HAMILTONIAN CONSTRUCTIONS OF KAHLER-EINSTEIN METRICS AND KAHLER-METRICS OF CONSTANT SCALAR CURVATURE

被引：44

作者：

PEDERSEN, H ^{[1
]}

POON, YS ^{[1
]}

机构：

[1] RICE UNIV,DEPT MATH,HOUSTON,TX 77251

来源：

COMMUNICATIONS IN MATHEMATICAL PHYSICS | 1991年 / 136卷 / 02期

关键词：

D O I：

10.1007/BF02100027

中图分类号：

O4 [物理学];

学科分类号：

0702 ;

摘要：

Assuming the existence of a real torus acting through holomorphic isometries on a Kahler manifold, we construct an ansatz for Kahler-Einstein metrics and an ansatz for Kahler metrics with constant scalar curvature. Using this Hamiltonian approach we solve the differential equations in special cases and find, in particular, a family of constant scalar curvature Kahler metrics describing a non-linear superposition of the Bergman metric, the Calabi metric and a higher dimensional generalization of the LeBrun Kahler metric. The superposition contains Kahler-Einstein metrics and all the geometries are complete on the open disk bundle of some line bundle over the complex projective space P(n). We also build such Kahler geometries on Kahler quotients of higher cohomogeneity.

引用

页码：309 / 326

页数：18

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