AbstractWe investigate the convergence of special boundary approximation methods (BAMs) used for the solution of Laplace problems with a boundary singularity. In these methods, the solution is approximated in terms of the leading terms of the asymptotic solution around the singularity. Since the approximation of the solution satisfies identically the governing equation and the boundary conditions along the segments causing the singularity, only the boundary conditions along the rest of the boundary need to be enforced. Four methods of imposing the essential boundary conditions are considered: the penalty, hybrid, and penalty/hybrid BAMs and the BAM with Lagrange multipliers. A priori error analyses and numerical experiments are carried out ...
A new method is introduced for solving Laplace problems on 2D regions with corners by approximation ...
A general numerical method is described for the solution of linear elliptic and parabolic partial di...
About two decades ago, I. Babu ka, J.T. Oden and J.K. Lee introduced finite element methods that cal...
AbstractWe investigate the convergence of special boundary approximation methods (BAMs) used for the...
The authors present a new singular function boundary integral method for the numerical solution of p...
AbstractIn Li and Liang (1983), the simplified hybrid-combined method is presented for combining the...
AbstractWe present a Singular Function Boundary Integral Method (SFBIM) for solving elliptic problem...
Abstract We solve a Laplacian problem over an L-shaped domain using a singular function boundary int...
AbstractFor a class of singular free boundary problems with applications in electromagnetism and pla...
We present a new finite element method for solving partial differential equations with singularities...
Numerical methods for a class of free and moving boundary problems are considered. The class involve...
The singular function boundary integral method is applied for the solution of a Laplace equation pro...
AbstractThe cracked-beam problem, as a variant of Motz’s problem, is discussed, and its very accurat...
Abstract. In this study we investigate the approximation of the solutions of certain elliptic bounda...
AbstractThe main objective of the present work is to introduce a variant of Trefftz's method for fin...
A new method is introduced for solving Laplace problems on 2D regions with corners by approximation ...
A general numerical method is described for the solution of linear elliptic and parabolic partial di...
About two decades ago, I. Babu ka, J.T. Oden and J.K. Lee introduced finite element methods that cal...
AbstractWe investigate the convergence of special boundary approximation methods (BAMs) used for the...
The authors present a new singular function boundary integral method for the numerical solution of p...
AbstractIn Li and Liang (1983), the simplified hybrid-combined method is presented for combining the...
AbstractWe present a Singular Function Boundary Integral Method (SFBIM) for solving elliptic problem...
Abstract We solve a Laplacian problem over an L-shaped domain using a singular function boundary int...
AbstractFor a class of singular free boundary problems with applications in electromagnetism and pla...
We present a new finite element method for solving partial differential equations with singularities...
Numerical methods for a class of free and moving boundary problems are considered. The class involve...
The singular function boundary integral method is applied for the solution of a Laplace equation pro...
AbstractThe cracked-beam problem, as a variant of Motz’s problem, is discussed, and its very accurat...
Abstract. In this study we investigate the approximation of the solutions of certain elliptic bounda...
AbstractThe main objective of the present work is to introduce a variant of Trefftz's method for fin...
A new method is introduced for solving Laplace problems on 2D regions with corners by approximation ...
A general numerical method is described for the solution of linear elliptic and parabolic partial di...
About two decades ago, I. Babu ka, J.T. Oden and J.K. Lee introduced finite element methods that cal...