On Absorbing Boundary Conditions for Linearized Euler Equations by a Perfectly Matched Layer

Recently, perfectly matched layer (PML) as an absorbing boundary condition has found widespread applications. The idea was first introduced by Berenger for electromagnetic waves computations. In this paper, it is shown that the PML equations for the linearized Euler equations support unstable soluti

The instability of an earlier perfectly matched layer (PML) formulation for the linearized Euler equations is investigated. It is found that, in the presence of a mean flow, there exist acoustic waves that have a positive group velocity but a negative phase velocity in the direction of the mean flow

We present a detailed analysis of a recently proposed perfectly matched layer (PML) method for the absorption of acoustic waves. The split set of equations is shown to be only weakly well-posed, and ill-posed under small low order perturbations. This analysis provides the explanation for the stabili

The terms on the right sides of (5) 1 and (5) 2 are mutually exclusive. Whereas A គ ( x គ , ) and ( x គ , ) are some fields that are not necessarily electromagnetic, the six scalars ␣ Ϯ (), and so on, are uniform in the respective regions and may be considered as constitutive scalars. A blind appli