教师姓名：李同柱
出生日期：
所在学科：微分几何
职称：教授/博士生导师 邮编：
联系电话：
E-mail：litz@bit.edu.cn
通讯地址：北京理工大学数学与统计学院

Educational Background 2005年6月北京大学数学科学学院获博士学位。

Working Experience 2005,07--2012,07 北京理工大学数学与统计学院 讲师.
2007,09--2009,06，首都师范大学数学系做博士后研究工作。
2008,03--2008,03 日本 佐贺大学 访问.
2012,07--2018,07 北京理工大学数学与统计学院 副教授.
2014,03--2015,03 美国 加州大学圣克鲁兹分校 访问研究员.
2018,07--至今 北京理工大学数学与统计学院 教授.

Teachings 解析几何,高等代数,微分几何,Riemann几何等课程

Publications [1], Ji Xiu, Li Tongzhu*, " A note on compact Moebius homogeneous submanifolds in S^{n+1}", To appear in Bulletin of the Korean mathematical Society.
[2], Ji Xiu, Li Tongzhu*, Sun Huafei, "Spacelike hypersurfaces with constant conformal sectional curvature in R^{n+1}_1", To appear in Pacific Journal of Mathematics.
[3], Ji Xiu, Li Tongzhu*, Sun Huafei, "Para-Blaschke isoparametric spacelike hypersurfaces in Lorentzian space forms", To appear in Houston Journal of Mathematics.
[4], Lin Limiao, Li Tongzhu*, Wang Changping, "A Moebius Scalar curvature rigidity on compact conformally flat hypersurfaces in S^{n+1}", Journal of Mathematical Analysis and Applications, Vol.466,(2018)762--775.
[5], Li Tongzhu*, Nie Changxiong, " Spacelike Dupin hypersurfaces in Lorentzian space forms", Journal of the Mathematical Society of Japan, Vol.70,(2018)463--480.
[6], Xie Zhenxiao, Li Tongzhu, Ma Xiang*, Wang Changping, "Wintgen ideal submanifolds: reduction theorems and a coarse classification", Annals of Global Analysis and Geometry, Vol.53, (2018)377--403.
[7], Li Tongzhu, "Moebius homogeneous hypersurfaces with three distinct principal curvatures in S^{n+1}", Chinese Annals of Mathematics, Series B, Vol.38, (2017)1131--1144.
[8], Li Tongzhu*, Qing Jie, Wang Changping, "Moebius curvature, Laguerre curvature and Dupin hypersurface", Advances in Mathematics, Vol.311, (2017)249--294.
[9], Li Tongzhu, Ma Xiang*, Wang Changping, Xie Zhenxiao, "Wintgen ideal submanifolds of codimension two, complex curves, and Moebius geometry", Tohoku Mathematical Journal, Vol.68,(2016)621--638.
[10], Guo Zhen, Li Tongzhu*,Wang Changping, "Classification of hypersurfaces with constant Moebius Ricci curvature in R^{n+1}", Tohoku Mathematical Journal, Vol.67, (2015)383--403.
[11], Li Tongzhu*, Ma Xiang, Wang Changping, "Wintgen ideal submanifolds with a low-dimensional integrable distribution", Frontiers of Mathematics in China, Vol.10, (2015)111--136.
[12], Li Tongzhu*,Wang Changping, "A Note on Blaschke Isoparametric hypersurfaces", International Journal of Mathematics, Vol.25,(2014)**-1.
[13], Li Tongzhu*,Wang Changping, "Classification of Moebius homogeneous hypersurfaces in a 5-dimensional sphere", Houston Journal of Mathematics, Vol,40, (2014)1127--1146.
[14], Xie Zhenxiao, Li Tongzhu, Ma Xiang*, Wang Changping, "M?bius geometry of three-dimensional Wintgen ideal submanifolds in S^5",Science China Mathematics, Vol.57, (2014)1203--1220.
[15], Li Tongzhu*, Ma Xiang, Wang Changping, "Deformation of hypersurfaces preserving the M?bius metric and a reduction theorem", Advances in Mathematics, Vol.256,(2014)156--205.
[16], Li Tongzhu, "Compact Willmore hypersurfaces with two distinct principal curvatures in S^{n+1}", Differential Geometry and its Applications, Vol.32,(2014)35--45.
[17], Li Tongzhu*, Ma Xiang, Wang Changping, "Moebius homogeneous hypersurfaces with two distinct principal curvatures in S^{n+1}", Arkiv for Matematik, Vol.51,(2013}315--328.
[18], Li Tongzhu*, Ma Xiang, Wang Changping, "Willmore hypersurfaces with constant M?bius curvature in R^{n+1}", Geometriae dedicata, Vol.166,(2013)251--267.
[19], Li Tongzhu*, Nie Changxiong, "Conformal geometry of hypersurfaces in Lorentz space forms", Geometry,Vol. 2013,(2013)ID549602.
[20], Li Tongzhu*, Demeter Krupka, "The Geometry of Tangent Bundles: Canonical Vector Fields", Geometry,Vol.2013,(2013)ID364301.
[21], Li Tongzhu, "Willmore hypersurfaces with two distinct principal curvatures in R^{n+1}", Pacific Journal of Mathematics, Vol.256, (2012)129--149.
[22], Li Tongzhu, "Laguerre homogeneous surfaces in R^3", Science China Mathematics, Vol.55,(2012)1197--1214.
[23], Li Tongzhu*, Sun Huafei, "Laguerre Isopararmetric Hypersurfaces in R^4", Acta Mathematica Sinica (English series), Vol.28,(2012)1179--1186.
[24], Guo Zhen*, Li Tongzhu, Lin Limiao, Ma Xiang, Wang Changping, "Classification of hypersurfaces with constant M?bius curvature in S^m+1", Mathematische Zeitschrift, Vol.271,(2012)193--219.
[25], Li Tongzhu*, Li Haizhong Wang Changping, "Classification of hypersurfaces with constant Laguerre eigenvalues in R^n", Science China Mathematics,Vol.54, (2011)1129--1144.
[26], Nie Changxiong*, Li Tongzhu, He Yijun, Wu Chuanxi, "Conformal isoparametric hypersurfaces with two distinct conformal principal curvatures in conformal space", Science China Mathematics,Vol.53,(2010)953--965.
[27], Li Tongzhu*, Li Haizhong, Wang Changping, "Classification of hypersurfaces with parallel Laguerre second fundamental form in R^n", Differential Geometry and its Applications, Vol.28, (2010)148--157.
[28], Li Tongzhu, "Homogeneous surfaces in Lie sphere geometry", Geometriae dedicata, Vol.149, (2010)15--43.
[29], Li Tongzhu, Peng Linyu, Sun Huafei, " The geometric struction of the Inverse Gamma distribution", Contribution to Algebra and Geometry, Vol. 49, (2008) 217—225.
[30], Li Tongzhu, Wang Changping, " Laguerre geometry of hypersurfaces in R^n", Manuscripta mathematica, Vol.122, (2007)73--95.
[31], Li Tongzhu, "Laguerre geometry of surfaces in R^3", Acta Mathematica Sinica (English series), Vol. 21, (2005)1525--1534.
[32], 李同柱，郭震，"常曲率流形中具平行李奇曲率的超曲面",数学学报, Vol.47,(2004)587--592.
[33], Li Tongzhu,Sun Huafei," Hypersurfaces with Harmonic Moebius curvature in S^{n+1},"数学进展, Vol.37, (2008)57--66.
[34], 李同柱, 聂昌雄, "S^4 中具有调和共形高斯映照的超曲面. " 数学学报, Vol.57, (2014)1231--1240.
[35], 陈芝红， 李同柱，“超曲面的一个刚性定理”， 数学进展, Vol.47, (2018)117-124.


