论文信息 - An Absorbing Markov Chain Approach to GI/M/1 Queues with Generalized Vacations

An Absorbing Markov Chain Approach to GI/M/1 Queues with Generalized Vacations

Stationary probabilities of the embedded Markov chains of a class of GI/M/1 queues can be obtained by a simple multiplication y(I-Q)^(-1), where the j th entry of the row vector y is the probability that the system state seen by the first arrival during a busy period is j and (I-Q)^(-1) is the fundamental matrix associated with the standard GI/M/1 queue. In this paper, we present the entries of (I-Q)^(-1) explicitly. Also, we illustrate how to find y by examples such as the N-policy GI/M/1 queue with or without exponential multiple vacations.

Sang Min Lee | K. Chae | Kyung C. Chae | Sang Min Lee

[1] S. P. Mukherjee,et al. GI/M/1 Queue with Server Vacations , 1990 .

[2] Kyung-Chul Chae,et al. A TRIAL SOLUTION APPROACH TO THE GI=M=1QUEUE WITH N-POLICY AND EXPONENTIAL VACATIONS , 2004 .

[3] Sheldon M. Ross,et al. Introduction to Probability Models (4th ed.). , 1990 .

[4] Jau-Chuan Ke,et al. The Analysis of a General Input Queue with N Policy and Exponential Vacations , 2003, Queueing Syst. Theory Appl..

[5] B. Choi,et al. A G/M/1 vacation Model with exhaustive server , 1991 .

[6] Dong Hwan Han,et al. G/M^ /1 QUEUES WITH SERVER VACATIONS , 1994 .

[7] Chengxuan Cao,et al. The GI/M/1 queue with exponential vacations , 1989, Queueing Syst. Theory Appl..

[8] Naishuo Tian,et al. The Discrete-Time GI/Geo/1 Queue with Multiple Vacations , 2002, Queueing Syst. Theory Appl..

[9] Kuo-Hsiung Wang,et al. (European Journal of Operational Research,142(3):577-594)A Recursive Method for the N Policy G/M/1 Queueing System with Finite Capacity , 2002 .

[10] Naishuo Tian,et al. The N threshold policy for the GI/M/1 queue , 2004, Oper. Res. Lett..

[11] Surendra M. Gupta,et al. The Finite Capacity GI/M/1 Queue with Server Vacations , 1996 .

[12] Marcel F. Neuts,et al. Matrix-Geometric Solutions in Stochastic Models , 1981 .

[13] Sheldon M. Ross,et al. Introduction to probability models , 1975 .

[14] A. Krishnamoorthy,et al. A GI/M/1 queue with rest periods Jacob , 1986 .