[42] ,姬秀; 李同柱,Lorentz空间中的Para-isotropic超曲面. (Chinese) 数学学报(中文版)64(2021),no. 1,47–58.
[41],Xie, Zhenxiao;Li, Tongzhu;Ma, Xiang;Wang, Changping,Wintgen ideal submanifolds: new examples, frame sequence and Möbius homogeneous classification.
Adv. Math.381(2021),Paper No. 107620, 31 pp.
[40],Ji, Xiu;Li, Tongzhu,Conformal homogeneous spacelike hypersurfaces with two distinct principal curvatures in Lorentzian space forms.
Houston J. Math.46(2020),no. 4,935–951.
[39],Chen, Ya Yun;Ji, Xiu;Li, Tong Zhu, Möbius homogeneous hypersurfaces with one simple principal curvature in Sn+1.
Acta Math. Sin. (Engl. Ser.)36(2020),no. 9,
[38],Ji, Xiu;Li, Tongzhu,Conformal homogeneous spacelike surfaces in 3-dimensional Lorentz space forms.
Differential Geom. Appl.73(2020),101667, 16 pp.
[37],Deng, Zonggang;Li, Tongzhu, Conformally flat Willmore spacelike hypersurfaces in Rn+11.
Turkish J. Math.44(2020),no. 1,252–273.
[36],Lin, Limiao;Li, Tongzhu,A Möbius rigidity of compact Willmore hypersurfaces in Sn+1.
J. Math. Anal. Appl.484(2020),no. 1,123707, 15 pp.
[35],Ji, Xiu;Li, Tongzhu;Sun, Huafei,Para-Blaschke isoparametric spacelike hypersurfaces in Lorentzian space forms.
Houston J. Math.45(2019),no. 3,685–706.
[34],Ji, Xiu;Li, Tongzhu;Sun, Huafei, Spacelike hypersurfaces with constant conformal sectional curvature in Rn+11.
Pacific J. Math.300(2019),no. 1,17–37.
[33],Ji, Xiu;Li, TongZhu, A note on compact Móbius homogeneous submanifolds in Sn+1.
Bull. Korean Math. Soc.56(2019),no. 3,
[32],陈芝红;李同柱 , 空间形式中紧超曲面的刚性,数学进展,47(2018),no. 5,773–778.
[31],Lin, Limiao;Li, Tongzhu;Wang, Changping,A Möbius scalar curvature rigidity on compact conformally flat hypersurfaces in Sn+1.
J. Math. Anal. Appl.466(2018),no. 1,762–775
[30],Li, Tongzhu;Nie, Changxiong,Spacelike Dupin hypersurfaces in Lorentzian space forms.
J. Math. Soc. Japan70(2018),no. 2,463–480.
[29],Xie, Zhenxiao;Li, Tongzhu;Ma, Xiang;Wang, Changping,Wintgen ideal submanifolds: reduction theorems and a coarse classification.
Ann. Global Anal. Geom.53(2018),no. 3,377–403.
[28],Li, Tongzhu, Möbius homogeneous hypersurfaces with three distinct principal curvatures in Sn+1.
Chinese Ann. Math. Ser. B38(2017),no. 5,1131–1144.
[27],Li, Tongzhu;Qing, Jie;Wang, Changping,Möbius curvature, Laguerre curvature and Dupin hypersurface.
Adv. Math.311(2017),249–294.
[26],Li, Tongzhu;Ma, Xiang;Wang, Changping;Xie, Zhenxiao, Wintgen ideal submanifolds of codimension two, complex curves, and Möbius geometry.
Tohoku Math. J. (2)68(2016),no. 4,621–638.
[25],Guo, Zhen;Li, Tongzhu;Wang, Changping, Classification of hypersurfaces with constant Möbius Ricci curvature in Rn+1.
Tohoku Math. J. (2)67(2015),no. 3,383–403.
[24],Li, Tongzhu;Ma, Xiang;Wang, Changping,Wintgen ideal submanifolds with a low-dimensional integrable distribution.
Front. Math. China10(2015),no. 1,111–136.
[23], 李同柱; 聂昌雄, 四维球面空间中共形高斯映射调和 的超曲面,数学学报,57(2014),no. 6,1231–1240.
