Please use this identifier to cite or link to this item: https://sci.ldubgd.edu.ua/jspui/handle/123456789/6046
Title: The total first boundary value problem for equation of hyperbolic type with piecewise constant coefficients and \delta- singularities
Authors: Карабин Оксана
Чмир Оксана
Тацій Роман
Keywords: quasi-differential equation, the boundary value problem, the Cauchy matrix, the Dirac function, the eigenvalues problem, the method of Fourier and the method of eigenfunc
Issue Date: 2019
Publisher: Researches in Mathematics and Mechanics
Citation: the method of Fourier and the method of eigenfunctions
Abstract: For the first time a new formal solving scheme of the general first boundary value problem for a hyperbolic type equation with piecewise constant coefficients and ^-singularities was proposed and justified. In the basis of the solving scheme is a concept of quasi-derivatives, a modern theory of systems of linear differential equations, the classical Fourier method and a reduction method. The advantage of this method is a possibility to examine a problem on each breakdown segment and then to combine obtained solutions on the basis of matrix calculation. Such an approach allows the use of software tools for solving the problem.
URI: http://hdl.handle.net/123456789/6046
ISSN: 2519—206Х
Appears in Collections:2019

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