Geometric structures approximated by Maxwell's equations

Maxwell's equations for structures with arbitrary point symmetry groups are considered. It is shown that an initial boundary value problem for Maxwell's equations in a domain can be reduced to ∼N independent problems in a 1/N part of the initial domain, where N is the order of the symmetry group of

## Abstract Consider a time–harmonic electromagnetic plane wave incident on a biperiodic structure in ℝ^3^. The periodic structure separates two homogeneous regions. The medium inside the structure is chiral and heterogeneous. In general, wave propagation in the chiral medium is governed by Maxwell

We study superconvergence of edge finite element approximations to the magnetostatic problem and to the time-dependent Maxwell system. We show that in special discrete norms there is an increase of one power in the order of convergence of the finite element method compared to error estimates in stan