We discuss how the Fast Multipole Method (FMM) applied to a boundary concentrated mesh can be used to evaluate volume potentials that arise in the boundary element method. If $h$ is the meshwidth near the boundary, then the algorithm can compute the potential in nearly $\Ord(h^{-2})$ operations while maintaining an $\Ord(h^p)$ convergence of the error. The effectiveness of the algorithms are demonstrated by solving boundary integral equations of the Poisson equation
This article summarizes the development of a fast boundary element method for the linear Poisson-Bol...
To reduce computational complexity and memory requirement for 3-D elastodynamics using the boundary ...
International audienceSolving the 3-D elastodynamic equations using traditional boundary element met...
We discuss how the Fast Multipole Method (FMM) applied to a boundary concentrated mesh can be used t...
The solution of the elastodynamic equations using integral formulations requires to solve full and n...
The solution of the elastodynamic equations using boundary element methods (BEMs) gives rise to full...
This paper presents a fast multipole boundary element method (FMBEM) for the 3-D elastodynamic bound...
A linear strength, Galerkin Boundary Element Meth-od (BEM) for the solution of the three dimensional...
This paper deals with the efficient 3D multidomain boundary element method (BEM) for solving a Poiss...
International audienceThe Boundary Element Method (BEM) has been an effective method for modelling a...
The Laplace and Helmholtz equations are two of the most important partial differential equations (PD...
International audienceThe solution of the elastodynamic equations using boundary element methods (BE...
We present a large variety of applications of the Boundary Element Method exploiting a Multipole for...
A fast multipole boundary element method (FM-BEM) for solving large-scale potential problems ruled b...
The renewed interest in the finite-element and boundary-integral (FE-BI) method originated from the ...
This article summarizes the development of a fast boundary element method for the linear Poisson-Bol...
To reduce computational complexity and memory requirement for 3-D elastodynamics using the boundary ...
International audienceSolving the 3-D elastodynamic equations using traditional boundary element met...
We discuss how the Fast Multipole Method (FMM) applied to a boundary concentrated mesh can be used t...
The solution of the elastodynamic equations using integral formulations requires to solve full and n...
The solution of the elastodynamic equations using boundary element methods (BEMs) gives rise to full...
This paper presents a fast multipole boundary element method (FMBEM) for the 3-D elastodynamic bound...
A linear strength, Galerkin Boundary Element Meth-od (BEM) for the solution of the three dimensional...
This paper deals with the efficient 3D multidomain boundary element method (BEM) for solving a Poiss...
International audienceThe Boundary Element Method (BEM) has been an effective method for modelling a...
The Laplace and Helmholtz equations are two of the most important partial differential equations (PD...
International audienceThe solution of the elastodynamic equations using boundary element methods (BE...
We present a large variety of applications of the Boundary Element Method exploiting a Multipole for...
A fast multipole boundary element method (FM-BEM) for solving large-scale potential problems ruled b...
The renewed interest in the finite-element and boundary-integral (FE-BI) method originated from the ...
This article summarizes the development of a fast boundary element method for the linear Poisson-Bol...
To reduce computational complexity and memory requirement for 3-D elastodynamics using the boundary ...
International audienceSolving the 3-D elastodynamic equations using traditional boundary element met...