Multigrid methods for the computation of 3D electromagnetic field problems
ISSN: 0332-1649
Article publication date: 1 June 2001
Abstract
The focus of this paper is on the efficient numerical computation of 3D electromagnetic field problems by using the finite element (FE) and multigrid (MG) methods. The magnetic vector potential is used as the field variable and the discretization is performed by Lagrange (nodal) as well as Ne´de´lec (edge) finite elements. The resulting system of equations is solved by applying a preconditioned conjugate gradient (PCG) method with an adapted algebraic multigrid (AMG) as well as an appropriate geometric MG preconditioner.
Keywords
Citation
Kaltenbacher, M., Reitzinger, S., Schinnerl, M., Schöberl, J. and Landes, H. (2001), "Multigrid methods for the computation of 3D electromagnetic field problems", COMPEL - The international journal for computation and mathematics in electrical and electronic engineering, Vol. 20 No. 2, pp. 581-594. https://doi.org/10.1108/03321640110383915
Publisher
:MCB UP Ltd
Copyright © 2001, MCB UP Limited