复射影空间中拟全实极小子流形

J4 ›› 2011, Vol. 49 ›› Issue (01): 56-60.

复射影空间中拟全实极小子流形

尹松庭¹, 宋卫东²

1. 铜陵学院数学计算机系, 安徽铜陵 244000|2. 安徽师范大学数学与计算机科学学院, 安徽芜湖 241000

收稿日期:2009-11-16 出版日期:2011-01-26 发布日期:2011-02-19
通讯作者: 宋卫东 E-mail:swd56@sina.com

Quasitotally Real Minimal Submanifolds ina Complex Projective Space

YIN Songting¹, SONG Weidong²

1. Department of Mathematics and Computer Science, Tongling College, Tongling 244000, Anhui Province, China;2. College of Mathematics and Computer Science, Anhui Normal University, Wuhu 241000, Anhui Province, China

Received:2009-11-16 Online:2011-01-26 Published:2011-02-19
Contact: SONG Weidong E-mail:swd56@sina.com

摘要/Abstract

摘要：

运用活动标架法和Bochner技巧, 研究复射影空间CP^(n+p)/2中拟全实极小子流形曲率与几何特征的关系, 得到了截面曲率和Ricci曲率的刚性定理. 证明了: 若Mⁿ的截面曲率处处不小于(n+3)/2(n+1)或Ricci曲率处处不小于n+1-3p/n+12p/n²(n≥4), 3n/4+2(n≤4), 则p=n,M=RPⁿ.

关键词: 复射影空间, 一般子流形, 极小子流形, 拟全实子流形

Abstract:

The authors studied the relations between the curvature and geometric feature of quasitotally real minimal submanifold in a complex p
rojective space CP^(n+p)/2. With the help of movingframe method and Bochner skills, some rigidity theorems on sectional curvature and Ricci curvature were obtained. The authors have proved that if the sectional curvature of Mⁿ is not less than (n+3)/[2(n+1)] or Ricci curvature is not less than n+1-3p/n+12p/n²(n≥4) or 3n/4+2(n≤4), then p=n, M=RPⁿ.

Key words: complex projective space, generic submanifold, minimal submanifold, quasitotally real submanifold

中图分类号:

O186

尹松庭, 宋卫东. 复射影空间中拟全实极小子流形[J]. J4, 2011, 49(01): 56-60.

YIN Song-Ting, SONG Wei-Dong. Quasitotally Real Minimal Submanifolds ina Complex Projective Space[J]. J4, 2011, 49(01): 56-60.

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