论发散复几何积分的有限部分及其与赫米蒂公设选择的关系

Ludvig Svensson
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引用次数: 0

摘要

让 X 是一个纯维度的还原复数空间。我们考虑 X 上某些形式的发散积分,这些发散积分沿着某个全纯向量束 \(E \rightarrow X\) 的全纯段的零集定义的子维奇异。给定 E 上赫米特度量的选择,我们定义发散积分的有限部分。我们的主要结果是有限部分对度量选择的依赖性的明确公式。
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On Finite Parts of Divergent Complex Geometric Integrals and Their Dependence on a Choice of Hermitian Metric

Let X be a reduced complex space of pure dimension. We consider divergent integrals of certain forms on X that are singular along a subvariety defined by the zero set of a holomorphic section of some holomorphic vector bundle \(E \rightarrow X\). Given a choice of Hermitian metric on E we define a finite part of the divergent integral. Our main result is an explicit formula for the dependence on the choice of metric of the finite part.

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