On regular sets in Cayley graphs
Abstract
Let be a graph and nonnegative integers. An -regular set in is a nonempty proper subset of such that every vertex in has exactly neighbours in and every vertex in has exactly neighbours in . A -regular set is called a perfect code, an efficient dominating set, or an independent perfect dominating set. A subset of a group is called an -regular set of if it is an -regular set in some Cayley graph of , and an -regular set in a Cayley graph of is called a subgroup -regular set if it is also a subgroup of . In this paper we study -regular sets in Cayley graphs with a focus on -regular sets, where is an integer. Among other things we determine when a non-trivial proper normal subgroup of a group is a -regular set of the group. We also determine all subgroup -regular sets of dihedral groups and generalized quaternion groups. We obtain necessary and sufficient conditions for a hypercube or the Cartesian product of copies of the cycle of length to admit -regular sets, where is an odd prime. Our results generalize several known results from perfect codes to -regular sets.
Keywords
Cite
@article{arxiv.2310.01793,
title = {On regular sets in Cayley graphs},
author = {Xiaomeng Wang and Shou-Jun Xu and Sanming Zhou},
journal= {arXiv preprint arXiv:2310.01793},
year = {2024}
}
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27 pages