Classical and Mild Solution of the First Mixed Problem for the Telegraph Equation with a Nonlinear Potential

Classical and Mild Solution of the First Mixed Problem for the Telegraph Equation with a Nonlinear Potential

We study the first mixed problem for the telegraph equation with a nonlinear potential in the first quadrant. We pose the Cauchy conditions on the lower base of the domain and the Dirichlet condition on the lateral boundary. By the method of characteristics, we obtain an expression for the solution...

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Bibliographic Details
Published in:Izvestiâ Irkutskogo gosudarstvennogo universiteta. Seriâ "Matematika" (Online) Vol. 43; no. 1; pp. 48 - 63
Main Authors: Korzyuk, V. I., Rudzko, J. V.
Format: Journal Article
Language:English
Published: Irkutsk State University 01-01-2023
Subjects:
classical solution
generalized solution
matching conditions
mixed problem
nonlinear wave equation
Online Access:Get full text
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Summary:We study the first mixed problem for the telegraph equation with a nonlinear potential in the first quadrant. We pose the Cauchy conditions on the lower base of the domain and the Dirichlet condition on the lateral boundary. By the method of characteristics, we obtain an expression for the solution of the problem in an implicit analytical form as a solution of some integral equations. To solve these equations, we use the method of sequential approximations. The existence and uniqueness of the classical solution under specific smoothness and matching conditions for given functions are proved. Under inhomogeneous matching conditions, we consider a problem with conjugation conditions. When the given data is not smooth enough, we construct a mild solution.
ISSN:1997-7670
2541-8785
DOI:10.26516/1997-7670.2023.43.48