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This article is cited in 8 scientific papers (total in 8 papers)
Differential Equations and Mathematical Physics
A boundary value problem for a third order hyperbolic equation with degeneration of order inside the domain
R. Kh. Makaova Institute of Applied Mathematics and Automation
of Kabardin-Balkar Scientific Centre of RAS,
Nal’chik, 360000, Russian Federation
(published under the terms of the Creative Commons Attribution 4.0 International License)
Abstract:
In this paper we study the boundary value problem for a degenerating third order equation of hyperbolic type in a mixed domain. The equation under consideration in the positive part of the domain coincides with the Hallaire equation, which is a pseudoparabolic type equation. Moreover, in the negative part of the domain it coincides with a degenerating hyperbolic equation of the first kind, the particular case of the Bitsadze–Lykov equation. The existence and uniqueness theorem for the solution is proved. The uniqueness of the solution to the problem is proved with the Tricomi method. Using the functional relationships of the positive and negative parts of the domain on the degeneration line, we arrive at the convolution type Volterra integral equation of the 2nd kind with respect to the desired solution by a derivative trace. With the Laplace transform method, we obtain the solution of the integral equation in its explicit form. At last, the solution to the problem under study is written out explicitly as the solution of the second boundary-value problem in the positive part of the domain for the Hallaire equation and as the solution to the Cauchy problem in the negative part of the domain for a degenerate hyperbolic equation of the first kind.
Keywords:
boundary-value problem, third order hyperbolic equation, Hallaire equation.
Received: October 27, 2017 Revised: December 11, 2017 Accepted: December 18, 2017 First online: December 28, 2017
Citation:
R. Kh. Makaova, “A boundary value problem for a third order hyperbolic equation with degeneration of order inside the domain”, Vestn. Samar. Gos. Tekhn. Univ., Ser. Fiz.-Mat. Nauki [J. Samara State Tech. Univ., Ser. Phys. Math. Sci.], 21:4 (2017), 651–664
Linking options:
https://www.mathnet.ru/eng/vsgtu1574 https://www.mathnet.ru/eng/vsgtu/v221/i4/p651
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