弱Landsberg流形的一个整体刚性定理

研究弱Landsberg流形的整体刚性性质,并证明任一闭的具负旗曲率的弱Landsberg 流形一定是Riemann流形.     

常曲率空间中平均曲率为常数的迷向子流形

设M~n是n维黎曼流形,S~(n+p)(e)是n+p维截面曲率为常数c的黎曼流形,设fM~n→S~(n+p)(c)是等距浸入,我们分别用和表示f(M~n)和S~(n+p)(c)的协变微分,那么浸入f的第二基本形式A为 A(X,Y)=x~Y-x~Y     

迷向映照和伪Veronese流形

本文讨论了伪Riemann流形之间的迷向映照。作为从伪Riemann球面到伪Riemann球面的极值浸入的新例子,本文从伪Riemann球面之间的迷向调和映照中确定了所有的伪Veronese流形。最后,利用某些几何量来刻划双曲类空的Veronese流形。     

具有平行平均曲率向量场的子流形

本文讨论了具有平行平均曲率向量场的某一类子流形，得到了这类子流形成为全脐点子流形及其余维数减小的充分条件。     

具有平行平均曲率向量子流形的曲率估计与稳定性

本文估计空间形式中具有平行平均曲率向量子流形上共形度量的数量曲率上界,并利用其研究了具有常平均曲率超曲面的稳定性．     

正曲率子流形的几何刚性定理

§1Introduction LetMnbeann-dimensionalcompactRiemannianmanifoldisometricallyimmersedinto an(n+p)-dimentionalcompleteandsimplyconnectedRiemannianmanifoldFn+p(c)with constantcurvaturec.DenotebyKMandHthesectionalcurvatureandmeancurvatureofM respectively.In[10],Yauprovedthefollowingstrikingresult.TheoremA.LetMnbeann-dimensionalorientedcompactminimalsubmanifoldin Sn+p(1).IfthesectionalcurvatureofMisnotlessthanp-12p-1,thenMiseitherthetotally geodesicsphere,thestandardimmersionoftheproductoftw…     

二维紧致具有非正曲率Riemann流形Euler数的一个计算公式

设Ｍ是二维紧致、曲率Ｋ（Ｍ）≤０的Ｒｉｅｍａｎｎ流形．对任一ｘ　Ｍ,在Ｍ上类数≥３的点集非空且只有有限个点｛α１,α２,…;αｄ｝．用Ｋｊ表示αｊ的类数,即αｊ到ｘ的最短测地线的条数．那么,Ｍ的Ｅｕｌｅｒ数Ｘ（Ｍ）可以表示为：Ｘ（Ｍ）＝（ｄ＋１）＝Ｋｊ．如果Ｍ上类数２３的点只有一个,那么这个点是Ｍ上距离ｘ最远的点．     

爱因斯坦流形中超曲面的平均曲率流

本文证明了一个拼嵌的爱因斯坦流形中的任何超曲面在沿其平均曲率向量演化时，如果初发始曲面满足保持其截曲率为正的某些条件，则在有限时间内超曲而将收缩成一点。     

球面上迷向子流形的一个整体Pinching定理

球面上迷向子流形的一个整体Pinching定理@潮小李@于秀云...     

拟常曲率流形中有平行平均曲率向量的子流形

研究了拟常曲率流形中具有平行平均曲率向量的子流形,给出了两个积分不等式.     

A global rigidity theorem for weakly Landsberg manifolds

In this paper we study a global rigidity property for weakly Landsberg manifolds and prove that a closed weakly Landsberg manifold with the negative flag curvature must be Riemannian.     

Finsler Manifolds with Positive Constant Flag Curvature

It is shown that a Finsler metric with positive constant flag curvature and vanishing mean tangent curvature must be Riemannian. As applications, we also discuss the case of Cheng's maximal diameter theorem and Green's maximal conjugate radius theorem in Finsler manifolds.     

S-curvature of Doubly Warped Product of Finsler Manifolds

Doubly warped product of Finsler manifolds is useful in theoretical physics, particularly in general relativity. In this paper, we study doubly warped product of Finsler manifolds with isotropic mean Berwald curvature or weak isotropic S-curvature.     

