This is a version of my thesis with some small corrections, and typeset differently fro
Abstract. We analyse the spectral bounds of nonoverlapping domain decomposition precondi-tioners for...
In this article we address the question of efficiently solving the algebraic linear system of equati...
In DD (domain decomposition) methods, the main contribution to the computa-tional work is due to the...
We propose and analyze several block iteration preconditioners for the solution of elliptic problems...
International audienceIn this article, we consider the derivation of hp–optimal spectral bounds for ...
Domain decomposition preconditioners fur high-order Galerkin methods in two dimensions are often bui...
AbstractIn this paper we propose preconditioners for spectral element methods for elliptic and parab...
The numerical solution of high-frequency Helmholtz problems by discretization methods such as the fi...
Two of the most recent and important nonoverlapping domain decomposition methods, the BDDC method (B...
Several old and new finite-element preconditioners for nodal-based spectral discretizations of -Delt...
For smooth problems spectral element methods (SEM) exhibit exponential convergence and have been ver...
Two domain decomposition methods for solving vector field problems posed in H(curl) and discretized ...
Locally adapted meshes and polynomial degrees can greatly improve spectral element accuracy and appl...
It is well known that elliptic problems when posed on non-smooth domains, develop singularities. We ...
We shall establish a discrete weighted Helmholtz decomposition in edge element spaces, which is stab...
Abstract. We analyse the spectral bounds of nonoverlapping domain decomposition precondi-tioners for...
In this article we address the question of efficiently solving the algebraic linear system of equati...
In DD (domain decomposition) methods, the main contribution to the computa-tional work is due to the...
We propose and analyze several block iteration preconditioners for the solution of elliptic problems...
International audienceIn this article, we consider the derivation of hp–optimal spectral bounds for ...
Domain decomposition preconditioners fur high-order Galerkin methods in two dimensions are often bui...
AbstractIn this paper we propose preconditioners for spectral element methods for elliptic and parab...
The numerical solution of high-frequency Helmholtz problems by discretization methods such as the fi...
Two of the most recent and important nonoverlapping domain decomposition methods, the BDDC method (B...
Several old and new finite-element preconditioners for nodal-based spectral discretizations of -Delt...
For smooth problems spectral element methods (SEM) exhibit exponential convergence and have been ver...
Two domain decomposition methods for solving vector field problems posed in H(curl) and discretized ...
Locally adapted meshes and polynomial degrees can greatly improve spectral element accuracy and appl...
It is well known that elliptic problems when posed on non-smooth domains, develop singularities. We ...
We shall establish a discrete weighted Helmholtz decomposition in edge element spaces, which is stab...
Abstract. We analyse the spectral bounds of nonoverlapping domain decomposition precondi-tioners for...
In this article we address the question of efficiently solving the algebraic linear system of equati...
In DD (domain decomposition) methods, the main contribution to the computa-tional work is due to the...