曲面到复Grassmann流形调和映照的若干结果

本文讨论曲面到复Grassmann流形调和映照的若干问题,得到了调和映照 为(?)'-不可约或(?)"-不可约的等价条件,给出了显式计算调和映照迷向阶的方法.     

V-流形间的2-调和映照

本文将２－调和映照从黎曼流形推广到Ｖ－流形,获得了２－调和映照的第一变分和第二变分,得到了２－调和映照成为调和映照的一些充分条件,讨论了Ｖ－流形上２－调和映照的复合映照。     

关于2—调和映照的一个定理

本文研究了 Riemann 流形间2-调和映照的复合映照,获得了一个与调和映照类似的性质。     

Hermitian调和映照的Schwarz引理

由Jost和Yau引进的Hermitian调和映照是Riemannian流形上通常的调和映照在Hermitian流形上的一种自然的类比.本文证明了复分析中经典的Schwarz引理对一大类Hermitian调和映照仍然成立.作为推论,我们得到了半共形Hermitian调和映照的Liouville性质.     

单位圆到水平条形无界区域的调和拟共形映照

研究单位圆盘到水平条形无界区域在原点满足一定规范条件的单叶保向调和映照的解析特征.推导出该类单叶调和映照的解析表示法.得到单位圆盘到水平条形无界区域在原点满足一定规范条件的单叶保向调和映照f(z)成为调和拟共形映照的充分必要条件,对该类调和拟共形映照的系数作出精确估计.作为应用,证明了该类调和拟共形映照的像在欧氏度量下的长度和面积与原像在非欧度量下的偏差定理.本文的结果改进和推广了由Hengartner和Schober所得的相应结论.     

关于稳定调和映照的一点注记

§1 引言设 f 是从紧致 Riemann 流形 M 到 Riemann 流形 N 的一个光滑映照.映照 f 的能量积分定义为E(f)=1/2 integral from M‖df‖~2dV_M.如果映照 f 是能量泛函 E 的一个临界点,则称 f 为从 M 到 N 的调和映照.调和映照f 称为稳定的如果其二阶变分非负.设 S~n 表示 n 维欧氏球面.我们知道不存在从任意紧致 Riemann 流形到 S~n 或从 S~n 到任意 Riemann 流形的非常值稳定调和映照(n≥3).文献[3]、[4]、[5]和[6]进一     

单叶调和映照的反函数

设是在一个单连通区域上的单叶调和映照，我们证明了反函数ｚ＝ｆ－１（）也是调和映照的充要条件是ｆ为下面三类函数之一：（ｉ）单叶共形映照；（ｉｉ）仿射交换映照；（ｉｉｉ）具有形式ｆ（ｚ）＝Ａ［ａｚ＋β＋ｌｏｇ（１－ｅ－ａｚ－β）－ｌｏｇ（１－ｅ－ａｚ－β）］＋Ｂ的调和映照，其中Ａ，Ｂ，α和β是常数且满足条件Ｒ（ａｚ＋β）＞０，Ｚ∈Ｄ．     

锥和类锥调和映照

本文引进了类锥调和映照,考虑了它的性质及其应用,最后得到了球面中极小超曲面的拓扑障碍:设M~n→S~(n 1)是紧致极小超曲面,如果其Gauss映照所对应的类锥调和映照是稳定的,那么M~n允许正数量曲率的度量.     

恒等映照与调和映照

本文对同一底流形配以不同的度量，然后用讨论该流形上恒等映照以及它与Gauss映照复合的调和性同全测地性的方法，对一些熟知的几何概念，如相对调和映照、相对仿射映照、常曲率流形中具常平均曲率的超曲面、Euclid空间中具常Gauss－Kronecker曲率的超曲面等，给出了用调和映照语言表出的新的分析意义．     

关于指数调和映照的若干结果

本文对J.Eells和L.Lemaire最近提出的指数调和映照进行讨论,举例说明了与调和映照的关系,主要讨论了曲率条件下的指数调和映照,守恒律和能量有限条件下的Liouville型定理,第二变分公式和稳定性。     

