基本信息
姓 名：陈慧斌
英文名：Huibin Chen
职 称：讲师
研究室：几何代数研究室
研究方向：Lie theory and differential geometry.Current projects: Einstein metrics, geodesic orbit metrics and Killing vector fields of constant length.
联系方式：chenhuibin@njnu.edu.cn
个人主页： 点击查看个人主页X 关闭窗口
Huibin Chen

Lecturer

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Research
Primary Research Area:
Geometry/Topology
Research Interests:
Lie groups, Riemannian geometry
Current Projects:
Einstein metrics, Geodesic orbit metrics, Killing vector fields of constant length

Contact Information
chenhuibin@njnu.edu.cn
636B Xingjian Building, Nanjing Normal University(Xianlin Campus)

Publications
[12] Huibin Chen, Zhiqi Chen, Fuhai Zhu, Geodesic orbit metrics on homogeneous spaces constructed by strongly isotropy irreducible spaces. Sci. China Math. to appear. [Download]


[11] Huibin Chen, Chao Chen, Zhiqi Chen, New Invariant Einstein-Randers Metrics on Stiefel ManifoldsV_{2p}?^n=SO(n)/SO(n?2p). Results Math, 76 (2021), no. 1, 19. [Download]


[10] Shaoxiang Zhang, Huibin Chen and Shaoqiang Deng, New non-naturally reductive Einstein metrics on Sp(n), Acta Math. Sci., to appear.

[9] Zhiqi Chen and Huibin Chen, Non-naturally Reductive Einstein metrics on Sp(n). Front. Math. China 15 (2020), no. 1, 47-55. [Download]

[8] Xiaosheng Li, Huibin Chen and Zhiqi Chen, Einstein-Randers metrics on compact simple Lie groups. Publ. Math. Debrecen, 97(2020), no.1-2, 149-160. [Download]

[7] Bo Zhang, Huibin Chen, Ju Tan, New non-naturally reductive Einstein metrics on SO(n). Internat. J. Math. 29 (2018), no. 11, **, 13 pp. [Download]

[6] Huibin Chen, Zhiqi Chen and Joseph A. Wolf, Geodesic orbit metrics on compact simple Lie groups arising from flag manifolds. C. R. Math. Acad. Sci. Paris 356 (2018), no. 8, 846–851. [Download]

[5] Zaili Yan, Huibin Chen and Shaoqiang Deng, Classi?cation of Invariant Einstein metrics on certain compact homogeneous spaces. Sci. China Math. 63(2020), no.4, 755-776. [Download]

[4] Huibin Chen, Zhiqi Chen and Shaoqiang Deng, Compact simple Lie groups admitting left-invariant Einstein metrics that are not geodesic orbit. C. R. Math. Acad. Sci. Paris 356 (2018), no. 1, 81–84. [Download]

[3] Huibin Chen, Zhiqi Chen and Shaoqiang Deng, Non-naturally reductive Einstein metrics on SO(n). Manuscripta Math. 156 (2018), no. 1-2, 127–136. [Download]

[2] Huibin Chen, Zhiqi Chen and Shaoqiang Deng, New non-naturally reductive Einstein metrics on exceptional simple Lie groups. J. Geom. Phys. 124 (2018), 268–285. [Download]

[1] Huibin Chen and Shaoqiang Deng, A class of fermionic Novikov superalgebras which is a class of Novikov superalgebras. Czechoslovak Math. J. 68(143) (2018), no. 4, 1159–1168. [Download]

Visiting Experience
1. 2017.10.14-2018.10.28 University of California, Berkeley, Joint training student, CA, USA
2.2019.3.17-2019.4.1 Shiing-shen Chern visiting scholar, Chern Institute of Mathematics, Tianjin, China

Conferences
1. 2019.7.14-2019.7.20, The 16th National Conference on Liealgebra, Qingdao, China, 25min talk.
2. 2019.7.21-2019.7.26, The 15th National Conference on Algebra, Nanning, China.
3. 2019.10.25-2019.10.28, Seminar on Lie theory and Finsler geometry, Tianjin, China, 45min talk.
4. 2019.11.28-2019.12.2, 8th Workshop on the Geometry and Topology ofsubmanifolds, Fuzhou, China.

Invited Talks
2019.12.13, University of Science and Technology of China, "Geodesic orbit metrics on semisimple compact homogeneous spaces", invited by Prof. Bin Xu.


Fundings
1. National Science Foundation for Young Scientist of China (Grant No. **).

2.Natural Science Research of Jiangsu Education Institutions of China (Grant No. 19KJB110015).

3. Starting research funds of Nanjing Normal University (Grant No.184080H202B196).
Teaching
2019-2020 firstsemester, Calculus C
Teaching materials:
Chapter 5: 5.1, 5.2, 5.3, 5.4, Refresher Course,
Chapter 6: 6.1 and 6.2, 6.2(2),

Homework answer: Week 11, Week 12, Week 13, Week 14, Week 15, Week 16


2019-2020 second semester, Calculus C
Teaching materials:
Chapter 7: 7.1-7.4, 7.4-7.5, 7.7;
Chapter 8: 8.1-8.3, 8.4(1), 8.4(2), 8.5, 8.6;
Chapter 9: 9.1, 9.1(2), 9.2(1), 9.2(2), 9.3, 9.4, 9.5, 9.6, 9.6(1), 9.8;
Chapter 10: 10.1-10.2, 10.2(2), 10.4;
Chapter 11: 11.1, 11.2, 11.3;
Chapter 12: 12.1, 12.2, 12.3, 12.4.

Homework answer: Week 1, Week 2, Week 3, Week 4, Week 5, Week 6, Week 7, Week 8&9, Week 10&11, Week 12, Week 13, Week 14.


2020-2021 first semester, Analytic Geometry
Teaching materials:
Chapter 1: 1.1-1.4, 1.5, Summary (1), 1.6-1.8, 1.9, 1.10, Summary (2);
Chapter 2: 2.1-2.2, 2.3;
Chapter 3: 3.1, 3.2-3.3, 3.4, 3.5-3.7，3.8，Summary(3)；
Chapter 4: 4.1，4.2，4.3，4.4，4.5-4.6，4.7；
Chapter 5: 5.1，5.2，Summary(4)，Exercises.