Title :
A Discrete 2-D Formulation for 3-D Field Problems With Continuous Symmetry
Author :
Auchmann, Bernhard ; Flemisch, Brend ; Kurz, Stefan
Author_Institution :
CERN/TE, Geneva, Switzerland
Abstract :
In this paper, we describe a general formalism that allows to reduce the spatial dimension of a field problem from 3-D to (2 +1)-D. Subsequently, we identify conditions under which the third dimension can be eliminated. We see that the resulting 2-D field problems only decouple if an orthogonality criterion is fulfilled. The approach is based solely on differential-form calculus and can therefore be easily transferred into a discrete setting. As a numerical example, we compute the field of twisted wires.
Keywords :
differentiation; electromagnetism; magnetostatics; 3D field problems; continuous symmetry; differential form calculus; discrete 2D formulation; orthogonality criterion; spatial dimension; twisted wires; Calculus; Differential equations; Euclidean distance; Linear systems; Matrix decomposition; Tellurium; Time of arrival estimation; Wires; Continuous symmetries; dimensional reduction; discrete electromagnetism;
Journal_Title :
Magnetics, IEEE Transactions on
DOI :
10.1109/TMAG.2010.2045224
