王佳兵

	王佳兵   副教授、博士生导师
	Associate Professor Jia-Bing   Wang
	中国地质大学(武汉)数学与物理学院School of Mathematics and   Physics,China University of   Geosciences,Wuhan, Hubei 430074
王佳兵，男，1989年6月生，湖北巴东人。2018年6月博士毕业于兰州大学（与加拿大纽芬兰纪念大学联合培养）。现任中国地质大学数学与物理学院副教授、博士生导师，先后入选地大学者岗位青年优秀人才（2018）与青年拔尖人才（2022）。主要研究领域为微分方程与动力系统，尤其关注扩散系统的传播理论及应用。已在JNS、JDE、JDDE、DCDS、Proc. Roy. Soc. Edinburgh Sec. A、Proc. Amer. Math. Soc.、Stud.   Appl. Math.、Sci. China Math.等数学、应用数学领域SCI期刊发表学术论文30余篇，其中ESI高被引论文3篇、热点论文1篇。先后主持国家自然科学基金青年项目和面上项目，以及广东省自然科学基金面上项目。
办公室  Office	东区综合教学楼A座1108室
	A1108, Integrated Teaching building, East Campus
E-mail：	wangjb@cug.edu.cn，xbmwangjiabing@163.com
Homepage	https://www.researchgate.net/profile/Jia_Bing_Wang
研究兴趣Research Interests	（非局部）反应扩散方程（Nonlocal）Reaction-Diffusion Equations
	应用动力系统Applied Dynamical Systems
	数学生物学 Mathematical Biology

教育背景 Education

2016.09-2018.03	加拿大Memorial University of Newfoundland数学系-联合培养博士（国家留学基金委资助），导师：赵晓强教授
2014.09-2018.06	兰州大学-应用数学博士，获理学博士学位，导师：李万同教授
2011.09-2014.06	兰州大学-应用数学硕士（推荐免试），导师：李万同教授
2007.09-2011.06	西北民族大学，数学与应用数学专业本科，获理学学士学位

工作经历 Academic Experience

2018.07-	中国地质大学(武汉)数学与物理学院，特任副教授、副教授（2021.07-）、硕导、博导（2023.06-）
2021.01-	中国地质大学(武汉)数学科学中心，副教授
2023.06	访问香港理工大学应用数学系（合作导师：王治安教授）

主要学术任职  Academic Service

①	武汉工业与应用数学学会理事
②	美国《数学评论》（Mathematical Reviews）评论员
③	德国《数学文摘》（zbMATH）评论员
④	教育部学位与研究生教育发展中心学位论文评审专家
⑤	湖北省、江西省科技项目评审专家
⑥	Nonlinearity、JDDE、DCDS-A/B、PAMS、NA-RWA、JMAA、AML等SCI期刊审稿人

主要奖励和荣誉 Honors & Awards

1)      2023年5月，指导研究生朱静蕾获评第三届“数理先锋”年度人物---学术科研类

2)      2023年4月，指导研究生朱静蕾荣获2022年度湖北省工业与应用数学学会优秀研究生论文奖

3)      2022 年 12 月入选“地大学者”岗位青年拔尖人才

4)      2022年度教师年终考核评优校级优秀

5)      2021年度数理学院科研及学科建设先进个人

6)      2020年度数理学院党员民主评议评优活动中获评“优秀党员”

7)      2020年度中国地质大学“校级优秀班主任”

8)      2018年7月入选“地大学者”岗位青年优秀人才

9)      2016年获博士研究生国家奖学金

10)   2016年获兰州大学“三好研究生”荣誉称号

11)   2014年获兰州大学“优秀毕业生”荣誉称号

科研课题 Funded Research Projects

1. 主持国家自然科学基金面上项目（National Natural Science Foundation of China），12271494，非局部扩散方程在非均匀介质中的传播现象及应用研究（Propagation phenomena and applications of nonlocal dispersal equations in heterogeneous media），2023/01-2026/12.

2. 主持广东省基础与应用基础研究基金自然科学基金面上项目（Guangdong Basic and Applied Basic Research Foundation），带自由边界的非局部扩散模型在移动介质中的传播动力学（Propagation dynamics of nonlocal diffusion models with free boundaries in shifting environments），2023/01-2025/12.

3. 主持国家自然科学基金青年项目（National Natural Science Foundation of China），11901543，移动环境下非局部扩散模型的时空传播（Spatiotemporal propagation of nonlocal dispersal models in shifting environments），2020/01-2022/12.

4. 主持中国地质大学（武汉）数学特区优秀青年人才计划培育项目, 2021/01-2022/12.

5. 中央高校基本科研业务费-ESI-数理学科团队（数学）主要成员，CUGSX01.

6. 主持兰州大学中央高校基金优秀研究生创新项目（the Fundamental Research Funds for the Central Universities, Lanzhou University），lzujbky-2016-226、周期媒介中退化非局部扩散系统的时空动力学（Spatiotemporal dynamics of degenerate nonlocal diffusion systems in periodic media），2016/01-2017/06.

