Your search keyword '"G/G/1 queue"' showing total 1,615 results

1. Heavy-traffic single-server queues and the transform method.

Author

Boon, M.A.A., Janssen, A.J.E.M., and van Leeuwaarden, J.S.H.

Abstract

Heavy-traffic limit theory is concerned with queues that operate close to criticality and face severe queueing times. Let W denote the steady-state waiting time in the GI / G / 1 queue. Kingman (1961) showed that W , when appropriately scaled, converges in distribution to an exponential random variable as the system's load approaches 1. The original proof of this famous result uses the transform method. Starting from the Laplace transform of the pdf of W (Pollaczek's contour integral representation), Kingman showed convergence of transforms and hence weak convergence of the involved random variables. We apply and extend this transform method to obtain convergence of moments with error assessment. We also demonstrate how the transform method can be applied to so-called nearly deterministic queues in a Kingman-type and a Gaussian heavy-traffic regime. We demonstrate numerically the accuracy of the various heavy-traffic approximations. [ABSTRACT FROM AUTHOR]

Published

2023

2. Data-Driven Fitting of the G/G/1 Queue.

Author

Dieleman, Nanne A.

Abstract

The Maximum Likelihood Estimation (MLE) method is an established statistical method to estimate unknown parameters of a distribution. A disadvantage of the MLE method is that it requires an analytically tractable density, which is not available in many cases. This is the case, for example, with applications in service systems, since waiting models from queueing theory typically have no closed-form solution for the underlying density. This problem is addressed in this paper. MLE is used in combination with Stochastic Approximation (SA) to calibrate the arrival parameter θ of a G/G/1 queue via waiting time data. Three different numerical examples illustrate the application of the proposed estimator. Data sets of an M/G/1 queue, G/M/1 queue and model mismatch are considered. In a model mismatch, a mismatch is present between the used data and the postulated queuing model. The results indicate that the estimator is versatile and can be applied in many different scenarios. [ABSTRACT FROM AUTHOR]

Published

2021

3. Asymptotic Delay Analysis and Timeout-Based Admission Control for Ad Hoc Wireless Networks

Author

El-Azouzi, R., Samanta, S. K., Sabir, E., El-Khoury, R., Hutchison, David, Series editor, Kanade, Takeo, Series editor, Kittler, Josef, Series editor, Kleinberg, Jon M., Series editor, Mattern, Friedemann, Series editor, Mitchell, John C., Series editor, Naor, Moni, Series editor, Nierstrasz, Oscar, Series editor, Pandu Rangan, C., Series editor, Steffen, Bernhard, Series editor, Sudan, Madhu, Series editor, Terzopoulos, Demetri, Series editor, Tygar, Doug, Series editor, Vardi, Moshe Y., Series editor, Weikum, Gerhard, Series editor, Ruiz, Pedro M., editor, and Garcia-Luna-Aceves, Jose Joaquin, editor

Published

2009

4. Data-Driven Fitting of the G/G/1 Queue

Author

Nanne Dieleman and Operations Analytics

Subjects

Queueing theory, 021103 operations research, Computer science, G/G/1 queue, Maximum likelihood, 0211 other engineering and technologies, Estimator, maximum likelihood estimation, 02 engineering and technology, Stochastic approximation, Data-driven, Distribution (mathematics), data-driven fitting, Control and Systems Engineering, stochastic approximation, 0202 electrical engineering, electronic engineering, information engineering, Applied mathematics, 020201 artificial intelligence & image processing, SDG 7 - Affordable and Clean Energy, Queue, Information Systems

Abstract

The Maximum Likelihood Estimation (MLE) method is an established statistical method to estimate unknown parameters of a distribution. A disadvantage of the MLE method is that it requires an analytically tractable density, which is not available in many cases. This is the case, for example, with applications in service systems, since waiting models from queueing theory typically have no closed-form solution for the underlying density. This problem is addressed in this paper. MLE is used in combination with Stochastic Approximation (SA) to calibrate the arrival parameter θ of a G/G/1 queue via waiting time data. Three different numerical examples illustrate the application of the proposed estimator. Data sets of an M/G/1 queue, G/M/1 queue and model mismatch are considered. In a model mismatch, a mismatch is present between the used data and the postulated queuing model. The results indicate that the estimator is versatile and can be applied in many different scenarios.

Published

2021

5. Comparison of Approximation Methods for the Estimation of Distributions in the Analysis of the G/G/1 Queue

Author

L. Chupakhina, N. Kireeva, O. Karaulova, and A. Gazizulina

Subjects

Estimation, 021110 strategic, defence & security studies, General Computer Science, lcsh:T, Computer science, lcsh:Mathematics, General Mathematics, 0211 other engineering and technologies, General Engineering, G/G/1 queue, 02 engineering and technology, lcsh:QA1-939, lcsh:Technology, General Business, Management and Accounting, PMRS, PMRQ, Computer Science::Networking and Internet Architecture, 0202 electrical engineering, electronic engineering, information engineering, Applied mathematics, Lindley’s equation, 020201 artificial intelligence & image processing, Damping function, Approximation

Abstract

The analysis of Weibull and Pareto distribution functions in the approximation of the density of a sum of damping functions, PMRQ approximation and approximation of service distribution in the peak mode of the flow. There was found one of the characteristics of the network, the average waiting time of packets in the queue after application of spectral method of the Lindley’s integral equation. Finally, PMRQ approximation of the average waiting time in TES+/G/1, MMPR, was compared with the analytic values of the same value in the spectral solution of the Lindley’s integral equation obtained by simulation with real traffic. Traffic is captured using the Wireshark protocol analyzer program. The time distributions were obtained in the EasyFit data analysis program, designed for quick statistical data analysis and decision making. Methods of approximation of network traffic allows us to estimate the average packet latency using statistical data analysis, which will improve the quality of service and predict the behavior of traffic.

Published

2019

6. Queues and Risk Processes with Dependencies.

Author

Badila, E. S., Boxma, O. J., and Resing, J. A. C.

Subjects

*GENERALIZATION, *MULTIVARIATE analysis, *QUEUING theory, *EMPLOYEES' workload, *STOCHASTIC processes, *STATISTICAL correlation, *HYPOTHESIS

Abstract

We study the generalization of theG/G/1 queue obtained by relaxing the assumption of independence between inter-arrival times and service requirements. The analysis is carried out for the class of multivariate matrix exponential distributions introduced in Ref.[13]. In this setting, we obtain the steady-state waiting time distribution, and we show that the classical relation between the steady-state waiting time and workload distributions remains valid when the independence assumption is relaxed. We also prove duality results with the ruin functions in an ordinary and a delayed ruin process. These extend several known dualities between queueing and risk models in the independent case. Finally, we show that there exist stochastic order relations between the waiting times under various instances of correlation. [ABSTRACT FROM AUTHOR]

Published

2014

7. Tail asymptotics for a batch service polling system with retrials and nonpersistent customers

Author

Tao Jiang

Subjects

Mathematical optimization, 021103 operations research, Queue management system, Applied Mathematics, 0211 other engineering and technologies, M/M/1 queue, M/D/c queue, G/G/1 queue, 02 engineering and technology, 01 natural sciences, Computer Science::Performance, 010104 statistics & probability, Multilevel queue, Computer Science::Networking and Internet Architecture, M/G/1 queue, M/M/c queue, 0101 mathematics, Bulk queue, Analysis, Mathematics

