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Эта публикация цитируется в 1 научной статье (всего в 1 статье)
Spectral problems arising in the stabilization problem for the loaded heat equation: a two-dimensional and multi-point cases
M. T. Jenaliyeva, K. B. Imanberdiyevab, A. S. Kassymbekovab, K. S. Sharipovc a Institute Mathematics and Mathematical Modeling, Pushkin str., 125, 050010 Almaty, Republic of Kazakhstan
b Al-Farabi Kazakh National University, Al-Farabi Ave., 71, 050040 Almaty, Republic of Kazakhstan
c Kazakh University Ways of Communications, Zhetysu-1 mcr., B.32a, 050063 Almaty, Republic of Kazakhstan
Аннотация:
Spectral properties of a loaded two-dimensional Laplace operator, studied in this work are the application with the stabilization of solutions of problems for the heat equation. The stabilization problem (of forming a cylinder) of a solution of boundary value problem for heat equation with the loaded two-dimensional Laplace operator is considered. An algorithm is proposed for approximate construction of boundary controls providing the required stabilization of the solution. The work continues the research of the authors carried out earlier for the loaded one-dimensional heat equation. The idea of reducing the stabilization problem for a parabolic equation by means of boundary controls to the solution of an auxiliary boundary value problem in the extended domain of independent variables belongs to A.V. Fursikov. At the same time, recently, the so-called loaded differential equations are actively used in problems of mathematical modeling and control of nonlocal dynamical systems.
Ключевые слова:
boundary stabilization, heat equation, spectrum, loaded Laplace operator.
Образец цитирования:
M. T. Jenaliyev, K. B. Imanberdiyev, A. S. Kassymbekova, K. S. Sharipov, “Spectral problems arising in the stabilization problem for the loaded heat equation: a two-dimensional and multi-point cases”, Eurasian Journal of Mathematical and Computer Applications, 7:1 (2019), 23–37
Образцы ссылок на эту страницу:
https://www.mathnet.ru/rus/ejmca129 https://www.mathnet.ru/rus/ejmca/v7/i1/p23
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Страница аннотации: | 113 | PDF полного текста: | 54 |
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