Convergence of a relaxation approximation to a boundary value problem for conservation laws

Abstract
We propose a semilinear relaxation approximation to the unique entropy solutions of an initial boundary value problem for a scalar conservation law. Without any restriction on the initial--boundary data or on the flux function, we prove uniform a priori estimates and convergence of that approximation as the relaxation parameter tends to zero.
Anno
2001
Autori IAC
Tipo pubblicazione
Altri Autori
Natalini, R., Terracina, A.
Editore
Marcel Dekker]
Rivista
Communications in partial differential equations