Harmonic Riemannian maps on locally conformal Kaehler manifolds

We study harmonic Riemannian maps on locally conformal Kaehler manifolds (lcK manifolds). We show that if a Riemannian holomorphic map between lcK manifolds is harmonic, then the Lee vector field of the domain belongs to the kernel of the Riemannian map under a condition. When the domain is Kaehler, we prove that a Riemannian holomorphic map is harmonic if and only if the lcK manifold is Kaehler. Then we find similar results for Riemannian maps between lcK manifolds and Sasakian manifolds. Finally, we check the constancy of some maps between almost complex (or almost contact) manifolds and almost product manifolds.     

CONSTRUCTION OF PLURIHARMONIC MAPS INTO COMPLEX GRASSMANN MANIFOLDS

In this paper, some construction theorems of pluriharmonic maps into complex Grassmann manifolds axe obtained. By these, there exists a characterization of strongly isotropic pluriharmonic maps.     

到复Grassmann流形的多重调和映照的构造

本文给出了一些到复Ｇｒａｓｓｍａｎｎ流形的多重调和映照的构造定理,从而推广了莫小欢,Ｂｕｒｓｔａｌｌ　Ｆ． Ｅ．,Ｗｏｏｄ Ｊ． Ｃ．和 Ｕｄａｇａｗａ Ｓ．的结果．     

Harmonic maps between compact Hermitian manifolds

In this paper, we generalize the Bochner-Kodaira formulas to the case of Hermitian com- plex (possibly non-holomorphic) vector bundles over compact Hermitian (possibly non-K¨ahler) mani- folds. As applications, we get the complex analyticity of harmonic maps between compact Hermitian manifolds.     

Harmonic Maps from Complete Noncompact Manifolds

ln this paper we prove some general existence theorems of harmonic maps from complete noncompact manifolds with tho positive lower bounds of spectrum into convex balls. We solve the Dirichlet problem in classical domains and some special complete noncompact manifolds for harmonic maps into convex balls. We also study the existence of harmonic maps from some special complete noncompact manifolds into complete manifolds with nonpositive sectional curvature which are not simply connected.     

Generalized Big Picard Theorem for pseudo-holomorphic maps

We show how an appropriate choice for affine connections in the target manifold allows the pseudo-holomorphic curves to be realized as harmonic maps. As an application, we present a generalized Big Picard Theorem for pseudo-holomorphic maps between manifolds with almost complex structures.     

A boundary value problem for Hermitian harmonic maps and applications

We study the existence and uniqueness problems for Hermitian harmonic maps from Hermitian manifolds with boundary to Riemannian manifolds of nonpositive sectional curvature and with convex boundary. The complex analyticity of such maps and the related rigidity problems are also investigated.

     

Variational results on flag manifolds: Harmonic maps, geodesics and Einstein metrics

In this paper, we study variational aspects for harmonic maps from M to several types of flag manifolds and the relationship with the rich Hermitian geometry of these manifolds. We consider maps that are harmonic with respect to any invariant metric on each flag manifold. They are called equiharmonic maps. We survey some recent results for the case where M is a Riemann surface or is one dimensional; i.e., we study equigeodesics on several types of flag manifolds. We also discuss some results concerning Einstein metrics on such manifolds.     

Hamiltonian systems on complex Grassmann manifolds. Holonomy and Schrodinger equation

Differential geometric structures such as principal bundles for canonical vector bundles on complex Grassmann manifolds, canonical connection forms on these bundles, canonical symplectic forms on complex Grassmann manifolds, and the corresponding dynamical systems are investigated. Grassmann manifolds are considered as orbits of the co-adjoint action and symplectic forms are described as the restrictions of the canonical Poisson structure to Lie coalgebras. Holonomies of connections on principal bundles over Grassmannians and their relation with Berry phases is considered and investigated for integral curves of Hamiltonian dynamical systems. __________ Translated from Sovremennaya Matematika i Ee Prilozheniya (Contemporary Mathematics and Its Applications), Vol. 22, Algebra and Geometry, 2004.