研究方向：微分几何

个人简介：

女，河南南阳人。理学博士，副教授，硕士研究生导师，美国《数学评论》评论员。2002年获得郑州大学系统科学与数学系理学学士学位，2005年获得郑州大学数学系微分几何方向理学硕士学位，2017年获得郑州大学数学与统计学院微分几何方向理学博士学位。2005年7月起在郑州大学数学与统计学院从事教学科研工作。

讲授课程：

解析几何、黎曼几何、线性代数、概率论与数理统计。

获奖情况：

获河南省自然科学优秀学术论文奖一等奖1次，二等奖1次，三等奖2次，河南省教育厅自然科学优秀科技论文奖一等奖2次。

科研成果：

一、项目

1.主持国家自然科学基金青年项目：黎曼子流形的分类及相关问题的研究，11801524,2019.01-2021.12.

2.作为主要成员参与完成国家自然科学基金 面上项目3项 (10671181，11071225，11371330)，青年项目1 项(11401537).

二、论文

1. Xing Cheng, Zhai Shujie*,  Minimal Legendrian submanifolds in Sasakian space forms with C-parallel second fundamental form,  Journal of Geometry and Physics, 187, 2023, 15 pp.

2. Zhai Shujie*, Zhang Heng,  Minimal Legendrian submanifolds of S^9 with nonnegative sectional curvature,  Turkish Journal of Mathematics, 46, 2022: 2854-2866.

3. Yin Bangchao, Zhai Shujie *,  Classification of Moebius minimal and Moebius isotropic hypersurfaces in S^5,  AIMS Mathematics, 6 (8), 2021: 8426–8452.

4. Li Dehe, Zhai Shujie*,  Real Hypersurfaces in Complex Grassmannians of Rank Two, Mathematics, 9, 2021, 3238, 13pp.

5. Hu Zejun, Zhai Shujie*,  Submanifolds with parallel Moebius second fundamental form in the unit sphere,  Results in Mathematics, 73, 2018, Paper No. 93, 46 pp.

6. Zhai Shujie*, Guo Xiuli, Hu Zejun,  Hypersurfaces in the unit sphere with parallel Moebius form and constant para-Blaschke eigenvalues,  Turkish Journal of Mathematics, 42, 2018:1180-1192.

7. Hu Zejun, Li Dehe, Zhai Shujie,  On generalized m-quasi-Einstein manifolds with constant Ricci curvatures,  Journal of Mathematical analysis and applications, 446, 2017: 843-851.

8. Zhai Shujie*, Hu Zejun, Wang Changping,  On submanifolds with parallel Moebius second fundamental form in the unit sphere, International Journal of Mathematics, 25, 2014:1450062.

9. Hu Zejun, Li Xingxiao, Zhai shujie, On the Blaschke isoparametric hypersurfaces in the unit sphere with three distinct Blaschke eigenvalues, Science China Mathematics, 54, 2011: 2171-2194.

10. Hu Zejun, Zhai Shujie, Moebius isoparametric hypersurfaces with three distinct principal curvatures, II, Pacific Journal of Mathematics, 249, 2011: 343-370.

11. Chu Yawei, Zhai Shujie, On spacelike hypersurfaces with constant scalar curvature in the anti-de Sitter space, Differential Geometry and its Applications, 29, 2011: 737–746.

12. Hu Zejun, Zhai Shujie, Classification of Moebius isoparametric hypersurfaces in S^6, Tohoku Mathematical Journal, 60, 2008: 499–526.

13. Hu Zejun, Mike Scherfner, Zhai Shujie, On spacelike hypersurfaces with constant scalar curvature in the de Sitter space, Differential Geometry and Its Applications, 25, 2007: 594–611.

14. Hu Zejun, Zhai Shujie,  Hypersurfaces of the hyperbolic space with constant scalar curvature，Results in Mathematics, 48, 2005: 65-88.

15. Hu Zejun, Zhai Shujie,  A Sphere Theorem for even-dimensional submanifolds of the unit sphere,  Journal of Zhengzhou University (理学版)，37, 2005:1-4.

教学成果：

1.2022年主持1项校级教改项目：《解析几何》课程教学的创新与实践 2022ZZUJG160;

2.2021年主持1项校级混合式一流课程（重点项目):《解析几何》2021ZZUKCLX008；

3.2020年5月获评校级本科教育线上教学优秀课程 《概率论与数理统计》;

4.发表教研论文2篇，参与省级精品课程项目《线性代数》1项，参与校级教改项目1项.