SLANT IMMERSIONS OF COMPLEX SPACE FORMS AND CHEN'S INEQUALITY 被引量：10

SLANT IMMERSIONS OF COMPLEX SPACE FORMS AND CHEN'S INEQUALITY

下载PDF

导出

摘要 A submanifold in a complex space form is called slant if it has constant Wirtinger angles. B. Y. Chen and Y. Tazawa proved that there do not exist minimal proper slant surfaces in CP2 and CH2. So it seems that the slant immersion has some interesting properties. The authors have great interest to consider slant immersions satisfying some additional conditions, such as unfull first normal bundles or Chen’s equality holding. They prove that there do not exist n-dimensional Kaehlerian slant immersions in CPn and CHn with unfull first normal bundles. Next, it is seen that every Kaehlerian slant submanifold satisfying an equality of Chen is minimal which is similar to that of Lagrangian immersions. But in contrast, it is shown that a large class of slant immersions do not exist thoroughly. Finally, they give an application of Chen’s inequality to general slant immersions in a complex projective space, which generalizes a result of Chen. A submanifold in a complex space form is called slant if it has constant Wirtinger angles. B. Y. Chen and Y. Tazawa proved that there do not exist minimal proper slant surfaces in CP2 and CH2. So it seems that the slant immersion has some interesting properties. The authors have great interest to consider slant immersions satisfying some additional conditions, such as unfull first normal bundles or Chen's equality holding. They prove that there do not exist n-dimensional Kaehlerian slant immersions in CPn and CHn with unfull first normal bundles. Next, it is seen that every Kaehlerian slant submanifold satisfying an equality of Chen is minimal which is similar to that of Lagrangian immersions. But in contrast, it is shown that a large class of slant immersions do not exist thoroughly. Finally, they give an application of Chen's inequality to general slant immersions in a complex projective space, which generalizes a result of Chen.

作者李光汉吴传喜

机构地区 School of Mathematical Science Peking University

出处《Acta Mathematica Scientia》 SCIE CSCD 2005年第2期223-232,共10页 数学物理学报（B辑英文版）

基金 This project is supported by the NSFC(10271041)Tianyuan Youth Foundation of Mathematics.

关键词 Slant immersion IDEAL Chen's inequality complex space form Slant immersion, ideal, Chen's inequality, complex space form

分类号 O178 [理学—基础数学]

引文网络
相关文献

参考文献10

1Guanghan Li.Ideal einstein, conformally flat and semi-symmetric immersions[J].Israel Journal of Mathematics.2002(1)
2Bang -yen Chen.A general inequality for submanifolds in complex-space-forms and its applications[J].Archiv der Mathematik.1996(6)
3Chen B Y,Tazawa Y.Slant Submanifolds of Complex Projective and Complex Hyperbolic Spaces[].Glasgow Mathematical Journal.2000
4Chen B Y.A General Inequality for Submanifolds in Complex-Space-Forms and Its Applications[].Archiv der Mathematik.1996
5Abe T.Isotropic Slant Submanifolds[].Mathematica Japonica.1998
6Li G,Wu C.Rigidity Theorems for Submanifolds[].Acta Math Sci(Chinese).2001
7Chen B Y.Some New Obstructions to Minimal Lagrangian Isometric Immersions[].Japanese Journal of Mathematics.2000
8Li G.Ideal Einstein, Conformally Flat and Semi-Symmetric Immersions[].Israel Journal of Mathematics.2002
9Li G.Semi-Parallel, Semi-Symmetric Immersions and Chen’s Equality[].Results in Mathematics.2001
10Chen B Y.A Riemannian Invariants and Its Applications to Submanifolds Theory[].Results in Mathematics.1995

