Integral cohomology of quotients via toric geometry

Pub Date : 2019-08-16 DOI:10.46298/epiga.2022.volume6.5762

Gr'egoire Menet

引用次数: 5

Abstract

We describe the integral cohomology of $X/G$ where $X$ is a compact complex manifold and $G$ a cyclic group of prime order with only isolated fixed points. As a preliminary step, we investigate the integral cohomology of toric blow-ups of quotients of $\mathbb{C}^n$. We also provide necessary and sufficient conditions for the spectral sequence of equivariant cohomology of $(X,G)$ to degenerate at the second page. As an application, we compute the Beauville--Bogomolov form of $X/G$ when $X$ is a Hilbert scheme of points on a K3 surface and $G$ a symplectic automorphism group of orders 5 or 7.

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经由环几何的商的积分上同调

描述了$X/G$的积分上同调，其中$X$是紧复流形，$G$是只有孤立不动点的素阶循环群。作为第一步，我们研究了$\mathbb{C}^n$的环膨胀商的积分上同调性。在第二页给出了$(X,G)$等变上同调谱序列简并的充分必要条件。作为应用，我们计算了当$X$是aK3曲面上点的Hilbert格式，$G$是5阶或7阶辛自同构群时$X/G$的beauville—Bogomolov形式。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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