具有外伽罗瓦点的光滑平面曲线，其约简自同构群为$A_{5}$

IF 0.4 4区数学 Q4 MATHEMATICS Proceedings of the Japan Academy Series A-Mathematical Sciences Pub Date : 2022-10-11 DOI:10.3792/pjaa.98.013

Takeshi Harui, Kei Miura, A. Ohbuchi

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引用次数: 0

摘要

在[8]中，作者将不小于4次光滑平面曲线的自同构群划分为5类。如果曲线有唯一的外伽罗瓦点，则其自同构群与该点处的伽罗瓦群的商群称为约化自同构群，是一维射影线性群的有限子群。本文是[10]和[9]的续集。本文给出了约化自同构群为二十面体群时曲线的定义方程，并给出了满自同构群的描述。

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Smooth plane curves with outer Galois points whose reduced automorphism group is $A_{5}$

: In [8] the ﬁrst author classiﬁed automorphism groups of smooth plane curves of degree not less than four into ﬁve types. If the curve has a unique outer Galois point, then the quotient group of its automorphism group by the Galois group at the point, which is called the reduced automorphism group, is a ﬁnite subgroup of one-dimensional projective linear group. This article is a sequel of [10] and [9]. In this article, we shall determine the deﬁning equation of the curve when the reduced automorphism group is an icosahedral group and give a description of the full automorphism group.

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Proceedings of the Japan Academy Series A-Mathematical Sciences 数学-数学

CiteScore

1.00

自引率

0.00%

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审稿时长

6 months

期刊介绍： The aim of the Proceedings of the Japan Academy, Series A, is the rapid publication of original papers in mathematical sciences. The paper should be written in English or French (preferably in English), and at most 6 pages long when published. A paper that is a résumé or an announcement (i.e. one whose details are to be published elsewhere) can also be submitted. The paper is published promptly if once communicated by a Member of the Academy at its General Meeting, which is held monthly except in July and in August.

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