共查询到19条相似文献,搜索用时 215 毫秒
1.
一类Reinhardt域的Einstein-Kahler度量及其曲率 总被引:1,自引:0,他引:1
本文给出Cn中一类Reinhardt域D0(K)的使Ricci曲率为-1的Einstein-Kahler度量的显表达式,更有兴趣的是其全纯截曲率也是常数,等于一2(n+1)_(-1)。并给出在此度量下的全部调和函数 相似文献
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本文证明了两个定理:(1)设DCn是一个完备的圆型域,若且对任意.则D对ρD而言是完备的.(2)令D是Cn中的有界域,若其 Bergman核函数KD(z,)满足下列条件:(i)KD(z,)在 D x(D∪ D)连续;(ii)对任何 P ∈D,有lim KD(z,z)= +∞.则 D对 ρD而言是完备的.作为其应用,还证明了Cartan-Hartogs域在其 Bergman度量下是完备的. 相似文献
3.
本文把[1]的结果推广到更广泛的一类Reinhardt域D=D(k1k2…kp) C(1≤p<n),即利用D的解析自同构群Aut(D)下不变函数给出了域D在Aut(D)下不变的Kahler度量. 相似文献
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本文利用Kahler-Einstein流形的模空间思想,证明了非光滑三次代数曲面簇上Kahler-Einsteinorbifold度量的一个存在性定理。 相似文献
6.
度量方程应用于Krause定理的推广 总被引:1,自引:0,他引:1
本文用距离几何的方法证明了主要定理,对曲率为K的n维常曲率空间,其内任意n+1个n-1维球Si(i=1,2,…,n+1),它们中的任一个都与其它球不变,则与Si交角为βi(i=1,2,…,n+1)的n-1维一般有2^n+1个,当n为偶数时,它们的测地线曲率之交错和为零;当n为奇数时,此结论不成立,该定理包括非欧情形,而当n=2,βi=1(i=1,2,…,n+1)时,就是iilkerJB在「1」中所 相似文献
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本文首先对紧致的度量拓扑空间证明了有限点集的费马点是存在的,其次,运用度量几何的经典方法考察了度量空间(包括双曲空间和Banach空间)中有限点集的费马点的唯一性,此外,还对n维欧氏空间E^n中有限点集的费马作了进一步研究。 相似文献
8.
第三类超Cartan域上的比较定理 总被引:1,自引:0,他引:1
本文给出了第三类超Cartan域上不变Kalher度量下的全纯截曲率的表达式.利用其Bergman度量的完备性,构造了一个不比Bergman度量小的完备的不变Kalher度量,证明了在此Kalher度量下的全纯截曲率有一个负上界,从而证明了第三类超Cartan域的Bergman度量与Kobayashi度量的比较定理. 相似文献
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把文[1]中结果推广到Reinhardt域D=D(K1K2…Kp)C(1≤p<n).即证明了从域D的任一不变Khler度量都可以导出相同的Aut(D) 相似文献
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Comparison theorem on Cartan-Hartogs domain of the first type 总被引:1,自引:0,他引:1
In this paper the holomorphic sectional curvature under invariant Kahler metrics on Cartan-Hartogs domain of the first type
are given in explicit forms. In the meantime, we construct an invariant Kahler metric, which is not less than Bergman metric
such that its holomorphic sectional curvature is bounded from above by a negative constant. Hence we obtain the comparison
theorem for the Bergman metric and Kobayashi metric on Cartan-Hartogs domain of the first type. 相似文献
12.
