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TheM/G/1 queue with processor sharing and its relation to a feedback queue

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Abstract

The central model of this paper is anM/M/1 queue with a general probabilistic feedback mechanism. When a customer completes his ith service, he departs from the system with probability 1−p(i) and he cycles back with probabilityp(i). The mean service time of each customer is the same for each cycle. We determine the joint distribution of the successive sojourn times of a tagged customer at his loops through the system. Subsequently we let the mean service time at each loop shrink to zero and the feedback probabilities approach one in such a way that the mean total required service time remains constant. The behaviour of the feedback queue then approaches that of anM/G/1 processor sharing queue, different choices of the feedback probabilities leading to different service time distributions in the processor sharing model. This is exploited to analyse the sojourn time distribution in theM/G/1 queue with processor sharing.

Some variants are also considered, viz., anM/M/1 feedback queue with additional customers who are always present, and anM/G/1 processor sharing queue with feedback.

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Author notes

  1. J. L. van den Berg

    Present address: PTT Research, P.O. Box 421, 2260, AK Leidschendam, The Netherlands

Authors and Affiliations

  1. Centre for Mathematics and Computer Science, P.O. Box 4079, 1009, AB Amsterdam, The Netherlands

    J. L. van den Berg

  2. Centre for Mathematics and Computer Science, P.O. Box 4079, 1009, AB Amsterdam, The Netherlands

    O. J. Boxma

  3. Faculty of Economics, Tilburg University, P.O. Box 90153, 5000, LE Tilburg, The Netherlands

    O. J. Boxma

Authors
  1. J. L. van den Berg
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  2. O. J. Boxma
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van den Berg, J.L., Boxma, O.J. TheM/G/1 queue with processor sharing and its relation to a feedback queue. Queueing Syst 9, 365–401 (1991). https://doi.org/10.1007/BF01159223

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  • DOI: https://doi.org/10.1007/BF01159223

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