阿贝利亚变种的标准化

Default journal Pub Date : 1900-01-01 DOI:10.5802/AFST.687

J. Fresnel, M. V. D. Put

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引用次数: 5

摘要

在k的赋值环上，具有较差约简性的完全值域k上的阿贝尔变量Z可以统一到形式方案(或刚性解析空间)的范畴中。这意味着Z≃G/Λ其中G是一个代数群，即一个具有较好约简性的阿贝尔变量通过秩h环面的扩展。在证明中，人们简化到Z =曲线C的雅可比变分的情形。G和Λ的构造使用了Ω上的线束，这是k的赋值环上形式方案范畴中C的全称覆盖。

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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Uniformisation des variétés abéliennes

An abelian variety Z over a complete valued field k, which has a bad reduction, can be uniformized in the category of formal schemes (or rigid analytic spaces) over the valuation ring of k. This means Z ≃ G/Λ where G is an algebraic group, namely an extension of an abelian variety with good reduction by a torus of rank h, and where Λ ≃ Z^h is a discrete subgroup of G. In the proof one reduces to the case where Z = the Jacobian variety of a curve C. The construction of G and Λ uses line bundles on Ω, the universal covering of C in the category of formal schemes over the valuation ring of k.

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