局部对称共形平坦黎曼流形中的紧致子流形

本文讨论局部对称共形平坦黎曼流形中紧子流形问题．改进了［１］的结果并将［２］中关于球面子流形的一个结果推广到局部对称共形平坦黎曼流形子流形．     

局部对称共形平坦空间的极小子流形（Ⅱ）

文［１］的重要结果推广到了环绕空间是局部对称共形平坦的情形，得到了这种空间中极小子流形截面曲率非负时，Ｒｉｃｃｉ曲率应满足的条件，做为应用，得到了比文［１］中结果更强的一个几何结果。     

李奇曲率平行的黎曼流形的曲率张量模长

李安民和赵国松［１］提出了下面的问题：找出李奇曲率平行的黎曼流形的曲率张量模长的最佳拼挤常数并确定达到该值的流形．本文确定了非爱因斯坦流形的最佳拼挤常数和达到该值的黎曼流形．在ｎ１２时，回答了［１］中提出的问题．     

全脐子流形的一个特征

１９７４年Ｍ．Ｏｋｕｍｕｒａ证明［１］：设Ｍｎ（ｎ≥３）为ｎ＋１维单位球面Ｓｎ＋１的紧致常平均曲率超曲面，若其第二基本形式的模长平方则Ｍｎ为全脐超曲面，其中Ｈ为平均曲率．本文目的是把限制常数改为，而且对于余维数大于１的情况也有类似的结果．     

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。     

带边紧流形上热核的Harnack不等式

１９８６年,Ｐ．Ｌｉ与丘成桐给出了带凸边界的紧黎曼流形上关于热核的一个Ｈａｒｎａｃｋ不等式（可参看［６］）,而该文的目的正是将他们的工作推广到可能带非凸边界的紧黎曼流形上．     

李奇曲率平行的黎曼流形到欧氏空间的等距浸入

设ｆ：Ｍｎ→Ｒｎ＋ｐ为具平行李奇曲率的黎曼流形到欧氏空间的等距浸入．对ｐ＝１，本文给出了极小条件下以及平均曲率处处非零条件下该浸入的分类     

Beltrami定理的推广

本文研究了Berwald流形之间的射影对应.利用Berwald流形上Weyl射影曲率张量的射影不变性,证明了当n>2时,与射影平坦的Berwald流形射影对应的黎曼流形M~n是常曲率流形,从而推广了Beltrami定理.     

关于局部对称空间中的极小子流形

本文研究局部对称完备黎曼流形中的紧致极小流形，得到了这类子流形的第二基本形式模长平方的一个拼挤定理，推广了［１］中的结论．     

径向截面曲率有下界黎曼流形的微分同胚定理

研究了径向截面曲率以一类旋转模曲面的Gauss曲率为下界的非紧完备黎曼流形的拓扑,得到了该类黎曼流形与欧氏空间微分同胚的一个合理的充分条件,推广了径向截面曲率有常数下界完备黎曼流形的微分同胚定理.     

Congruence theorems for riemannian submanifolds

The aim of this paper is, essentially, to give sufficient conditions in terms of mean curvature for two submanifolds of a given Riemannian manifold to be congruent modulo a given 1-parameter group of transformations. The results obtained generalise those of several authors including M. Okumura and the present author [11].     

On geodesic mappings of equidistant generalized Riemannian spaces

In this paper geodesic mappings of equidistant generalized Riemannian spaces are discussed. It is proved that each equidistant generalized Riemannian space of basic type admits non-trivial geodesic mapping with preserved equidistant congruence. Especially, there exists non-trivial geodesic mapping of equidistant generalized Riemannian space onto equidistant Riemannian space. An example of geodesic mapping of an equidistant generalized Riemannian spaces is presented.     

Monotonicity of the Complementary Vector Field of a Nonexpansive Map

The Minty-Browder monotonicity notion will be generalized for vector fields of a Riemannian manifold M. If M is a Hadamard manifold, complementary vector fields of maps f : M M will be introduced. If f is nonexpansive it is proved that the complementary vector field of f is monotone. In particular, compositions of projection maps onto convex sets will be considered.     

