Dong-Qi Wan, Jianbing Liu, Jin Ho Kwak, Jin-Xin Zhou
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引用次数: 0
摘要
枚举几类图覆盖的同构或等价类是枚举拓扑图理论的核心研究课题之一。1988 年,霍夫迈斯特(Hofmeister)枚举了图的双重覆盖,郭(Kwak)和李(Lee)将这项工作扩展到图的 n 重覆盖。对于规则图覆盖,Kwak、Chun 和 Lee 在 Kwak et al. (SIAM J Discrete Math 11:273-285, 1998) 中列举了当覆盖变换群是有限无边群或二面群时图覆盖的同构类。2018年,当覆盖变换群是一个循环群的\(\mathbb {Z}_2\)-扩展时,图覆盖的同构类被列举出来。作为这项工作的延续,我们列举了当覆盖变换群是奇素数整数p的循环群的\(\mathbb {Z}_p\)-扩展时,图覆盖的同构类。
Enumerating regular graph coverings whose covering transformation groups are $$\mathbb {Z}_p$$ -extensions of a cyclic group
Enumerating the isomorphism or equivalence classes of several types of graph coverings is one of the central research topics in enumerative topological graph theory. In 1988, Hofmeister enumerated the double covers of a graph, and this work was extended to n-fold coverings of a graph by Kwak and Lee. For regular graph coverings, Kwak, Chun and Lee enumerated the isomorphism classes of graph coverings when the covering transformation group is a finite abelian or a dihedral group in Kwak et al. (SIAM J Discrete Math 11:273–285, 1998). In 2018, the isomorphism classes of graph coverings are enumerated when the covering transformation groups are \(\mathbb {Z}_2\)-extensions of a cyclic group. As a continuation of this work, we enumerate the isomorphism classes of coverings of a graph when the covering transformation groups are \(\mathbb {Z}_p\)-extensions of a cyclic group for an odd prime integer p.
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.
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