Abstract

Perel and Yechiali 2014 [16] considered a multi-queue single-server retrial polling system with batch service of an unlimited size, i.e., the so called “Israeli queue” with retrial, where the system consists of a main queue and an orbit queue, and only the customer at the head of the orbit queue is allowed to try to access the main queue. In this present paper, we aim to give a further study on this queueing model, in which each of the retrial customers in the orbit queue independently repeatedly tries for receiving service, and customers may abandon at the arrival instant from outside or at the departure epoch from the orbit queue. By analysing this model, we find that it is difficult to obtain an explicit closed form solution for the joint stationary probability distribution of the number of retrial customers in the orbit queue and the number of groups in the main queue. Therefore, by making use of the matrix analytic approach and the censoring technique, we derive the tail asymptotics result for the stationary joint probabilities.

Published

2018

8. Another look into decomposition results.

Author

Ivanovs, Jevgenijs and Kella, Offer

Subjects

*QUEUEING networks, *WIENER-Hopf equations, *LEVY processes, *BANKRUPTCY prevention, *DECOMPOSITION method

Abstract

In this note, we identify a simple setup from which one may easily infer various decomposition results for queues with interruptions as well as càdlàg processes with certain secondary jump inputs. Special cases are processes with stationary or stationary and independent increments. In the Lévy process case, the decomposition holds not only in the limit but also at independent exponential times, due to the Wiener-Hopf decomposition. A similar statement holds regarding the GI/GI/1 setting with multiple vacations. [ABSTRACT FROM AUTHOR]

Published

2013

9. Perturbation analysis of waiting times in the G/G/1 queue.

Author

Leahu, Haralambie, Heidergott, Bernd, and Hordijk, Arie

Abstract

This paper is devoted to perturbation analysis of the stationary distribution of waiting times in the G/G/1 queue with a parameter-dependent service time distribution. We provide sufficient conditions under which the stationary distribution is Lipschitz continuous and we explicitly compute the Lipschitz constant. Thereby, we provide bounds on the effect of a (finite) perturbation of the service time distribution on the stationary waiting time. The case of infinitesimal perturbations (read, derivatives) is treated as well. [ABSTRACT FROM AUTHOR]

Published

2013

10. Analysis of transient queues with semidefinite optimization.

Author

Osogami, Takayuki and Raymond, Rudy

Subjects

*UNSTEADY flow -- Computer simulation, *QUEUING theory, *SEMIDEFINITE programming, *MATHEMATICAL bounds, *MATHEMATICAL optimization

Abstract

We derive upper bounds on the tail distribution of the transient waiting time in the GI/GI/1 queue, given a truncated sequence of the moments of the service time and that of the interarrival time. Our upper bound is given as the objective value of the optimal solution to a semidefinite program (SDP) and can be calculated numerically by solving the SDP. We also derive the upper bounds in closed form for the case when only the first two moments of the service time and those of the interarrival time are given. The upper bounds in closed form are constructed by formulating the dual problem associated with the SDP. Specifically, we obtain the objective value of a feasible solution of the dual problem in closed from, which turns out to be the upper bound that we derive. In addition, we study bounds on the maximum waiting time in the first busy period. [ABSTRACT FROM AUTHOR]

Published

2013

11. Throughput improvement and its tradeoff with the queuing delay in the diamond relay networks.

Author

Qing Wang, Pingyi Fan, and Letaief, K. B.

Subjects

RELAY control systems, ELECTRIC lines, AD hoc computer networks, RAYLEIGH model, DIAMOND computer peripherals, LINE drivers (Integrated circuits), QUEUEING networks, SWITCHING circuits

Abstract

Diamond relay network model, as a basic transmission model, has recently been attracting considerable attention in wireless ad hoc networks. Node cooperation and opportunistic scheduling scheme are two important techniques to improve the performance in wireless scenarios. In the paper we consider such a problem how to efficiently combine opportunistic scheduling and cooperative modes for the Rayleigh fading scenario in the diamond relay network. To do so, we first compare the throughput of SRP (Spatial Reused Pattern) and AFP (Amplify Forwarding Pattern) in the half-duplex case with the assumption that channel side information is known to all and then come up with a new scheduling scheme. It will be verified that only switching between SRP and AFP simply does little help to obtain an expected improvement because SRP is always superior to AFP on average due to its efficient spatial reuse. To improve the throughput further, we put forward a new processing strategy in which buffers are employed at both relays in SRP mode. By efficiently utilizing the links with relatively higher gains, the throughput can be greatly improved at a cost of queuing delay. Furthermore, we shall quantitatively evaluate the queuing delay and the tradeoff between the throughput and the additional queuing delay. Finally, to realize our developed strategy and make sure it always run at stable status, we present two criteria and an algorithm on the selection and adjustment of the switching thresholds. Copyright © 2009 John Wiley & Sons, Ltd. [ABSTRACT FROM AUTHOR]

Published

2010

12. Mean response time for a G/G/1 queueing system: Simulated computation

Author

Chu, Yunn-Kuang and Ke, Jau-Chuan

Subjects

*CONFIDENCE intervals, *MATHEMATICAL programming, *MATHEMATICAL analysis, *ALGORITHMS

Abstract

Abstract: Mean response time, denoted by r, plays an important role of system characteristics in queueing models. In this paper we developed a data-based recursion relation to compute a sequence of response times, and the sample mean from these response times, denoted by , was used to estimate mean response time r of an FCFS G/G/1 queueing system. We further construct new confidence intervals of r for a G/G/1 queueing system, which are based on four bootstrap methods; standard bootstrap (SB) confidence interval, percentile bootstrap (PB) confidence interval, bias-corrected percentile bootstrap (BCPB) confidence interval, and bias-corrected and accelerated (BCa) confidence interval. A numerical simulation study is conducted in order to demonstrate performance of the proposed estimator and bootstrap confidence intervals of r. From the simulation results, we show that is a consistent estimator of r. In addition, we also investigate the accuracy of the four bootstrap confidence intervals by calculating the coverage percentage, the average length, and the relative average length of confidence intervals. Detailed discussions of simulation results for seven various queueing models are presented. [Copyright &y& Elsevier]

Published

2007

13. Approximations for the Queue Length Distributions of Time-Varying Many-Server Queues

Author

Jamol Pender and Young Myoung Ko

Subjects

Mathematical optimization, 021103 operations research, M/G/k queue, M/D/1 queue, 0211 other engineering and technologies, General Engineering, M/D/c queue, G/G/1 queue, 02 engineering and technology, 01 natural sciences, 010104 statistics & probability, Burke's theorem, M/G/1 queue, Applied mathematics, M/M/c queue, 0101 mathematics, Bulk queue, Mathematics

Abstract

This paper presents a novel and computationally efficient methodology for approximating the queue length (the number of customers in the system) distributions of time-varying non-Markovian many-server queues (e.g., Gt/Gt/nt queues), where the number of servers (nt) is large. Our methodology consists of two steps. The first step uses phase-type distributions to approximate the general interarrival and service times, thus generating an approximating Pht/Pht/nt queue. The second step develops strong approximation theory to approximate the Pht/Pht/nt queue with fluid and diffusion limits whose mean and variance can be computed using ordinary differential equations. However, by naively representing the Pht/Pht/nt queue as a Markov process by expanding the state space, we encounter the lingering phenomenoneven when the queue is overloaded. Lingering typically occurs when the mean queue length is equal or near the number of servers, however, in this case it also happens when the queue is overloaded and this time is not of zero measure. As a result, we develop an alternative representation for the queue length process that avoids the lingering problem in the overloaded case, thus allowing for the derivation of a Gaussian diffusion limit. Finally, we compare the effectiveness of our proposed method with discrete event simulation in a variety parameter settings and show that our approximations are very accurate. The online supplement is available at https://doi.org/10.1287/ijoc.2017.0760 .

