Add to ORKGAbstract: We present the difference method for elliptic equations appearing in connection with constructions of block-structured grids in the complicated curvilinear regions. This method is a special variant of the well-known multigrid method introduced by R.P.Fedorenko. As the inner iterations of the multigrid method we use the special form of Chebyshev's method. The method is realized and used for calculations of block-structured grids, but other applications are possible.Note: Research direction:Mathematical problems and theory of numerical method
Multigrid methods are studied for solving elliptic partial differential equations. Focus is on paral...
We describe an application of the multigrid iteration to the collocation approximation for elliptic ...
AbstractPiecewise uniform meshes introduced by Shishkin, are a very useful tool to construct robust ...
Abstract: Multigrid method is widely used for computations of diffusion, fluid dynamics, e...
Multigrid methods have been very active area of research since it was introduced in 1960’[19]. It is...
A robust solver for the elliptic grid generation equations is sought via a numerical study. The syst...
The construction of effective iteration methods for the solution of elliptic problems is the aim of ...
Abstract: The multigrid algorithm for elliptic equations on curvilinear grids have been c...
In this thesis numerical methods for solving elliptic partial differential equations are developed. ...
Approximate solutions of elliptic boundary value problems can be obtained by using finite elements. ...
Approximate solutions of elliptic boundary value problems can be obtained by using finite elements. ...
summary:A full multigrid finite element method is proposed for semilinear elliptic equations. The ma...
Abstract: We introduce an adaptive algebraic multigrid method (AMG) for numerical solution...
Abstract: Parallel multigrid method for elliptic difference equations. Anisotropic diffusi...
In this paper, a high order compact difference scheme and a multigrid method are proposed for solvin...
Multigrid methods are studied for solving elliptic partial differential equations. Focus is on paral...
We describe an application of the multigrid iteration to the collocation approximation for elliptic ...
AbstractPiecewise uniform meshes introduced by Shishkin, are a very useful tool to construct robust ...
Abstract: Multigrid method is widely used for computations of diffusion, fluid dynamics, e...
Multigrid methods have been very active area of research since it was introduced in 1960’[19]. It is...
A robust solver for the elliptic grid generation equations is sought via a numerical study. The syst...
The construction of effective iteration methods for the solution of elliptic problems is the aim of ...
Abstract: The multigrid algorithm for elliptic equations on curvilinear grids have been c...
In this thesis numerical methods for solving elliptic partial differential equations are developed. ...
Approximate solutions of elliptic boundary value problems can be obtained by using finite elements. ...
Approximate solutions of elliptic boundary value problems can be obtained by using finite elements. ...
summary:A full multigrid finite element method is proposed for semilinear elliptic equations. The ma...
Abstract: We introduce an adaptive algebraic multigrid method (AMG) for numerical solution...
Abstract: Parallel multigrid method for elliptic difference equations. Anisotropic diffusi...
In this paper, a high order compact difference scheme and a multigrid method are proposed for solvin...
Multigrid methods are studied for solving elliptic partial differential equations. Focus is on paral...
We describe an application of the multigrid iteration to the collocation approximation for elliptic ...
AbstractPiecewise uniform meshes introduced by Shishkin, are a very useful tool to construct robust ...