The Bipolar Quantum Drift-diffusion Model 被引量：5

The Bipolar Quantum Drift-diffusion Model

导出

摘要 A fourth order parabolic system, the bipolar quantum drift-diffusion model in semiconductor simulation, with physically motivated Dirichlet-Neumann boundary condition is studied in this paper. By semidiscretization in time and compactness argument, the global existence and semiclassical limit are obtained, in which semiclassieal limit describes the relation between quantum and classical drift-diffusion models, Furthermore, in the case of constant doping, we prove the weak solution exponentially approaches its constant steady state as time increases to infinity. A fourth order parabolic system, the bipolar quantum drift-diffusion model in semiconductor simulation, with physically motivated Dirichlet-Neumann boundary condition is studied in this paper. By semidiscretization in time and compactness argument, the global existence and semiclassical limit are obtained, in which semiclassieal limit describes the relation between quantum and classical drift-diffusion models, Furthermore, in the case of constant doping, we prove the weak solution exponentially approaches its constant steady state as time increases to infinity.

作者 Xiu Qing CHEN Li CHEN

机构地区 School of Sciences Department of Mathematical Sciences

出处《Acta Mathematica Sinica,English Series》 SCIE CSCD 2009年第4期617-638,共22页 数学学报（英文版）

基金 Supported by the Natural Science Foundation of China （No. 10571101, No. 10626030 and No. 10871112）

关键词 quantum drift-diffusion fourth order parabolic system weak solution semiclassical limit exponential decay quantum drift-diffusion, fourth order parabolic system, weak solution, semiclassical limit,exponential decay

分类号 O413 [理学—理论物理] TN6 [理学—物理]

引文网络
相关文献

参考文献4

1Li CHEN,Hui Zhao LIU.Generalized Solution of a Kind of Nonparametric Curvature Evolution with Boundary Condition[J].Acta Mathematica Sinica,English Series,2006,22(2):455-468. 被引量：1
2Li CHEN,Qiangchang JU.The Semiclassical Limit in the Quantum Drift-Diffusion Equations with Isentropic Pressure[J].Chinese Annals of Mathematics,Series B,2008,29(4):369-384. 被引量：6
3Xiuqing CHEN,Li CHEN,Huaiyu JIAN.The Existence and Long-Time Behavior of Weak Solution to Bipolar Quantum Drift-Diffusion Model[J].Chinese Annals of Mathematics,Series B,2007,28(6):651-664. 被引量：7
4Ling HSIAO,Fu Cai LI,Shu WANG.Convergence of the Vlasov-Poisson-Boltzmann System to the Incompressible Euler Equations[J].Acta Mathematica Sinica,English Series,2007,23(4):761-768. 被引量：2

二级参考文献54

1JIANHUAIYU,LIUQINGHUA,CHENXIUQING.CONVEXITY AND SYMMETRY OF TRANSLATING SOLITONS IN MEAN CURVATURE FLOWS[J].Chinese Annals of Mathematics,Series B,2005,26(3):413-422. 被引量：5
2Tatsien LI.Blow-up Mechanism of Classical Solutions to Quasilinear Hyperbolic Systems in the Critical Case[J].Chinese Annals of Mathematics,Series B,2006,27(1):53-66. 被引量：1
3Xu-Jia WANG.Schauder Estimates for Elliptic and Parabolic Equations[J].Chinese Annals of Mathematics,Series B,2006,27(6):637-642. 被引量：7
4Tatsien LI.Inverse Piston Problem for the System of One-Dimensional Isentropic Flow[J].Chinese Annals of Mathematics,Series B,2007,28(3):265-282. 被引量：5
5Aleksandrov, A. D.: Dirichlet's problem for the equation det‖Zij‖= Ф. Vestn. Leningr. Un-ta. Ser.Matematika, Mekhanika, Astronomiya, 1, 5-24 (1958). 被引量：1
6Tso, K.: On an Aleksandrov-Bakel'man type maximum principle for second order parabolic equation.Comm. in Partial. Diff. Eqs., 10, 543-553 (1985). 被引量：1
7Chen, L., Wang, G. L., Lian, S. Z.: Convex-monotone functions and generalized solution of parabolic Monge-Ampere equation. Journal Differential Equations, 186, 558-571, (2002). 被引量：1
8Wang, G. L., Liu, H. Z.; A new type of curvature flows with boundary condition. Chinese Journal of Contemporary Mathematics, 21, 273-282 (2000). 被引量：1
9Liu, H. Z., Wang, G.L.: Evolution of nonparametric surfaces with speed depending on the reciprocal of the Gauss Curvature. Acta Mathematica Sinica, Chinese Series, 45(1), 43-58 (2002). 被引量：1
10Huisken, G.: Nonparametric mean curvature evolution with boundarY condition. Journal Differential Equations, 77, 369-378 (1989). 被引量：1

共引文献8

1董建伟.双极量子漂移-扩散等熵模型的混合边界问题[J].应用数学,2010,23(1):101-107.
2陈丽,陈秀卿.Dirichlet-Neumann Problem for Unipolar Isentropic Quantum Drift-Diffusion Model[J].Tsinghua Science and Technology,2008,13(4):560-569.
3肖玲,栗付才,王术.Vlasov-Maxwell-Fokker-Planck方程组的极限问题[J].数学学报（中文版）,2009,52(4):677-690.
4Xiuqing CHEN,Li CHEN,Caiyun SUN.A Sixth-Order Parabolic System in Semiconductors[J].Chinese Annals of Mathematics,Series B,2011,32(2):265-278.
5董建伟,毛北行.一维双极量子漂移-扩散稳态模型的弱解（英文）[J].数学杂志,2015,35(3):530-538.
6董建伟,张又林,程少华.一维半导体量子能量输运模型稳态解的唯一性[J].数学杂志,2015,35(5):1245-1251.
7LIU Yannan,SUN Wenlong,LI Yeping.Existence of Global Attractor for the One-Dimensional Bipolar Quantum Drift-Diffusion Model[J].Wuhan University Journal of Natural Sciences,2017,22(4):277-282. 被引量：1
8LIU fang,LI Yeping.Asymptotic Behavior of Solutions of the Bipolar Quantum Drift-Diffusion Model in the Quarter Plane[J].Wuhan University Journal of Natural Sciences,2019,24(6):467-473.

