Abstract
In this paper, we study a retrial queueing model with the server subject to starting failures. We first present the necessary and sufficient condition for the system to be stable and derive analytical results for the queue length distribution as well as some performance measures of the system in steady state. We show that the general stochastic decomposition law forM/G/1 vacation models also holds for the present system. Finally, we demonstrate that a few well known queueing models are special cases of the present model and discuss various interpretations of the stochastic decomposition law when applied to each of these special cases.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
Reference
P.J. Burke, Proof of a conjecture on the interarrivai time distribution in anM/M/1 queue with feedback, IEEE Trans. Commun. 24 (1976) 175–178.
B.D. Choi, and W.C. Ahn, Retrial queues with collision arising from unslotted CSMA/CD protocol, Queueing Syst. 11 (1992) 335–356.
E. Çinlar,Introduction to Stochastic Processes (Prentice-Hall, Englewood Cliffs, 1975).
R.B. Cooper, Queues served in cyclic order: waiting times, Bell Syst. Tech. J. 49 (1970) 399–413.
D.R. Cox and H.D. Miller,The Theory of Stochastic Processes (Methuen, London, 1965).
B.T. Doshi, A note on stochastic decomposition in aGI/G/1 queue with vacations or set-up times, J. Appl. Prob. 22 (1985) 419–428.
B.T. Doshi, Queueing systems with vacations—A survey, Queueing Syst. 1 (1986) 29–66.
G. Falin, Retrial queues, Queueing Syst. 7 (1990) 127–168.
S.W. Fuhrmann, A note on theM/G/1 queue with server vacations, Oper. Res. 32 (1984) 1368–1373.
S.W. Fuhrmann and R.B. Cooper, Stochastic decomposition in theM/G/l queue with generalized vacations, Oper. Res. 33 (1985) 1117–1129.
D.P. Heyman, Optimal operating policies forM/G/l queueing systems, Oper. Res. 16 (1968) 362–382.
J. Keilson, J. Cozzolino and H. Young, A service system with unfilled requests repeated, Oper. Res. 16 (1968) 1126–1137.
L. Kleinrock, Analysis of a time-shared processor, Nav. Res. Log. Quart. 11 (1964) 59–73.
L. Kleinrock, Time-shared systems: a theoretical treatment, J. ACM 14 (1967) 242–261.
L. Kleinrock,Queueing Systems, Vol. I:Theory (Wiley, New York, 1975).
V.G. Kulkarni and B.D. Choi, Retrial queue with server subject to breakdowns and repairs, Queueing Syst. 7 (1990) 191–208.
A.J. Lemoine, Limit theorems for generalized single server queue, Adv. Appl. Prob. 6 (1974) 159–174.
A.J. Lemoine, Limit theorems for generalized single server queue: the exceptional system, SIAM J. Appl. Math. 28 (1975) 596–606.
H. Levy and L. Kleinrock, A queue with starter and a queue with vacations: delay analysis by decomposition, Oper. Res 34 (1986) 426–436.
Y. Levy and U. Yechiali, Utilization of idle time in anM/G/l queueing system, Manag. Sci. 22 (1975) 202–211.
D. Le Minh, Analysis of the exceptional queueing system by the use of regenerative processes and analytical methods, Math. Oper. Res. 5 (1980) 147–159.
M.F. Neuts and M.F. Ramalhoto, A service model in which the server is required to search for customers, J. Appl. Prob. 21 (1984) 157–166.
A.G. Pakes, Some conditions for ergodicity and recurrence of Markov chains, Oper. Res. 17 (1969) 1058–1061.
M. Scholl and L. Kleinrock, On the M/G/l queue with rest period and certain service-independent queueing disciplines, Oper. Res. 31 (1983) 705–719.
P.D. Welch, On a generalizedM/G/1 queueing process in which the first customer of each busy period receives exceptional service, Oper. Res. 12 (1964) 736–752.
T. Yang and J.G.C. Templeton, A survey on retrial queues, Queueing Syst. 2 (1987) 201–233.
Author information
Authors and Affiliations
Additional information
Partially supported by the Natural Sciences and Engineering Research Council of Canada, grant OGP0046415.
Partially supported by internal research grant of Mount Saint Vincent University.
Rights and permissions
About this article
Cite this article
Yang, T., Li, H. TheM/G/1 retrial queue with the server subject to starting failures. Queueing Syst 16, 83–96 (1994). https://doi.org/10.1007/BF01158950
Received:
Revised:
Issue Date:
DOI: https://doi.org/10.1007/BF01158950