主要学术论文  Academic Papers (*: Corresponding author 通讯作者)

1．Jun‐Feng Li(研究生), Jia-Bing Wang*, Spatial propagation of a lattice predation–competition system with one predator and two preys in shifting habitats, Stud. Appl. Math. (2023), DOI: 10.1111/sapm.12645.

2．Zhan-Ping Ma, Jia-Bing Wang*, Existence and Bifurcation of positive solutions to a class of predator-prey models with mutual interference among the predators, Proc. Amer. Math. Soc. (2023), DOI: 10.1090/proc/16696.

3．Shao-Xia Qiao, Wan-Tong Li*, Jia-Bing Wang, Propagation dynamics of nonlocal dispersal competition systems in time-periodic shifting habitats. J. Differential Equations 378 (2024), 399-459.

4．Yu-Xia Hao, Wan-Tong Li*, Jia-Bing Wang, Wen-Bing Xu, Entire solutions of Lotka-Volterra competition systems with nonlocal dispersal, Acta Mathematica Scientia, 2023, 43B(6): 2347-2376.

5．Lei Lu(研究生), Jia-Bing Wang*, Traveling waves of the SIR epidemic model with discrete diffusion and treatment. Appl. Math. Lett. 138 (2023), Paper No. 108515, 8 pp.

6．Lei Lu(研究生), Meihong Qiao, Jia-Bing Wang*, Epidemic waves in a discrete diffusive endemic model with treatment and external supplies. Commun. Nonlinear Sci. Numer. Simul. 120 (2023), Paper No. 107163, 30 pp.

7．Yu-Xia Hao, Wan-Tong Li*, Jia-Bing Wang, Propagation dynamics of nonlocal dispersal equations with bistable nonlinearity in spatially periodic media. Discrete Contin. Dyn. Syst. Ser. B 28 (2023), no. 7, 4040-4067.

8．Jia-Bing Wang*，Jing-Lei Zhu(研究生)，Propagation Phenomena for a Discrete Diffusive Predator-Prey Model in a Shifting Habitat. J. Dynam. Differential Equations (2022), Online. https://doi.org/10.1007/s10884-022-10223-5.

9．Fang-Di Dong, Wan-Tong Li*, Jia-Bing Wang, Propagation phenomena for a nonlocal dispersal Lotka- Volterra competition model in shifting habitats. J. Dynam. Differential Equations (2022), Online. https://doi.org/10.1007/s10884-021-10116-z.

10．Jing-Lei Zhu(研究生), Jia-Bing Wang*, Fang-Di Dong, Spatial propagation for the lattice competition system in moving habitats. Z. Angew. Math. Phys. 73 (2022), no. 3, Paper No. 92.

11．Jia-Bing Wang, Shao-Xia Qiao, Chufen Wu*，Wave phenomena in a compartmental epidemic model with nonlocal dispersal and relapse. Discrete Contin. Dyn. Syst. Ser. B 27 (2022), no. 5, 2635-2660.

12．Jia-Bing Wang, Wan-Tong Li*, Fang-Di Dong, Shao-Xia Qiao, Recent developments on spatial propagation for diffusion equations in shifting environments. Discrete Contin. Dyn. Syst. Ser. B 27 (2022), no. 9, 5101-5127.

13．Shao-Xia Qiao, Wan-Tong Li, Jia-Bing Wang*，Multi-type forced waves in nonlocal dispersal KPP equations with shifting habitats. J. Math. Anal. Appl. 505 (2022), no. 2, Paper No. 125504.

14．Shao-Xia Qiao, Wan-Tong Li*, Jia-Bing Wang, Asymptotic propagations of a nonlocal dispersal population model with shifting habitats. European J. Appl. Math. 33 (2022), no. 4, 701-728.

15．Yu-Xia Hao, Wan-Tong Li*, Jia-Bing Wang, Propagation dynamics of Lotka-Volterra competition systems with asymmetric dispersal in periodic habitats. J. Differential Equations 300 (2021), 185-225.

16．Guofeng He(研究生), Jia-Bing Wang, Gang Huang*, Wave propagation of a diffusive epidemic model with latency and vaccination. Appl. Anal. 100 (2021), no. 9, 1972-1995.

17．Guofeng He(研究生), Jia-Bing Wang, Gang Huang*，Threshold Dynamics of an Epidemic Model with Latency and Vaccination in a Heterogeneous Habitat. Journal of Nonlinear Modeling and Analysis (2020), Volume 2, Number 3, 393-410.

18．Shao-Xia Qiao，Jing-Lei Zhu(研究生), Jia-Bing Wang*, Asymptotic behaviors of forced waves for the lattice Lotka-Volterra competition system with shifting habitats. Appl. Math. Lett. 118 (2021), 107168.

