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Bochner-Kahler metrics

微分几何 2007-05-23 v3 辛几何

摘要

A Kahler metric is said to be Bochner-Kahler if its Bochner curvature vanishes. This is a nontrivial condition when the complex dimension of the underlying manifold is at least 2. In this article it will be shown that, in a certain well-defined sense, the space of Bochner-Kahler metrics in complex dimension n has real dimension n+1 and a recipe for an explicit formula for any Bochner-Kahler metric will be given. It is shown that any Bochner-Kahler metric in complex dimension n has local (real) cohomogeneity at most n. The Bochner-Kahler metrics that can be `analytically continued' to a complete metric, free of singularities, are identified. In particular, it is shown that the only compact Bochner-Kahler manifolds are the discrete quotients of the known symmetric examples. However, there are compact Bochner-Kahler orbifolds that are not locally symmetric. In fact, every weighted projective space carries a Bochner-Kahler metric. The fundamental technique is to construct a canonical infinitesimal torus action on a Bochner-Kahler metric whose associated momentum mapping has the orbits of its symmetry pseudo-groupoid as fibers.

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引用

@article{arxiv.math/0003099,
  title  = {Bochner-Kahler metrics},
  author = {Robert L. Bryant},
  journal= {arXiv preprint arXiv:math/0003099},
  year   = {2007}
}

备注

93 pages, 3 figures, converted to latex2e with amsart and hyperref packages, more typos corrected, new material and references added about relations with other work, and some statements revised for clarity or historical accuracy