The hexagonal grid version of the block-grid method, which is a difference-analytical method, has been applied for the solution of Laplace’s equation with Dirichlet boundary conditions, in a special type of polygon with corner singularities. It has been justified that in this polygon, when the boundary functions away from the singular corners are from the Hölder classes C4,λ, 0<λ<1, the uniform error is of order O(h4), h is the step size, when the hexagonal grid is applied in the ‘nonsingular’ part of the domain. Moreover, in each of the finite neighborhoods of the singular corners (‘singular’ parts), the approximate solution is defined as a quadrature approximation of the integral representation of the harmonic function, and the erro...
The finite difference solution of the Dirichlet problem on rectangles when a boundary function is gi...
AbstractWe investigate the convergence of special boundary approximation methods (BAMs) used for the...
AbstractA new numerical method for solving linear elliptic boundary value problems with constant coe...
The hexagonal grid version of the block-grid method, which is a difference-analytical method, has be...
The fourth order matching operator on the hexagonal grid is constructed. Its application to the inte...
AbstractThe highly accurate block-grid method for solving Laplace’s boundary value problems on polyg...
The block-grid method (see Dosiyev, 2004) for the solution of the Dirichlet problem on polygons, whe...
The error estimates obtained for solving Laplace's boundary value problem on polygons by the block-g...
An interpolation operator is proposed using the cubic grid solution of order O(h4), h is the mesh si...
We present a new finite element method for solving partial differential equations with singularities...
A new method is introduced for solving Laplace problems on 2D regions with corners by approximation ...
An interpolation operator is proposed using the cubic grid solution of order 0 (h(4)), h is the mesh...
”The difficulties are almost always at the boundary. ” That statement applies to the solution of par...
Abstract“The difficulties are almost always at the boundary.” That statement applies to the solution...
International audienceIt is well known that the solution of the Laplace equation in a non convexpoly...
The finite difference solution of the Dirichlet problem on rectangles when a boundary function is gi...
AbstractWe investigate the convergence of special boundary approximation methods (BAMs) used for the...
AbstractA new numerical method for solving linear elliptic boundary value problems with constant coe...
The hexagonal grid version of the block-grid method, which is a difference-analytical method, has be...
The fourth order matching operator on the hexagonal grid is constructed. Its application to the inte...
AbstractThe highly accurate block-grid method for solving Laplace’s boundary value problems on polyg...
The block-grid method (see Dosiyev, 2004) for the solution of the Dirichlet problem on polygons, whe...
The error estimates obtained for solving Laplace's boundary value problem on polygons by the block-g...
An interpolation operator is proposed using the cubic grid solution of order O(h4), h is the mesh si...
We present a new finite element method for solving partial differential equations with singularities...
A new method is introduced for solving Laplace problems on 2D regions with corners by approximation ...
An interpolation operator is proposed using the cubic grid solution of order 0 (h(4)), h is the mesh...
”The difficulties are almost always at the boundary. ” That statement applies to the solution of par...
Abstract“The difficulties are almost always at the boundary.” That statement applies to the solution...
International audienceIt is well known that the solution of the Laplace equation in a non convexpoly...
The finite difference solution of the Dirichlet problem on rectangles when a boundary function is gi...
AbstractWe investigate the convergence of special boundary approximation methods (BAMs) used for the...
AbstractA new numerical method for solving linear elliptic boundary value problems with constant coe...