Abstract
We investigate finite difference schemes which approximate 2 × 2 one-dimensional
linear dissipative hyperbolic systems. We show that it is possible to introduce some suitable modifications
in standard upwinding schemes, which keep into account the long-time behavior of the
solutions, to yield numerical approximations which are increasingly accurate for large times when
computing small perturbations of stable asymptotic states, respectively, around stationary solutions
and in the diffusion (Chapman-Enskog) limit.
Anno
2008
Autori IAC
Tipo pubblicazione
Altri Autori
AregbaDriollet D., Briani M., Natalini R.
Editore
The Society
Rivista
SIAM journal on numerical analysis (Print)