Neighbour-transitive codes in Kneser graphs
Abstract
A code is a subset of the vertex set of a graph and is -neighbour-transitive if its automorphism group acts transitively on each of the first parts of the distance partition , where is the covering radius of . While codes have traditionally been studied in the Hamming and Johnson graphs, we consider here codes in the Kneser graphs. Let be the underlying set on which the Kneser graph is defined. Our first main result says that if is a -neighbour-transitive code in such that has minimum distance at least , then (i.e., is a code in an odd graph) and lies in a particular infinite family or is one particular sporadic example. We then prove several results when is a neighbour-transitive code in the Kneser graph . First, if acts intransitively on we characterise in terms of certain parameters. We then assume that acts transitively on , first proving that if has minimum distance at least then either is an odd graph or has a -homogeneous (and hence primitive) action on . We then assume that is a code in an odd graph and acts imprimitively on and characterise in terms of certain parameters. We give examples in each of these cases and pose several open problems.
Keywords
Cite
@article{arxiv.2307.09752,
title = {Neighbour-transitive codes in Kneser graphs},
author = {Dean Crnković and Daniel R. Hawtin and Nina Mostarac and Andrea Švob},
journal= {arXiv preprint arXiv:2307.09752},
year = {2023}
}