Published

2017

14. Stationary analysis of the infinite-server queue modulated by a multi-phase Markovian environment

Author

Senlin Yu and Zaiming Liu

Subjects

Mathematical optimization, 021103 operations research, M/G/k queue, Applied Mathematics, 010102 general mathematics, M/D/1 queue, 0211 other engineering and technologies, M/M/1 queue, G/G/1 queue, 02 engineering and technology, 01 natural sciences, Computer Science::Performance, Computational Mathematics, Fluid queue, M/G/1 queue, Applied mathematics, M/M/c queue, 0101 mathematics, Bulk queue, Mathematics

Abstract

We consider an infinite-server queue, where the arrival and service rates are both governed by a continuous-time Markov chain that is independent of all other aspects of the queue. Through constructing a pretty Markov process, several performance measures are derived by using the supplementary variable technique. In addition, special cases and numerical examples are studied in detail.

Published

2017

15. Computation of the moments of queue length in the BMAP∕SM∕1 queue

Author

Konstantin E. Samouylov, Alexander N. Dudin, and Valentina Klimenok

Subjects

Mathematical optimization, Computer science, M/G/k queue, Applied Mathematics, M/D/1 queue, M/M/1 queue, M/D/c queue, 020206 networking & telecommunications, G/G/1 queue, 02 engineering and technology, Management Science and Operations Research, 01 natural sciences, Industrial and Manufacturing Engineering, Computer Science::Performance, 010104 statistics & probability, 0202 electrical engineering, electronic engineering, information engineering, M/G/1 queue, Applied mathematics, M/M/c queue, 0101 mathematics, Bulk queue, Software

Abstract

The B M A P ∕ S M ∕ 1 queue is the most general single-server queueing model which can be analysed analytically. Problem of computation of stationary distributions of queue length is solved in the literature. However, the problem of computation of the moments of these distributions is not enough addressed. This problem is more complicated than its particular case when the service times are independent identically distributed random variables due to reducibility of some involved matrices. In this communication, we solve this problem.

Published

2017

16. Extension of Heuristic Approach : 2nd Moment of Waiting Time in M/G/1 Queue with Generalized Vacations

Author

Doo Ho Lee

Subjects

Discrete mathematics, Mathematical optimization, M/G/k queue, Burke's theorem, M/M/1 queue, M/G/1 queue, M/D/c queue, G/G/1 queue, M/M/c queue, M/M/∞ queue, Mathematics

Published

2017

17. Stationary distributions for a class of Markov-modulated tandem fluid queues

Author

Małgorzata M. O’Reilly, Willem R.W. Scheinhardt, and Stochastic Operations Research

Subjects

Statistics and Probability, 0211 other engineering and technologies, M/M/1 queue, 02 engineering and technology, Laplace–Stieltjes transform, Fork–join queue, Tandem, 01 natural sciences, Transient analysis, 010104 statistics & probability, Fluid queue, Applied mathematics, 0101 mathematics, Mathematics, Discrete mathematics, 021103 operations research, M/G/k queue, Applied Mathematics, G/G/1 queue, Markov Chain, Computer Science::Performance, Stochastic fluid model, Modeling and Simulation, 2023 OA procedure, M/G/1 queue, M/M/c queue, Bulk queue, Limiting distribution

Abstract

We consider a model consisting of two fluid queues driven by the same background continuous-time Markov chain, such that the rates of change of the fluid in the second queue depend on whether the first queue is empty or not: when the first queue is nonempty, the content of the second queue increases, and when the first queue is empty, the content of the second queue decreases. We analyze the stationary distribution of this tandem model using operator-analytic methods. The various densities (or Laplace–Stieltjes transforms thereof) and probability masses involved in this stationary distribution are expressed in terms of the stationary distribution of some embedded process. To find the latter from the (known) transition kernel, we propose a numerical procedure based on discretization and truncation. For some examples we show the method works well, although its performance is clearly affected by the quality of these approximations, both in terms of accuracy and runtime.

Published

2017

18. Analysis of an M/G/1 queue with vacations and multiple phases of operation

Author

Jianjun Li, Liwei Liu, and Tao Jiang

Subjects

Discrete mathematics, Queueing theory, 021103 operations research, Distribution (number theory), M/G/k queue, Epoch (reference date), General Mathematics, Real-time computing, 0211 other engineering and technologies, G/G/1 queue, 02 engineering and technology, Management Science and Operations Research, 01 natural sciences, 010104 statistics & probability, M/G/1 queue, 0101 mathematics, Method of supplementary variables, Queue, Software, Mathematics

Abstract

This paper deals with an M / G / 1 queue with vacations and multiple phases of operation. If there are no customers in the system at the instant of a service completion, a vacation commences, that is, the system moves to vacation phase 0. If none is found waiting at the end of a vacation, the server goes for another vacation. Otherwise, the system jumps from phase 0 to some operative phase i with probability $$q_i$$ , $$i = 1,2, \ldots ,n.$$ In operative phase i, $$i = 1,2, \ldots ,n$$ , the server serves customers according to the discipline of FCFS (First-come, first-served). Using the method of supplementary variables, we obtain the stationary system size distribution at arbitrary epoch. The stationary sojourn time distribution of an arbitrary customer is also derived. In addition, the stochastic decomposition property is investigated. Finally, we present some numerical results.

Published

2017

19. On a Vacation Queue Approach to Queue Size Computation for a Signalized Traffic Intersection * *This work was supported in part by NSF CMMI Project No. 1636377

Author

Mohammad Motie and Ketan Savla

Subjects

D/M/1 queue, Computer science, Real-time computing, M/M/1 queue, 010501 environmental sciences, Fork–join queue, 01 natural sciences, 0502 economics and business, Computer Science::Networking and Internet Architecture, Fluid queue, Queue, 0105 earth and related environmental sciences, 050210 logistics & transportation, Queueing theory, Queue management system, M/G/k queue, 05 social sciences, M/D/1 queue, M/D/c queue, G/G/1 queue, M/M/∞ queue, Computer Science::Performance, Multilevel queue, Control and Systems Engineering, M/G/1 queue, M/M/c queue, Priority queue, Algorithm, Bulk queue

Abstract

We propose a vacation queue model for a signalized traffic intersection to elucidate intra-cycle queue size variations. Each incoming street to the intersection is modeled to experience Poisson arrivals, and to have finite queue capacity; vehicles arriving to full queue are dropped. Under a fixed-time policy, the queue size dynamics on each street are decoupled. Motivated by vacation queues, an imbedded Markov chain corresponding to queue sizes at the end of cycles is considered, whose transition probabilities are computed from analytical transient solutions of M/D/1/N queues. Sufficient conditions for convergence to steady-state distributions are provided for fixed-time policy. Simulations suggest consistency between the queue sizes computed by the proposed model, and the Webster and time-dependent traffic queue models.

