Abstract
In this article, we deal with the numerical approximation of a quantum drift-diffusion model capable of describing tunneling effects through the thin oxide barrier in nanoscale semiconductor devices. We propose a novel reformulation of the mathematical model that allows a natural generalization of the Gummel decoupled algorithm, widely adopted in the case of the drift-diffusion system. Then, we address the finite element discretization of the linearized problems obtained after decoupling, and we prove well-posedness and a discrete maximum principle for the solution of the continuity equations. Finally, we validate the physical accuracy and the numerical stability of the proposed algorithms on the simulation of a real-life nanoscale device.
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More From: Computer Methods in Applied Mechanics and Engineering
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