Homogenization of a diffusion equation with drift

In this paper, we continue our study on the asymptotic behavior of the drift-diffusion model for semiconductor devices. We assume the mobilities are constants, and show in this case the dynamical system has a compact, connected, maximal attractor that attracts sets that are bounded in terms of the \

A one-dimensiorzt drift-diffasion mechai-fi~,,m combined with special boundary conditions is investigated. Thi~ mechanism may be used to de~:ribe the b\_'haviour of mobile ions with surface trapping. The problem is solved numerically wi.th an inte-gr~differential equation and with a double integral

We consider a linear system with Markovian switching which is perturbed by Gaussian type noise. If the linear system is mean square stable then we show that under certain conditions the perturbed system is also stable. We also show that under certain conditions the linear system with Markovian switc

A simple model with a local particle drift is proposed to extend the diffusion-limited aggregation model. Here the attractive or the repulsive interaction between a flight particle and the aggregation cluster is taken into account. In our model the drift force depends on the local aggregation struct