Title :
Iterative solution techniques for hybrid finite-element spectral-element models
Author :
De Gersem, Herbert ; Clemens, Markus ; Weiland, Thomas
Author_Institution :
Dept. of Electr. Eng. & Inf. Technol., Tech. Univ. Darmstadt, Germany
fDate :
5/1/2003 12:00:00 AM
Abstract :
Hybrid finite-element (FE) spectral-element (SE) discretizations combine a FE model part represented by a system of equations with an SE model part solved by Fourier transform. Specialized iterative solution techniques are developed based on Schur complements, matrix-free techniques, fast Fourier transforms and domain-decomposition-type preconditioners. Numerical experiments, e.g., for a superconductive dipole magnet, indicate that hybrid FE-SE models equipped with these special solvers outperform their classical full FE counterparts.
Keywords :
fast Fourier transforms; finite element analysis; iterative methods; superconducting magnets; Schur complements; domain-decomposition-type preconditioners; fast Fourier transforms; hybrid finite-element spectral-element models; iterative solution techniques; matrix-free techniques; superconductive dipole magnet; Finite element methods; Geometry; Iron; Magnetic domains; Magnetostatics; Partial differential equations; Solid modeling; Superconducting magnets; Superconductivity; Vectors;
Journal_Title :
Magnetics, IEEE Transactions on
DOI :
10.1109/TMAG.2003.810544
