A finite-volume scheme for the multidimensional quantum drift-diffusion model for semiconductors

In this paper, we derive a coupled Schrödinger drift-diffusion self-consistent stationary model for quantum semiconductor device simulations. The device is decomposed into a quantum zone (where quantum effects are expected to be large) and a classical zone (where they are supposed negligible). The S

The limit of the vanishing Debye length (the charge neutral limit) in a nonlinear bipolar drift-diffusion model for semiconductors without a pn-junction (i.e., with a unipolar background charge) is studied. The quasi-neutral limit 1 Supported by the EU-funded TMR-network Asymptotic Methods in Kineti

A new nonconforming exponentially fitted finite element for a Galerkin approximation of convectiondiffusion equations with a dominating advective term is considered. The attention is here focused on the drift-diffusion current continuity equations in semiconductor device modeling. The scheme extends