Abstract
The global existence of smooth solutions of the Cauchy
problem for the $N$-dimensional Euler-Poisson model for
semiconductors is established,
under the assumption
that the initial data is a perturbation of a stationary solution
of the drift-diffusion equations with zero electron velocity,
which is proved to be unique.
The resulting evolutionary solutions converge asymptotically in time to
the unperturbed state.
The singular relaxation limit is also discussed.
Anno
2003
Tipo pubblicazione
Altri Autori
Ali; G.
Editore
Society for Industrial and Applied Mathematics.
Rivista
SIAM journal on mathematical analysis (Print)
