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News of the Kabardino-Balkarian Scientific Center of the Russian Academy of Sciences, 2022, Issue 4, Pages 11–18
DOI: https://doi.org/10.35330/1991-6639-2022-4-108-11-18 (Mi izkab496) 		 
PHYSICAL-MATHEMATICAL SCIENCES

The inverse problem of determining the source depending on spatial variables in a hyperbolic equation of the third order

B. S. Ablabekov, A. K. Goroev

Kyrgyz national University named J. Balasagyn, 720033, Kyrgyz Republic, Bishkek, 547 Frunze street
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DOI: https://doi.org/10.35330/1991-6639-2022-4-108-11-18
Abstract: The work is devoted to the proof of the existence and uniqueness of the solution of the inverse problem of determining the source for a hyperbolic equation of the third order. An inverse problem is posed, which consists in determining an unknown source that depends on spatial variables. As additional information for solving the inverse problem, the values of the solution of the problem at the interior point are given. The proof is based on the derivation of a linear system of Volterra integral equations of the second kind with respect to an unknown source.
Keywords: hyperbolic equation, inverse problem, source function, uniqueness, existence, Volterra equation, redefinition.
Received: 30.05.2022
Revised: 20.07.2022
Accepted: 21.07.2022
Document Type: Article
UDC: 517.95
MSC: 35L30
Language: Russian
Citation: B. S. Ablabekov, A. K. Goroev, “The inverse problem of determining the source depending on spatial variables in a hyperbolic equation of the third order”, News of the Kabardino-Balkarian Scientific Center of the Russian Academy of Sciences, 2022, no. 4, 11–18
Citation in format AMSBIB
\Bibitem{AblGor22}
\by B.~S.~Ablabekov, A.~K.~Goroev
\paper The inverse problem of determining the source depending
on spatial variables in a hyperbolic equation of the third order
\jour News of the Kabardino-Balkarian Scientific Center of the Russian Academy of Sciences
\yr 2022
\issue 4
\pages 11--18
\mathnet{http://mi.mathnet.ru/izkab496}
\crossref{https://doi.org/10.35330/1991-6639-2022-4-108-11-18}
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