出了在任意时刻n瞬态队长分布的z-变换的递推表达式和稳态队长分布的递推表达式,以及稳态队长的随机分解.最后,通过数值实例, 讨论了稳态队长分布对系统参数的敏感性,并阐述了获得便于计算的稳态队长分布的表达式在系统容量设计中有重要的价值.