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Analysis of finite-capacity polling systems

Published online by Cambridge University Press:  01 July 2016

Hideaki Takagi
Hideaki Takagi*
Affiliation:
IBM Tokyo Research Laboratory
*
Postal address: Tokyo Research Laboratory, IBM Japan, Ltd., No. 36 Kowa Building, 5–19 Sanban-cho, Chiyoda-ku, 102, Japan.
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Abstract

We consider a system of N finite-capacity queues attended by a single server in cyclic order. For each visit by the server to a queue, the service is given continuously until that queue becomes empty (exhaustive service), given continuously only to those customers present at the visiting instant (gated service), or given to only a single customer (limited service). The server then switches to the next queue with a random switchover time, and administers the same type of service there similarly. For such a system where each queue has a Poisson arrival process, general service time distribution, and finite capacity, we find the distribution of the waiting time at each queue by utilizing the known results for a single M/G/1/K queue with multiple vacations.

Keywords

QUEUESFINITE-CAPACITY QUEUESCYCLIC SERVICEVACATION MODELSPOLLING MODELS
Type
Research Article
Information
Advances in Applied Probability , Volume 23 , Issue 2 , June 1991 , pp. 373 - 387
Copyright
Copyright © Applied Probability Trust 1991 

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