The G/M/m queue with finite waiting room

Per Hokstad

doi:10.2307/3212728

Abstract

The G/M/m queue with only s waiting places is studied. We start by studying the joint distribution of the number of customers present at time t and the time elapsing until the next arrival after t. This gives the asymptotic distribution of the number of customers at the moment of an arrival and at an arbitrary moment. Then waiting time and virtual waiting time distributions are easily obtained. For the G/M/1 queue also the transient solution is given. Finally the case s = ∞ is considered.

References

Cohen, J. W. (1969) The Single Server Queue. North-Holland, Amsterdam.Google Scholar

Smit, J. H. A. De (1973) On the many server queue with exponential service times. Adv. Appl. Prob. 5, 170–182.Google Scholar

Hokstad, P. (1975a) A supplementary variable technique applied to the M/G/1 queue. Scand. J. Statist. 2.Google Scholar

Hokstad, P. (1975b) The use of Wiener-Hopf decomposition in the study of waiting time and busy period for the G/G/1 queue. Scand. J. Statist. To appear.Google Scholar

Keilson, J. (1966) The ergodic queue length distribution for queueing systems with finite capacity. J. Roy. Statist. Soc. B 28, 190–201.Google Scholar

Takács, L. (1958) On a combined waiting time and loss problem concerning telephone traffic. Mathematical Institute, Loránd Eötvös University, Budapest, 73–82.Google Scholar

Takács, L. (1962) Introduction to the Theory of Queues. Oxford University Press, New York.Google Scholar

Schassberger, R. (1970) On the waiting time in the queueing system G/G/1. Ann. Math. Statist. 41, 182–187.Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Hokstad, Per 1977. Asymptotic behaviour of the Ek/G/1 queue with finite waiting room. Journal of Applied Probability, Vol. 14, Issue. 2, p. 358.

Hokstad, Per 1979. On the eelationship of the transient behaviour of a general queueing model to its idle and busy period distributions. Mathematische Operationsforschung und Statistik. Series Optimization, Vol. 10, Issue. 3, p. 421.

Nogami, Shinya Komota, Yasuo and Hoshiko, Yukio 1984. Analysis of the GI/Ek/1 queue with finite waiting room by the supplementary variable approach. Electronics and Communications in Japan (Part I: Communications), Vol. 67, Issue. 1, p. 10.

Kapadia, Asha Seth Kazmi, Mohammad Fasihullah and Mitchell, A.Cameron 1984. Analysis of a finite capacity non preemptive priority queue. Computers & Operations Research, Vol. 11, Issue. 3, p. 337.

Kijima, Masaaki and Makimoto, Naoki 1992. A unified approach to gi/m(n)/l/k and m(n)/g/1/k queues via finite quasi-birth-death processes. Communications in Statistics. Stochastic Models, Vol. 8, Issue. 2, p. 269.

Nicola, V.F. Hagesteijn, G.A. and Kim, B.G. 1994. Fast simulation of the Leaky Bucket algorithm. p. 266.

Yang, Ping 1994. A unified algorithm for computing the stationary queue length distributions inM(k)/G/1/N and GI/M(k)/1/N queues. Queueing Systems, Vol. 17, Issue. 3-4, p. 383.

Srinivasa Rao, T. S. S. and Gupta, U. C. 1995. ON the GI/M(n)/1/K queue-an alternative approach. Optimization, Vol. 35, Issue. 3, p. 265.

1998. APR volume 30 issue 4 Cover and Back matter. Advances in Applied Probability, Vol. 30, Issue. 4, p. b1.

Emstad, Peder J. and Osland, Per-Oddvar 2001. Teletraffic Engineering in the Internet Era, Proceedings of the International Teletraffic Congress - ITC-I7. Vol. 4, Issue. , p. 581.

Kimura, Toshikazu 2003. A consistent diffusion approximation for finite-capacity multiserver queues. Mathematical and Computer Modelling, Vol. 38, Issue. 11-13, p. 1313.

Choi, Dae W. Kim, Nam K. and Chae, Kyung C. 2005. A Two-Moment Approximation for the GI/G/c Queue with Finite Capacity. INFORMS Journal on Computing, Vol. 17, Issue. 1, p. 75.

Takahashi, Akira Takahashi, Yoshitaka Kaneda, Shigeru and Shinagawa, Noriteru 2007. Diffusion Approximations for the GI/G/c/K queue. p. 681.

Goswami, V. Samanta, S.K. Vijaya Laxmi, P. and Gupta, U.C. 2008. Analyzing a multiserver bulk-service finite-buffer queue. Applied Mathematical Modelling, Vol. 32, Issue. 9, p. 1797.

Brandwajn, Alexandre and Begin, Thomas 2012. A Recurrent Solution of PH/M/c/N-Like and PH/M/c-Like Queues. Journal of Applied Probability, Vol. 49, Issue. 1, p. 84.

Grassmann, Winfried and Tavakoli, Javad 2014. Efficient Methods to find the Equilibrium Distribution of the Number of Customers inGI/M/cQueues. INFOR: Information Systems and Operational Research, Vol. 52, Issue. 4, p. 197.

Vijaya Laxmi, P. and Jyothsna, K. 2015. Balking and Reneging Multiple Working Vacations Queue with Heterogeneous Servers. Journal of Mathematical Modelling and Algorithms in Operations Research, Vol. 14, Issue. 3, p. 267.

Legros, Benjamin 2021. Age-based Markovian approximation of the G/M/1 queue. Operations Research Letters, Vol. 49, Issue. 5, p. 708.

El-Taha, Muhammad 2021. An Efficient Convolution Method to Compute the Stationary Transition Probabilities of the G/M/c Model and its Variants. p. 1.

Legros, Benjamin 2022. The principal-agent problem for service rate event-dependency. European Journal of Operational Research, Vol. 297, Issue. 3, p. 949.

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The G/M/m queue with finite waiting room

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