A complete classification of Blaschke parallel submanifolds with vanishing Mbius form 被引量：3

A complete classification of Blaschke parallel submanifolds with vanishing Mbius form

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摘要 The Blaschke tensor and the Mbius form are two of the fundamental invariants in the Mobius geometry of submanifolds;an umbilic-free immersed submanifold in real space forms is called Blaschke parallel if its Blaschke tensor is parallel.We prove a theorem which,together with the known classification result for Mobius isotropic submanifolds,successfully establishes a complete classification of the Blaschke parallel submanifolds in S^n with vanishing Mobius form.Before doing so,a broad class of new examples of general codimensions is explicitly constructed. The Blaschke tensor and the Mbius form are two of the fundamental invariants in the Mobius geometry of submanifolds;an umbilic-free immersed submanifold in real space forms is called Blaschke parallel if its Blaschke tensor is parallel.We prove a theorem which,together with the known classification result for Mobius isotropic submanifolds,successfully establishes a complete classification of the Blaschke parallel submanifolds in S^n with vanishing Mobius form.Before doing so,a broad class of new examples of general codimensions is explicitly constructed.

作者 LI XingXiao SONG HongRu

机构地区 College of Mathematics and Information Science

出处《Science China Mathematics》 SCIE CSCD 2017年第7期1281-1310,共30页 中国科学：数学（英文版）

基金 National Natural Science Foundation of China(Grant Nos. 11171091 and 11371018)

关键词 parallel Blaschke tensor vanishing Mobius form constant scalar curvature parallel mean curvature vector parallel Blaschke tensor vanishing Mobius form constant scalar curvature parallel mean curvature vector

分类号 O186.1 [理学—基础数学]

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参考文献5

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二级参考文献9

1HU Zejun,LI Haizhong Department of Mathematics, Zhengzhou University Zhengzhou 450052, China Department of Mathematical Sciences, Tsinghua University, Beijing 100084, China.Classification of hypersurfaces with parallel Mobius second fundamental form in S^(n+1)[J].Science China Mathematics,2004,47(3):417-430. 被引量：34
2NIE ChangXiong 1,2,LI TongZhu 3,HE YiJun 4 & WU ChuanXi 5 1 Faculty of Mathematics and Computer Sciences,Hubei University,Wuhan 430062,China,2 School of Mathematical Sciences,Peking University,Beijing 100871,China,3 Faculty of Sciences,Beijing Institute of Technology,Beijing 100081,China,4 School of Mathematical Sciences,Shanxi University,Taiyuan 030006,China,5 Institute of Mathematics,Hubei University,Wuhan 430062,China.Conformal isoparametric hypersurfaces with two distinct conformal principal curvatures in conformal space[J].Science China Mathematics,2010,53(4):953-965. 被引量：10
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共引文献51

1HU Zejun,LI Haizhong Department of Mathematics, Zhengzhou University Zhengzhou 450052, China Department of Mathematical Sciences, Tsinghua University, Beijing 100084, China.Classification of hypersurfaces with parallel Mobius second fundamental form in S^(n+1)[J].Science China Mathematics,2004,47(3):417-430. 被引量：34
2NIE ChangXiong 1,2,LI TongZhu 3,HE YiJun 4 & WU ChuanXi 5 1 Faculty of Mathematics and Computer Sciences,Hubei University,Wuhan 430062,China,2 School of Mathematical Sciences,Peking University,Beijing 100871,China,3 Faculty of Sciences,Beijing Institute of Technology,Beijing 100081,China,4 School of Mathematical Sciences,Shanxi University,Taiyuan 030006,China,5 Institute of Mathematics,Hubei University,Wuhan 430062,China.Conformal isoparametric hypersurfaces with two distinct conformal principal curvatures in conformal space[J].Science China Mathematics,2010,53(4):953-965. 被引量：10
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同被引文献14

1HU Zejun,LI Haizhong Department of Mathematics, Zhengzhou University Zhengzhou 450052, China Department of Mathematical Sciences, Tsinghua University, Beijing 100084, China.Classification of hypersurfaces with parallel Mobius second fundamental form in S^(n+1)[J].Science China Mathematics,2004,47(3):417-430. 被引量：34
2NIE ChangXiong 1,2,LI TongZhu 3,HE YiJun 4 & WU ChuanXi 5 1 Faculty of Mathematics and Computer Sciences,Hubei University,Wuhan 430062,China,2 School of Mathematical Sciences,Peking University,Beijing 100871,China,3 Faculty of Sciences,Beijing Institute of Technology,Beijing 100081,China,4 School of Mathematical Sciences,Shanxi University,Taiyuan 030006,China,5 Institute of Mathematics,Hubei University,Wuhan 430062,China.Conformal isoparametric hypersurfaces with two distinct conformal principal curvatures in conformal space[J].Science China Mathematics,2010,53(4):953-965. 被引量：10
3Xing Xiao LI Feng Yun ZHANG.Immersed Hypersurfaces in the Unit Sphere S^(m+1) with Constant Blaschke Eigenvalues[J].Acta Mathematica Sinica,English Series,2007,23(3):533-548. 被引量：11
4钟定兴,孙弘安.单位球面上仿Blaschke张量的特征值为常数的超曲面[J].数学学报（中文版）,2008,51(3):579-592. 被引量：5
5聂昌雄,吴传喜.共形空间中平行的共形第二基本形式的类空超曲面[J].数学学报（中文版）,2008,51(4):685-692. 被引量：9
6Xing Xiao LI Feng Yun ZHANG.On the Blaschke Isoparametric Hypersurfaces in the Unit Sphere[J].Acta Mathematica Sinica,English Series,2009,25(4):657-678. 被引量：12
7HU ZeJun,LI XingXiao,ZHAI ShuJie.On the Blaschke isoparametric hypersurfaces in the unit sphere with three distinct Blaschke eigenvalues[J].Science China Mathematics,2011,54(10):2171-2194. 被引量：7
8LINLiMiao,GU0Zhen.Classification of hypersurfaces with two distinct principal curvatures and closed Mbius form in S^(m+1)[J].Science China Mathematics,2012,55(7):1463-1478. 被引量：6
9Changxiong NIE,Chuanxi WU.Regular Submanifolds in Conformal Space Q_p^n[J].Chinese Annals of Mathematics,Series B,2012,33(5):695-714. 被引量：9
10Hai Zhong LI Department of Mathematics, Tsinghua University. Beijing 100084. P. R. China Hui Li LIU Department of Mathematics, Northeastern University. Shenyang 110000. P. R. China Chang Ping WANG Key Laboratory of Pure and Applied Mathematics, School of Mathematical Sciences. Peking University, Beijing 100871, P. R. China Guo Song ZHAO Department of Mathematics, Sichuan University, Chengdu 610064. P. R. China.Mobius Isoparametric Hypersurfaces in S^(n+1) with Two Distinct Principal Curvatures[J].Acta Mathematica Sinica,English Series,2002,18(3):437-446. 被引量：55

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