gaduchon astheno-Kahler流形上有限向量束的表征

IF 0.9 Q2 MATHEMATICS Epijournal de Geometrie Algebrique Pub Date : 2017-11-01 DOI:10.46298/epiga.2018.volume2.4209

I. Biswas, Vamsi Pingali

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引用次数: 3

摘要

射影变量X上的向量束E如果满足一个具有积分系数的非平凡多项式方程，则称为有限。nori的一个定理表明E是有限的当且仅当E对X的有限的等值覆盖的回拉是平凡的。当X是紧复流形时，我们证明了同样的命题，该流形承认一个高杜雄astheno-Kahler度量。

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A characterization of finite vector bundles on Gauduchon astheno-Kahler manifolds

A vector bundle E on a projective variety X is called finite if it satisfies a nontrivial polynomial equation with integral coefficients. A theorem of Nori implies that E is finite if and only if the pullback of E to some finite etale Galois covering of X is trivial. We prove the same statement when X is a compact complex manifold admitting a Gauduchon astheno-Kahler metric.

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