Visiting Positions 开始时间
岂止时间
工作单位

2008-03
2008-03
日本 日本佐贺大学 访问

2014-03
2015-03
美国 加州大学圣克鲁兹分校 研究员


Research Projects 1，主持国家自然科学基金：项目名称：N维欧式空间中超曲面的Laguerre几何，项目编号：**，起止时间：2008,01--2008,12.
2, 主持国家自然科学基金：项目名称：n维欧式空间中子流形的Laguerre微分几何，项目编号：**，起止时间：2009,01--2011,12.
3, 主持国家自然科学基金：项目名称：Lorentz空间形式中子流形的刚性和形变问题，项目编号：**，起止时间：2016,01--2019,12.
4,主持校基础科学基金：项目名称：N维球面中超曲面的Moebius几何，项目编号：，起止时间：2013,01--2014,12.
5, 参与国家自然科学基金：项目名称：李球微分几何及其子几何的子流形理论，项目编号：**，起止时间：2008,01--2010,12.
6,参与国家自然科学基金：项目名称：球几何与不定Kaehler度量流形Q^n_1中子流形的研究，项目编号：起止时间：**，2012,01--2015,12.
7, 参与国家自然科学基金：项目名称：子流形共形高斯映射的几何，项目编号：**，起止时间：2015,01--2018,12.


Awards, Honors and Recognitions 获奖情况

获奖项目名称
颁奖部门
奖励级别
奖励等级
获奖时间

保球变换群的几何及其子流形理论
教育部
省部
一等奖
2014.12


Graduate Students 指导研究生：
韩希武（毕业），张树邦（毕业），陈芝红（毕业）。

Conference Talks and Invited Presentations
Conference Organization
Grants & Scholarships Assessor
International Refereed Journals
International Refereed Proceedings