Hybrid time domain solvers for the Maxwell equations in 2D

## Abstract A hybrid method for solution of Maxwell's equations of electromagnetics in the frequency domain is developed as a combination between the method of moments and the approximation in physical optics. The equations are discretized by a Galerkin method and solved by an iterative block Gauss

## Abstract We introduce a new preconditioning technique for iteratively solving linear systems arising from finite element discretization of the mixed formulation of the time‐harmonic Maxwell equations. The preconditioners are motivated by spectral equivalence properties of the discrete operators,

We consider a model explicit fourth-order staggered finite-difference method for the hyperbolic Maxwell's equations. Appropriate fourth-order accurate extrapolation and one-sided difference operators are derived in order to complete the scheme near metal boundaries and dielectric interfaces. An eige

The present paper shows that certain instabilities encountered with Nedelec-type "nite element implementations of the vector wave equation can be eliminated by a family of Lagrange multiplier methods. The considered approaches can be interpreted as coupled vector and scalar potential methods, includ

## Abstract The computational cost and memory requirements of classical marching‐on‐in‐time (MOT)‐based time‐domain integral‐equation (TDIE) solvers for analyzing scattering of electromagnetic waves from surfaces residing in lossy media scale as __O__(__N____N__) and __O__(__N____N__~__t__~), respe