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1.
本文主要研究由两个Riemann度量和一个1-形式构成的Finsler度量.首先,本文给出这类度量局部射影平坦的等价条件;其次,给出这类度量局部射影平坦且具有常旗曲率的分类情形;最后,构造这类度量局部射影平坦且具有常旗曲率K=-1的例子.  相似文献   

2.
邓义华 《数学学报》2007,50(6):1365-137
讨论了一类具有如下形式的Finsler度量F=α+εβ+kβ~2/α+k~2β~4/3α~3-k~3β~6/5α~5,其中α=(a_(ij)y~iy~j)~(1/2)是一个Riemann度量,β=b_iy~i是一个1-形式,ε和k≠0是常数,研究了这类度量的旗曲率性质,得到了F为局部射影平坦的充要条件.  相似文献   

3.
吴志成  钟春平 《数学研究》2008,41(3):223-233
设M是复流形,具有复(α,β)度量F=αφ(|β|/α),其中α为M上的Hermite度量,β为M上的(1,0)形式。本文得到与F相联系的复非线性联络系数Гiμ^i的表达式,且证明了:若β为M上的全纯(1,0)形式,并且关于α的Hermite联络γij^k(z)平行,则F是M上的复Berwald度量;若α是M上的Kaihler度量,则F是M上的强Kahler Finsler度量.  相似文献   

4.
陈永发  严荣沐 《数学学报》2007,50(4):801-804
设(M_1,α),(M_2,β)均为Hermitian流形,本文证明了积流形M_1×M_2上的复Szabó度量F_ε是Berwald度量,且当α,β为K(?)hler度量时,F_ε是强Kahler-Finsler度量,此外本文还给出了F_ε的全纯曲率的显式表达式.  相似文献   

5.
设(M_1,α),(M_2,β)均为Hermitian流形,本文证明了积流形M_1×M_2上的复Szabó度量F_ε是Berwald度量,且当α,β为K(?)hler度量时,F_ε是强Kahler-Finsler度量,此外本文还给出了F_ε的全纯曲率的显式表达式.  相似文献   

6.
关于(α,β) -度量的S -曲率   总被引:1,自引:0,他引:1  
给出(α,β) -度量F=α\phi(β/α)的S -曲率的计算公式. 证得对一般的(α,β) -度量,当β为关于α长度恒定的Killing1 -形式时,S=0.研究了Matsumoto -度量F=α2/(α-β)和(α,α) -度量F=α+εβ+kβ2/α)的S -曲率, 证得S=0当且仅当β为关于α长度恒定的Killing1 -形式.同时还得到这两类度量成为弱Berwald度量的充要条件.其中\phi(s)为光滑函数,α(y)=\sqrt{aij(x)yiyj}为黎曼度量,β(y)=bi(x)yi为非零1 -形式且ε,k≠ 0为常数.  相似文献   

7.
本文研究了一类重要的形如F=α+εβ+βarctan(β/α)(ε为常数)的弱Berwald(α,β)-度量.利用S-曲率公式,获得了这类度量为弱Berwald度量的充要条件.并且还证明了F为具有标量旗曲率的弱Berwald度量当且仅当它们为Berwald度量且旗曲率消失.  相似文献   

8.
研究刻画球对称Finsler度量的射影平坦性质的偏微分方程,通过对射影平坦Finsler度量PDE的研究,构造了两类球对称射影平坦Finsler度量,得到了一些球对称的射影平坦Finsler度量,并进一步给出这些Finsler度量的射影因子和旗曲率.  相似文献   

9.
给出(α,β)-度量F=αФ(α,β)的S-曲率的计算公式.证得对一般的(α,β)-度量,当β为关于α长度恒定的Killing1-形式时,S=0.研究了Matsumoto-度量F=α^2/(α-β)和(α,β),度量F=α+εβ+κ(β^2/α)的S-曲率,证得S=0当且仅当β为关于α长度恒定的Killing1-形式.同时还得到这两类度量成为弱Berwald度量的充要条件,其中Ф(s)为光滑函数,α(y)=√aij(x)y^iy^j为黎曼度量,β(y)=bi(x)y^i为非零1-形式且ε,κ≠0为常数.  相似文献   

10.
程新跃  张婷  袁敏高 《数学杂志》2014,34(3):417-422
本文主要研究了对偶平坦和共形平坦的(α,β)-度量.利用对偶平坦和共形平坦与其测地线的关系,得到了局部对偶平坦和共形平坦的Randers度量是Minkowskian度量的结论.进一步,推广到非Randers型的情形,我们证明了局部对偶平坦和共形平坦的非Randers型的(α,β)-度量在附加的条件下一定是Minkowskian度量.  相似文献   

11.
Let T : X → X be a uniformly continuous homeomorphism on a non-compact metric space (X, d). Denote by X* = X ∪ {x*} the one point compactification of X and T * : X* → X* the homeomorphism on X* satisfying T *|X = T and T *x* = x*. We show that their topological entropies satisfy hd(T, X) ≥ h(T *, X*) if X is locally compact. We also give a note on Katok’s measure theoretic entropy on a compact metric space.  相似文献   

12.
K¨ahler Finsler Metrics Are Actually Strongly K¨ahler   总被引:6,自引:1,他引:5  
In this paper, the Kahler conditions of the Chern-Finsler connection in complex Finsler geometry are studied, and it is proved that Kahler Finsler metrics are actually strongly Kahler.  相似文献   

13.
In this paper, we discuss a class of Finsler metrics defined by a Riemannian metric and a 1-form on a manifold. We characterize weak Landsberg metrics in this class and show that there exist weak Landsberg metrics which are not Landsberg metrics in dimension greater than two.  相似文献   

14.
田范基 《数学杂志》1998,18(3):317-320
本文抓住Boutroux-Cartan定理中关键;用到列与圆,将这个定理推广到一般度量空间上去,然后取一些不同的度量空间得出一序列的结果。  相似文献   

15.
In this paper,the K(a)hler conditions of the Chern-Finsler connection in complex Finsler geometry are studied,and it is proved that K(a)hler Finsler metrics are actually strongly K(a)hler.  相似文献   

16.
17.
Some constructions of projectively flat Finsler metrics   总被引:6,自引:0,他引:6  
In this paper, we find some solutions to a system of partial differential equations that characterize the projectively flat Finsler metrics. Further, we discover that some of these metrics actually have the zero flag curvature.  相似文献   

18.
Let M be a complex n-dimensional manifold endowed with a strongly pseudoconvex complex Finsler metric F. Let M be a complex m-dimensional submanifold of M, which is endowed with the induced complex Finsler metric F. Let D be the complex Rund connection associated with (M, F). We prove that (a) the holomorphic curvature of the induced complex linear connection  on (M, F) and the holomorphic curvature of the intrinsic complex Rund connection ~* on (M, F) coincide; (b) the holomorphic curvature of ~* does not exceed the holomorphic curvature of D; (c) (M, F) is totally geodesic in (M, F) if and only if a suitable contraction of the second fundamental form B(·, ·) of (M, F) vanishes, i.e., B(χ, ι) = 0. Our proofs are mainly based on the Gauss, Codazzi and Ricci equations for (M, F).  相似文献   

19.
In this paper, the Laplacian on the holomorphic tangent bundle T1,0M of a complex manifold M endowed with a strongly pseudoconvex complex Finsler metric is defined and its explicit expression is obtained by using the Chern Finsler connection associated with (M,F). Utilizing the initiated “Bochner technique”, a vanishing theorem for vector fields on the holomorphic tangent bundle T1,0M is obtained.  相似文献   

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