Published

2017

20. Two-queue polling systems with switching policy based on the queue that is not being served

Author

Uri Yechiali and Efrat Perel

Subjects

Statistics and Probability, 021103 operations research, Queue management system, M/G/k queue, Applied Mathematics, M/D/1 queue, 0211 other engineering and technologies, M/M/1 queue, G/G/1 queue, 02 engineering and technology, Topology, 01 natural sciences, 010104 statistics & probability, Multilevel queue, Modeling and Simulation, M/G/1 queue, M/M/c queue, 0101 mathematics, Mathematics

Abstract

We study a system of two non-identical and separate M/M/1/• queues with capacities (buffers) C1 < ∞ and C2 = ∞, respectively, served by a single server that alternates between the queues. The server’s switching policy is threshold-based, and, in contrast to other threshold models, is determined by the state of the queue that is not being served. That is, when neither queue is empty while the server attends Qi (i = 1, 2), the server switches to the other queue as soon as the latter reaches its threshold. When a served queue becomes empty we consider two switching scenarios: (i) Work-Conserving, and (ii) Non-Work-Conserving. We analyze the two scenarios using Matrix Geometric methods and obtain explicitly the rate matrix R, where its entries are given in terms of the roots of the determinants of two underlying matrices. Numerical examples are presented and extreme cases are investigated.

Published

2017

21. Performance and reliability analysis of a repairable discrete-time G e o /G /1 queue with Bernoulli feedback and randomized policy

Author

Shaojun Lan and Yinghui Tang

Subjects

D/M/1 queue, 0209 industrial biotechnology, Mathematical optimization, M/G/k queue, Computer science, M/D/1 queue, Real-time computing, M/M/1 queue, M/D/c queue, G/G/1 queue, 010103 numerical & computational mathematics, 02 engineering and technology, Management Science and Operations Research, 01 natural sciences, General Business, Management and Accounting, 020901 industrial engineering & automation, Modeling and Simulation, M/G/1 queue, 0101 mathematics, Bulk queue

Abstract

This paper is concerned with a discrete-time Geo/G/1 repairable queueing system with Bernoulli feedback and randomized p,N-policy. The service station may be subject to failures randomly during serving customers and therefore is sent for repair immediately. The p,N-policy means that when the number of customers in the system reaches a given threshold value N, the deactivated server is turned on with probability p or is still left off with probability 1−p. Applying the law of total probability decomposition, the renewal theory and the probability generating function technique, we investigate the queueing performance measures and reliability indices simultaneously in our work. Both the transient queue length distribution and the recursive expressions of the steady-state queue length distribution at various epochs are explicitly derived. Meanwhile, the stochastic decomposition property is presented for the proposed model. Various reliability indices, including the transient and the steady-state unavailability of the service station, the expected number of the service station breakdowns during the time interval 0+,n+ and the equilibrium failure frequency of the service station are also discussed. Finally, an operating cost function is formulated, and the direct search method is employed to numerically find the optimum value of N for minimizing the system cost. Copyright © 2017 John Wiley & Sons, Ltd.

Published

2017

22. Large deviations for the total queue size in non-Markovian tandem queues

Author

Anne Buijsrogge, Karol Rosen, Pieter-Tjerk de Boer, Werner Scheinhardt, and Stochastic Operations Research

Subjects

Computer science, Real-time computing, Markov process, 02 engineering and technology, Management Science and Operations Research, Fork–join queue, 01 natural sciences, 010104 statistics & probability, symbols.namesake, Tandem queue, 0202 electrical engineering, electronic engineering, information engineering, Applied mathematics, 0101 mathematics, Queue, MSC-60K25, EWI-27679, M/G/k queue, GG1 queue, 020206 networking & telecommunications, G/G/1 queue, Computer Science Applications, Decay rate, Large deviations, Computational Theory and Mathematics, M/G/1 queue, symbols, MSC-60F10, Large deviations theory, Bulk queue, IR-104020

Abstract

We consider a $d$-node tandem queue with arrival process and light-tailed service processes at all queues i.i.d. and independent of each other. We consider three variations of the probability that the number of customers in the system reaches some high level $N$, namely during a busy cycle, in steady state, and upon arrival of a new customer. We show that their decay rates for large $N$ have the same value and give an expression for this value.

Published

2017

23. Iterative method of analysis of single queue, multi-server with limited system capacity

Author

L.I. Igbinosun and V.O. Ezugwu

Subjects

Mathematical optimization, 021103 operations research, Computer science, M/G/k queue, M/D/1 queue, Real-time computing, 0211 other engineering and technologies, M/M/1 queue, Pharmaceutical Science, M/D/c queue, G/G/1 queue, 02 engineering and technology, Complementary and alternative medicine, Iterative method, Single queue, Multi-Server queue model, Limited capacity, Performance measures, 0202 electrical engineering, electronic engineering, information engineering, M/G/1 queue, 020201 artificial intelligence & image processing, Pharmacology (medical), M/M/c queue, Bulk queue

Abstract

In this paper, analysis of single queue, multi-server with limited system capacity under first come first served discipline was carried out using iterative method. The arrivals of customers and service times of customers are assumed poisson and exponential distributions respectively. This queuing model is an extension of single queue, single server with limited system capacity. Performance measures of the model, such as the expected number of customers in the queue and in the system, the expected waiting times of customers in the queue and in the system respectively were derived. The performance measures so derived were compared with that of single queue, single server with limited capacity {M/M/1:(N/FCFS)} model. The numerical illustration indicates that single queue, multi-server with limited capacity {M/M/c:(N/FCFS)} model is more effective and efficient in handling congestions.Keywords: Iterative method, Single queue, Multi-Server queue model, Limited capacity, Performance measures

Published

2017

24. Analysis of an infinite-buffer batch-size-dependent service queue with Markovian arrival process

Author

U. C. Gupta and S. Pradhan

Subjects

021103 operations research, M/G/k queue, Computer science, M/D/1 queue, Real-time computing, 0211 other engineering and technologies, M/M/1 queue, General Decision Sciences, G/G/1 queue, 02 engineering and technology, Management Science and Operations Research, Fork–join queue, Computer Science::Performance, M/G/1 queue, Applied mathematics, Markovian arrival process, Bulk queue, Queue

Abstract

This paper considers an infinite-buffer batch-service queue with Markovian arrival process, generally distributed and batch-size-dependent service time. We obtain a bivariate vector generating function of queue length and server content distribution at departure epoch of a batch. The complete joint distribution of queue length, server content and phase of the arrival process at departure epoch is extracted in terms of roots of the associated characteristic equation. By employing these probability vectors we also perceive the joint distribution at arbitrary and pre-arrival epochs. Our analytic procedure and results are demonstrated using some numerical examples for phase-type as well as deterministic service time distributions with high and low values of model parameters. The occurrence of multiple roots are also investigated in case of phase-type service time distribution. Finally, we also investigate the influence of correlation of the arrival process on the behavior of the system performance.