Wei-ping Yin & An WANG School of Mathematical Sciences Capital Normal University Beijing China 《中国科学A辑(英文版)》2007,50(2):183-200
In this paper we study the complete invariant metrics on Cartan-Hartogs domains which are the special types of Hua domains. Firstly, we introduce a class of new complete invariant metrics on these domains, and prove that these metrics are equivalent to the Bergman metric. Secondly, the Ricci curvatures under these new metrics are bounded from above and below by the negative constants. Thirdly, we estimate the holomorphic sectional curvatures of the new metrics, and prove that the holomorphic sectional curvatures are bounded from above and below by the negative constants. Finally, by using these new metrics and Yau's Schwarz lemma we prove that the new metrics are equivalent to the Einstein-Kahler metric. That means that the Yau's conjecture is true on Cartan-Hartogs domains. 相似文献
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《复变函数与椭圆型方程》2012,57(3):183-201
In this paper, we give the holomorphic sectional curvature under invariant Kähler metric on a Cartan-Hartogs domain of the third type Y III (N,q,K) and construct an invariant Kähler metric, which is complete and not less than the Bergman metric, such that its holomorphic sectional curvature is bounded above by a negative constant. Hence we obtain a comparison theorem for the Bergman and Kobayashi metrics on Y III (N,q,K). 相似文献
14.
Two alternate arguments in the framework of intrinsic metrics and measures respectively of part of the proof of a famous theorem due to Qi-Keng Lu on Bergman metric with constant negative holomorphic sectional curvature are presented.A relationship between the Lu constant and the holo- morphic sectional curvature of the Bergman metric is given.Some recent progress of the Yau's porblem on the characterization of domain of holomorphy on which the Bergman metric is K(?)hler-Einstein is described. 相似文献
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Let YI be the Cartan-Hartogs domain of the first type. We give the generating function of the Einstein-Kahler metrics on YI, the holomorphic sectional curvature of the invariant Einstein-Kahler metrics on YI. The comparison theorem of complete Einstein-Kahler metric and Kobayashi metric on YI is provided for some cases. For the non-homogeneous domain YI, when K =mn+1/m+n,m>1, the explicit forms of the complete Einstein-Kahler metrics are obtained. 相似文献
16.
第四类Caftan-Hartogs域上Bergman度量与Einstein-Kahler度量等价 总被引:1,自引:0,他引:1
In this paper,we discuss the invariaut complete metric on the Cartan-Hartogs domain of the fourth type.Firstly,we find a new invariant complete metric,and prove the equivalence between Bergman metric and the new metric;Secondly,the Ricci curvature of the new metric has the super bound and lower bound;Thirdly,we prove that the holomorphic sectional curvature of the new metric has the negative supper bound;Finally,we obtain the equivalence between Bergman metric and Einstein-Kahler metric on the Cartan-Hartogs domain of the fourth type. 相似文献
17.
We present a method for constructing global holomorphic peak functions from local holomorphic support functions for broad classes of unbounded domains in \(\mathbb {C}^n\). As an application, we establish a method for showing the positivity and completeness of invariant metrics including the Bergman metric mainly for the unbounded domains. 相似文献
18.
本文研究的是华罗庚域的特殊类型第二类Cartan-Hartogs域的不变Bergman度量与Kahler-Einstein度量的等价问题.引入一种与Bergman度量等价的新的完备的Kahler度量ωgλ,其Ricci曲率和全纯截取率具有负的上下界.然后应用丘成桐对Schwarz引理的推广证明ωgλ等价于Kahler-Einstein度量,从而得到了Bergman度量与Khhler-Einstein度量的等价,即丘成桐关于度量等价的猜想在第二类Cartan-Hartogs域上成立. 相似文献
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第一类超Cartan域上的不变度量 总被引:2,自引:0,他引:2
首先证明超Cartan域Y_I(k;N;m,n)为凸域的充分必要条件是2k■m;接着讨论了在超Cartan域上四类经典的不变度量,即Bergman度量、Caratheodory度量、Kobayashi度量和Einstein-Kahler度量的等价性;最后通过计算得到了超Cartan域Y_I(1;N;2,n)和Y_I(2;N;2,n)上的Caratheodory度量(和Kobayashi度量)的显表达式. 相似文献