Well Posed Constraint-Preserving Boundary Conditions for the Linearized Einstein Equations

Numerical simulation of two-dimensional incompressible viscous ¯ows around an obstacle is considered. Two horizontal straight line arti®cial boundaries are introduced and the original ¯ow is approximated by a ¯ow in an in®nite channel with slip boundary condition on the wall. Then two vertical segme

The compressible Navier-Stokes equations belong to the class of incompletely parabolic systems. The general method developed by Laurence Halpern for deriving artificial boundary conditions for incompletely parabolic perturbations of hyperbolic systems is applied to the linearized compressible Navier

In the first part of this paper (J. Comput. Phys. 137, 1, 1997), continuous artificial boundary conditions for the linearized compressible Navier-Stokes equations were proposed which were valid for small viscosities, high time frequencies, and long space wavelengths. In the present work, a new hiera