常曲率空间中的具有共形第二基本形式的子流形

以把调和态射看作等距浸入的单位法投影的问题为背景,研究了具有共形第二基本形式的子流形,论证了具有共形第二基本形式的高维子流形,一般不是由极小点和全脐点构成.这和曲面的情形形成了鲜明的对照.也给出了常曲率空间中具有平行中曲率的奇数维子流形的一个完全分类.     

共形空间${\mathbb Q}^n_s$中的正则Blaschke拟全脐子流形

[Nie C X,Wu C X,Regular submanifolds in the conformal space Q_p~n,ChinAnn Math,2012,33B(5):695-714]中研究了共形空间Q_s~n中的正则子流形,并引入了共形空间Q_s~n中的子流形理论.本文作者将分类共形空间Q_s~n中的Blaschke拟全脐子流形,证明伪Riemann空间形式中具有常数量曲率和平行的平均曲率向量场的正则子流形是共形空间中的Blaschke拟全脐子流形;反之,共形空间中的Blaschke拟全脐子流形共形等价于伪Riemann空间形式中具有常数量曲率和平行的平均曲率向量场的正则子流形.这一结论可看作是共形空间Q_s~n中共形迷向子流形分类定理的推广.     

共形空间Q_s~n中的正则Blaschke拟全脐子流形

[Nie C X,Wu C X,Regular submanifolds in the conformal space Q_p~n,ChinAnn Math,2012,33B(5):695-714]中研究了共形空间Q_s~n中的正则子流形,并引入了共形空间Q_s~n中的子流形理论.本文作者将分类共形空间Q_s~n中的Blaschke拟全脐子流形,证明伪Riemann空间形式中具有常数量曲率和平行的平均曲率向量场的正则子流形是共形空间中的Blaschke拟全脐子流形;反之,共形空间中的Blaschke拟全脐子流形共形等价于伪Riemann空间形式中具有常数量曲率和平行的平均曲率向量场的正则子流形.这一结论可看作是共形空间Q_s~n中共形迷向子流形分类定理的推广.     

局部对称共形平坦黎曼流形中紧致极小子流形的一个刚性定理

本文研究局部对称共形平坦黎曼流形中紧致极小子流形,得到了这类子流形第二基本形式模长平方关于外围空间Ricci曲率的—个拼挤定理,推广了文[1]中的结果.     

局部对称共形平坦黎曼流形中具有平行平均曲率向量的子流形

本文把[1]的结论推广到了环绕空间是局部对称共形平坦的情形,即获得了:设M~是局部对称共形平坦黎曼流形N~+p(p>1)中具有平行平均曲率向量的紧致子流形,如果则M~位于N~+p的全测地子流形N~+1中。其中S,H分别是M~的第二基本形式长度的平方和M~的平均曲率,T_C、t_c分别是N~+p的Ricci曲率的上、下确界,K是N~+p的数量曲率。     

复射影空间的正曲率极小子流形

一、引言 H.Naitoh M.Takeuchi等研究了实空间形与复空间形中,第二基本形式平行的子梳形,并把复射影空间CP~n的共形平坦、全实极小子流形M~n分为三类。 N.Ejiri得到n=4时,第二类与第三类的特征。本文把N.Ejiri的工作,推广到射影平坦、共园平坦、调和平坦或拟共形平坦的全实极小子流形,导出关于数量曲率的Pinching定理。     

常曲率空间中具有平行平均曲率向量的子流形

本文改进和推广了S.T.Yan关于具有平行平均曲率向量的子流形的一个结果,并且对常曲率空间中具有平行第二基本形式、具有平坦法丛的各类子流形分别作了一些讨论。     

复空间形式中具有常数量曲率的全实子流形

本文研究了复空间形式中具有常数量曲率的全实子流形.利用一种自伴算子,得到了这类子流形关于第二基本形式模长平方的积分不等式.     

Finsler子流形的Chern联络与Gauss方程

利用Chern联络D、Cartan张量A以及第二基本形式H．研究了Finsler子流形中的诱导Chern联络与第一、第二曲率R和P，给出了子流形的关于R曲率、P曲率以及flag曲率的Gauss方程。     

关于局部对称共形平坦空间中具有常数量曲率的子流形

该文研究了局部对称共形平坦空间中具有常数量曲率的紧致子流形,证明了这类子流形的某些内蕴刚性定理.     

