共查询到19条相似文献,搜索用时 46 毫秒
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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
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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
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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
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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
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关于(α,β) -度量的S -曲率 总被引:1,自引:0,他引:1
崔宁伟 《数学物理学报(A辑)》2006,26(6):1047
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
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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
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崔宁伟 《数学物理学报(A辑)》2006,26(B12):1047-1056
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
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周云华 《数学物理学报(B辑英文版)》2011,31(1):102-108
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
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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
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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
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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
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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
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Some constructions of projectively flat Finsler metrics 总被引:6,自引:0,他引:6
MO Xiaohuan SHEN Zhongmin & YANG Chunhong LMAM School of Mathematical Sciences Peking University Beijing China Department of Mathematical Sciences Indiana University-Purdue University Indianapolis IN - USA Department of Mathematics Inner Mongolia University Hohhot China 《中国科学A辑(英文版)》2006,49(5):703-714
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
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ZHONG ChunPing School of Mathematical Sciences Xiamen University Xiamen China 《中国科学 数学(英文版)》2010,(2)
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
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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