Abstract:
For reduced to the canonical system of integro-differential equations of acoustics,
a direct problem is posed, which consists in determining the velocity of the perturbed medium
and the pressure and the inverse problem of finding the diagonal memory matrix. The problems are
reduced to a closed system of integral equations of the second kind of the Volterra type with respect
to the solution of the direct problem and unknowns of the inverse problem.
The method of contraction mappings in the space of continuous functions with an exponential weighted norm is applied to this system.
Existence and uniqueness theorems for solutions to problems in the global sense are proved.
Key words:
hyperbolic system, system of acoustics equations, integral equation, contraction mapping principle.
Received: 07.03.2022 Accepted: 14.11.2023
Document Type:
Article
UDC:517.968
Language: Russian
Citation:
D. K. Durdiev, Kh. Kh. Turdiev, “The problem of finding the kernels in the system of integro-differential acoustics equations”, Dal'nevost. Mat. Zh., 23:2 (2023), 190–210
\Bibitem{DurTur23}
\by D.~K.~Durdiev, Kh.~Kh.~Turdiev
\paper The problem of finding the kernels in the system of integro-differential acoustics equations
\jour Dal'nevost. Mat. Zh.
\yr 2023
\vol 23
\issue 2
\pages 190--210
\mathnet{http://mi.mathnet.ru/dvmg518}
\crossref{https://doi.org/10.47910/FEMJ202317}
Linking options:
https://www.mathnet.ru/eng/dvmg518
https://www.mathnet.ru/eng/dvmg/v23/i2/p190
This publication is cited in the following 1 articles:
D. K. Durdiev, T. R. Suyarov, Kh. Kh. Turdiev, “Obratnaya koeffitsientnaya zadacha dlya drobnogo telegrafnogo uravneniya s sootvetstvuyuschei drobnoi proizvodnoi po vremeni”, Izv. vuzov. Matem., 2025, no. 2, 39–52
Citation in format AMSBIB
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