[22],Li, Tongzhu;Wang, Changping,Classification of Möbius homogeneous hypersurfaces in a 5-dimensional sphere.
Houston J. Math.40(2014),no. 4,1127–1146.
[21],Li, Tongzhu;Wang, Changping,A note on Blaschke isoparametric hypersurfaces.
Internat. J. Math.25(2014),no. 12,1450117, 9 pp.
[20],Xie, ZhenXiao;Li, TongZhu;Ma, Xiang;Wang, ChangPing, Möbius geometry of three-dimensional Wintgen ideal submanifolds in S5.
Sci. China Math.57(2014),no. 6,1203–1220.
[19],Li, Tongzhu;Ma, Xiang;Wang, Changping, Deformation of hypersurfaces preserving the Möbius metric and a reduction theorem.
Adv. Math.256(2014),156–205.
[18],Li, Tongzhu, Compact Willmore hypersurfaces with two distinct principal curvatures in Sn+1.
Differential Geom. Appl.32(2014),35–45.
[17],Li, Tongzhu;Ma, Xiang;Wang, Changping, Willmore hypersurfaces with constant Möbius curvature in Rn+1.
Geom. Dedicata166(2013),251–267.
[16],Li, Tongzhu;Ma, Xiang;Wang, Changping, Möbius homogeneous hypersurfaces with two distinct principal curvatures in Sn+1.
Ark. Mat.51(2013),no. 2,315–328.
[15],Li, Tongzhu,Willmore hypersurfaces with two distinct principal curvatures in Rn+1.
Pacific J. Math.256(2012),no. 1,129–149.
[14],Li, TongZhu, Laguerre homogeneous surfaces in R3.
Sci. China Math.55(2012),no. 6,1197–1214.
[13],Guo, Zhen;Li, Tongzhu;Lin, Limiao;Ma, Xiang;Wang, Changping, Classification of hypersurfaces with constant Möbius curvature in Sm+1.
Math. Z.271(2012),no. 1-2,193–219.
[12],Li, Tong Zhu;Sun, Hua Fei, Laguerre isoparametric hypersurfaces in R4.
Acta Math. Sin. (Engl. Ser.)28(2012),no. 6,1179–1186.
[11],Li, TongZhu;Li, HaiZhong;Wang, ChangPing, Classification of hypersurfaces with constant Laguerre eigenvalues in Rn.
Sci. China Math.54(2011),no. 6,1129–1144.
[10],Li, Tongzhu, Homogeneous surfaces in Lie sphere geometry.
Geom. Dedicata149(2010),15–43.
[9],Nie, ChangXiong;Li, TongZhu;He, YiJun;Wu, ChuanXi, Conformal isoparametric hypersurfaces with two distinct conformal principal curvatures in conformal space.
Sci. China Math.53(2010),no. 4,953–965.
[8],Li, Tongzhu;Li, Haizhong;Wang, Changping,Classification of hypersurfaces with parallel Laguerre second fundamental form in Rn.
Differential Geom. Appl.28(2010),no. 2,
[7], 李同柱; 孙华飞, 球面中具有调和曲率的超曲面. 数学进展37(2008),no. 1,57–66.
[6],Li, Tongzhu;Peng, Linyu;Sun, Huafei, The geometric structure of the inverse gamma distribution.
Beiträge Algebra Geom.49(2008),no. 1,217–225.
[5],Li, Tongzhu;Wang, Changping, Laguerre geometry of hypersurfaces in Rn.
Manuscripta Math.122(2007),no. 1,73–95.
[4],Li, Tong Zhu,Laguerre geometry of surfaces in R3.
Acta Math. Sin. (Engl. Ser.)21(2005),no. 6,1525–1534.
[3], Li Tongzhu, Nie Changxiong, Conformal geometry of hypersurfaces in Lorentz space forms,
Geometry, 2013, Vol.2013, Article ID 549602.
[2], Li Tongzhu, Demeter Krupka, The Geometry of Tangent Bundles: Canonical Vector Fields,
Geometry, 2013, Vol.2013, Article ID 364301.
[1] 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,2004, 47 ,587—592.