Zobrazeno 1 - 8
of 8
pro vyhledávání: '"Tatyana Panfilova"'
Autor:
Anna Sinitcina, Yacov Satin, Alexander Zeifman, Galina Shilova, Alexander Sipin, Ksenia Kiseleva, Tatyana Panfilova, Anastasia Kryukova, Irina Gudkova, Elena Fokicheva
Publikováno v:
Mathematics, Vol 6, Iss 5, p 80 (2018)
The model of a two-dimensional birth-death process with possible catastrophes is studied. The upper bounds on the rate of convergence in some weighted norms and the corresponding perturbation bounds are obtained. In addition, we consider the detailed
Externí odkaz:
https://doaj.org/article/b2db7caaf8614e33a3cfba9fafad9cad
Autor:
Ivan Nekrasov, Vadim Tynchenko, Vladimir Bukhtoyarov, Tatyana Panfilova, Aleksandr Sokolnikov, Aleksey Gorodov, Ilia Panfilov
Publikováno v:
VII INTERNATIONAL CONFERENCE “SAFETY PROBLEMS OF CIVIL ENGINEERING CRITICAL INFRASTRUCTURES” (SPCECI2021).
Autor:
Tatyana Panfilova, Alexander Zeifman
Publikováno v:
Journal of Mathematical Sciences. 221:616-622
Homogeneous birth and death processes with a finite number of states are studied. We analyze the slowest and fastest rates of convergence to the limit mode. Estimates of these bounds for some classes of mean-field models are obtained. The asymptotics
Autor:
V. Yu. Korolev, Anna Korotysheva, Ya. A. Satin, Tatyana Panfilova, Alexander Zeifman, Alexander Sipin, Galina Shilova
Publikováno v:
Journal of Mathematical Sciences. 218:238-244
We consider a multidimensional inhomogeneous birth-death process and obtain bounds for the probabilities of the corresponding one-dimensional processes.
Autor:
Elena Fokicheva, Anastasia Kryukova, Alexander Sipin, Irina A. Gudkova, Anna Sinitcina, Tatyana Panfilova, Ksenia Kiseleva, Yacov Satin, Alexander Zeifman, Galina Shilova
Publikováno v:
Mathematics; Volume 6; Issue 5; Pages: 80
Mathematics, Vol 6, Iss 5, p 80 (2018)
Mathematics, Vol 6, Iss 5, p 80 (2018)
The model of a two-dimensional birth-death process with possible catastrophes is studied. The upper bounds on the rate of convergence in some weighted norms and the corresponding perturbation bounds are obtained. In addition, we consider the detailed
Publikováno v:
Mathematical Biosciences. 245:96-102
General nonstationary birth-death process with possible catastrophes on finite state space is studied. The approach for obtaining the bounds on the rates of convergence to the limiting characteristics is outlined. Method for construction of the limit
Publikováno v:
Theory of probability and its applications, 54(1):10.1137/S0040585X97984097, 97-113. Society for Industrial and Applied Mathematics Publications
Teoriya veroyatnostei i ee primeneniya, 54(1), 18-38. Nauchnoe Izdatel'stvo TVP
Teoriya veroyatnostei i ee primeneniya, 54(1), 18-38. Nauchnoe Izdatel'stvo TVP
We survey a method initiated by one of us in the 1990's for finding bounds and representations for the rate of convergence of a birth-death process. We also present new results obtained by this method for some specific birth-death processes related t
Publikováno v:
Communications in Computer and Information Science ISBN: 9783642359798
An analogue of M t /M t /S/S Erlang loss system for a queue with group services is introduced and considered. Weak ergodicity of the model is studied. We obtain the bounds on the rate of convergence to the limiting characteristics and consider two co
Externí odkaz:
https://explore.openaire.eu/search/publication?articleId=doi_________::00688ca8871c5e35e584d27181cd48a0
https://doi.org/10.1007/978-3-642-35980-4_22
https://doi.org/10.1007/978-3-642-35980-4_22