Document Zbl 0451.60085

Asymptotic behavior of the stationary distributions in the GI/PH/c queue with heterogeneous servers. (English) Zbl 0451.60085

Z. Wahrscheinlichkeitstheor. Verw. Geb. 57, 441-452 (1981).

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MSC:

60K25	Queueing theory (aspects of probability theory)
90B22	Queues and service in operations research

Keywords:

multi-server queues; heterogeneous servers; phase type distributions; matrix-geometric solutions; asymptotic results; queue length; waiting time; computational probability

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References:

[1]	Bellman, R., Introduction to Matrix Analysis (1960), New York: McGraw Hill, New York · Zbl 0124.01001
[2]	Gantmacher, F. R., The Theory of Matrices (1959), New York: Chelsea, New York · Zbl 0085.01001
[3]	Lavenberg, S. S., Stability and Maximum Departure Rate of Certain Open Queueing Networks having Finite Capacity Constraints, R.A.I.R.O. Informatique/Computer Science, 12, 353-370 (1978) · Zbl 0387.68032
[4]	Neuts, M. F., Probability Distributions of Phase Type. Liber Amicorum Prof. Emeritus H. Florin, 173-206 (1975), Belgium: Dept. Math., Univ. Louvain, Belgium
[5]	Neuts, M. F., Renewal Processes of Phase Type, Naval. Res. Logist. Quart., 25, 445-454 (1978) · Zbl 0393.90096
[6]	Neuts, M. F., Markov Chains with Applications in Queueing Theory, which have a Matrix-geometric Invariant Probability Vector, Advances in Appl. Probability, 10, 185-212 (1978) · Zbl 0382.60097
[7]	Neuts, M. F., The Probabilistic Significance of the Rate Matrix in Matrix-geometric Invariant Vectors, J. Appl. Probability, 17, 291-296 (1980) · Zbl 0424.60091
[8]	Neuts, M. F., Matrix-geometric Solutions in Stochastic Models. An Algorithmic Approach (1981), Baltimore, MD: Johns Hopkins University Press, Baltimore, MD · Zbl 0469.60002
[9]	Neuts, M.F.: Stationary Waiting Time Distributions in the GI/PH/1 Queue. J. Appl. Probability18 (1981) · Zbl 0475.60086
[10]	Takahashi, Y.; Takami, Y., A Numerical Method for the Steady-state Probabilities of a GI/G/c Queueing System in a General Class, J. Operations Res. Soc. Japan, 19, 147-157 (1976) · Zbl 0348.60127
[11]	Takahashi, Y.: Asymptotic Exponentiality of the Tail of the Waiting Time Distribution in a PH/PH/c Queue. Advances in Appl. Probability13 (1981) · Zbl 0463.60083

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