Smooth quotients of abelian surfaces by finite groups that fix the origin

IF 0.6 Q3 MATHEMATICS Cubo Pub Date : 2018-09-12 DOI:10.4067/S0719-06462022000100037

Robert Auffarth, G. Arteche, Pablo Quezada

引用次数: 6

Abstract

Let $A$ be an abelian surface and let $G$ be a finite group of automorphisms of $A$ fixing the origin. Assume that the analytic representation of $G$ is irreducible. We give a classification of the pairs $(A,G)$ such that the quotient $A/G$ is smooth. In particular, we prove that $A=E^2$ with $E$ an elliptic curve and that $A/G\simeq\mathbb P^2$ in all cases. Moreover, for fixed $E$, there are only finitely many pairs $(E^2,G)$ up to isomorphism. This completes the classification of smooth quotients of abelian varieties by finite groups started by the first two authors.

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固定原点的有限群的阿贝尔曲面的光滑商

设$A$是阿贝尔曲面，设$G$是固定原点的$A$的自同构的有限群。假设$G$的解析表示是不可约的。我们给出了对$（a，G）$的分类，使得商$a/G$是光滑的。特别地，我们证明了$A=E^2$，其中$E$是一条椭圆曲线，并且在所有情况下都证明了$A/G\simeq\mathbb P^2$。此外，对于固定的$E$，到同构只有有限多对$（E^2，G）$。这就完成了由前两位作者开始的有限群对阿贝尔变种的光滑商的分类。

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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