李代数g2∧so(7)、结合3平面和so(4)子代数的观察

IF 0.8 4区数学 Q2 MATHEMATICS

Expositiones Mathematicae Pub Date : 2022-12-01 DOI:10.1016/j.exmath.2022.10.004

Max Chemtov , Spiro Karigiannis

引用次数: 1

摘要

我们对李代数g2∧so(7)、结合3-平面和so(4)子代数作了若干观察。有些可能是众所周知的，但不容易在文献中找到，而其他结果是新的。我们证明了一个元素X∈g2不能有秩2，如果它有秩4，那么它的核是一个结合子空间。我们证明了g2元素的一个标准形式定理。给定R7中的一个结合的3平面P，构造一个与so(4)同构的so(7)=Λ2(R7)的李子代数Θ(P)。这个so(4)子代数不同于其他已知的由结合3平面确定的so(7)的so(4)子代数的构造。这些是NSERC本科生研究项目的结果。这篇论文是为了让广大读者都能读懂而写的。

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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Observations about the Lie algebra g2⊂so(7), associative 3-planes, and so(4) subalgebras

We make several observations relating the Lie algebra $g_{2} \subset so (7)$ , associative 3-planes, and $so (4)$ subalgebras. Some are likely well-known but not easy to find in the literature, while other results are new. We show that an element $X \in g_{2}$ cannot have rank 2, and if it has rank 4 then its kernel is an associative subspace. We prove a canonical form theorem for elements of $g_{2}$ . Given an associative 3-plane $P$ in $R^{7}$ , we construct a Lie subalgebra $Θ (P)$ of $so (7) = Λ^{2} (R^{7})$ that is isomorphic to $so (4)$ . This $so (4)$ subalgebra differs from other known constructions of $so (4)$ subalgebras of $so (7)$ determined by an associative 3-plane. These are results of an NSERC undergraduate research project. The paper is written so as to be accessible to a wide audience.

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来源期刊

Expositiones Mathematicae 数学-数学

CiteScore

1.30

自引率

0.00%

发文量

审稿时长

40 days

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