Error analysis of numerical schemes for the wave equation in heterogeneous media

We consider the time dependent Maxwell's equations in dispersive media in a bounded three-dimensional (3-D) domain. Fully discrete mixed finite element methods are developed for three most popular dispersive media models: i.e., the isotropic cold plasma, the one-pole Debye medium and the two-pole Lo

## Abstract In the last decade or so finite element techniques have been applied with increased frequency to contaminant transport problems. Whereas most of the attention has focused on finite element approximations of spatial derivatives, standard finite difference techniques are generally used fo

This work presents the analysis of the numerical dispersion properties of a finite element method used to approximate the solution of the equations of motion for a fluid saturated porous elastic solid (a Biot medium) in the two-dimensional case and the low frequency regime. The finite element method

A fundamental solution is derived for time harmonic elastic waves originating from a point source and propagating in a restricted class of three-dimensional, unbounded heterogeneous media which have a Poisson ratio of 0•25 and elastic moduli that vary quadratically with respect to the depth co-ordin

A discontinuous Galerkin method for the numerical approximation of time-dependent Maxwell equations in three different dispersive media is introduced. Both the L 2 -stability and error estimate of the DG method are discussed in detail. We show that the proposed method has an accuracy of Oðh kþ 1 2 Þ

## Abstract Several finite element schemes for analysis of seepage in porous elastic media, based on different spatial and temporal discretization, were implemented in computer programs. Their numerical performance is evaluated by comparison with the exact solution for Terzaghi's problem of one‐dim