A FINITE-ELEMENT METHOD FOR APPROXIMATING THE TIME-HARMONIC MAXWELL EQUATIONS

In this paper we study the use of Nedelec's curl conforming finite elements to approximate the time-harmonic Maxwell equations on a bounded domain. The analysis is complicated by the fact that the bilinear form is not coercive, and the principle part has a very large null-space. This difficulty is circumvented by using a discrete Helmholtz decomposition of the error vector. Numerical results are presented that compare two different linear elements.