AbstractWe consider efficient and robust adaptive multigrid and domain decomposition methods for the computation of electromagnetic fields in the low-frequency regime, i.e., for the quasistationary limit of Maxwell's equations based on curl-conforming edge element discretizations. Emphasis is on hybrid smoothing and nonmatching grids (mortar edge elements) as well as on adaptive grid refinement relying on residual type a posteriori error estimation. Numerical results are given to illustrate the performance of the multigrid solvers and the a posteriori error estimators. As a technologically relevant problem, we briefly address the computation of eddy currents in converter modules used as electric drives for high-power electromotors
AbstractQuasi-stationary magnetic field formulations are often coupled with lumped parameter models ...
Our focus is on Maxwell’s equations in the low frequency range; two specific ap-plications we aim at...
Abstract. We develop an adaptive edge finite element method based on reliable and efficient residual...
AbstractWe consider efficient and robust adaptive multigrid and domain decomposition methods for the...
For the efficient numerical solution of indefinite linear systems arising from curl conforming edge ...
This thesis is concerned with the application of adaptive mortar edge element methods to the numeric...
For the efficient numerical solution of indefinite linear systems arising from curl conforming edge ...
In this work we study finite element methods for two-dimensional Maxwell\u27s equations and their so...
We consider the convergence theory of adaptive multigrid methods for second-order elliptic problems ...
AbstractIn the edge vector finite element solution of the frequency domain Maxwell equations, the pr...
In this work, we present scalable balancing domain decomposition by constraints methods for linear s...
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 ...
The efficient computation of large eddy current problems with finite elements requires adaptive meth...
In the first part, an efficient and reliable a posteriori error estimate is derived for solving thre...
AbstractQuasi-stationary magnetic field formulations are often coupled with lumped parameter models ...
Our focus is on Maxwell’s equations in the low frequency range; two specific ap-plications we aim at...
Abstract. We develop an adaptive edge finite element method based on reliable and efficient residual...
AbstractWe consider efficient and robust adaptive multigrid and domain decomposition methods for the...
For the efficient numerical solution of indefinite linear systems arising from curl conforming edge ...
This thesis is concerned with the application of adaptive mortar edge element methods to the numeric...
For the efficient numerical solution of indefinite linear systems arising from curl conforming edge ...
In this work we study finite element methods for two-dimensional Maxwell\u27s equations and their so...
We consider the convergence theory of adaptive multigrid methods for second-order elliptic problems ...
AbstractIn the edge vector finite element solution of the frequency domain Maxwell equations, the pr...
In this work, we present scalable balancing domain decomposition by constraints methods for linear s...
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 ...
The efficient computation of large eddy current problems with finite elements requires adaptive meth...
In the first part, an efficient and reliable a posteriori error estimate is derived for solving thre...
AbstractQuasi-stationary magnetic field formulations are often coupled with lumped parameter models ...
Our focus is on Maxwell’s equations in the low frequency range; two specific ap-plications we aim at...
Abstract. We develop an adaptive edge finite element method based on reliable and efficient residual...