Resources.
MDPI AG.
Vol. 8.
2019.
On truncation of the matrix-geometric stationary distributions
In this paper, we study queueing systems with an infinite and finite number of waiting places that can be modeled by a Quasi-Birth-and-Death process. We derive the conditions under which the stationary distribution for a loss system is a truncation of the stationary distribution of the Quasi-Birth-and-Death process and obtain the stationary distributions of both processes. We apply the obtained results to the analysis of a semi-open network in which a customer from an external queue replaces a customer leaving the system at the node from which the latter departed. © 2019 by the authors.
Authors
Journal
Publisher
MDPI AG
Number of issue
9
Language
English
Status
Published
Link
Number
798
Volume
7
Year
2019
Organizations
- 1 Service Innovation Research Institute, Helsinki, 00120, Finland
- 2 Department of Applied Informatics and Probability, Peoples' Friendship University of Russia (RUDN University), Miklukho-Maklaya St. 6, Moscow, 117198, Russian Federation
- 3 Institute of Informatics Problems, Federal Research Center 'Computer Science and Control' of the Russian Academy of Sciences, Vavilov St. 44-2, Moscow, 119333, Russian Federation
Keywords
Matrix-geometric solution; Quasi-Birth-and-Death process; Truncated distribution
Date of creation
24.12.2019
Date of change
16.02.2021
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Mathematics.
MDPI AG.
Vol. 7.
2019.