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Dirichlet-Neumann Problem for Unipolar Isentropic Quantum Drift-Diffusion Model

Li CHEN( )Xiuqing CHEN
Department of Mathematical Sciences, Tsinghua University, Beijing 100084, China
School of Sciences, Beijing University of Posts and Telecommunications, Beijing 100876, China
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Abstract

This paper studies the existence, semiclassical limit, and long-time behavior of weak solutions to the unipolar isentropic quantum drift-diffusion model, a fourth order parabolic system. Semi-discretization in time and entropy estimates give the global existence and semiclassical limit of nonnegative weak solutions to the one-dimensional model with a nonnegative large initial value and a Dirichlet-Neumann boundary condition. Furthermore, the weak solutions are proven to exponentially approach constant steady state as time increases to infinity.

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Tsinghua Science and Technology
Pages 560-569

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Cite this article:
CHEN L, CHEN X. Dirichlet-Neumann Problem for Unipolar Isentropic Quantum Drift-Diffusion Model. Tsinghua Science and Technology, 2008, 13(4): 560-569. https://doi.org/10.1016/S1007-0214(08)70089-0

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Received: 15 June 2007
Published: 01 August 2008
© Tsinghua University Press 2008