黎野平 - 华东理工大学

个人简介

教育经历： 1、1992.9—1996.6 湖北大学（理学学士学位）； 2、1998.9—2001.6 武汉大学（理学硕士学位）； 3、2002.1—2004.12 香港中文大学（哲学博士学位）。工作经历： 1、1997.7—1998.8 湖北科技学院（讲师）； 2、2005.1—2006.6 上海大学（副教授）； 3、2005.3—2006.12 复旦大学数学科学学院博士后流动站； 4、2007.1—2014.4上海师范大学（教授）； 5、2014.5— 华东理工大学（教授）。

研究领域

非线性偏微分方程理论及其应用、可压缩流体力学

近期论文

查看导师最新文章（温馨提示：请注意重名现象，建议点开原文通过作者单位确认）

[1].Yeping Li and Xiongfeng Yang, Stability of stationary solution for the compressible viscous magnetohydrodynamic equations with large potential force in bounded domain, J. Differential Equations, 262 (2017), 3169–3193. [2].Yeping Li, Vanishing viscosity and Debye-length limit to rarefaction wave with vacuum for the 1D bipolar Navier-Stokes-Poisson equation, Z.angew Math. Phys.，67(2016), 1-22. [3].Yeping Li and Zhen Luo, Zero-capillarity-viscosity limit to rarefaction waves for the one-dimensional compressible Navier-Stokes-Korteweg equations. Mathematical Methods in Applied Sciences, 39-18(2016), 5513-5528. [4].Haiyue Kong and Yeping Li, Relaxation limit of the one-dimensional bipolar Euler-Poisson system in the bound domain, Applied Mathematics and Computation, 274(2016), 1-13. [5].Yeping Li and Wenan Yong, Zero Mach number limit of the compressible Navier-Stokes-Korteweg equations, Comm. Math. Sci., 14(2016), 233-247. [6].Yeping Li and Wenan Yong, Quasi-neutral limit in a three-dimensional compressible Navier-Stokes-Poisson-Korteweg model, IMA Journal of Applied Mathematics, 80(2015), 712-727. [7].Yeping Li and Zhiming Zhou, Relaxation-time limit in the multi-dimensional bipolar nonisentropic Euler-Poisson systems, J. Differential Equations, 258 (2015) 3546–3566. [8].Yeping Li and Wenan Yong, Zero Mach number limit of compressible viscous magnetohydrodynamic equations, Chinese Annals of Mathematics, Series B, 36(2015), 1043-1054. [9].Yeping Li, Global existence and asymptotic behavior of the solutions to the 3D bipolar non-isentropic Euler-Poisson equation, Nonlinear Analysis-Modelling and Control, 20(2015), 305-330. [10].Zhiyuan Zhao and Yeping Li, Global existence and optimal decay rate of the compressible bipolar Navier-Stokes-Poisson equations with external force, Nonlinear Analysis: Real World Applications, 16(2014), 146-162. [11].Yeping Li, Global existence and large time behavior of solutions for the bipolar quantum hydrodynamic models in the quarter plane, Mathematical Methods in Applied Sciences, 36(2013), 1409-1422. [12].Yeping Li, Global existence and asymptotic behavior of smooth solutions to a bipolar Euler-Poisson equations in a bound domain, Z.angew Math. Phys.，64(2013), 1125-1144. [13].Yeping Li, Asymptotic behavior and quasineutral limit for the one-dimensional bipolar Euler-Poisson system with boundary effects, Chinese Annals of Mathematics, Series B, 34B(2013), 529-540. [14].Xuemin Zhang and Yeping Li, Zero-electron-mass limit and zero-relaxation-time limit in a multi-dimensional stationary bipolar Euler-Poisson system, Applied Mathematics and Computation, 219(2013), 5174-5184. [15].Zhiyuan Zhao and Yeping Li, Existence and optimal decay rate of the compressible non-isentropic Navier-Stokes-Poisson models with external force, Nonlinear Analysis: Theory, Methods & Applications, 75(2012), 6130-6147. [16].Yeping Li, Convergence of the compressible magnetohydrodynamic equations to incompressible magnetohydrodynamic equations, Journal of Differential Equations,252(2012), 2725-2738. [17].Yeping Li and Xiongfeng Yang, Global existence and asymptotic behavior of the solutions to the three dimensional bipolar Euler-Poisson systems, Journal of Differential Equations,252(2012), 768-791. [18].Yeping Li, Relaxation-time limit of the three-dimensional hydrodynamic model with boundary effects, Mathematical Methods in Applied Sciences, 34(2011), 1202-1210. [19].Yeping Li, Existence and some limit analysis of stationary solutions for a multi-dimensional bipolar Euler-Poisson system，Discrete and Continuous Dynamical System, B16(2011), 345-360. [20].Yeping Li and Ting Zhang, Relaxation-time limit of the multidimensional bipolar hydrodynamic model in Besov space, Journal of Differential Equations,251(2011), 3143-3162.