Connectivity of generating graphs of nilpotent groups

Scott Harper, A. Lucchini
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引用次数: 8

Abstract

Let $G$ be $2$-generated group. The generating graph of $\Gamma(G)$ is the graph whose vertices are the elements of $G$ and where two vertices $g$ and $h$ are adjacent if $G=\langle g,h\rangle$. This graph encodes the combinatorial structure of the distribution of generating pairs across $G$. In this paper we study several natural graph theoretic properties related to the connectedness of $\Gamma(G)$ in the case where $G$ is a finite nilpotent group. For example, we prove that if $G$ is nilpotent, then the graph obtained from $\Gamma(G)$ by removing its isolated vertices is maximally connected and, if $|G| \geq 3$, also Hamiltonian. We pose several questions.
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幂零群生成图的连通性
设$G$为$2$生成的组。$\Gamma(G)$的生成图是这样一个图,它的顶点是$G$的元素,其中两个顶点$g$和$h$相邻于$G=\langle g,h\rangle$。该图编码了$G$上生成对分布的组合结构。在$G$是有限幂零群的情况下,研究了与$\Gamma(G)$的连通性有关的几个自然图论性质。例如,我们证明如果$G$是幂零的,那么通过去掉$\Gamma(G)$的孤立顶点得到的图是最大连通的,如果$|G| \geq 3$也是哈密顿的。我们提出了几个问题。
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