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The insensitivity of stationary probabilities in networks of queues

Published online by Cambridge University Press:  01 July 2016

R. Schassberger*
Affiliation:
University of Calgary

Abstract

The stationary probabilities for certain networks of queues as defined by Kelly [4] were recently shown by Barbour [1] to depend on the service-time distributions involved only through their means. This type of insensitivity has been studied by König and Jansen [5] for a general class of stochastic processes. Kelly's networks yield special cases of such processes. We point this out in the present paper, thus shedding new light on the insensitivity phenomenon observed in these networks and its connection with the phenomenon of local balance. As a consequence of our recent study [8] we also obtain a new insensitivity result for these networks.

Type
Research Article
Copyright
Copyright © Applied Probability Trust 1978 

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References

[1] Barbour, A. D. (1976) Networks of queues and the method of stages. Adv. Appl. Prob. 8, 584591.Google Scholar
[2] Baskett, F., Chandy, K. M., Muntz, R. R. and Palacios, F. G. (1975) Open, closed and mixed networks of queues with different classes of customers. J. Assoc. Comput. Mach. 22, 248260.Google Scholar
[3] Jacobi, H. (1965) Eine Unempfindlichkeitseigenschaft für geordnete Bündel ungeordneter Teilbündel. Wiss. Z. Fr.-Schiller Univ. Jena, Math.-Naturwiss. Reihe 14, 251260.Google Scholar
[4] Kelly, F. P. (1976) Networks of queues. Adv. Appl. Prob. 8, 416432.CrossRefGoogle Scholar
[5] König, D. and Jansen, U. (1976) Eine Invarianzeigenschaft zufälliger Bedienungsprozesse mit positiven Geschwindigkeiten. Math. Nachr. 70, 321364.CrossRefGoogle Scholar
[6] König, D., Matthes, K. and Nawrotzki, K. (1974) Unempfindlichkeitseigenschaften von Bedienungsprozesse. Appendix in Introduction to Queueing Theory (German edition) by Gnedenko, B. V. and Kovalenko, I. N.. Akademie-Verlag, Berlin.Google Scholar
[7] Matthes, K. (1962) Zur Theorie der Bedienungsprozessen. Trans. 3rd Prague Conf. Inf. Theory. Google Scholar
[8] Schassberger, R. (1978) Insensitivity of steady-state distributions of generalized semi-Markov processes with speeds. Adv. Appl. Prob. 10, 836851.Google Scholar
[9] Stoyan, D. (1978) Queuing networks—insensitivity and a heuristic approximation. Elektron. Informationsverarbeit. Kybernetik. 14 (3). Abstract in Adv. Appl. Prob. 10, 318.Google Scholar
[10] Wolff, R. W. and Wrightson, C. W. (1976) An extension of Erlang's loss formula. J. Appl. Prob. 13, 628632.CrossRefGoogle Scholar