The blow-up of the conformal mean curvature flow

In this paper, we introduce and study the conformal mean curvature flow of submanifolds of higher codimension in the Euclidean space R~n. This kind of flow is a special case of a general modified mean curvature flow which is of various origination. As the main result, we prove a blow-up theorem concluding that, under the conformal mean curvature flow in R~n, the maximum of the square norm of the second fundamental form of any compact submanifold tends to infinity in finite time. Furthermore, we also prove that the external conformal forced mean curvature flow of a compact submanifold in R~n with the same pinched condition as Andrews-Baker's will be convergent to a round point in finite time.     

Conformally flat C-totally real submanifolds of Sasakian space forms

Using the expression for the Laplacian of the square of the length of the second fundamental form of conformally flat minimal C-totally real submanifolds of a Sasakian space form pinchings for scalar curvature and sectional curvature are obtained which imply that the submanifolds must be totally geodesic.     

Doubly warped product CR -submanifolds in locally conformal K?hler manifolds

In this paper we study doubly warped product CR submanifolds in locally conformal K?hler manifolds, and we found a B.Y. Chen’s type inequality for the second fundamental form of these submanifolds.     

Complete space-like submanifolds in locally symmetric semi-definite spaces

The purpose of this paper is to study complete space-like submanifolds with parallel mean curvature vector and flat normal bundle in a locally symmetric semi-defnite space satisfying some curvature conditions. We first give an optimal estimate of the Laplacian of the squared norm of the second fundamental form for such submanifold. Furthermore, the totally umbilical submanifolds are characterized     

拟常曲率流形中全脐点子流形的拼嵌定理

We study the global umbilic submanifolds with parallel mean curvature vector fields in a Riemannian manifold with quasi constant curvature and get a local pinching theorem about the length of the second fundamental form.     

Submanifolds with restrictions on extrinsic <Emphasis Type="Italic">q</Emphasis>th scalar curvature

We study the structure of the minimum set of the normal curvature for a symmetric bilinear map on Euclidean or Hilbert space, the conditions when this set contains strongly umbilical, conformal nullity, etc. linear subspaces. The main goals are estimates from above of the codimension of these subspaces for a symmetric bilinear map with positive normal curvature and the inequality type restriction on the extrinsic qth scalar curvature. We estimate from above the codimension of asymptotic and relative nullity subspaces for a symmetric bilinear map with nonpositive extrinsic qth scalar curvature. Applying the algebraic results to the second fundamental form of a submanifold with low codimension, we characterize the totally umbilical and totally geodesic submanifolds, prove local nonembedding theorems for the products of Riemannian manifolds and global extremal theorem for the space of positive curvature. On the way we generalize results by Florit (1994), Borisenko (1977, 1987) and Okrut (1991) about Riemannian and Hilbert submanifolds. The research was supported by the Center for Absorption in Science, Ministry of Immigrant Absorption, State of Israel; and by Center for Computational Mathematics and Scientific Computation, University of Haifa.     

ON CURVATURE PINCHING FOR MINIMAL AND KAEHLER SUBMANIFOLDSiWITH ISOTROPIC SECOND FUNDAMENTAL FORM

An isometrically immersed submanifold is said to have isotropic second fundamental form if the length of the second fundamental form related into any normal vector is the same one. In this note, some curvature pinching theorems for compact minimal (resp. Kaehler) submanifolds in $S^{n+p}(c)$(resp. $CP^{n+p}(c)$) with isotropic second fundamental form are given.     

Doubly warped product <Emphasis Type="Italic">CR</Emphasis>-submanifolds in locally conformal Kähler manifolds

In this paper we study doubly warped product CR submanifolds in locally conformal K?hler manifolds, and we found a B.Y. Chen’s type inequality for the second fundamental form of these submanifolds. Beneficiary of a CNR-NATO Advanced Research Fellowship pos. 216.2167 Prot. n. 0015506.