In this paper we report on a non-overlapping and an overlapping domain decom-position method as preconditioners for the boundary element approximation of an indefinite hypersingular integral equation on a surface. The equation arises from an integral reformulation of the Neumann screen problem with the Helmholtz equatio
AbstractWe describe a fully discrete method for the numerical solution of the hypersingular integral...
International audienceIn this paper, we develop in a general framework a non overlapping Domain Deco...
AbstractIn this paper we give an overview on the definition of finite element spaces for the h-, p-,...
International audienceWe introduce and analyze a Nitsche-based domain decomposition method for the s...
The article deals with the analysis of Additive Schwarz preconditioners for the h-version of the bou...
The limiting process that leads to the formulation of hypersingular boundary integral equations is f...
We extend the approach of Cai and Widlund (Domain decomposition algorithms for indefinite elliptic p...
We study two-level additive Schwarz preconditioners for the h-p version of the Galerkin boundary ele...
Additive Schwarz preconditioners are developed for the h-version of the boundary element method for ...
The limiting process that leads to the formulation of hypersingular boundary integral equations is f...
The need for hypersingular boundary integral equations in crack problems is motivated through acoust...
We present a preconditioning method for the linear systems arising from the boundary element discret...
summary:The problem of a solving a class of hypersingular integral equations over the boundary of a ...
The paper presents a Galerkin numerical method for solving the hyper-singular boundary integral equa...
This work is devoted to a convergence and performance study of finite-infinite element discretizatio...
AbstractWe describe a fully discrete method for the numerical solution of the hypersingular integral...
International audienceIn this paper, we develop in a general framework a non overlapping Domain Deco...
AbstractIn this paper we give an overview on the definition of finite element spaces for the h-, p-,...
International audienceWe introduce and analyze a Nitsche-based domain decomposition method for the s...
The article deals with the analysis of Additive Schwarz preconditioners for the h-version of the bou...
The limiting process that leads to the formulation of hypersingular boundary integral equations is f...
We extend the approach of Cai and Widlund (Domain decomposition algorithms for indefinite elliptic p...
We study two-level additive Schwarz preconditioners for the h-p version of the Galerkin boundary ele...
Additive Schwarz preconditioners are developed for the h-version of the boundary element method for ...
The limiting process that leads to the formulation of hypersingular boundary integral equations is f...
The need for hypersingular boundary integral equations in crack problems is motivated through acoust...
We present a preconditioning method for the linear systems arising from the boundary element discret...
summary:The problem of a solving a class of hypersingular integral equations over the boundary of a ...
The paper presents a Galerkin numerical method for solving the hyper-singular boundary integral equa...
This work is devoted to a convergence and performance study of finite-infinite element discretizatio...
AbstractWe describe a fully discrete method for the numerical solution of the hypersingular integral...
International audienceIn this paper, we develop in a general framework a non overlapping Domain Deco...
AbstractIn this paper we give an overview on the definition of finite element spaces for the h-, p-,...
DOI
Add to ORKG