A coercive bilinear form for Maxwell's equations

We have constructed reliable finite difference methods for approximating the solution to Maxwell's equations using accurate discrete analogs of differential operators that satisfy the identities and theorems of vector and tensor calculus in discrete form. The numerical approximation does not have sp

## Abstract A new hybrid finite‐volume time‐domain integral equation (FVTD/IE) algorithm for the solution of Maxwell's Equations on unstructured meshes of arbitrary flat‐faceted volume elements is presented. A time‐domain IE‐based numerical algorithm is applied on the boundary of the computational

In this paper we consider the inverse backscattering problem for Maxwell's equations in a nonmagnetic inhomogeneous medium, i.e. the magnetic permeability is a fixed constant. We show that the electric permittivity is uniquely determined by the trace of the backscattering kernel S(s,! , ) for all s3

Exact nonreflecting boundary conditions are derived for the time dependent Maxwell equations in three space dimensions. These conditions hold on a spherical surface B, outside of which the medium is assumed to be homogeneous, isotropic, and source-free. They are local in time and nonlocal on B, and

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