F2 上交映群的单星形子群

IF 1 3区 数学 Q1 MATHEMATICS
Alexandre Zalesski
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引用次数: 0

摘要

如果一个线性群的每个元素的特征值都是 1,那么这个线性群就被称为单星群。在本文中,我们开发了一些研究单星不可还原线性群的一般机制。研究这类群的动机来自多个方面,包括代数几何、伽罗华理论、有限群理论和表示理论。特别是,无方变体理论的某个方面需要了解双元域上交点群的单星不可还原子群,本文将集中讨论一般问题的这一特例。一个更特殊但更重要的问题是,在特定度数的交映群中是否存在这样的子群。我们几乎回答了所有度数 2n<250 的问题,具体地说,只有 7 个 n 值的问题仍然悬而未决。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Unisingular subgroups of symplectic groups over F2

A linear group is called unisingular if every element of it has eigenvalue 1. In this paper we develop some general machinery for the study of unisingular irreducible linear groups. A motivation for the study of such groups comes from several sources, including algebraic geometry, Galois theory, finite group theory and representation theory. In particular, a certain aspect of the theory of abelian varieties requires the knowledge of unisingular irreducible subgroups of the symplectic groups over the field of two elements, and in this paper we concentrate on this special case of the general problem. A more special but important question is that of the existence of such subgroups in the symplectic groups of particular degrees. We answer this question for almost all degrees 2n<250, specifically, the question remains open only 7 values of n.

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来源期刊
CiteScore
2.20
自引率
9.10%
发文量
333
审稿时长
13.8 months
期刊介绍: Linear Algebra and its Applications publishes articles that contribute new information or new insights to matrix theory and finite dimensional linear algebra in their algebraic, arithmetic, combinatorial, geometric, or numerical aspects. It also publishes articles that give significant applications of matrix theory or linear algebra to other branches of mathematics and to other sciences. Articles that provide new information or perspectives on the historical development of matrix theory and linear algebra are also welcome. Expository articles which can serve as an introduction to a subject for workers in related areas and which bring one to the frontiers of research are encouraged. Reviews of books are published occasionally as are conference reports that provide an historical record of major meetings on matrix theory and linear algebra.
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