Title :
The low-frequency performance of H-φ and T-Ω methods using edge elements for 3D eddy current problems
Author :
Webb, J.P. ; Forghani, B.
Author_Institution :
Dept. of Electr. Eng., McGill Univ., Montreal, Que., Canada
fDate :
11/1/1993 12:00:00 AM
Abstract :
Using edge elements, it is possible to solve directly for the vector magnetic field in the conducting material of a time-harmonic eddy-current problem, and for a magnetic scalar potential in the nonconducting regions. This is the H-φ method. Edge elements also allow the magnetic field, H, to be split into the gradient of a scalar potential, and another, rotational part. This is the T-Ω method. The H-φ and T-Ω methods provide the same answers. However, the matrix equation obtained from T-Ω is better conditioned at low frequencies, and can be solved more efficiently
Keywords :
boundary-elements methods; conjugate gradient methods; eddy currents; vectors; 3D eddy current problems; H-φ method; T-Ω methods; edge elements; incomplete Choleski conjugate gradient algorithm; low-frequency performance; magnetic scalar potential; matrix equation; time-harmonic eddy-current problem; vector magnetic field; Board of Directors; Conducting materials; Eddy currents; Equations; Frequency; Laboratories; Magnetic analysis; Magnetic fields; Performance analysis; Polynomials;
Journal_Title :
Magnetics, IEEE Transactions on
