Numerical electromagnetic frequency domain analysis with discrete exterior calculus
Abstract
In this paper, we perform a numerical analysis in frequency domain for various electromagnetic problems based on discrete exterior calculus (DEC) with an arbitrary 2-D triangular or 3-D tetrahedral mesh. We formulate the governing equations in terms of DEC for 3-D and 2-D inhomogeneous structures, and also show that the charge continuity relation is naturally satisfied. Then we introduce a general construction for signed dual volume to incorporate material information and take into account the case when circumcenters fall outside triangles or tetrahedrons, which may lead to negative dual volume without Delaunay triangulation. Then we examine the boundary terms induced by the dual mesh and provide a systematical treatment of various boundary conditions, including perfect magnetic conductor (PMC), perfect electric conductor (PEC), Dirichlet, periodic, and absorbing boundary conditions (ABC) within this method. An excellent agreement is achieved through the numerical calculation of several problems, including homogeneous waveguides, microstructured fibers, photonic crystals, scattering by a 2-D PEC, and resonant cavities.
- Publication:
-
Journal of Computational Physics
- Pub Date:
- December 2017
- DOI:
- 10.1016/j.jcp.2017.08.068
- arXiv:
- arXiv:1704.05145
- Bibcode:
- 2017JCoPh.350..668C
- Keywords:
-
- Maxwell's equations;
- Differential forms;
- Discrete exterior calculus;
- Arbitrary simplicial mesh;
- Circumcenter/Voronoi dual;
- Hodge star;
- Physics - Computational Physics
- E-Print:
- 41 pages with 19 figures. Briefly presented in IEEE APS 2016 meeting