同被引文献81

1CHENBangyen.Somepinchingandclassificationtheoremsforminimalsubmanifolds[J].ArchMath,1993,60:568-578.
2CHERNShiingshen.MinimalsubmanifoldsinaRiemannianmanifold[M].Lawrence:UniversityofKansasPress,1968.
3FERN?NDEZLM,FUENTESAM.SomerelationshipsbetweenintrinsicandextrinsicinvariantsofsubmanifoldsingeneralizedSspaceforms[EB/OL].arXivpreprintarXiv:13061655,2013.http://arxiv.org/pdf/13061655.pdf.
4?ZGRCBY.CheninequalitiesforsubmanifoldsaRiemannianmanifoldofaquasiconstantcurvature[J].TurkJMath,2011,35:501-509.
5LIXingxiao,HUANGGuangyue,XUJianlou.Someinequalitiesforsubmanifoldsinlocallyconformalalmostcosymplecticmanifolds[J].SoochowJournalofMathematics,2005,31(3):309.
6ARAU'JOKO,BARBOSAER.PinchingtheoremsforcompactspacelikesubmanifoldsinsemiRiemannianspaceforms[J].DifferentialGeometryanditsApplications,2013,31(5):672-681.
7CHENBangyen.RelationsbetweenRiccicurvatureshapeoperatorforsubmanifoldswitharbitrarycodimensions[J].GlasgowMathJ,1999,41:31-41.
8LIUXimin,DAIWanji.Riccicurvatureofsubmanifoldsinaquaternionprojectivespace[J].CommunKoreanMathSoc,2002,17(4):625-634.
9ARSLANK,EZENTASR,MIHAII,etal.RiccicurvatureofsubmanifoldsinKenmotsuspaceforms[J].IntJMathMathSci,2002,29:719-726.
10TRIPATHIM M.ImprovedChenRicciinequalityforcurvatureliketensorsanditsapplications[J].DifferentialGeometryanditsApplications,2011,29:685-698.

引证文献10

1杜锋,吴传喜,李光汉.Heisenberg群上具有散度形式椭圆算子的特征值估计[J].数学物理学报（A辑）,2012,32(6):1032-1040. 被引量：3
2杜锋,张明波.广义复空间形式中具有平行平均曲率向量场的予流形[J].湖北大学学报（自然科学版）,2014,36(2):170-174.
3张攀,张量,宋卫东.伪黎曼空间形式中类空子流形的几何不等式[J].山东大学学报（理学版）,2014,49(6):91-94. 被引量：3
4何国庆,陈平.容有半对称度量联络的广义复空间中子流形上的Chen不等式（英文）[J].安徽师范大学学报（自然科学版）,2014,37(5):418-424. 被引量：1
5张量,张攀.关于具有半对称非度量联络的实空间形式中子流形的Chen不等式的注记(英文)[J].华东师范大学学报（自然科学版）,2015(1):6-15.
6潘旭林,张攀,张量.拟常曲率空间中子流形的Casorati曲率不等式[J].山东大学学报（理学版）,2015,50(9):84-87.
7张攀,张量,宋卫东.拟常曲率黎曼流形中子流形的几何不等式的一些注记（英文）[J].数学杂志,2016,36(3):445-457. 被引量：3
8刘旭东,潘旭林,张量.具有半对称度量联络拟常曲率空间中子流形的Casorati曲率不等式[J].山东大学学报（理学版）,2017,52(2):55-59. 被引量：1
9程丽鹃,王佳慧,朱业成.不定复空间形式中全实类空子流形的δ不等式[J].安徽工业大学学报（自然科学版）,2021,38(4):437-443.
10苏曼,张量.关于伪黎曼空间形式中类空子流形Chen不等式的两个结果[J].山东大学学报（理学版）,2016,51(10):59-64.

