负向量束相关奇点的不可还原去奇点化的唯一性

Fusheng Deng, Yinji Li, Qunhuan Liu, Xiangyu Zhou
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引用次数: 0

摘要

我们证明了紧凑复流形上负全形向量束的格劳厄特下吹给出的奇点的不可还原去奇点化是唯一的,直到同构;作为应用,我们证明了紧凑复流形上的两个负线束是同构的,当且仅当它们的格劳厄特下吹在奇点附近有同构的胚芽。我们还证明了将复流形的子流形修正为超曲面的唯一方法,即沿子流形吹胀环境流形。
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Uniqueness of irreducible desingularization of singularities associated to negative vector bundles
We prove that the irreducible desingularization of a singularity given by the Grauert blow down of a negative holomorphic vector bundle over a compact complex manifold is unique up to isomorphism, and as an application, we show that two negative line bundles over compact complex manifolds are isomorphic if and only if their Grauert blow downs have isomorphic germs near the singularities. We also show that there is a unique way to modify a submanifold of a complex manifold to a hypersurface, namely, the blow up of the ambient manifold along the submanifold.
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