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Performance analysis of single server non-Markovian retrial queue with working vacation and constant retrial policy

Published online by Cambridge University Press:  30 April 2014

V. Jailaxmi
Affiliation:
Department of Mathematics, PSG College of Technology, 641004 - Coimbatore, India. [email protected]; [email protected]
R. Arumuganathan
Affiliation:
Department of Mathematics, PSG College of Technology, 641004 - Coimbatore, India. [email protected]; [email protected]
M. Senthil Kumar
Affiliation:
Department of Applied Mathematics and Computational Sciences, PSG College of Technology, 641004 - Coimbatore, India; [email protected]
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Abstract

This paper analyses an M/G/1 retrial queue with working vacation and constant retrial policy. As soon as the system becomes empty, the server begins a working vacation. The server works with different service rates rather than completely stopping service during a vacation. We construct the mathematical model and derive the steady-state queue distribution of number of customer in the retrial group. The effects of various performance measures are derived.

Type
Research Article
Copyright
© EDP Sciences, ROADEF, SMAI, 2014

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References

G.I. Falin and J.K.C. Templeton, Retrial queues, Chapman and Hall, London (1997).
Artalejo, J.R., Accessible bibliography on retrail queues. Math. Comput. Model. 30 (1999) 16. Google Scholar
Artalejo, J.R., A classified bibliography of research on retrial queues: Progress in 1990, Top 7 (1999) 187211. Google Scholar
Choi, B.D. and Park, K.K., The M/G/1 Retrial queue with Bernoulli schedule. Queueing Syst. 7 (1990) 219227. Google Scholar
Choi, B.D., Choi, K.B. and Lee, Y.W., M/G/1 Retrial queueing system with two types of calls and finite capacity. Queueing Syst. 19 (1995) 215229. Google Scholar
Choi, B.D. and Chang, Y., Single server retrial queues with priority calls. Math. Comput. Model. 30 (1999) 732. Google Scholar
J.R. Artalejo and Gomez–Corral, Retrial queueing systems. A Comput. Approach. Springer-Verlag, Berlin (2008).
H. Takagi, Vacation and priority systems, Part I, Queueing analysis. A foundation of performance evaluation, Vol. 1, North-Holland, Amsterdam (1991).
Li, H. and Yang, T., A single server retrial queue with server vacation and a finite number of input sources. Eur. J. Oper. Res. 85 (1995) 149160. Google Scholar
Artalejo, J.R., Analysis of an M/G/1 queue with constant repeated attempts and server vacations. Comput. Oper. Res. 24 (1997) 493504. Google Scholar
Doshi, B.T., Queueing systems with vacations a survey. Queueing Syst. 1 (1986) 2966. Google Scholar
B.T. Doshi, An M/G/1 queue with variable vacation. Proc. Int. Conf. Performance Model., Sophia Antipolis, France (1985).
Baba, Y., On the M X/G/1 queue with vacation time. Oper. Res. Lett. 5 (1986) 9398. Google Scholar
Senthilkumar, M. and Arumuganathan, R., On the single server batch arrival retrial queue with general vacation time under Bernoulli schedule and two phases of heterogeneous service. Quality Technology and Quantitative Management 5 (2008) 145160. Google Scholar
Lee, H.W., Lee, S.S., Park, J.O. and Chae, K.C., Analysis of M X/G/1 queue with N-policy and multiple vacations. J. Appl. Prob. 31 (1994) 467496. Google Scholar
Lee, S.S., Lee, H.W. and Chae, K.C., Batch arrival queue with N-policy and single vacation. Comput. Oper. Res. 22 (1995) 173189. Google Scholar
G.V. Krishna Reddy, Nadarajan, R. and Arumuganathan, R., Analysis of a bulk queue with N- policy multiple vacations and setup times. Comput. Oper. Res. 25 (1998) 957967. Google Scholar
Arumuganathan, R., T. Judeth Malliga and A. Rathinasamy. Steady state analysis of non-Markorian bulk queueing system with N-Policy and different types of vacations. Int. J. Modern Math. 3 (2008) 4766. Google Scholar
Haridass, M. and Arumuganathan, R., Analysis of a M X/G/1 queueing system with vacation interruption. RAIRO-Oper. Res. 46 (2012) 304334. Google Scholar
Servi, L.D. and Finn, S.G., M/M/1 queues with working vacation (M/M/1/Wv). Performance Evaluation 50 (2002) 4152. Google Scholar
J. Kim D. Choi and K. Chae, Analysis of queue length distribution of the M/G/1 queue with working vacations, Int. Conf. Statistics and related fields, Hawaii (2003).
D. Wu. and Takagi, H., M/G/1 queue with multiple working vacations. Performance Evaluations 63 (2006) 654681. Google Scholar
Li, J.L., Tian, N. and Zhang, Z.G., Analysis of the M/G/1 queue with exponentially distributed working vacations a matrix analytic approach. Queueing Syst. 61 (2009) 139166. Google Scholar
Tien Van, Do., M/M/1 retrial queue working vacation. Acta Inf. 47 (2009) 6775. Google Scholar
N. Limnios and Gh. Oprisan, Semi-Markov Process and Reliability-Statistics for Industry and Technology, Birkhauser Boston, Springer (2001).