点的希尔伯特方案的伽罗瓦闭包和基本组成部分

Selecta Mathematica Pub Date : 2024-02-27 DOI:10.1007/s00029-024-00915-9

Matthew Satriano, Andrew P. Staal

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引用次数: 0

摘要

Bhargava 和本文第一作者引入了有限秩环扩展的函数式伽罗瓦闭合操作，概括了格罗滕迪克和卡茨-马祖尔的构造。在本文中，我们概括了伽罗瓦闭合运算，并将其应用于构建一个新的点的希尔伯特方案的不可还原成分的无穷族。我们证明了这些分量是初等的，即它们是在点上支持的代数的参数。此外，我们还通过对合适的社会元素进行模化，产生了从伽罗瓦闭包得到的基本分量的二级族。

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Galois closures and elementary components of Hilbert schemes of points

Bhargava and the first-named author of this paper introduced a functorial Galois closure operation for finite-rank ring extensions, generalizing constructions of Grothendieck and Katz–Mazur. In this paper, we generalize Galois closures and apply them to construct a new infinite family of irreducible components of Hilbert schemes of points. We show that these components are elementary, in the sense that they parametrize algebras supported at a point. Furthermore, we produce secondary families of elementary components obtained from Galois closures by modding out by suitable socle elements.

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Selecta Mathematica

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