Published

2017

25. A parametric uncertainty analysis method for queues with vacations

Author

Baya Takhedmit and Karim Abbas

Subjects

Queueing theory, Mathematical optimization, 021103 operations research, M/G/k queue, Applied Mathematics, M/D/1 queue, 0211 other engineering and technologies, G/G/1 queue, 02 engineering and technology, 01 natural sciences, 010104 statistics & probability, Computational Mathematics, Computer Science::Networking and Internet Architecture, M/G/1 queue, Applied mathematics, M/M/c queue, 0101 mathematics, Uncertainty quantification, Uncertainty analysis, Mathematics

Abstract

In this paper, we propose a numerical method, based on Taylor series expansion, for computing the uncertainty in performance measures of vacation queueing model due to epistemic uncertainties in its parameters. Specifically, we consider the M/G/1/N queue with vacations, where we assume that vacation parameter is derived from finite number of observations, they themselves will have epistemic uncertainty associated with them. Using this method, we compute the expected value and the variance of the stationary distribution associated with the M/G/1/N queue with vacations. In order to illustrate the applicability of the proposed method, a series of numerical examples are discussed and the obtained results are compared to the corresponding Monte Carlo simulations ones.

Published

2017

26. On the sojourn time distribution in a finite population Markovian processor sharing queue

Author

Qiang Zhen, Charles Knessl, J.S.H. van Leeuwaarden, and Stochastic Operations Research

Subjects

D/M/1 queue, Mathematical optimization, Processor sharing, Computer science, 0211 other engineering and technologies, M/M/1 queue, 02 engineering and technology, 01 natural sciences, 010104 statistics & probability, FOS: Mathematics, Applied mathematics, 0101 mathematics, Queue, 021103 operations research, M/G/k queue, Applied Mathematics, Probability (math.PR), G/G/1 queue, Computer Science::Performance, asymptotics, Finite population, M/G/1 queue, M/M/c queue, 60K25, 41A60, 35C20, 35P20, Mathematics - Probability

Abstract

We consider a finite population processor-sharing (PS) queue, with Markovian arrivals and an exponential server. Such a queue can model an interactive computer system consisting of a bank of terminals in series with a central processing unit (CPU). For systems with a large population $N$ and a commensurately rapid service rate, or infrequent arrivals, we obtain various asymptotic results. We analyze the conditional sojourn time distribution of a tagged customer, conditioned on the number $n$ of others in the system at the tagged customer's arrival instant, and also the unconditional distribution. The asymptotics are obtained by a combination of singular perturbation methods and spectral methods. We consider several space/time scales and parameter ranges, which lead to different asymptotic behaviors. We also identify precisely when the finite population model can be approximated by the standard infinite population $M/M/1$-PS queue., 60 pages and 3 figures

Published

2017

27. Steady-State Analysis and Optimization of the Unreliable M/G/1 Queueing Model Under D-Policy

Author

Khalid Alnowibet and Lotfi Tadj

Subjects

Kendall's notation, Discrete mathematics, Queueing theory, M/G/k queue, M/D/1 queue, M/D/c queue, G/G/1 queue, General Chemistry, Condensed Matter Physics, Computational Mathematics, M/G/1 queue, General Materials Science, M/M/c queue, Electrical and Electronic Engineering, Mathematics

Published

2017

28. Efficient Computational Analysis of Stationary Probabilities for the Queueing System BMAP/G/1/N With or Without Vacation(s)

Author

A. D. Banik and Mohan L. Chaudhry

Subjects

Queueing theory, Mathematical optimization, 021103 operations research, M/G/k queue, Computer science, M/D/1 queue, 0211 other engineering and technologies, General Engineering, G/G/1 queue, 02 engineering and technology, 01 natural sciences, Computer Science::Performance, 010104 statistics & probability, M/G/1 queue, Markovian arrival process, 0101 mathematics, Bulk queue, Queue

Abstract

We consider a finite-buffer single-server queue with batch Markovian arrival process. In the case of finite-buffer batch arrival queue, there are different customer rejection/acceptance strategies such as partial batch rejection, total batch rejection, and total batch acceptance policy. We consider partial batch rejection strategy throughout our paper. We obtain queue length distributions at various epochs such as pre-arrival, arbitrary, and post-departure as well as some important performance measures, like probability of loss for the first, an arbitrary, and the last customer of a batch, mean queue lengths, and mean waiting times. The corresponding queueing model under single and multiple vacation policy has also been investigated. Some numerical results have been presented in the form of tables by considering phase-type and Pareto service time distributions. The proposed analysis is based on the successive substitutions in the Markov chain equations of the queue-length distribution at an embedded post-departure epoch of a customer. We also establish relationships among the queue-length distributions at post-departure, arbitrary, and pre-arrival epochs using the classical argument based on Markov renewal theory and semi-Markov processes. Such queueing systems find applications in the performance evaluation of teletraffic part in 4G A11-IP networks.

Published

2017

29. Estimating functions in indirect inference.

Author

Heggland, Knut and Frigessi, Arnoldo

Subjects

MATHEMATICAL functions, ASYMPTOTIC efficiencies, ESTIMATION theory, MATHEMATICAL models, SIMULATION methods & models, STATISTICS

Abstract

There are models for which the evaluation of the likelihood is infeasible in practice. For these models the Metropolis–Hastings acceptance probability cannot be easily computed. This is the case, for instance, when only departure times from a G/ G/1 queue are observed and inference on the arrival and service distributions are required. Indirect inference is a method to estimate a parameter θ in models whose likelihood function does not have an analytical closed form, but from which random samples can be drawn for fixed values of θ. First an auxiliary model is chosen whose parameter β can be directly estimated. Next, the parameters in the auxiliary model are estimated for the original data, leading to an estimate . The parameter β is also estimated by using several sampled data sets, simulated from the original model for different values of the original parameter θ. Finally, the parameter θ which leads to the best match to is chosen as the indirect inference estimate. We analyse which properties an auxiliary model should have to give satisfactory indirect inference. We look at the situation where the data are summarized in a vector statistic T, and the auxiliary model is chosen so that inference on β is drawn from T only. Under appropriate assumptions the asymptotic covariance matrix of the indirect estimators is proportional to the asymptotic covariance matrix of T and componentwise inversely proportional to the square of the derivative, with respect to θ, of the expected value of T. We discuss how these results can be used in selecting good estimating functions. We apply our findings to the queuing problem. [ABSTRACT FROM AUTHOR]

