Non-local radiation conditions for the time-dependent Maxwell equations

The paper deals with the time-dependent linear heat equation with a non-linear and non-local boundary condition that arises when considering the radiation balance. Solutions are considered to be functions with values in < : "+v3H( )" v3¸(R ),. As a consequence one has to work with non-standard Sobo

Asymptotic and exact local radiation boundary conditions (RBC) for the scalar time-dependent wave equation, ÿrst derived by Hagstrom and Hariharan, are reformulated as an auxiliary Cauchy problem for each radial harmonic on a spherical boundary. The reformulation is based on the hierarchy of local b

We describe a new, efficient approach to the imposition of exact nonreflecting boundary conditions for the scalar wave equation. We compare the performance of our approach with that of existing methods by coupling the boundary conditions to finite-difference schemes. Numerical experiments demonstrat

A few years ago, Costabel and Dauge proposed a variational setting, which allows one to solve numerically the timeharmonic Maxwell equations in 3D geometries with the help of a continuous approximation of the electromagnetic field. In this paper, we investigate how their framework can be adapted to

A modiÿed version of an exact Non-re ecting Boundary Condition (NRBC) ÿrst derived by Grote and Keller is implemented in a ÿnite element formulation for the scalar wave equation. The NRBC annihilate the ÿrst N wave harmonics on a spherical truncation boundary, and may be viewed as an extension of th