任意维基上雅可比矩阵的N 'eron模型

Pub Date : 2021-03-11 DOI:10.46298/epiga.2022.7340

Thibault Poiret

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引用次数: 1

摘要

我们在一个优秀的局部阶乘方案$S$上处理一个平滑的相对曲线$X_U/ $ U$，并带有节点约简。我们证明了在一个截面的理想层中爆破xu的节点模型可以产生一个新的节点模型，并描述了这些模型如何相互关联。我们构造了xu的雅可比矩阵的N′eron模型，并在S$上局部描述为一个选定的节点模型的picard空间的商。我们为N\'eron模型的分离提供了一个组合准则。

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N\'eron models of Jacobians over bases of arbitrary dimension

We work with a smooth relative curve $X_U/U$ with nodal reduction over an excellent and locally factorial scheme $S$. We show that blowing up a nodal model of $X_U$ in the ideal sheaf of a section yields a new nodal model, and describe how these models relate to each other. We construct a N\'eron model for the Jacobian of $X_U$, and describe it locally on $S$ as a quotient of the Picard space of a well-chosen nodal model. We provide a combinatorial criterion for the N\'eron model to be separated.

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