Energy estimates for a one-dimensional hydrodynamic model of semiconductors

We present a hydrodynamic model for semiconductors, where the energy equation is replaced by a pressure-density relationship. We prove existence of smooth solutions and a uniqueness result in the subsonic case, which is characterized by a smallness assumption on the current flowing through the devi

Steady-state BV solutions to a one-dimensional hydrodynamic model for semiconductors are shown to exist as limits of viscous solutions as the viscosity vanishes. 1997 Academic Press ## 1. Introduction Recently the hydrodynamic model for semiconductors has received increasing attention. The model

The one-dimensional stationary full hydrodynamic model for semiconductor devices with non-isentropic pressure is studied. This model consists of the equations for the electron density, electron temperature, and electric field in a bounded domain supplemented with boundary conditions. The existence o

## Abstract We investigate a multi‐dimensional isentropic hydrodynamic (Euler–Poisson) model for semiconductors, where the energy equation is replaced by the pressure–density relation __p__(__n__) . We establish the global existence of smooth solutions for the Cauchy–Neumann problem with small pert