Vestnik Sankt-Peterburgskogo Universiteta. Seriya 10. Prikladnaya Matematika. Informatika. Protsessy Upravleniya
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Vestnik Sankt-Peterburgskogo Universiteta. Seriya 10. Prikladnaya Matematika. Informatika. Protsessy Upravleniya, 2019, Volume 15, Issue 2, Pages 187–198
DOI: https://doi.org/10.21638/11701/spbu10.2019.203
(Mi vspui400)
 

This article is cited in 24 scientific papers (total in 24 papers)

Applied mathematics

Stabilization of weak solutions of parabolic systems with distributed parameters on the graph

A. P. Zhabkoa, V. V. Provotorovb, O. R. Balabanc

a St. Petersburg State University, 7-9, Universitetskaya nab., St. Petersburg, 199034, Russian Federation
b Voronezh State University, 1, Universitetskaya pl., Voronezh, 394006, Russian Federation
c Air Force Academy named after professor N. E. Zhukovsky and Y. A. Gagarin, 54a, ul. Starikh Bol'shevikov, Voronezh, 396064, Russian Federation
References:
Abstract: In many applications because of the complexity of the mathematical models have to abandon the use of ordinary differential equations in behalf of considering the evolutionary equations with partial derivatives. In addition, most commonly the evolutionary problem study on the finite interval changes of a temporary variable. In practice, where you can solve the problem for arbitrary finite interval changes to a temporary variable it is important to know the behavior of the solution where, when the temporary variable strives to infinity. First of all, this is related to the study of the properties of the stability of the indicated solution and the possibility of constructing the stabilizing control in case of the instability. Precisely this case is the object of the study in this work, in which represent the analysis of the stability of the weak solutions of the evolutionary systems with distributed parameters on the graph with the unlimited growth of the temporary variable, obtain the conditions of the stabilization of the weak solutions. By studying the relevant initial-boundary value problem, we to be beyond the scope of the classical solutions and appeal to the weak solutions of the problem, reflecting more accurately the physical essence of appearance and processes (i. e. consider the initial-boundary value problem in weak formulation). In this case, the choice of the class of weak solutions to be determined one way or the other functional space is at the disposal of the researchers and to meet the demand, above all, conservation of the existence theorems and the uniqueness theorems for the arbitrary finite interval changes to a temporary variable. The fundamental used tool is the representation of a weak solution in the form of a functional series (method Faedo—Galerkin approximation with the special basis-system functions — the eigenfunction system) and the compactness of a many of approximate solutions (thanks to a priori estimates).
Keywords: an evolutionary system of parabolic type, distributed parameters on the graph, a weak solution, stabilization of a weak solution.
Received: January 21, 2019
Accepted: March 15, 2019
Bibliographic databases:
Document Type: Article
UDC: 517.929.4
MSC: 74G55
Language: English
Citation: A. P. Zhabko, V. V. Provotorov, O. R. Balaban, “Stabilization of weak solutions of parabolic systems with distributed parameters on the graph”, Vestnik S.-Petersburg Univ. Ser. 10. Prikl. Mat. Inform. Prots. Upr., 15:2 (2019), 187–198
Citation in format AMSBIB
\Bibitem{ZhaProBal19}
\by A.~P.~Zhabko, V.~V.~Provotorov, O.~R.~Balaban
\paper Stabilization of weak solutions of parabolic systems with distributed parameters on the graph
\jour Vestnik S.-Petersburg Univ. Ser. 10. Prikl. Mat. Inform. Prots. Upr.
\yr 2019
\vol 15
\issue 2
\pages 187--198
\mathnet{http://mi.mathnet.ru/vspui400}
\crossref{https://doi.org/10.21638/11701/spbu10.2019.203}
\elib{https://elibrary.ru/item.asp?id=38552364}
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  • This publication is cited in the following 24 articles:
    Citing articles in Google Scholar: Russian citations, English citations
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    Вестник Санкт-Петербургского университета. Серия 10. Прикладная математика. Информатика. Процессы управления
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    References:23
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