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ON THE UNIQUENESS OF THE SOLUTION TO THE DRIFTDIFFUSION MODEL IN SEMICONDUCTOR ANALYSIS

ON THE UNIQUENESS OF THE SOLUTION TO THE DRIFTDIFFUSION MODEL IN SEMICONDUCTOR ANALYSIS This paper is concerned with the analysis of global uniqueness of the solution to the driftdiffusion models, for stationary flow of charges carriers in semiconductor devices. Two uniqueness cases are found. Firstly, small applied voltages with a proof introducing new quasimonotony condition verified for solutions in W and not necessarily in H. Secondly, large applied voltage to the semiconductor with small 2D domain, and not large doping functions. These uniqueness cases allow the construction of algorithms that yield converging sequences of solutions. http://www.deepdyve.com/assets/images/DeepDyve-Logo-lg.png COMPEL: The International Journal for Computation and Mathematics in Electrical and Electronic Engineering Emerald Publishing

ON THE UNIQUENESS OF THE SOLUTION TO THE DRIFTDIFFUSION MODEL IN SEMICONDUCTOR ANALYSIS

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References (5)

Publisher
Emerald Publishing
Copyright
Copyright © Emerald Group Publishing Limited
ISSN
0332-1649
DOI
10.1108/eb010099
Publisher site
See Article on Publisher Site

Abstract

This paper is concerned with the analysis of global uniqueness of the solution to the driftdiffusion models, for stationary flow of charges carriers in semiconductor devices. Two uniqueness cases are found. Firstly, small applied voltages with a proof introducing new quasimonotony condition verified for solutions in W and not necessarily in H. Secondly, large applied voltage to the semiconductor with small 2D domain, and not large doping functions. These uniqueness cases allow the construction of algorithms that yield converging sequences of solutions.

Journal

COMPEL: The International Journal for Computation and Mathematics in Electrical and Electronic EngineeringEmerald Publishing

Published: Mar 1, 1992

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