Sojourn times in the m/g/1 queue with deterministic feedback
- 1 January 1989
- journal article
- research article
- Published by Taylor & Francis in Communications in Statistics. Stochastic Models
- Vol. 5 (1) , 115-129
- https://doi.org/10.1080/15326348908807101
Abstract
In this paper we consider an M/G/1 queueing model, in which each customer is fed back a fixed number of times. For the case of negative exponentially distributed service times at each visit, we determine the Laplace-Stieltjes transform of the joint distribution of the sojourn times of the consecutive visits. As a by-result, we obtain the (transform of the) total sojourn time distribution; it can be related to the sojourn time distribution in the M/D/l queue with processor sharing. For the case of generally distributed service times at each visit, a set of linear equations is derived, from which the mean sojourn times per visit can be calculated.Keywords
This publication has 10 references indexed in Scilit:
- Queueing Networks: A Survey of Their Random ProcessesSIAM Review, 1985
- Stationary queue-length and waiting-time distributions in single-server feedback queuesAdvances in Applied Probability, 1984
- The sojourn-time distribution in the M/G/1 queue by processor sharingJournal of Applied Probability, 1984
- Priority Queues with FeedbackJournal of the ACM, 1984
- Poisson Arrivals See Time AveragesOperations Research, 1982
- A note on sojourn times in M/G/1 queues with instantaneous, bernoulli feedbackNaval Research Logistics Quarterly, 1981
- A derivation of response time distributions for a multi-class feedback queueing systemsPerformance Evaluation, 1981
- An Inversion Technique for the Laplace Transform with Application to ApproximationBell System Technical Journal, 1978
- Open, Closed, and Mixed Networks of Queues with Different Classes of CustomersJournal of the ACM, 1975
- A Single-Server Queue with FeedbackBell System Technical Journal, 1963