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of the European Council for Modelling and Simulation

Title:

Method For Bounding The Rate Of Convergence For One Class Of Finite-Capacity Markovian Time-Dependent Queues With Batch Arrivals When Empty

Authors:

Anastasiya Kryukova, Viktoriya Oshushkova, Alexander Zeifman, Rostislav Razumchik

Published in:

2020). ECMS 2020 Proceedings Edited by: Mike Steglich, Christian Muller, Gaby Neumann, Mathias Walther, European Council for Modeling and Simulation.

DOI: http://doi.org/10.7148/2020

ISSN: 2522-2422 (ONLINE)

ISSN: 2522-2414 (PRINT)

ISSN: 2522-2430 (CD-ROM)

ISBN: 978-3-937436-68-5
ISBN: 978-3-937436-69-2(CD)

Communications of the ECMS , Volume 34, Issue 1, June 2020,

United Kingdom

Citation format:

Anastasiya Kryukova, Viktoriya Oshushkova, Alexander Zeifman, Rostislav Razumchik (2020). Method For Bounding The Rate Of Convergence For One Class Of Finite-Capacity Markovian Time-Dependent Queues With Batch Arrivals When Empty, ECMS 2020 Proceedings Edited By: Mike Steglich, Christian Mueller, Gaby Neumann, Mathias Walther European Council for Modeling and Simulation. doi: 10.7148/2020-0403

DOI:

https://doi.org/10.7148/2020-0403

Abstract:

Consideration is given to one class of inhomogeneous birth and death processes with finite state space and addi-tional transitions from the origin, which may be used to study the queue-length process in finite-capacity Markovian time-dependent queues with possible batch arrivals when empty. The latter means that customers may arrive in batches only during the periods when the system is idle. All possible transition intensities are allowed to be state-dependent non-random functions of time. Method based on Lyapunov functions, which allows one to obtain ergodicity bounds, is presented. Short numerical example is given.

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