超椭圆曲线的Galois表示

IF 0.5 4区数学 Q3 MATHEMATICS

Glasgow Mathematical Journal Pub Date : 2022-11-24 DOI:10.1017/S0017089522000386

Ariel Pacetti, Angel Villanueva

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引用次数: 0

摘要

摘要残差特征p的离散赋值环$\mathscr｛O｝$上的超椭圆曲线是由方程$\mathscr｛C｝\；：\；给出的曲线；y^n=\，f（x）$，其中$\textrm｛Disc｝（\，f）\neq为0$。本文的目的是描述在假设f（x）的所有根都在$\mathscr｛O｝$的分式域中并且$p\nmid n$的情况下，附加到这样一条曲线上的伽罗瓦表示。我们的结果受到了Bouw和WewersGlasg（Math.J.59（1）（2017），77–108.）中给出的算法的启发，但我们的描述是根据Dokchitser等人定义的聚类图给出的（代数曲线及其应用，当代数学，第724卷（美国数学学会，普罗维登斯，RI，2019），73–135.）。

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Galois representations of superelliptic curves

Abstract A superelliptic curve over a discrete valuation ring $\mathscr{O}$ of residual characteristic p is a curve given by an equation $\mathscr{C}\;:\; y^n=\,f(x)$ , with $\textrm{Disc}(\,f)\neq 0$ . The purpose of this article is to describe the Galois representation attached to such a curve under the hypothesis that f(x) has all its roots in the fraction field of $\mathscr{O}$ and that $p \nmid n$ . Our results are inspired on the algorithm given in Bouw and WewersGlasg (Math. J. 59(1) (2017), 77–108.) but our description is given in terms of a cluster picture as defined in Dokchitser et al. (Algebraic curves and their applications, Contemporary Mathematics, vol. 724 (American Mathematical Society, Providence, RI, 2019), 73–135.).

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来源期刊

Glasgow Mathematical Journal 数学-数学

CiteScore

1.10

自引率

0.00%

发文量

审稿时长

6-12 weeks

期刊介绍： Glasgow Mathematical Journal publishes original research papers in any branch of pure and applied mathematics. An international journal, its policy is to feature a wide variety of research areas, which in recent issues have included ring theory, group theory, functional analysis, combinatorics, differential equations, differential geometry, number theory, algebraic topology, and the application of such methods in applied mathematics. The journal has a web-based submission system for articles. For details of how to to upload your paper see GMJ - Online Submission Guidelines or go directly to the submission site.