A potential theory for a three-dimensional elliptic equation with one singular coefficient is considered. Double- and simple-layer potentials with unknown density are introduced, which are expressed in terms of the fundamental solution of the mentioned elliptic equation. When studying these potentials, the properties of the Gaussian hypergeometric function are used. Theorems are proved on the limiting values of the introduced potentials and their conormal derivatives, which make it possible to equivalently reduce boundary value problems for singular elliptic equations to an integral equation of the second kind, to which the Fredholm theory is applicable. The Holmgren problem is solved for a three-dimensional elliptic equation with one singu...
We present a simple and effective method for computing double-and single-layer potentials for Laplac...
AbstractWe consider the Friedrichs extension of the operator A=A0+q(x), defined on a bounded domain ...
The present work devoted to the finding explicit solution of a boundary problem with the Dirichlet-N...
AbstractThe present work is devoted to the studying of a boundary-value problem with Neumann’s condi...
Fundamental solutions of the generalized biaxially symmetric elliptic equation are expressed in term...
AbstractThe main result of the present work is the finding of fundamental solutions for a class of t...
AbstractIn the present work, we investigate the Dirichlet problem for a three-dimensional (3D) ellip...
© 2016, Pleiades Publishing, Ltd.Fundamental solutions of a degenerate elliptic equation are found. ...
For the elliptic type of differential equation with two singular coefficients, the quadratic values ...
AbstractWe consider an equation Lα,β,γ(u)≡uxx+uyy+uzz+2αxux+2βyuy+2γzuz=0 in a domain R3+≡{(x,y,z):x...
I. The principal object of the following paper is the discussion of a Neumann problem, with referenc...
© 2016,International Journal of Pharmacy and Technology. All rights reserved.1. The classical method...
The study of Poisson’s equation with general measure data was initiated in the 1920s and has since t...
The dissertation is made of two chapters. The first chapter is dedicated to the investigation of so...
In this paper we apply the method of potentials for studying the Dirichlet and Neumann boundary-valu...
We present a simple and effective method for computing double-and single-layer potentials for Laplac...
AbstractWe consider the Friedrichs extension of the operator A=A0+q(x), defined on a bounded domain ...
The present work devoted to the finding explicit solution of a boundary problem with the Dirichlet-N...
AbstractThe present work is devoted to the studying of a boundary-value problem with Neumann’s condi...
Fundamental solutions of the generalized biaxially symmetric elliptic equation are expressed in term...
AbstractThe main result of the present work is the finding of fundamental solutions for a class of t...
AbstractIn the present work, we investigate the Dirichlet problem for a three-dimensional (3D) ellip...
© 2016, Pleiades Publishing, Ltd.Fundamental solutions of a degenerate elliptic equation are found. ...
For the elliptic type of differential equation with two singular coefficients, the quadratic values ...
AbstractWe consider an equation Lα,β,γ(u)≡uxx+uyy+uzz+2αxux+2βyuy+2γzuz=0 in a domain R3+≡{(x,y,z):x...
I. The principal object of the following paper is the discussion of a Neumann problem, with referenc...
© 2016,International Journal of Pharmacy and Technology. All rights reserved.1. The classical method...
The study of Poisson’s equation with general measure data was initiated in the 1920s and has since t...
The dissertation is made of two chapters. The first chapter is dedicated to the investigation of so...
In this paper we apply the method of potentials for studying the Dirichlet and Neumann boundary-valu...
We present a simple and effective method for computing double-and single-layer potentials for Laplac...
AbstractWe consider the Friedrichs extension of the operator A=A0+q(x), defined on a bounded domain ...
The present work devoted to the finding explicit solution of a boundary problem with the Dirichlet-N...