王明，男，1986年12月生，汉族，湖北监利人，副教授，硕士生导师，主要从事偏微分方程理论以及调和分析方面的研究.两次入选“地大****”.在J. European Mathematical Society，Journal de Mathématiques Pures et Appliquées, J. Differential Equations等杂志上发表论文20余篇。美国数学会Mathematical Reviews评论员，编号143807. Researchgate主页为
http://www.researchgate.net/profile/Ming_Wang20
担任Journal of Mathematical Analysis and Applications，Discrete and continuous dynamical systems - series b (dcds-b)，Applicable Analysis，Mathematische Nachrichten，Communications in Mathematical Sciences等SCI期刊的审稿人.
联系方式
Email:mwang@cug.edu.cn
QQ:
学习与工作经历
2004.9——2008.7华中科技大学，数学与统计学院，本科
2008.9——2013.7华中科技大学，数学与统计学院，博士
2013.7——2013.12讲师,中国地质大学(武汉)数理学院
2014.1——2016.12特任副教授,中国地质大学(武汉)数理学院
2017.1——至今副教授,中国地质大学(武汉)数理学院
科研项目(主持)
部分耗散KdV方程的动力学行为与定量唯一延拓性，**,国家自然科学基金青年基金，2018.1-2020.12
薛定谔方程的定量唯一延拓性，第12批中国博士后基金特别资助，2019.1-2020.12
KdV方程在解析函数空间中的动力学行为，4139Z34H,中国博士后基金一等资助，2018.1-2019.9
部分数据的电阻抗技术原理研究，2017CFB142,湖北省自然科学基金，2017.8-2019.8
全空间中临界Surface Quasi-geostrophic方程的全局吸引子及其分形维数，**,国家自然科学基金数学天元基金，2015.1-2015.12
无界域中弱耗散方程解的长时间行为研究,中央高校新青年启动基金，G,2014.1-2015.12
高阶薛定谔算子的相关问题研究，杰出人才培育基金，G, 2015.1-2016.12.

研究兴趣
目前感兴趣的领域为：
定量唯一延拓性
色散与耗散偏微分方程的适定性与不适定性
无穷维动力系统
高阶薛定谔算子的相关问题

发表论文(SCI)
[23]M.Wang,Q. Ma,J.Duan, Gevrey semigroup generated by ?(Λα?+?b??) in L^p(Rn), Journal of Mathematical Analysis and Applications, Available online 6 September 2019, 123480
[22] Jianhua Huang andMing Wang. New lower bounds on the radius of spatial analyticity for the KdV equation. Journal of Differential Equations 266.9 (2019): 5278--5317.
[21]Gengsheng Wang, Ming Wang,Can Zhang, Yubiao Zhang, Observable set, observability, interpolation inequality and spectral inequality for the heat equation in Rn. Journal de Mathématiques Pures et Appliquées, 126(2019)144--194.
[20]Ming Wang, and Jianhua Huang. Finite dimensionality of the global attractor for a fractional Schr?dinger equation on R. Applied Mathematics Letters 98 (2019): 432--437.
[19] S. Huang,M. Wang*, Q Zheng, Z. Duan. Lp estimates for fractional Schr?dinger operators with Kato class potentials. Journal of Differential Equations, 265 (2018) 4181–4212.
[18]M. Wang*, Z. Zhang. Sharp global well-posedness for the fractional BBM equation. Mathematical Methods in the Applied SciencesVolume 41, Issue15 October 2018Pages 5906-5918
[17]M. Wang*, A. Liu. Dynamics of the bbm equation with a distribution force in low regularity spaces. Topological Methods in Nonlinear Analysis, 51 (2018), 91–109. [16]G. Wang,M. Wang, Y. Zhang, Observability and unique continuation inequalities for the Schrodinger equation, Journal of the European Mathematical Society (JEMS), 21 (2019) 3513–3572.
[15]Y. Guo,M. Wang*, Regular attractor for damped KdV-Burgers equations on R，Mathematical Methods in the Applied Sciences，Volume 40, Issue 18 December 2017
Pages 7453–7469.
[14]M. Wang, J. Duan，Existence and regularity of a linear nonlocal Fokker–Planck equation with growing drift. Journal of Mathematical Analysis and Applications, 2017, 449(1): 228-243.
[13]M. Wang, Sharp global well-posedness of the BBM equation in L^p type Sobolev spaces, Discrete Continuous Dynamical Systems - Series A, Volume 36, Number 10, October 2016 pp. 5763—5788.
[12] S. Huang,M. Wang?, Q. Zheng, Quantitative uniqueness of some higher order elliptic equations,Journal of Mathematical Analysis and Applications444 (2016) 326—339.
[11]M. Wang, J. Duan,Smooth solution of a nonlocal Fokker–Planck equation associated with stochastic systems with Levy noise, Applied Mathematics Letters 58 (2016) 172–177.
[10]M. Wang, Long time behavior of a damped generalized BBM equation in low regularity spaces, Mathematical Methods in the Applied Sciences, 2015，38：4852-4866.
[9]Y. Guo,M. Wang, Y. Tang, Higher regularity of global attractor for a damped Benjamin–Bona–Mahony equation on R, Applicable Analysis: An International Journal, 2015，94(9)：1766-178.
[8]M. Wang, Global attractor for weakly damped gKdV equations in higher sobolev spaces, Discrete Continuous Dynamical Systems - Series A, Volume 35, Number 8, August 2015, 3799 -- 3825.
[7]Y. Guo，M. Wang，Y. Tang，Higher regularity of global attractors of a weakly dissipative fractional Korteweg de Vries equation，Journal of Mathematical Physics，2015，56（122702）
[6]M. Wang, Y. Tang, Long time dynamics of 2D quasi-geostrophic equations with damping in L^p, Journal of Mathematical Analysis and Applications, 412 (2014) 866 -- 877.
[5]M. Wang, Long time dynamics for damped Benjamin-Bona-Mahony Equation in low regularity spaces, Nonlinear Analysis Series A: Theory, Methods Applications, 105 (2014) 134 -- 144.
[4]M. Wang, Y. Tang, Attractors in H^2 and L^{2p-2} for reaction diffusion equations on unbounded domains, Communications on Pure and Applied Analysis, vol. 12 March (2013) 1111 -- 1121.
[3]M. Wang, Y. Tang, On dimension of the global attractor for 2D quasi-geostrophic equations, Nonlinear Analysis Series B: Real World Applications, 14 (2013) 1887 -- 1895.
[2]M. Wang*, D. Li, C. Zhang, Y. Tang, Long time behavior of solutions of gKdV equations, Journal of Mathematical Analysis and Applications, 390 (2012) 136 -- 150.
[1]W. Gu,M. Wang, D. Li, Stepsize Restrictions for Nonlinear Stability Properties of Neutral Delay Differential Equations, Hindawi Publishing Corporation Abstract and Applied Analysis，Volume 2014, Article ID 304071, 7 pageshttp://dx.doi.org/10.1155/2014/304071
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