Work-conserving priorities
- 1 April 1970
- journal article
- research article
- Published by Cambridge University Press (CUP) in Journal of Applied Probability
- Vol. 7 (02), 327-337
- https://doi.org/10.1017/s0021900200034914
Abstract
In many situations, it is reasonable to assume that a priority rule does not affect the total time spent in service of any job. Rules with this property are said to be work-conserving. This concept unifies and simplifies the analysis of a variety of priority queues. Some results are obtained for rules applied to the GI/G/1 queue. Some special properties of Poisson arrivals are discussed, and a new proof of the equivalence of averaging over all time with averaging over arrival epochs is presented. In this case, explicit results for particular rules are obtained in examples. In another example, the optimal rule (from a very restrictive class) is determined without specializing the arrival stream.Keywords
This publication has 9 references indexed in Scilit:
- A Mixed-Priority Queue with Applications to the Analysis of Real-Time SystemsOperations Research, 1969
- Two Queues Attended by a Single ServerOperations Research, 1968
- Queuing with Alternating PrioritiesOperations Research, 1965
- On a Generalized M/G/1 Queuing Process in Which the First Customer of Each Busy Period Receives Exceptional ServiceOperations Research, 1964
- Priority QueuesOperations Research, 1964
- Letter to the Editor—An Alternate Derivation of the Pollaczek-Khintchine FormulaOperations Research, 1964
- Some Queuing Problems with the Service Station Subject to BreakdownOperations Research, 1963
- A Proof for the Queuing Formula: L = λWOperations Research, 1961
- On the Characteristics of the General Queueing Process, with Applications to Random WalkThe Annals of Mathematical Statistics, 1956