For the efficient numerical solution of indefinite linear systems arising from curl conforming edge element approximations of the time-harmonic Maxwell equation, we consider local multigrid methods (LMM) on adaptively refined meshes. The edge element discretization is done by the lowest order edge elements of Nédélec’s first family. The LMM features local hybrid Hiptmair smoothers of Jacobi and Gauss–Seidel type which are performed only on basis functions associated with newly created edges/nodal points or those edges/nodal points where the support of the corresponding basis function has changed during the refinement process. The adaptive mesh refinement is based on Dörfler marking for residual-type a posteriori error estimators and the new...
We present an algebraic analysis of two-level multigrid methods for the solution of linear systems a...
In the first part, an efficient and reliable a posteriori error estimate is derived for solving thre...
We present a local Fourier analysis of multigrid methods for the two-dimensional curl-curl formulati...
For the efficient numerical solution of indefinite linear systems arising from curl conforming edge ...
For the efficient numerical solution of indefinite linear systems arising from curl conforming edge ...
Abstract. We develop an adaptive edge finite element method based on reliable and efficient residual...
We consider local multigrid methods for adaptive finite element and adaptive edge element discretize...
A widely used approach for the computation of time-harmonic electromag-netic fields is based on the ...
We consider the convergence theory of adaptive multigrid methods for second-order elliptic problems ...
We consider the convergence theory of adaptive multigrid methods for second-order elliptic problems ...
We consider H(curl,Ω)-elliptic variational problems on bounded Lipschitz polyhe-dra and their finite...
AbstractWe consider efficient and robust adaptive multigrid and domain decomposition methods for the...
This thesis is concerned with the application of adaptive mortar edge element methods to the numeric...
In this paper a local Fourier analysis for multigrid methods on tetrahedral grids is presented. Diff...
We present a local Fourier analysis of multigrid methods for the two-dimensional curl-curl formulati...
We present an algebraic analysis of two-level multigrid methods for the solution of linear systems a...
In the first part, an efficient and reliable a posteriori error estimate is derived for solving thre...
We present a local Fourier analysis of multigrid methods for the two-dimensional curl-curl formulati...
For the efficient numerical solution of indefinite linear systems arising from curl conforming edge ...
For the efficient numerical solution of indefinite linear systems arising from curl conforming edge ...
Abstract. We develop an adaptive edge finite element method based on reliable and efficient residual...
We consider local multigrid methods for adaptive finite element and adaptive edge element discretize...
A widely used approach for the computation of time-harmonic electromag-netic fields is based on the ...
We consider the convergence theory of adaptive multigrid methods for second-order elliptic problems ...
We consider the convergence theory of adaptive multigrid methods for second-order elliptic problems ...
We consider H(curl,Ω)-elliptic variational problems on bounded Lipschitz polyhe-dra and their finite...
AbstractWe consider efficient and robust adaptive multigrid and domain decomposition methods for the...
This thesis is concerned with the application of adaptive mortar edge element methods to the numeric...
In this paper a local Fourier analysis for multigrid methods on tetrahedral grids is presented. Diff...
We present a local Fourier analysis of multigrid methods for the two-dimensional curl-curl formulati...
We present an algebraic analysis of two-level multigrid methods for the solution of linear systems a...
In the first part, an efficient and reliable a posteriori error estimate is derived for solving thre...
We present a local Fourier analysis of multigrid methods for the two-dimensional curl-curl formulati...