上推型局部s弧传图的顶点稳定器

IF 0.6 3区数学 Q3 MATHEMATICS

Journal of Algebraic Combinatorics Pub Date : 2024-05-08 DOI:10.1007/s10801-024-01326-x

John van Bon, Chris Parker

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引用次数: 0

摘要

假设 \(\Delta \)是一个厚的、局部有限的、局部为 s 弧的传递 G 图，具有 \(s \ge 4\).对于 \(\Delta \)中的顶点 z，让 \(G_z\) 是 z 的稳定子，而 \(G_z^{[1]}\) 是 \(G_z\) 作用于 z 的邻域的内核。我们说 \(\Delta \)是上推类型的，条件是存在一个素数 p 和一个 1 弧 (x, y)，使得 \(C_{G_z}(O_p(G_z^{[1]}))\le O_p(G_z^{[1]})\) for \(z \in \{x,y\}\) and \(O_p(G_x^{[1]}) \le O_p(G_y^{[1]})\).我们证明，如果 \(\Delta \) 是上推类型，那么 \(O_p(G_x^{[1]})\) 是初等阿贝尔的，并且 \(G_x/G_x^{[1]}\cong X\) 与 \( \textrm{PSL}_2(p^a)\le X \le \mathrm{P\Gamma L}_2(p^a)\).

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Vertex stabilizers of locally s-arc transitive graphs of pushing up type

Suppose that \(\Delta \) is a thick, locally finite and locally s-arc transitive G-graph with \(s \ge 4\). For a vertex z in \(\Delta \), let \(G_z\) be the stabilizer of z and \(G_z^{[1]}\) the kernel of the action of \(G_z\) on the neighbours of z. We say \(\Delta \) is of pushing up type provided there exist a prime p and a 1-arc (x, y) such that \(C_{G_z}(O_p(G_z^{[1]})) \le O_p(G_z^{[1]})\) for \(z \in \{x,y\}\) and \(O_p(G_x^{[1]}) \le O_p(G_y^{[1]})\). We show that if \(\Delta \) is of pushing up type, then \(O_p(G_x^{[1]})\) is elementary abelian and \(G_x/G_x^{[1]}\cong X\) with \( \textrm{PSL}_2(p^a)\le X \le \mathrm{P\Gamma L}_2(p^a)\).

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来源期刊

Journal of Algebraic Combinatorics 数学-数学

CiteScore

1.50

自引率

12.50%

发文量

审稿时长

6-12 weeks

期刊介绍： The Journal of Algebraic Combinatorics provides a single forum for papers on algebraic combinatorics which, at present, are distributed throughout a number of journals. Within the last decade or so, algebraic combinatorics has evolved into a mature, established and identifiable area of mathematics. Research contributions in the field are increasingly seen to have substantial links with other areas of mathematics. The journal publishes papers in which combinatorics and algebra interact in a significant and interesting fashion. This interaction might occur through the study of combinatorial structures using algebraic methods, or the application of combinatorial methods to algebraic problems.