Add to ORKGThe use of Lagrangian finite element methods for solving a Poisson problem produces systems of linear equations, the global stiffness equations. The components of the vectors which are the solutions of these systems are approximations to the exact solution of the problem at nodal points in the region of definition. There is thus associated with each nodal point an equation which can be thought of as a difference equation. Difference equations resulting from the use of polynomial trial functions of various orders on regular meshes of square and isosceles right triangular elements are derived. The rival merits of this technique of setting up a standard difference equation, as distinct from the more usual practice with finite elements of the r...
The solution of the interface problem is only in H1+α(Ω) with α> 0 possibly close to zero and, he...
This study focus on the finite difference approximation of two dimensional Poisson equation with uni...
In this paper we consider the finite element approximation of the singularities of the solution of P...
The basic concepts taught in an introductory course in Finite Element Analysis are utilized to solve...
We consider the solution u to Poisson's equation L(pu)=f on a polygonal domain ? ? R 2 , which itsel...
We consider the solution u to Poisson's equation L(pu)=f on a polygonal domain ? ? R 2 , which itsel...
We consider the solution u to Poisson's equation L(pu)=f on a polygonal domain ? ? R 2 , which itsel...
We consider the solution u to Poisson's equation L(pu)=f on a polygonal domain ? ? R 2 , which itsel...
AbstractA spectral element method is described which enables Poisson problems defined in irregular i...
Abstract Poisson’s Equation on a rectangular domain describes conduction heat transfer on a plate. T...
Abstract Poisson’s Equation on a rectangular domain describes conduction heat transfer on a plate. T...
We consider the solution u to Poisson's equation L(pu)=f on a polygonal domain ? ? R 2 , which itsel...
Abstract. We demonstrate how meshfree finite difference methods can be applied to solve vector Poiss...
Discontinuous coefficients in the Poisson equation lead to the weak discontinuity in the solution, e...
Discontinuous coefficients in the Poisson equation lead to the weak discontinuity in the solution, e...
The solution of the interface problem is only in H1+α(Ω) with α> 0 possibly close to zero and, he...
This study focus on the finite difference approximation of two dimensional Poisson equation with uni...
In this paper we consider the finite element approximation of the singularities of the solution of P...
The basic concepts taught in an introductory course in Finite Element Analysis are utilized to solve...
We consider the solution u to Poisson's equation L(pu)=f on a polygonal domain ? ? R 2 , which itsel...
We consider the solution u to Poisson's equation L(pu)=f on a polygonal domain ? ? R 2 , which itsel...
We consider the solution u to Poisson's equation L(pu)=f on a polygonal domain ? ? R 2 , which itsel...
We consider the solution u to Poisson's equation L(pu)=f on a polygonal domain ? ? R 2 , which itsel...
AbstractA spectral element method is described which enables Poisson problems defined in irregular i...
Abstract Poisson’s Equation on a rectangular domain describes conduction heat transfer on a plate. T...
Abstract Poisson’s Equation on a rectangular domain describes conduction heat transfer on a plate. T...
We consider the solution u to Poisson's equation L(pu)=f on a polygonal domain ? ? R 2 , which itsel...
Abstract. We demonstrate how meshfree finite difference methods can be applied to solve vector Poiss...
Discontinuous coefficients in the Poisson equation lead to the weak discontinuity in the solution, e...
Discontinuous coefficients in the Poisson equation lead to the weak discontinuity in the solution, e...
The solution of the interface problem is only in H1+α(Ω) with α> 0 possibly close to zero and, he...
This study focus on the finite difference approximation of two dimensional Poisson equation with uni...
In this paper we consider the finite element approximation of the singularities of the solution of P...