International audienceThe "boundary stiffness matrix" characterizing in a discretized form the response of the boundary to given Dirichlet boundary conditions allows the coupling between BEM and FEM. The paper presents an approach based on the direct computation of the stiffness matrix from the potential function related to a given Dirichlet boundary condition. The method produces a symmetric stiffness matrix as for the Singular Galerkin boundary element method, but does not need to compute hypersingular integrals. In addition, the method uses only the nodal values of the boundary potential, but does not need discretized values of the normal gradient at the boundary, as for usual boundary element methods, which reduces the number of matrice...
This chapter deals with formulations based on boundary integral equations (BIEs) for elastic and pla...
A boundary integral equation of the first kind is discretised using Galerkin's method with piecewise...
Neste trabalho, a formulação linear do método dos elementos de contorno - MEC, para elasticidade bid...
International audienceThe "boundary stiffness matrix" characterizing in a discretized form the respo...
ABSTRACT This study investigates the theoretical and numerical basis of finite element-hosted coupli...
Free rigid body modes in Neumann problems are typically eliminated by suitably restraining the body....
The Boundary Contour Method (BCM) is a recent variant of the Boundary Element Method (BEM) resting o...
AbstractThis paper presents a matrix analysis of the Dual Reciprocity Boundary Element Method (DRM) ...
The paper is devoted to the solution of Laplace equation by the boundary ele-ment method. The coupli...
This paper describes a general approach to compute the boundary integral equations that appear when ...
Applied to solid mechanics problems with geometric nonlinearity, current finite element and boundary...
nda e t es t scre hes of th n to tinu aso, the uccess re stil erator refer f depen r this i n integ ...
In this paper, a formulation for representation of stiffeners in plane stress by the boundary elemen...
The usage of the boundary integral equation method for nonhomogeneous problems and the combination o...
The calculation of structures made of the assembly of several walls requires finite element modeling...
This chapter deals with formulations based on boundary integral equations (BIEs) for elastic and pla...
A boundary integral equation of the first kind is discretised using Galerkin's method with piecewise...
Neste trabalho, a formulação linear do método dos elementos de contorno - MEC, para elasticidade bid...
International audienceThe "boundary stiffness matrix" characterizing in a discretized form the respo...
ABSTRACT This study investigates the theoretical and numerical basis of finite element-hosted coupli...
Free rigid body modes in Neumann problems are typically eliminated by suitably restraining the body....
The Boundary Contour Method (BCM) is a recent variant of the Boundary Element Method (BEM) resting o...
AbstractThis paper presents a matrix analysis of the Dual Reciprocity Boundary Element Method (DRM) ...
The paper is devoted to the solution of Laplace equation by the boundary ele-ment method. The coupli...
This paper describes a general approach to compute the boundary integral equations that appear when ...
Applied to solid mechanics problems with geometric nonlinearity, current finite element and boundary...
nda e t es t scre hes of th n to tinu aso, the uccess re stil erator refer f depen r this i n integ ...
In this paper, a formulation for representation of stiffeners in plane stress by the boundary elemen...
The usage of the boundary integral equation method for nonhomogeneous problems and the combination o...
The calculation of structures made of the assembly of several walls requires finite element modeling...
This chapter deals with formulations based on boundary integral equations (BIEs) for elastic and pla...
A boundary integral equation of the first kind is discretised using Galerkin's method with piecewise...
Neste trabalho, a formulação linear do método dos elementos de contorno - MEC, para elasticidade bid...