Published

2004

30. Analysis ofD-policy discrete-timeGeo/G/1queue with secondJ-optional service and unreliable server

Author

Yinghui Tang and Shaojun Lan

Subjects

D/M/1 queue, Mathematical optimization, 021103 operations research, Computer science, M/G/k queue, M/D/1 queue, 0211 other engineering and technologies, M/M/1 queue, M/D/c queue, G/G/1 queue, 010103 numerical & computational mathematics, 02 engineering and technology, Management Science and Operations Research, 01 natural sciences, Computer Science Applications, Theoretical Computer Science, M/G/1 queue, 0101 mathematics, Bulk queue

Abstract

This paper is concerned with a discrete-time Geo /G / 1 queueing system with D -policy and J -optional services in which the service station may be subject to failures at random during serving the customers. All the arriving customers require the first essential service, whereas some of them may opt for a second service from the J additional services with some probability. As soon as the system becomes empty, the server will not restart the service until the sum of the service times of the waiting customers in the system reaches or exceeds some given positive integer D . Applying the total probability decomposition law, renewal theory, and probability generating function technique, the queueing indices and reliability measures are investigated simultaneously in our work. Both the probability generating function of the transient queue length distribution and the explicit formulas of the steady-state queue length distribution at time epoch n + are derived. Meanwhile, the stochastic decomposition property is presented for the proposed model. Various reliability indices, including the transient and steady-state unavailability, the expected number of breakdowns during (0+ ,n + ], and the equilibrium failure frequency, are discussed. Finally, the optimum value of D for minimizing the system cost is numerically discussed under a given cost structure.

Published

2016

31. Performance evaluation of an M/G/n-type queue with bounded capacity and packet dropping

Author

Wojciech M. Kempa and Oleg Tikhonenko

Subjects

M/M/1 queue, loss probability, 02 engineering and technology, Combinatorics, 0202 electrical engineering, electronic engineering, information engineering, Computer Science (miscellaneous), Computer Science::Networking and Internet Architecture, QA1-939, finite buffer, Engineering (miscellaneous), Mathematics, Discrete mathematics, aqm algorithms, M/G/k queue, Applied Mathematics, M/D/1 queue, 020206 networking & telecommunications, G/G/1 queue, QA75.5-76.95, queue-size distribution, Computer Science::Performance, total packet volume, Burke's theorem, Electronic computers. Computer science, M/G/1 queue, 020201 artificial intelligence & image processing, M/M/c queue, Bulk queue

Abstract

A queueing system of the M/G/n-type, n ≥ 1, with a bounded total volume is considered. It is assumed that the volumes of the arriving packets are generally distributed random variables. Moreover, the AQM-type mechanism is used to control the actual buffer state: each of the arriving packets is dropped with a probability depending on its volume and the occupied volume of the system at the pre-arrival epoch. The explicit formulae for the stationary queue-size distribution and the loss probability are found. Numerical examples illustrating theoretical formulae are given as well.

Published

2016

32. Stein's Method for the Single Server Queue in Heavy Traffic

Author

Robert E. Gaunt and Neil Walton

Subjects

Statistics and Probability, Discrete mathematics, Queueing theory, G/G/1 queue, 010102 general mathematics, M/G/1 queue, Stein's method, Single server queue, heavy traffic, 01 natural sciences, 010104 statistics & probability, convergence rate, Rate of convergence, 0101 mathematics, Statistics, Probability and Uncertainty, Heavy traffic, exponential approximation, Mathematics

Abstract

Following recent developments in the application of Stein’s method in queueing theory, this paper is intended to be a short treatment showing how Stein’s method can be developed and applied to the single server queue in heavy traffic. Here we provide two approaches to this approximation: one based on equilibrium couplings and another involving comparison of generators.

Published

2019

33. On the non-Markovian multiclass queue under risk-sensitive cost

Author

Gal Mendelson and Rami Atar

Subjects

Discrete mathematics, Mathematical optimization, M/G/k queue, 010102 general mathematics, Order (ring theory), Markov process, G/G/1 queue, Management Science and Operations Research, 01 natural sciences, Computer Science Applications, 010104 statistics & probability, symbols.namesake, Computational Theory and Mathematics, M/G/1 queue, symbols, Large deviations theory, 0101 mathematics, Unit (ring theory), Queue, Mathematics

Abstract

This paper studies a control problem for the multiclass G/G/1 queue for a risk-sensitive cost of the form $$n^{-1}\log E\exp \sum _ic_iX^n_i(T)$$n-1logEexpźiciXin(T), where $$c_i>0$$ci>0 and $$T>0$$T>0 are constants, $$X^n_i$$Xin denotes the class-i queue length process, and the numbers of arrivals and service completions per unit time are of order n. The main result is the asymptotic optimality, as $$n\rightarrow \infty $$nźź, of a priority policy, provided that $$c_i$$ci are sufficiently large. Such a result has been known only in the Markovian (M/M/1) case. The index which determines the priority is explicitly computed in the case of Gamma-distributed interarrival and service times.

Published

2016

34. On the Modified Supplementary Variable Technique for a Discrete-Time GI/G/1 Queue with Multiple Vacations

Author

Doo Ho Lee

Subjects

Computer Science::Performance, Mathematical optimization, M/G/k queue, M/D/1 queue, Computer Science::Networking and Internet Architecture, M/G/1 queue, M/M/1 queue, M/D/c queue, Applied mathematics, M/M/c queue, G/G/1 queue, Bulk queue, Mathematics

Abstract

This work suggests a new analysis approach for a discrete-time GI/G/1 queue with multiple vacations. The method used is called a modified supplementary variable technique and our result is an exact transform-free expression for the steady state queue length distribution. Utilizing this result, we propose a simple two-moment approximation for the queue length distribution. From this, approximations for the mean queue length and the probabilities of the number of customers in the system are also obtained. To evaluate the approximations, we conduct numerical experiments which show that our approximations are remarkably simple yet provide fairly good performance, especially for a Bernoulli arrival process.

Published

2016

35. A computational algorithm for the loss probability in the M/G/1+PH queue

Author

Yoshiaki Inoue and Tetsuya Takine

Subjects

Statistics and Probability, Mathematical optimization, 021103 operations research, M/G/k queue, Applied Mathematics, M/D/1 queue, 0211 other engineering and technologies, M/M/1 queue, G/G/1 queue, 02 engineering and technology, 01 natural sciences, M/M/∞ queue, Combinatorics, 010104 statistics & probability, Modeling and Simulation, Burke's theorem, M/G/1 queue, M/M/c queue, 0101 mathematics, Mathematics

Abstract

This article develops a computational algorithm for the loss probability in the stationary M/G/1 queue with impatient customers whose impatience times follow a phase-type distribution (M/G/1+PH). T...