关于单位球面的子流形的一个Pinching定理

设Ｍ是单位球面的一个浸入子流形，ＵＭ＝∪ＵＭｘ是Ｍ的单位切丛.本文研究函数ｆ（ｘ）＝ｍａｘ－Ｂ（ｕ，ｕ）－Ｂ（ｖ，ｖ）２。其中Ｂ是Ｍ的第二基本形式．当Ｍ具平行平均曲率时，我们给出关于第二基本形式的一个Ｐｉｎｃｈｉｎｇ定理．对Ｍ是极小的情形，我们有相同的讨论．     

Mean Curvature Flow with Dirichlet Boundary Conditions in Riemannian Manifolds with Symmetries

Consider a hypermanifold M ₀ of a Riemannian manifold N whose Riccicurvature is bounded from below. If M ₀ is transversal to a conformalvector field on N, then conditions are given, such that the meancurvature evolution of M ₀ with Dirichlet boundary conditions has asolution for all times.     

Spacelike Graphs with Parallel Mean Curvature in Pseudo-Riemannian Product Manifolds

The author introduces the w-function defined on the considered spacelike graph M.Under the growth conditions w = o(log z) and w = o(r),two Bernstein type theorems for M in Rmn+ mare got,where z and r are the pseudo-Euclidean distance and the distance function on M to some fixed point respectively.As the ambient space is a curved pseudoRiemannian product of two Riemannian manifolds(Σ1,g1) and(Σ2,g2) of dimensions n and m,a Bernstein type result for n = 2 under some curvature conditions on Σ1 and Σ2 and the growth condition w = o(r) is also got.As more general cases,under some curvature conditions on the ambient space and the growth condition w = o(r) or w = o(√r),the author concludes that if M has parallel mean curvature,then M is maximal.     

Complete Hypersurfaces with Constant Mean Curvature and Finite Total Curvature

The main result of this paper states that the traceless second fundamental tensor A⁰ of an n-dimensional complete hypersurface M, with constant mean curvature H and finite total curvature, _M |A⁰|ⁿ dv_M < , in a simply-connected space form (c), with non-positive curvature c, goes to zero uniformly at infinity. Several corollaries of this result are considered: any such hypersurface has finite index and, in dimension 2, if H ² + c > 0, any such surface must be compact.     

局部对称空间中具有平行平均曲率向量的黎曼叶层的Pinching定理

本文利用Nakagawa和Takagi的计算散度的方法,求出局部对称空间中具有平行平均曲率向量的黎曼叶状结构${\cal F}$上向量场的散度,并证明了其上的整体Pinching定理.     

Generalized Ejiri's Rigidity Theorem for Submanifolds in Pinched Manifolds

Let $M^{n}(n\geq4)$ be an oriented compact submanifold with parallel mean curvature in an $(n+p)$-dimensional complete simply connected Riemannian manifold $N^{n+p}$. Then there exists a constant $\delta(n,p)\in(0,1)$ such that if the sectional curvature of $N$ satisfies $\ov{K}_{N}\in[\delta(n,p), 1]$, and if $M$ has a lower bound for Ricci curvature and an upper bound for scalar curvature, then $N$ is isometric to $S^{n+p}$. Moreover, $M$ is either a totally umbilic sphere $S^n\big(\frac{1}{\sqrt{1+H^2}}\big)$, a Clifford hypersurface $S^{m}\big(\frac{1}{\sqrt{2(1+H^2)}}\big)\times S^{m}\big(\frac{1}{\sqrt{2(1+H^2)}}\big)$ in the totally umbilic sphere $S^{n+1}\big(\frac{1}{\sqrt{1+H^2}}\big)$ with $n=2m$, or $\mathbb{C}P^{2}\big(\frac{4}{3}(1+H^2)\big)$ in $S^7\big(\frac{1}{\sqrt{1+H^2}}\big)$. This is a generalization of Ejiri''s rigidity theorem.