Powers of commutators in linear algebraic groups

IF 0.7 3区 数学 Q2 MATHEMATICS
Benjamin Martin
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引用次数: 0

Abstract

Let Abstract Image${\mathcal G}$ be a linear algebraic group over k, where k is an algebraically closed field, a pseudo-finite field or the valuation ring of a non-archimedean local field. Let Abstract Image$G= {\mathcal G}(k)$. We prove that if Abstract Image$\gamma\in G$ such that γ is a commutator and Abstract Image$\delta\in G$ such that Abstract Image$\langle \delta\rangle= \langle \gamma\rangle$ then δ is a commutator. This generalises a result of Honda for finite groups. Our proof uses the Lefschetz principle from first-order model theory.

线性代数群中换元的幂
让 ${\mathcal G}$ 是一个 k 上的线性代数群,其中 k 是一个代数闭域、伪无限域或非拱顶局部域的估值环。让 $G= {\mathcal G}(k)$.我们证明,如果 $\gamma\in G$ 使得 γ 是换元器,并且 $\delta\in G$ 使得 $\langle\delta\rangle= \langle\gamma\rangle$ 那么 δ 是换元器。这概括了本田对有限群的一个结果。我们的证明使用了一阶模型理论中的 Lefschetz 原则。
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来源期刊
CiteScore
1.10
自引率
0.00%
发文量
49
审稿时长
6 months
期刊介绍: The Edinburgh Mathematical Society was founded in 1883 and over the years, has evolved into the principal society for the promotion of mathematics research in Scotland. The Society has published its Proceedings since 1884. This journal contains research papers on topics in a broad range of pure and applied mathematics, together with a number of topical book reviews.
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