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The Equilibrium Distribution for a Clocked Buffered Switch

Published online by Cambridge University Press:  27 July 2009

Steven Jaffe
Steven Jaffe*
Affiliation:
Department of Mathematics University of Southern California Los angeles, California 90089-1113
*
Current address: Department of Mathematics, Vassar College, Poughkeepsie, New York 12601.
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Abstract

A 2-by-2 buffered switch is the basic element of certain parallel data-processing networks. For a switch fed by two independent Bernoulli input streams, we find the joint distribution of the number of messages waiting in the two buffers at equilibrium, in the form of a bivariate generating function. The derivation uses complex-variable techniques developed by Kingman and by Flatto and McKean for the “shortest queue problem.” A number of asymptotic results are given, the principal one being the variance of the total number of waiting messages in the heavy-traffic limit.

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Type
Articles
Information
Probability in the Engineering and Informational Sciences , Volume 6 , Issue 4 , October 1992 , pp. 425 - 438
Copyright
Copyright © Cambridge University Press 1992

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References

Chung, K.L. (1967). Markov chains with stationary transition probabilities, 2nd ed.Berlin: Springer-Verlag.Google Scholar
Cohen, J.W. & Boxma, O. J. (1983). Boundary value problems in queueing system analysis. Amsterdam: Elsevier North-Holland.Google Scholar
Flatto, L. & McKean, H.P. (1977). Two queues in parallel. Communications on Pure and Applied Mathematics 30: 255263.CrossRefGoogle Scholar
Jaffe, S. (1989). Equilibrium results for a pair of coupled discrete-time queues. Ultracomputer Note #160, NYU Ultracomputer Research Lab, Courant Institute of Mathematical Sciences, New York.Google Scholar
Kingman, J.F.C. (1961). Two similar queues in parallel. Annals of Mathematical Statistics 32:13141323.CrossRefGoogle Scholar
Kruskal, C.P., Snir, M., & Weiss, A. (1986). The distribution of waiting times in clocked multistage interconnection networks. In Proceedings of the 1986 International Conference on Parallel Processing, pp. 1219. Washington, DC: IEEE Computer Society Press.Google Scholar
Percus, O.E. & Percus, J.K. (1990). Elementary properties of clock-regulated queues. SIAM Journal on Applied Mathematics 50: 11661175.CrossRefGoogle Scholar
Percus, O.E. & Percus, J.K. (1990). Models for queue length in clocked queueing networks. Communications on Pure and Applied Mathematics 43: 273289.CrossRefGoogle Scholar
Percus, O.E. & Percus, J.K. (1990). Queue length distributions in a Markov model of a multistage clocked queueing network. Communications on Pure and Applied Mathematics 43: 685693.CrossRefGoogle Scholar