广义煎饼图中圈的长度

Saúl A. Blanco, Charles Buehrle
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引用次数: 1

摘要

本文研究了由前缀反转生成的广义对称群$S(m,n)$的Cayley图,即广义煎饼图的边缘上可以嵌入的圈的长度。广义对称群$S(m,n)$是阶循环群$m$与阶对称群$n!$的环积。我们主要关注底层的\emph{无向}图,用$\mathbb{P}_m(n)$表示。当循环群有一个或两个元素时,这些图分别同构于煎饼图和烧焦煎饼图。我们证明了当循环群有三个元素时,$\mathbb{P}_3(n)$具有所有可能长度的循环,从而类似于煎饼图和烧焦煎饼图的类似性质。此外,$\mathbb{P}_4(n)$有所有的偶数长度的循环。我们利用这些结果作为基本情况,并证明如果$m>2$是偶数,则$\mathbb{P}_m(n)$具有从其周长到哈密顿循环的所有偶数长度的循环。此外,当$m>2$为奇数时,$\mathbb{P}_m(n)$具有从其周长到哈密顿周期的所有长度的循环。我们进一步表明,$\mathbb{P}_m(n)$的周长为$\min\{m,6\}$如果$m\geq3$,从而补充了已知的结果 $m=1,2.$
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Lengths of Cycles in Generalized Pancake Graphs
In this paper, we consider the lengths of cycles that can be embedded on the edges of the generalized pancake graphs which are the Cayley graph of the generalized symmetric group $S(m,n)$, generated by prefix reversals. The generalized symmetric group $S(m,n)$ is the wreath product of the cyclic group of order $m$ and the symmetric group of order $n!$. Our main focus is the underlying \emph{undirected} graphs, denoted by $\mathbb{P}_m(n)$. In the cases when the cyclic group has one or two elements, these graphs are isomorphic to the pancake graphs and burnt pancake graphs, respectively. We prove that when the cyclic group has three elements, $\mathbb{P}_3(n)$ has cycles of all possible lengths, thus resembling a similar property of pancake graphs and burnt pancake graphs. Moreover, $\mathbb{P}_4(n)$ has all the even-length cycles. We utilize these results as base cases and show that if $m>2$ is even, $\mathbb{P}_m(n)$ has all cycles of even length starting from its girth to a Hamiltonian cycle. Moreover, when $m>2$ is odd, $\mathbb{P}_m(n)$ has cycles of all lengths starting from its girth to a Hamiltonian cycle. We furthermore show that the girth of $\mathbb{P}_m(n)$ is $\min\{m,6\}$ if $m\geq3$, thus complementing the known results for $m=1,2.$
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