We present a new finite element method for solving partial differential equations with singularities caused by abrupt changes in boundary conditions or sudden changes in boundary shape. Terms from the local solution supplement the ordinary basis functions in the finite element solution. All singular contributions reduce to boundary integrals after a double application of the divergence theorem to the Galerkin integrals, and the essential boundary conditions are weakly enforced using Lagrange multipliers. The proposed method eliminates the need for high-order integration, improves the overall accuracy, and yields very accurate estimates for the singular coefftcients. It also accelerates the convergence with regular mesh refinement and conver...
It is well known that the standard finite element method based on the space Vh of continuous piecewi...
The hexagonal grid version of the block-grid method, which is a difference-analytical method, has be...
AbstractIn Li and Liang (1983), the simplified hybrid-combined method is presented for combining the...
Abstract We solve a Laplacian problem over an L-shaped domain using a singular function boundary int...
The authors present a new singular function boundary integral method for the numerical solution of p...
finite element method. Abstract. We solve a Laplacian problem over an L-shaped domain using a singul...
AbstractWe present a Singular Function Boundary Integral Method (SFBIM) for solving elliptic problem...
Stress singularities in fluid mechanics problems arise at points where there is an abrupt change in ...
Abstract. The finite element dual singular function method [FE-DSFM] has been constructed and analyz...
The Virtual Element Method (VEM) [1] is a stabilized Galerkin finite element formulation that is cap...
The singular function boundary integral method is applied for the solution of a Laplace equation pro...
finite element method. We solve a Laplacian problem over an L-shaped domain using a singular functio...
In this paper, we propose the extended virtual element method (X-VEM) to treat singularities and cra...
We present a new algorithm, based on integral equation formulations, for the solution of constant-co...
AbstractWe compare two numerical methods for the solution of elliptic problems with boundary singula...
It is well known that the standard finite element method based on the space Vh of continuous piecewi...
The hexagonal grid version of the block-grid method, which is a difference-analytical method, has be...
AbstractIn Li and Liang (1983), the simplified hybrid-combined method is presented for combining the...
Abstract We solve a Laplacian problem over an L-shaped domain using a singular function boundary int...
The authors present a new singular function boundary integral method for the numerical solution of p...
finite element method. Abstract. We solve a Laplacian problem over an L-shaped domain using a singul...
AbstractWe present a Singular Function Boundary Integral Method (SFBIM) for solving elliptic problem...
Stress singularities in fluid mechanics problems arise at points where there is an abrupt change in ...
Abstract. The finite element dual singular function method [FE-DSFM] has been constructed and analyz...
The Virtual Element Method (VEM) [1] is a stabilized Galerkin finite element formulation that is cap...
The singular function boundary integral method is applied for the solution of a Laplace equation pro...
finite element method. We solve a Laplacian problem over an L-shaped domain using a singular functio...
In this paper, we propose the extended virtual element method (X-VEM) to treat singularities and cra...
We present a new algorithm, based on integral equation formulations, for the solution of constant-co...
AbstractWe compare two numerical methods for the solution of elliptic problems with boundary singula...
It is well known that the standard finite element method based on the space Vh of continuous piecewi...
The hexagonal grid version of the block-grid method, which is a difference-analytical method, has be...
AbstractIn Li and Liang (1983), the simplified hybrid-combined method is presented for combining the...