English

Subgroup perfect codes in Cayley graphs

Combinatorics 2020-07-17 v2

Abstract

Let Γ\Gamma be a graph with vertex set V(Γ)V(\Gamma). A subset CC of V(Γ)V(\Gamma) is called a perfect code in Γ\Gamma if CC is an independent set of Γ\Gamma and every vertex in V(Γ)CV(\Gamma)\setminus C is adjacent to exactly one vertex in CC. A subset CC of a group GG is called a perfect code of GG if there exists a Cayley graph of GG which admits CC as a perfect code. A group GG is said to be code-perfect if every proper subgroup of GG is a perfect code of GG. In this paper we prove that a group is code-perfect if and only if it has no elements of order 44. We also prove that a proper subgroup HH of an abelian group GG is a perfect code of GG if and only if the Sylow 22-subgroup of HH is a perfect code of the Sylow 22-subgroup of GG. This reduces the problem of determining when a given subgroup of an abelian group is a perfect code to the case of abelian 22-groups. Finally, we determine all subgroup perfect codes in any generalized quaternion group.

Keywords

Cite

@article{arxiv.1904.01858,
  title  = {Subgroup perfect codes in Cayley graphs},
  author = {Xuanlong Ma and Gary L. Walls and Kaishun Wang and Sanming Zhou},
  journal= {arXiv preprint arXiv:1904.01858},
  year   = {2020}
}

Comments

This is the final version to be published in SIAM Journal on Discrete Mathematics, 18 pp

R2 v1 2026-06-23T08:27:49.417Z