Existence and Asymptotic Behavior of Multi-Dimensional Quantum Hydrodynamic Model for Semiconductors

## Abstract We establish the global existence of smooth solutions to the Cauchy problem for the multi‐dimensional hydrodynamic model for semiconductors, provided that the initial data are perturbations of a given stationary solutions, and prove that the resulting evolutionary solution converges asy

## 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

In this paper, we study the asymptotic behavior of the global smooth solutions to the initial boundary value problem for the hydrodynamic model for semiconductors with spherical symmetry. We prove that the solution to the problem converges to a stationary solution time asymptotically exponentially f