The universal Kobayashi-Hitchin correspondence on Hermitian manifolds
著者
書誌事項
The universal Kobayashi-Hitchin correspondence on Hermitian manifolds
(Memoirs of the American Mathematical Society, no. 863)
American Mathematical Society, 2006
大学図書館所蔵 全14件
注記
"Volume 183, number 863 (third of 4 numbers)."
Includes bibliographical references (p. 95-97)
内容説明・目次
内容説明
We prove a very general Kobayashi-Hitchin correspondence on arbitrary compact Hermitian manifolds, and we discuss differential geometric properties of the corresponding moduli spaces. This correspondence refers to moduli spaces of 'universal holomorphic oriented pairs'. Most of the classical moduli problems in complex geometry (e. g. holomorphic bundles with reductive structure groups, holomorphic pairs, holomorphic Higgs pairs, Witten triples, arbitrary quiver moduli problems) are special cases of this universal classification problem.Our Kobayashi-Hitchin correspondence relates the complex geometric concept 'polystable oriented holomorphic pair' to the existence of a reduction solving a generalized Hermitian-Einstein equation. The proof is based on the Uhlenbeck-Yau continuity method. Using ideas from Donaldson theory, we further introduce and investigate canonical Hermitian metrics on such moduli spaces. We discuss in detail remarkable classes of moduli spaces in the non-Kahlerian framework: Oriented holomorphic structures, Quot-spaces, oriented holomorphic pairs and oriented vortices, non-abelian Seiberg-Witten monopoles.
目次
Introduction The finite dimensional Kobayashi-Hitchin correspondence A ""universal"" complex geometric classification problem Hermitian-Einstein pairs Polystable pairs allow Hermitian-Einstein reductions Examples and applications Appendix Bibliography.
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