Scrollar invariants, syzygies and representations of the symmetric group

IF 1.2 1区数学 Q1 MATHEMATICS

Journal fur die Reine und Angewandte Mathematik Pub Date : 2022-01-17 DOI:10.1515/crelle-2022-0088

W. Castryck, F. Vermeulen, Yongqiang Zhao

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引用次数: 2

Abstract

Abstract We give an explicit minimal graded free resolution, in terms of representations of the symmetric group S d {S_{d}} , of a Galois-theoretic configuration of d points in 𝐏 d - 2 {\mathbf{P}^{d-2}} that was studied by Bhargava in the context of ring parametrizations. When applied to the geometric generic fiber of a simply branched degree d cover of 𝐏 1 {\mathbf{P}^{1}} by a relatively canonically embedded curve C, our construction gives a new interpretation for the splitting types of the syzygy bundles appearing in its relative minimal resolution. Concretely, our work implies that all these splitting types consist of scrollar invariants of resolvent covers. This vastly generalizes a prior observation due to Casnati, namely that the first syzygy bundle of a degree 4 cover splits according to the scrollar invariants of its cubic resolvent. Our work also shows that the splitting types of the syzygy bundles, together with the multi-set of scrollar invariants, belong to a much larger class of multi-sets of invariants that can be attached to C → 𝐏 1 {C\to\mathbf{P}^{1}} : one for each irreducible representation of S d {S_{d}} , i.e., one for each partition of d.

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对称群的滚动不变量、协同和表示

摘要本文给出了Bhargava在环参数化背景下研究的𝐏d-2 {\mathbf{P}^{d-2}}中d点的伽罗瓦理论组态的显式最小梯度自由分辨率，其表示为对称群S d {S_{d}}。当我们的构造应用于𝐏1 {\mathbf{P}^{1}}的简支度d覆盖的几何一般纤维时，我们给出了在其相对最小分辨率中出现的syzygy束的分裂类型的新解释。具体地说，我们的工作表明所有这些分裂类型都是由可解覆盖的滚动不变量组成的。这极大地推广了先前由于Casnati的观察，即4度覆盖的第一个syzygy束根据其三次解的滚动不变量分裂。我们的工作还表明，syzygy束的分裂类型，连同滚动不变量的多集，属于一个更大的多不变量集，可以附加到C→𝐏1 {C\to\mathbf{P}^{1}}:对于S d {S_{d}}的每个不可约表示一个，即对于d的每个划分一个。

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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来源期刊

Journal fur die Reine und Angewandte Mathematik 数学-数学

CiteScore

2.50

自引率

6.70%

发文量

审稿时长

6-12 weeks

期刊介绍： The Journal für die reine und angewandte Mathematik is the oldest mathematics periodical still in existence. Founded in 1826 by August Leopold Crelle and edited by him until his death in 1855, it soon became widely known under the name of Crelle"s Journal. In the almost 180 years of its existence, Crelle"s Journal has developed to an outstanding scholarly periodical with one of the worldwide largest circulations among mathematics journals. It belongs to the very top mathematics periodicals, as listed in ISI"s Journal Citation Report.