On a method for constructing the Green function of the Dirichlet problem for the Laplace equation
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Академик Е.А. Бөкетов атындағы Қарағанды университеті
Abstract
The study of boundary value problems for elliptic equations is of both theoretical and applied interest. A
thorough study of model physical and spectral problems requires an explicit and effective representation of
the problem solution. Integral representations of solutions of problems of differential equations are one of the
main tools of mathematical physics. Currently, the integral representation of the Green function of classical
problems for the Laplace equation for an arbitrary domain is obtained only in a two-dimensional domain
by the Riemann conformal mapping method. Starting from the three-dimensional case, these classical
problems are solved only for spherical sectors and for the regions lying between the faces of the hyperplane.
The problem of constructing integral representations of general boundary value problems and studying their
spectral problems remains relevant. In this work, using the boundary condition of the Newtonian (volume)
potential and the spectral property of the potential of a simple layer, the Green function of the Dirichlet
problem for the Laplace equation was constructed.
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Kalmenov T.Sh. On a method for constructing the Green function of the Dirichlet problem for the Laplace equation/T.Sh. Kalmenov//Қарағанды университетінің хабаршысы. Математика сериясы.= Вестник Карагандинского университета. Серия Математика. = Bulletin of the Karaganda University. Mathematics Series. -2024. №2. Р.105-113.