二级引证文献10

1杨贵诚,杜锋.Heisernberg群上低阶特征值的估计[J].湖北大学学报（自然科学版）,2014,36(3):195-198. 被引量：1
2杨贵诚,侯兰宝,杜锋.Carnot群上低阶特征值的估计[J].扬州大学学报（自然科学版）,2016,19(2):10-12. 被引量：2
3何国庆,张量,刘海蓉.具有半对称度量联络的广义Sasakian空间形式中子流形上的Chen不等式[J].吉林大学学报（理学版）,2016,54(6):1248-1254.
4何国庆.容有半对称度量联络的广义复空间中子流形上的Chen-Ricci不等式（英文）[J].数学杂志,2016,36(6):1133-1141.
5刘旭东,蔡丹丹,张量.Bochner Kaehler流形中子流形的Casorati曲率不等式[J].吉林大学学报（理学版）,2018,56(3):537-543.
6杨慧章.局部对称伪黎曼流形中具有平行平均曲率向量的类空子流形[J].安徽大学学报（自然科学版）,2018,42(4):45-49. 被引量：1
7谭沈阳,黄体仁,刘大瑾.H型群上一类散度形算子的特征值估计[J].数学物理学报（A辑）,2018,38(3):467-475.
8田小强,董丹.伪黎曼空间形式中完备类空子流形的余维数约化[J].西南师范大学学报（自然科学版）,2018,43(4):31-36.
9蔡丹丹,刘旭东,张量.常曲率统计流形中子流形的广义标准δ-Casorati曲率不等式[J].吉林大学学报（理学版）,2019,57(2):206-212.
10苏曼,张量.关于伪黎曼空间形式中类空子流形Chen不等式的两个结果[J].山东大学学报（理学版）,2016,51(10):59-64.

1李邦河.CODIMENSION 1 AND 2 IMMERSIONS OF DOLD MANIFOLDS IN EUCLIDEAN SPACES[J].Chinese Science Bulletin,1988,33(3):182-185.
2宋卫东,邵维新.复空间形式中具有常数量曲率的全实子流形(英文)[J].数学杂志,2013,33(1):20-26. 被引量：1
3孙宝磊,何俊秀,姚纯青.复空间形式中具有平行平均曲率向量的全实伪脐子流形[J].西南大学学报（自然科学版）,2016,38(2):72-77.
4Saadet Dogan Muge Karadag.Slant Submanifolds of an Almost Hyperbolic Contact Metric Manifolds[J].Journal of Mathematics and System Science,2014,4(4):285-288.
5Mohammad A.Asadi-Golmankhaneh.MULTIPLE POINTS OF IMMERSIONS OF M^6■R^7[J].Acta Mathematica Scientia,2011,31(1):259-267.
6Shen Yibing, Department of Mathematics Hangzhou University Hangzhou, 310028 China.The Riemannian Geometry of Superminimal Surfaces in Complex Space Forms[J].Acta Mathematica Sinica,English Series,1996,12(3):298-313. 被引量：3
7杨君,冷爱萍,卢玉峰.к-order Slant Toeplitz Operators on the Bergman Space[J].Northeastern Mathematical Journal,2007,23(5):403-412.
8CHEN Jing-yi.The Willmore functional of surfaces[J].Applied Mathematics(A Journal of Chinese Universities),2013,28(4):485-493.
9Li Xingxiao (Department of Mathematics,Henan Normal University,Xinxiang 453002,China)Li Anmin (Department of Mathematics,Sichuan University,Chengdu 610064,China).Explicit Representations of Mimmal Immersions of 2-Spheres into S^(2m)[J].Acta Mathematica Sinica,English Series,1997,13(2):175-186. 被引量：1
10Chaomei LIU,Yufeng LU.Product and Commutativity of Slant Toeplitz Operators[J].Journal of Mathematical Research with Applications,2013,33(1):122-126. 被引量：1

Acta Mathematica Scientia

2005年第2期

浏览历史

内容加载中请稍等...

SLANT IMMERSIONS OF COMPLEX SPACE FORMS AND CHEN'S INEQUALITY 被引量：10

参考文献10

同被引文献81

引证文献10

二级引证文献10

相关作者

相关机构

相关主题

浏览历史