同被引文献5

1Xiuqing CHEN,Li CHEN,Huaiyu JIAN.The Existence and Long-Time Behavior of Weak Solution to Bipolar Quantum Drift-Diffusion Model[J].Chinese Annals of Mathematics,Series B,2007,28(6):651-664. 被引量：7
2Li CHEN,Qiangchang JU.The Semiclassical Limit in the Quantum Drift-Diffusion Equations with Isentropic Pressure[J].Chinese Annals of Mathematics,Series B,2008,29(4):369-384. 被引量：6
3琚强昌,陈丽.SEMICLASSICAL LIMIT FOR BIPOLAR QUANTUM DRIFT-DIFFUSION MODEL[J].Acta Mathematica Scientia,2009,29(2):285-293. 被引量：4
4Jianwei DONG,Youlin ZHANG,Shaohua CHENG.Existence of Classical Solutions to a Stationary Simplified Quantum Energy-Transport Model in 1-Dimensional Space[J].Chinese Annals of Mathematics,Series B,2013,34(5):691-696. 被引量：9
5LIU Yannan,SUN Wenlong,LI Yeping.Existence of Global Attractor for the One-Dimensional Bipolar Quantum Drift-Diffusion Model[J].Wuhan University Journal of Natural Sciences,2017,22(4):277-282. 被引量：1

引证文献5

1董建伟,张又林.一个一维简化量子能量运输稳态模型分析(英文)[J].应用数学,2014,27(3):679-685.
2董建伟,毛北行.一维双极量子漂移-扩散稳态模型的弱解（英文）[J].数学杂志,2015,35(3):530-538.
3董建伟,张又林,程少华.一维半导体量子能量输运模型稳态解的唯一性[J].数学杂志,2015,35(5):1245-1251.
4LIU Yannan,SUN Wenlong,LI Yeping.Existence of Global Attractor for the One-Dimensional Bipolar Quantum Drift-Diffusion Model[J].Wuhan University Journal of Natural Sciences,2017,22(4):277-282. 被引量：1
5LIU fang,LI Yeping.Asymptotic Behavior of Solutions of the Bipolar Quantum Drift-Diffusion Model in the Quarter Plane[J].Wuhan University Journal of Natural Sciences,2019,24(6):467-473.

二级引证文献1

1LIU fang,LI Yeping.Asymptotic Behavior of Solutions of the Bipolar Quantum Drift-Diffusion Model in the Quarter Plane[J].Wuhan University Journal of Natural Sciences,2019,24(6):467-473.

1韩小森,赵彩霞,高勇,王术.半导体中拟中性漂移扩散模型的适定性(英文)[J].河南大学学报（自然科学版）,2004,34(1):7-13.
2Qiang Chang JU.The Semiclassical Limit in the Quantum Drift-Diffusion Model[J].Acta Mathematica Sinica,English Series,2009,25(2):253-264.
3琚强昌,陈丽.SEMICLASSICAL LIMIT FOR BIPOLAR QUANTUM DRIFT-DIFFUSION MODEL[J].Acta Mathematica Scientia,2009,29(2):285-293. 被引量：4
4邱建龙,任庆军,王成永.一类半导体方程稳态问题的存在性[J].曲阜师范大学学报（自然科学版）,2003,29(3):25-29.
5Xiuqing CHEN,Li CHEN,Caiyun SUN.A Sixth-Order Parabolic System in Semiconductors[J].Chinese Annals of Mathematics,Series B,2011,32(2):265-278.
6Gershon Wolansky.CONCENTRATION OF BLOCH EIGENSTATES IN THE PRESENCE OF GAUGE AT THE SEMI-CLASSICAL LIMIT[J].Acta Mathematica Scientia,2011,31(6):2278-2284.
7李勇,贡顶,宣春,夏洪富,谢海燕,王建国.器件效应数值模拟中漂移扩散模型的误差分析[J].强激光与粒子束,2014,26(6):233-238. 被引量：1
8CHEN Shou-xin HAN Xiao-sen.Asymptotic Behavior of Global Smooth Solution of 1-D Quasineutral Drift Diffusion Model for Semiconductors[J].Chinese Quarterly Journal of Mathematics,2006,21(3):385-396.
9张飞舟,王矫,顾雁.量子混沌系统本征态的统计非遍历性及其半经典极限[J].物理学报,1999,48(12):2169-2179. 被引量：2
10Tetsuya Ishiwata (Post Doctoral Fellow of High-Tech Research Center, Faculty of Science and Technology, Ryukoku University, SETA, OHTSU, 520-2194, Japan) Masayoshi Tsutsumi (Department of Applied Physics, Waseda University, Tokyo 169, Japan).SEMIDISCRETIZATION IN SPACE OF NONLINEAR DEGENERATE MRABOLIC EQUATIONS WITH BLOW-UP OF THE SOLUTIONS[J].Journal of Computational Mathematics,2000,18(6):571-586.

Acta Mathematica Sinica,English Series

2009年第4期

浏览历史

内容加载中请稍等...