The stationary solution of a one-dimensional bipolar quantum hydrodynamic model

Hu Jing; Li Yeping; Liao Jie

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The stationary solution of a one-dimensional bipolar quantum hydrodynamic model

机译：一维双极量子水动力模型的固定解

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摘要

In this paper, we consider the existence and uniqueness of stationary solution to the bipolar quantum hydrodynamic model in one dimensional space with general non constant doping profile. The existence of the stationary solution is proved by LeraySchauder fixed-point theorem and a crucial truncation technique is used to derive the positive upper and lower bounds of the stationary solution. The uniqueness of the stationary solution is shown by a delicate energy estimate. (c) 2020 Elsevier Inc. All rights reserved.

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《Journal of Mathematical Analysis and Applications》 |2021年第1期|共15页
作者
Hu Jing; Li Yeping; Liao Jie;
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作者单位

East China Univ Sci &

Technol Sch Sci Shanghai 200237 Peoples R China;

Nantong Univ Sch Sci Nantong 226019 Peoples R China;

East China Univ Sci &

Technol Sch Sci Shanghai 200237 Peoples R China;

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原文格式 PDF
正文语种 eng
中图分类数学分析;应用数学;
关键词
Bipolar quantum hydrodynamic model; Stationary solution; Existence; Uniqueness;

机译：双极量子水动力模型;固定式解决方案;存在;独特性;

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2. Transient and Stationary Simulations for a Quantum Hydrodynamic Model [J] . HU Xin, TANG Shao-Qiang 中国物理快报：英文版 . 2007,第006期
3. CONVERGENCE RATE OF SOLUTIONS TO STRONG CONTACT DISCONTINUITY FOR THE ONE-DIMENSIONAL COMPRESSIBLE RADIATION HYDRODYNAMICS MODEL [J] . Zhengzheng CHEN, Xiao juan CHAI, Wenjuan WANG 数学物理学报（英文版） . 2016,第001期
4. Existence and uniqueness of stationary solutions to a one-dimensional bipolar hydrodynamic model of semiconductors [J] . Tsuge N. Nonlinear Analysis: An International Multidisciplinary Journal . 2010,第3期

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The stationary solution of a one-dimensional bipolar quantum hydrodynamic model

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