CHARACTERIZING A CLASS OF TOTALLY-REAL SUBMANIFOLDS OF S-6 BY THEIR SECTIONAL CURVATURES

被引：18

作者：

CHEN, BY ^{[1
]}

DILLEN, F ^{[1
]}

VERSTRAELEN, L ^{[1
]}

VRANCKEN, L ^{[1
]}

机构：

[1] KATHOLIEKE UNIV LEUVEN,DEPT WISKUNDE,B-3001 LOUVAIN,BELGIUM

来源：

TOHOKU MATHEMATICAL JOURNAL | 1995年 / 47卷 / 02期

关键词：

D O I：

10.2748/tmj/1178225591

中图分类号：

O1 [数学];

学科分类号：

0701 ; 070101 ;

摘要：

The first author introduced in a previous paper an important Riemannian invariant for a Riemannian manifold, namely take the scalar curvature function and subtract at each point the smallest sectional curvature at that point. He also proved a sharp inequality for this invariant for submanifolds of real space forms. In this paper we study totally real submanifolds in the nearly kahler six-sphere that realize the equality in that inequality. In this way we characterize a class of totally real warped product immersions by one equality involving their sectional curvatures.

引用

页码：185 / 198

页数：14

共 15 条

[1] ON ALMOST COMPLEX CURVES IN THE NEARLY KAHLER 6-SPHERE [J].

BOLTON, J ;

VRANCKEN, L ;

WOODWARD, LM .

QUARTERLY JOURNAL OF MATHEMATICS, 1994, 45 (180) :407-427

[2] TOTALLY REAL SUBMANIFOLDS [J].

CHEN, BY ;

OGIUE, K .

TRANSACTIONS OF THE AMERICAN MATHEMATICAL SOCIETY, 1974, 193 (JUN) :257-266

[3] SOME PINCHING AND CLASSIFICATION-THEOREMS FOR MINIMAL SUBMANIFOLDS [J].

CHEN, BY .

ARCHIV DER MATHEMATIK, 1993, 60 (06) :568-578

[4]

CHEN BY, IN PRESS P ROY SOC A

[5]

CHEN BY, IN PRESS JAPANESE J

[6]

DILLEN F, 1988, GEOMETRIAE DEDICATA, V27, P325

[7]

DILLEN F, 1993, J REINE ANGEW MATH, V435, P33

[8] TOTALLY-REAL SUB-MANIFOLDS IN A 6-SPHERE [J].

EJIRI, N .

PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY, 1981, 83 (04) :759-763

[9] EQUIVARIANT MINIMAL IMMERSIONS OF S2 INTO S2M(1) [J].

EJIRI, N .

TRANSACTIONS OF THE AMERICAN MATHEMATICAL SOCIETY, 1986, 297 (01) :105-124

[10] CALIBRATED GEOMETRIES [J].

HARVEY, R ;

LAWSON, HB .

ACTA MATHEMATICA, 1982, 148 :47-157

← 1 2 →