English

On subgroup perfect codes in vertex-transitive graphs

Combinatorics 2025-01-15 v1

Abstract

A subset CC of the vertex set VV of a graph Γ\Gamma is called a perfect code in Γ\Gamma if every vertex in VCV\setminus C is adjacent to exactly one vertex in CC. Given a group GG and a subgroup HH of GG, a subgroup AA of GG containing HH is called a perfect code of the pair (G,H)(G,H) if there exists a coset graph Cos(G,H,U)\mathrm{Cos}(G,H,U) such that the set of left cosets of HH in AA is a perfect code in Cos(G,H,U)\mathrm{Cos}(G,H,U). In particular, AA is called a perfect code of GG if AA is a perfect code of the pair (G,1)(G,1). In this paper, we give a characterization of AA to be a perfect code of the pair (G,H)(G,H) under the assumption that HH is a perfect code of GG. As a corollary, we derive an additional sufficient and necessary condition for AA to be a perfect code of GG. Moreover, we establish conditions under which AA is not a perfect code of (G,H)(G,H), which is applied to construct infinitely many counterexamples to a question posed by Wang and Zhang [\emph{J.~Combin.~Theory~Ser.~A}, 196 (2023) 105737]. Furthermore, we initiate the study of determining which maximal subgroups of SnS_n are perfect codes.

Keywords

Cite

@article{arxiv.2501.08101,
  title  = {On subgroup perfect codes in vertex-transitive graphs},
  author = {Binzhou Xia and Junyang Zhang and Zhishuo Zhang},
  journal= {arXiv preprint arXiv:2501.08101},
  year   = {2025}
}
R2 v1 2026-06-28T21:05:53.514Z