On the Mean Exit Time for Compact Symmetric Spaces

Given a compact symmetric space, M, we obtain the mean exit time function from a principal orbit, for a Brownian particle starting and moving in a generalized ball whose boundary is the principal orbit. We also obtain the mean exit time flmction of a tube of radius r around special totally geodesic submanifolds P of M. Finally we give a comparison result for the mean exit time function of tubes around submanifolds in Riemannian manifolds, using these totally geodesic submanifolds in compact symmetric spaces as a model.     

The characteristic Chern type classes and integrability of multidimensional differential systems on Riemannian manifolds

The differential-geometric properties of generalized de Rham-Hodge complexes naturally related with integrable multidimensional differential systems of M. Gromov type are analyzed. The geometric structure of Chern type characteristic classes are studied, special differential invariants of the Chern type are constructed. The integrability of multi-dimensional nonlinear differential systems on Riemannian manifolds is discussed. (© 2008 WILEY-VCH Verlag GmbH & Co. KGaA, Weinheim)     

Riemann流形上ρ-(η,d)-B不变凸的向量变分不等式及向量优化问题

该文研究了Riemann流形上的优化问题.首先,利用广义方向导数在Riemann流形上引入ρ-(η,d)-B不变凸函数、ρ-(η,d)-B伪不变凸函数和ρ-(η,d)-B拟不变凸函数.其次,讨论了变分不等式的解与Riemann流形上向量优化问题解之间的关系.最后,建立了优化问题的Kuhn-Tucker充分条件.     

The Centroaffine Volume of Generalized Geodesic Balls Under Inversion at the Sphere

On an analytic Riemannian manifold (M,g), several authors have studied the Taylor expansion for the volume of geodesic balls under the exponential mapping. In the foregoing paper [1] we studied a more general structure (M,D,g), where D is a torsion-free and Ricci-symmetric connection. We calculated the Taylor expansion up to order (n+4) for the volume of what we called a generalized geodesic ball under the exponential mapping in case that all metric notions are Riemannian, while the exponential mapping is induced from the connection D. For the structure $(M,D,{\cal G})$ the coefficients of the Taylor expansion are much more complicated than in the Riemannian case. It is one of the main objectives of the present paper to study centroaffine hypersurfaces in Euclidean space, their geometric invariants which appear in the very complicated coefficient of order (n+4), and their behaviour under polarization (inversion at the unit sphere). Our results complement applications in the foregoing paper [1], where mainly the coefficients up to order (n+2) and geometric consequences have been studied.     

A Curvature Identity on a 4-Dimensional Riemannian Manifold

We recall a curvature identity for 4-dimensional compact Riemannian manifolds as derived from the generalized Gauss–Bonnet formula. We extend this curvature identity to non-compact 4-dimensional Riemannian manifolds. We also give some applications of this curvature identity.     

Hypersurfaces with Constant Mean Curvature in Space Forms

Ｈｙｐｅｒｓｕｒｆａｃｅｓ　ｗｉｔｈ　Ｃｏｎｓｔａｎｔ　Ｍｅａｎ　Ｃｕｒｖａｔｕｒｅ　ｉｎ　Ｓｐａｃｅ　ＦｏｒｍｓＨｙｐｅｒｓｕｒｆａｃｅｓｗｉｔｈＣｏｎｓｔａｎｔＭｅａｎＣｕｒｖａｔｕｒｅｉｎＳｐａｃｅＦｏｒｍｓ￥ＳｏｎｇＨｏｎｇｚａｏ；ＨｕＺｅｊ...     

Three-Dimensional Homogeneous Generalized Ricci Solitons

We study three-dimensional generalized Ricci solitons, both in Riemannian and Lorentzian settings. We shall determine their homogeneous models, classifying left-invariant generalized Ricci solitons on three-dimensional Lie groups.