19．Jia-Bing Wang, Jie Wang*, Jia-Feng Cao, Blowup and global existence of a free boundary problem with weak spatial source. Appl. Anal. 100 (2021), no. 5, 964-974.

20．Jia-Bing Wang *, Chufen Wu, Forced waves and gap formations for a Lotka-Volterra competition model with nonlocal dispersal and shifting habitats. Nonlinear Anal. Real World Appl. 58 (2021), 103208, 19 pp. （ESI高被引论文、热点论文）

21．Jia-Bing Wang, Wan-Tong Li*, Wave propagation for a cooperative model with nonlocal dispersal under worsening habitats. Z. Angew. Math. Phys. 71 (2020), no. 5, Paper No. 147, 19 pp.

22．Fei-Ying Yang, Wan-Tong Li*, Jia-Bing Wang, Wave propagation for a class of non-local dispersal non-cooperative systems. Proc. Roy. Soc. Edinburgh Sect. A 150 (2020), no. 4, 1965-1997.

23．Wan-Tong Li, Jia-Bing Wang*, Xiao-Qiang Zhao, Propagation dynamics in a time periodic nonlocal dispersal model with stage structure. J. Dynam. Differential Equations 32 (2020), no. 2, 1027-1064.

24．Jia-Bing Wang , Wan-Tong Li*, Pulsating waves and entire solutions for a spatially periodic nonlocal dispersal system with a quiescent stage. Sci. China Math. 62 (2019), no. 12, 2505-2526.

25．Jia-Bing Wang, Xiao-Qiang Zhao*, Uniqueness and global stability of forced waves in a shifting environment. Proc. Amer. Math. Soc. 147 (2019), no. 4, 1467–1481. （ESI高被引论文）

26．Fang-Di Dong, Wan-Tong Li*, Jia-Bing Wang, Propagation dynamics in a three-species competition model with nonlocal anisotropic dispersal. Nonlinear Anal. Real World Appl. 48 (2019), 232-266.

27．Li-Jun Du, Wan-Tong Li*, Jia-Bing Wang, Asymptotic behavior of traveling fronts and entire solutions for a periodic bistable competition-diffusion system. J. Differential Equations 265 (2018), no. 12, 6210-6250.

28．Jia-Bing Wang, Wan-Tong Li*, Jian-Wen Sun, Global dynamics and spreading speeds for a partially degenerate system with non-local dispersal in periodic habitats. Proc. Roy. Soc. Edinburgh Sect. A 148 (2018), no. 4, 849-880.

29．Wan-Tong Li, Jia-Bing Wang*, Xiao-Qiang Zhao, Spatial dynamics of a nonlocal dispersal population model in a shifting environment. J. Nonlinear Sci. 28 (2018), no. 4, 1189–1219. （ESI高被引论文）

30．Fang-Di Dong, Wan-Tong Li*, Jia-Bing Wang, Asymptotic behavior of traveling waves for a three-component system with nonlocal dispersal and its application. Discrete Contin. Dyn. Syst. 37 (2017), no. 12, 6291-6318.

31．Li-Jun Du, Wan-Tong Li*, Jia-Bing Wang, Invasion entire solutions in a time periodic Lotka-Volterra competition system with diffusion. Math. Biosci. Eng. 14 (2017), no. 5-6, 1187-1213.

32．Wan-Tong Li*, Jia-Bing Wang, Li Zhang, Entire solutions of nonlocal dispersal equations with monostable nonlinearity in space periodic habitats. J. Differential Equations 261 (2016), no. 4, 2472-2501.

33．Wei-Jie Sheng*, Jia-Bing Wang, Entire solutions of time periodic bistable reaction-advection-diffusion equations in infinite cylinders. J. Math. Phys. 56 (2015), no. 8, 081501.

34．Jia-Bing Wang, Wan-Tong Li*, Guo-Bao Zhang, Spatial dynamics of a nonlocal dispersal vector disease model with spatio-temporal delay. Electron. J. Differential Equations 2015, No. 122, 28 pp.

35．Jia-Bing Wang, Wan-Tong Li*, Fei-Ying Yang，Traveling waves in a nonlocal dispersal SIR model with nonlocal delayed transmission. Commun. Nonlinear Sci. Numer. Simul. 27 (2015), no. 1-3, 136-152.

主要讲授课程  Teaching

[1] 主讲过的本科生课程(Undergraduate courses)：

《数学物理方程(Mathematical Physical Equations)》、

《复变函数与积分变换(Complex Function and Integral Transformation)》、

《高等数学(Advanced Mathematics)》、

《线性代数(Linear Algebra)》、

《概率论与数理统计(Probability and Mathematical Statistics)》

[2] 主讲过的研究生课程(Graduate courses)：

     《数学物理方程(Mathematical Physical Equations)》

     《偏微分方程基本理论(Basic theory of partial differential equations)》