朱敏 - 南京林业大学

个人简介

教育背景与工作（挂职）经历：教育经历 1.1998.9-2002.7 扬州大学学士 2.2002.9-2005.4 江苏大学硕士 3.2011.3-2014.2 东南大学博士工作经历 1.2005.4---至今南京林业大学工作 2.2016.7 美国得克萨斯州阿灵顿分校访问15天科研项目： 1.国家青年基金：高阶b-族方程研究；2015.1-2017.12，主持，22 万 2.江苏省教育厅项目：一类Camassa-Holm型方程柯西问题的研究；2013.8-2015.12，主持,3万 3.南京林业大学高学历人才基金：关于水波方程柯西问题的研究：2015.1-2017.12，主持,4万 4.南京林业大学高水平论文启动基金；2015.1-2017.12主持,2万 5.南京林业大学“青年拔尖人才”培养对象; 6.国家自然科学基金（面上项目）：可压缩Navier-Stokes方程的一些研究，2012.1-2015.12，参与,45万

研究领域

偏微分方程

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. Min Zhu, Yue Liu, Changzheng Qu, On the model of the compressible hyperelastic rods and Euler equations on the circle, J. Differential Equations, 254, 648-659, 2013. (SCI). 2. Guilong Gui, Yue Liu, Min Zhu, On the wave-breaking phenomena and global existence for the generalized periodic Camassa-Holm equation, Int. Math. Res. Not., 21, 4858-4903, 2011. (SCI). 3. Min Zhu, On the higher-order b-family equation and Euler equations on the circle, Discrete Contin. Dyn. Syst.-A, 34(7), 3013-3024, 2014. (SCI). 4. Min Zhu, Junxiang Xu, On the wave-breaking phenomena for the periodic two-component Dullin-Gottwald-Holm system, J. Math. Anal. Appl., 391, 415-428, 2012. (SCI) 5. Min Zhu, Junxiang Xu, Persistence properties for the two-component b-family system, Adv. Nonlinear Stud., 12, 409-425, 2012. (SCI) 6. Min Zhu , Junxiang Xu, On the Cauchy problem for the two-component b-family system, Math. Method Appl. Sci., 36, 2154-2173, 2013. (SCI) 7. Min Zhu, Junxiang Xu, On the wave-breaking phenomena and global existence for the periodic two-component b-family system, Electronic J. Differential Equations, 44, 1-27, 2013. (SCI) 8. Min Zhu, Notes on well-posedness for the b-family equation, Journal of Southeast University (English Edition), 2014, accepted.(EI) 9.Min Zhu, Shuanghu Zhang, On the blow-up solutions to the periodic modified integrable Camassa-Holm equation, Discrete and Continuous Dynamical Systems,36(4), 2347-2364,2016.(SCI) 10.Min Zhu, Shuanghu Zhang, Blow-up of solutions to the periodic modified Camassa-Holm equation with varying linear dispersion. Discrete and Continuous Dynamical Systems,36(12), 7235-7256,2016.(SCI) 11.Junxiang Xu, Wang Kun, Zhu Min, On the reducibility of 2-dimensional linear quasi-periodic systems with small parameters. PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY, 144(11), 4793-4805,2016.(SCI) 12.Ying Wang, Min Zhu, Blow-up phenomena and persistence property for the modified b-family of equations, J. Differential Equations, 262(2017), 1161-1191, 2017. (SCI). 13.Ying Wang, Min Zhu, Blow-up solutions for the modified b-family of equations. Nonlinear Analysis, 15(2017), 19-37, 2017. (SCI) 14.Ting Luo, Min Zhu, Dynamical stability of the train of smooth solitary waves to the generalized two-component Camassa-Holm system. Quarterly of Applied Mathematics, 2, 201-230, 2017.(SCI) 15.Min Zhu, Ying Wng, Blow-up of solutions to the periodic generalized modified Camassa-Holm equation with varying linear disperdion. Discrete and Continuous Dynamical Systems,37(1), 645-661,2017.(SCI) 16.Min Zhu, Ying Wang, Blow-up of solutions to the rotation b-family system modeling equatorial water waves. Electronic Journal of Di erential Equations, 78, 1-23, 2018.(SCI) 17.Ying Wang, Min Zhu, Blow-up issues for a two-component system modeling water waves with constant vorticity. Nonlinear Analysis, 172(2018), 163-179, 2018.(SCI)