Path delays in communication networks. (English) Zbl 0309.60066


60K25 Queueing theory (aspects of probability theory)
90B15 Stochastic network models in operations research
90B10 Deterministic network models in operations research
Full Text: DOI


[1] J. W. Cohen,The Single Server Queue, Amsterdam: North-Holland Publishing Company, 1969. · Zbl 0183.49204
[2] N. U. Prabhu,Queues and Inventories, New York: Wiley, 1965.
[3] L. Takacs,Introduction to the Theory of Queues, New York: Oxford University Press, 1962. · Zbl 0118.13503
[4] W. S. Jewell, ?A Simple Proof ofL = ?W?,Operations Research, 15, pp. 1109-1116, 1967. · Zbl 0155.24802
[5] T. M. Cover, ?Broadcast Channels?,IEEE Trans. on Information Theory, vol. 18, pp. 2-14, January, 1972. · Zbl 0228.94008
[6] R. M. Gray andP. P. Bergmans, ?Two Problems in Simultaneous Communications?,IEEE Transactions on Communications, vol. 21, pp. 763-767, June, 1973.
[7] L. Kleinrock,Communication Nets, New York: McGraw-Hill, 1964. · Zbl 0274.90012
[8] L. Kleinrock, ?Scheduling, Queueing and Delays in Time-Shared Systems and Computer Networks?, inComputer?Communication Networks, Ed. by N. Abramson and F. F. Kuo. Englewood Cliffs, New Jersey: Prentice-Hall, 1973.
[9] J. R. Jackson, ?Networks of Waiting Lines?,Operations Research, vol. 5, pp. 518-521, 1957.
[10] W. J. Gordon andG. F. Newell, ?Closed Queueing Systems with Exponential Servers?,Operations Research, vol. 15, pp. 254-265, 1967. · Zbl 0168.16603
[11] H. Kobayashi, ?Application of the Diffusion Approximation to Queueing Networks: Part I?Equilibrium Queue Distributions?,Proceedings of the ACM SIGME Symposium on Measurement and Evaluation (Palo Alto), pp. 54-62, February, 1973.
[12] H. Frank andI. T. Frisch,Communication, Transmission, and Transportation Networks, Reading, Massachusetts: Addison-Wesley, 1971. · Zbl 0281.94012
[13] H. D. Friedman, ?Reduction Methods for Tandem Queueing Systems,?Operation Research, Vol. 13, pp. 121-131, 1965. · Zbl 0143.40702
[14] B. Avi-Itzhak, ?A sequence of Service Stations with Arbitrary Input and Regular Service Times,?Management Science, Vol. 11, No. 5, pp. 565-571, March 1965. · Zbl 0156.18602
This reference list is based on information provided by the publisher or from digital mathematics libraries. Its items are heuristically matched to zbMATH identifiers and may contain data conversion errors. It attempts to reflect the references listed in the original paper as accurately as possible without claiming the completeness or perfect precision of the matching.