Published

2016

36. G/G/m/N Queue using Refined Diffusion Approximation Techniques

Author

Rashmita Sharma

Subjects

Discrete mathematics, M/G/k queue, Burke's theorem, General Engineering, G/G/1 queue, Heavy traffic approximation, Queue, Mathematics

Published

2016

37. Exact time-dependent solutions for the M/D/1 queue

Author

Yun Han Bae, Soohan Ahn, Ho Woo Lee, and Jung Woo Baek

Subjects

D/M/1 queue, M/G/k queue, Computer science, Applied Mathematics, M/D/1 queue, M/D/c queue, 020206 networking & telecommunications, G/G/1 queue, 02 engineering and technology, Management Science and Operations Research, 01 natural sciences, Industrial and Manufacturing Engineering, Computer Science::Performance, Combinatorics, 010104 statistics & probability, Burke's theorem, Computer Science::Networking and Internet Architecture, 0202 electrical engineering, electronic engineering, information engineering, M/G/1 queue, Applied mathematics, M/M/c queue, 0101 mathematics, Software

Abstract

Time-dependent solutions to queuing models are very useful for evaluating the performance of real-world systems. However, because of their mathematical complexity, few available results exist. In this paper, we derive the time-dependent performance measures for an M / D / 1 queue starting with a positive number of initial customers. Using the limiting property of an Erlang distribution, we obtain closed-form time-dependent formulas for the queue length and the waiting time. Furthermore, the time-dependent queue length probability in a busy period is derived.

Published

2016

38. A Note on the Inter-Loss Time Distribution of an M/G/1/1 Queuing System

Author

Dooho Lee

Subjects

Discrete mathematics, Computer science, M/G/k queue, Burke's theorem, Real-time computing, M/M/1 queue, M/G/1 queue, G/G/1 queue, M/M/c queue, Pollaczek–Khinchine formula, M/M/∞ queue

Abstract

This note discusses the inter-loss time ofan M/G/1/1 queuing system. The inter-loss time is defined as the time duration between two consecutive losses of arriving customers. In this study, we present the explicit Laplace transform of the inter-loss time distribution of an M/G/1/1 queuing system.

Published

2016

39. Maximum Entropy Analysis of Mx /G/1 Queue With Modified Bernoulli Vacation Schedule And Un-Reliable Server Under NPolicy

Author

Madhu Jain and Deepa Chauhan

Subjects

Discrete mathematics, Bernoulli's principle, Schedule, M/G/k queue, Principle of maximum entropy, Real-time computing, M/G/1 queue, G/G/1 queue, Queue, Mathematics

Published

2016

40. STABILITY OF MAP/PH/c/K QUEUE WITH CUSTOMER RETRIALS AND SERVER VACATIONS

Author

Yang Woo Shin

Subjects

Discrete mathematics, D/M/1 queue, 021103 operations research, M/G/k queue, General Mathematics, M/D/1 queue, 0211 other engineering and technologies, M/D/c queue, G/G/1 queue, 02 engineering and technology, 01 natural sciences, M/M/∞ queue, 010104 statistics & probability, M/G/1 queue, M/M/c queue, 0101 mathematics, Mathematics

Published

2016

41. A simple analysis of system characteristics in the batch service queue with infinite-buffer and Markovian service process using the roots method:GI/C-MSP(a,b)/1/∞

Author

Mohan L. Chaudhry, António Pacheco, A. D. Banik, and Souvik Ghosh

Subjects

Mathematical optimization, 021103 operations research, M/G/k queue, 0211 other engineering and technologies, Markov process, G/G/1 queue, 02 engineering and technology, Function (mathematics), Management Science and Operations Research, 01 natural sciences, Computer Science Applications, Theoretical Computer Science, Computer Science::Performance, 010104 statistics & probability, symbols.namesake, symbols, M/G/1 queue, Matrix geometric method, Applied mathematics, 0101 mathematics, Bulk queue, Queue, Mathematics

Abstract

We consider an infinite-buffer single-server queue with renewal input and Markovian service process where customers are served in batches according to a general bulk service rule. Queue-length distributions at epochs of pre-arrival, arbitrary and post-departure have been obtained along with some important performance measures such as mean queue lengths and mean waiting times in both the system as well as the queue. We also obtain the steady-state service batch size distributions as well as system-length distributions. The proposed analysis is based on roots of the associated characteristic equation of the vector-generating function of queue-length distribution at a pre-arrival epoch. Also, we provide analytical and numerical comparison between the roots method used in this paper and the matrix geometric method in terms of computational complexities and required computation time to evaluate pre-arrival epoch probabilities for both the methods. Later, we have established heavy- and light-traffic approximations as well as an approximation for the tail probabilities at pre-arrival epoch based on one root of the characteristic equation. Numerical results for some cases have been presented to show the effect of model parameters on the performance measures.

Published

2016

42. Potentials Method for M/G/1/m Systems with Threshold Operating Strategies

Author

K. Yu. Zhernovyi and Yu. V. Zhernovyi

Subjects

D/M/1 queue, Queueing theory, 021103 operations research, General Computer Science, M/G/k queue, Computer science, Real-time computing, 0211 other engineering and technologies, M/M/1 queue, 020206 networking & telecommunications, G/G/1 queue, 02 engineering and technology, M/M/∞ queue, 0202 electrical engineering, electronic engineering, information engineering, M/G/1 queue, Applied mathematics, M/M/c queue

Abstract

We propose a method to analyze M/G/1/m queuing systems with the function of random dropping of customers and service time distribution dependent on the queue length. We obtain formulas to determine the Laplace transforms of the distribution of the number of customers in the system during busy period and of the distribution function of the busy period and to calculate the stationary characteristics. The relations for the stationary characteristics are tested using simulation models constructed with the use of the GPSS World tools. The results of the use of various control tools of system parameters are compared in the example.

Published

2016

43. Tail Asymptotics of Two Parallel Queues with Transfers of Customers

Author

Tao Jiang and Li-Wei Liu

Subjects

Mathematical optimization, 021103 operations research, M/G/k queue, 0211 other engineering and technologies, M/M/1 queue, G/G/1 queue, 02 engineering and technology, Management Science and Operations Research, 01 natural sciences, Computer Science::Performance, 010104 statistics & probability, Multilevel queue, Computer Science::Networking and Internet Architecture, M/G/1 queue, M/M/c queue, 0101 mathematics, Priority queue, Bulk queue, Mathematics

Abstract

This paper studies a system consisting of two parallel queues with transfers of customers. In the system, one queue is called main queue and the other one is called auxiliary queue. The main queue is monitored at exponential time instances. At a monitoring instant, if the number of customers in main queue reaches L\((>K)\), a batch of \(L-K\) customers is transferred from the main queue to the auxiliary queue, and if the number of customers in main queue is less than or equal to K, the transfers will not happen. For this system, by using a Foster-Lyapunov type condition, we establish a sufficient stability condition. Then, we provide a sufficient condition under which, for any fixed number of customers in the auxiliary queue, the stationary probability of the number of customers in the main queue has an exact geometric tail asymptotic as the number of customers in main queue increases to infinity. Finally, we give some numerical results to illustrate the impact of some critical model parameters on the decay rate.

