On a class of nonlocal problems for hyperbolic equations with degeneration of type and order

On a class of nonlocal problems for hyperbolic equations with degeneration of type and order

Nonlocal problems for the second order hyperbolic model equation were studied in the characteristic area. The type and order of equations degenerate on the same line $ y = 0 $. Nonlocal condition is given by means of fractional integro-differentiation of arbitrary order on the boundary. Nonlocal con...

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Bibliographic Details
Main Authors: Oleg A. Repin, Svetlana K. Kumykova
Format: Article
Language:English
Published: Samara State Technical University 2014-12-01
Series:Vestnik Samarskogo Gosudarstvennogo Tehničeskogo Universiteta. Seriâ: Fiziko-Matematičeskie Nauki
Subjects:
nonlocal boundary value problem
fractional integro-differentiation operators
Cauchy problem
second kind Volterra integral equation
Abel integral equation
Online Access:http://mi.mathnet.ru/eng/vsgtu1348
Description
Summary:Nonlocal problems for the second order hyperbolic model equation were studied in the characteristic area. The type and order of equations degenerate on the same line $ y = 0 $. Nonlocal condition is given by means of fractional integro-differentiation of arbitrary order on the boundary. Nonlocal condition connects fractional derivatives and integrals of the desired solution. For different values of order operators of fractional integro-differentiation within the boundary condition the unique solvability of the considered problems was proved or non-uniqueness of the solution was estimated.
ISSN:1991-8615
2310-7081

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