Einstein-Kaehler Metric on Cartan-Hartogs Domains

机译：签证箱 - 哈特戈斯域的爱因斯坦 - 喀尔勒公民公民

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Cheng and Yau[CY] proved that any C2 bounded pseudoconvex domain Ω in C~n has a complete Einstein-Kahler metric. Without any regularity assumption on the domain Ω, Mok and Yau[MY] proved that the complete Einstein-Kahler metric always exists. This Einstein-Kaehler metric is given by E_Ω(z): = Σ partial deriv~2g/partial deriv z_i partial deriv z_j dz_i dz_j, where g is a 1unique solution to the boundary problem of the Monge-Ampere equation: {det (partial deriv~2g/partial deriv z_ipartial derivz_j)=e~(n+1)g} z∈Ω g=∞ z∈partial derivΩ.

机译：Cheng和Yau [Cy]证明了C〜N中的任何C2有界伪电池域ω都有一个完整的爱因斯坦-Kahler指标。没有在域ω，mok和yau上的任何规律假设证明完整的einstein-kahler度量标准始终存在。该EINSTEIN-Kaehler度量由E_ω（z）给出：=Σ部分eriv〜2g / partive deriv z_i部分deriv z_j dz_i dz_j，其中g是对MOMGE-AMPERE等式的边界问题的一个1UNIQUE解决方案：{DET（部分德国〜2g / partive deriv z_ipartial derivz_j）= e〜（n + 1）g}z∈ωg =∞z∈partialderivω。

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《Beijing International Conference on Several Complex Variables》|2004年||共5页
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作者
WANG An; YIN Weiping; ZHANG Liyou; ZHANG Wenjuan; Capital Normal University(CNU); National Nature Science Foundation of China(NSFC); Abdus Salam International Centre for Theoretical Physics(ICTP);
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中图分类数学;
关键词
cartan-hartogs domain; einstein-kahler metric; holomorphic sectional curvature; generating function;

机译：CARTAN-HARTOGS域;爱因斯坦-Kahler公制;罗形剖面曲率;产生功能;

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1. The computations of Einstein-Kaehler metric of Cartan-Hartogs domain [J] . YIN Xiaolan, ZHAO Xiaoxia Science in China. Series A, Mathematics, physics, astronomy . 2005,第MayS期

机译：Cartan-Hartogs域的Einstein-Kaehler度量的计算
2. The Einstein-Kaehler metrics on Cartan-Hartogs domain of the first type [J] . WANG An Science in China. Series A, Mathematics, physics, astronomy . 2004,第2期

机译：第一类Cartan-Hartogs域上的Einstein-Kaehler度量
3. The Equivalence between Bergman Metric and Einstein-Kahler Metric on the Cartan-Hartogs Domain of the Fourth Type [J] . ZHAO Xiao-xia, LIN Ping 数学季刊：英文版 . 2008,第003期

机译：第四类Cartan-Hartogs域上Bergman度量与Einstein-Kahler度量的等价性
4. Einstein-Kaehler Metric on Cartan-Hartogs Domains [C] . WANG An, YIN Weiping, ZHANG Liyou, Beijing-International Conference on Several Complex Variables(SCV 2004, Beijing); 20041022-27; Beijing(CN) . 2004

机译：关于Cartan-Hartogs域的Einstein-Kaehler度量
5. Boundary behavior of a infinitesimal metric and intrinsic measure on domains and moduli space. [D] . Overholser, Eric Wayne. 2005

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7. Remarks on the canonical metrics on the Cartan-Hartogs domains [O] . Bi, Enchao, Tu, Zhenhan 2017

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8. Einstein-Kaehler metrics with explicit forms on a class of egg domains [R] . 1995

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Einstein-Kaehler Metric on Cartan-Hartogs Domains

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