Published

2016

44. A two-queue polling model with priority on one queue and heavy-tailed On/Off sources: a heavy-traffic limit

Author

Rosario Delgado

Subjects

Mathematical optimization, 021103 operations research, Queue management system, M/G/k queue, business.industry, 0211 other engineering and technologies, M/M/1 queue, G/G/1 queue, 02 engineering and technology, Management Science and Operations Research, 01 natural sciences, Computer Science Applications, Computer Science::Performance, 010104 statistics & probability, Computational Theory and Mathematics, Multilevel queue, Polling system, M/G/1 queue, 0101 mathematics, business, Bulk queue, Computer network, Mathematics

Abstract

We consider a single-server polling system consisting of two queues of fluid with arrival process generated by a big number of heavy-tailed On/Off sources, and application in road traffic and communication systems. Class-j fluid is assigned to queue j, $$j=1,2$$j=1,2. Server 2 visits both queues to process or let pass the corresponding fluid class. If there is class-2 fluid in the system, it is processed by server 2 until the queue is empty, and only then server 2 visits queue 1, revisiting queue 2 and restarting the cycle as soon as new class-2 fluid arrives, with zero switchover times. Server 1 is an "extra" server which continuously processes class-1 fluid (if there is any). During the visits of server 2 to queue 1, class-1 fluid is simultaneously processed by both servers (possibly at different speeds). We prove a heavy-traffic limit theorem for a suitable workload process associated with this model. Our limit process is a two-dimensional reflected fractional Brownian motion living in a convex polyhedron. A key ingredient in the proof is a version of the Invariance Principle of Semimartingale reflecting Brownian motions which, in turn, is also proved.

Published

2016

45. Queue size distribution of Geo/G/1 queue under the Min(N,D)-policy

Author

Yinghui Tang, Jianxiong Gu, Yingyuan Wei, and Miaomiao Yu

Subjects

D/M/1 queue, 0209 industrial biotechnology, Computer science, M/G/k queue, M/D/1 queue, M/M/1 queue, M/D/c queue, G/G/1 queue, 02 engineering and technology, 01 natural sciences, Computer Science::Performance, 010104 statistics & probability, 020901 industrial engineering & automation, Computer Science (miscellaneous), M/G/1 queue, Applied mathematics, M/M/c queue, 0101 mathematics, Simulation, Information Systems

Abstract

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.

Published

2016

46. The matrix-form solution for GeoX/G/1/N working vacation queue and its application to state-dependent cost control

Author

Chuanyi Luo, Chuan Ding, Kaizhi Yu, and Wei Li

Subjects

021103 operations research, General Computer Science, M/G/k queue, M/D/1 queue, 0211 other engineering and technologies, M/M/1 queue, M/D/c queue, G/G/1 queue, 02 engineering and technology, Management Science and Operations Research, 01 natural sciences, 010104 statistics & probability, Modeling and Simulation, M/G/1 queue, Applied mathematics, M/M/c queue, 0101 mathematics, Bulk queue, Simulation, Mathematics

Abstract

This paper studies a finite buffer size Geo X / G / 1 / N queue with single working vacation and different input rates. By combining two classic methods of supplementary variable and embedded Markov chain, the matrix-form solutions of queue-length distributions at departure, arbitrary, pre-arrival and outside observer's observation epochs are obtained. Based on these queue-length distributions, some performance measures are also derived and some numerical experiments are carried out. Then, an optimal control on state-dependent operating cost of a production to order is presented. HighlightsAnalyze a new queue model raised from practical production system.Obtain the solutions in form of formulae for queue length distributions at different epochs.Optimal analysis for the state-dependent cost of system.

Published

2016

47. Analysis of a discrete-time $$Geo^{\lambda _1,\lambda _2}/G/1$$ G e o λ 1 , λ 2 / G / 1 queue with N-policy and D-policy

Author

Yinghui Tang and Shaojun Lan

Subjects

Discrete mathematics, M/G/k queue, Applied Mathematics, M/D/1 queue, M/M/1 queue, M/D/c queue, G/G/1 queue, 010103 numerical & computational mathematics, 01 natural sciences, 010104 statistics & probability, Computational Mathematics, M/G/1 queue, M/M/c queue, 0101 mathematics, Bulk queue, Mathematics

Abstract

This paper explores a discrete-time Geo / G / 1 queueing system with N-policy and D-policy wherein customers arrive at the system in variable input rates according to the states of the server. When the system becomes empty, the server stays idle until the number of waiting customers reaches N or the sum of the service times of the waiting customers in the system reaches or exceeds a predetermined positive integer D, whichever happens first (referred to as Min(N, D)-policy). Employing the renewal theory, the total probability decomposition law and the probability generating function technique we obtain the probability generating function for the transient queue size distribution at time epoch $$n^+$$ . Also, the explicit recursive formulas of the steady-state queue length distribution at time epochs $$n^+$$ , n, $$n^-$$ and outside observer’s time epoch are derived, respectively. Finally, some numerical experiments are conducted to investigate the sensitivity of system performance measures and the optimization of system capacity.

Published

2016

48. On the Discrete-TimeGeo/G/1Queue with Vacations in Random Environment

Author

Jianjun Li and Liwei Liu

Subjects

D/M/1 queue, Mathematical optimization, 021103 operations research, M/G/k queue, 0211 other engineering and technologies, G/G/1 queue, 02 engineering and technology, 01 natural sciences, 010104 statistics & probability, Multilevel queue, Modeling and Simulation, M/G/1 queue, Applied mathematics, 0101 mathematics, Queue, Bulk queue, Mathematics, Variable (mathematics)

Abstract

A discrete-timeGeo/G/1queue with vacations in random environment is analyzed. Using the method of supplementary variable, we give the probability generating function (PGF) of the stationary queue length distribution at arbitrary epoch. The PGF of the stationary sojourn time distribution is also derived. And we present the various performance measures such as mean number of customers in the system, mean length of the type-icycle, and mean time that the system resides in phase0. In addition, we show that theM/G/1queue with vacations in random environment can be approximated by its discrete-time counterpart. Finally, we present some special cases of the model and numerical examples.

Published

2016

49. Generalised Pollaczek–Khinchin formula for the Polya/G/1 queue

Author

S. T. Mirtchev and Ivan Ganchev

Subjects

Discrete mathematics, Queueing theory, Infinite number, 021103 operations research, M/G/k queue, 0211 other engineering and technologies, G/G/1 queue, 02 engineering and technology, 01 natural sciences, Combinatorics, 010104 statistics & probability, M/G/1 queue, Pollaczek–Khinchine formula, Distributed services, 0101 mathematics, Electrical and Electronic Engineering, Queue, Mathematics

Abstract

A generalised Pollaczek–Khinchin formula for the Polya/G/1 queue, with a Polya peaked arrival process, general distributed service times, and infinite number of waiting positions, is obtained. It is shown that the peakedness of the number of arrivals and the variance of the service time lead to a significant increase in the service delay and queue length.

Published

2017

50. Parallel simulation by multi-instruction, longest-path algorithms.

Author

Chen, Liang

Abstract

This paper presents several basic algorithms for the parallel simulation of G/G/1 queueing systems and certain networks of such systems. The coverage includes systems subject to manufacturing or communication blocking, or to loss of customer due to capacity constraints. The key idea is that the customer departure times are represented by longest-path distance in directed graphs instead of by the usual recursive equations. This representation leads to scalable algorithms with a high degree of parallelism that can be implemented on either MIMD or SIMD parallel computers. [ABSTRACT FROM AUTHOR]

Published

1997