On the Classification of Binary Completely Transitive Codes with Almost-Simple Top-Group
Abstract
A code in the Hamming metric, that is, is a subset of the vertex set of the Hamming graph , gives rise to a natural distance partition , where is the covering radius of . Such a code is called completely transitive if the automorphism group acts transitively on each of the sets , , \ldots, . A code is called -neighbour-transitive if and acts transitively on each of , and . Let be a completely transitive code in a binary () Hamming graph having full automorphism group and minimum distance . Then it is known that induces a -homogeneous action on the coordinates of the vertices of the Hamming graph. The main result of this paper classifies those for which this induced -homogeneous action is not an affine, linear or symplectic group. We find that there are such codes, of which are non-linear codes. Though most of the codes are well-known, we obtain several new results. First, a new non-linear completely transitive code is constructed, as well as a related non-linear code that is -neighbour-transitive but not completely transitive. Moreover, new proofs of the complete transitivity of several codes are given. Additionally, we answer the question of the existence of distance-regular graphs related to the completely transitive codes appearing in our main result.
Keywords
Cite
@article{arxiv.2012.08436,
title = {On the Classification of Binary Completely Transitive Codes with Almost-Simple Top-Group},
author = {Robert F. Bailey and Daniel R. Hawtin},
journal= {arXiv preprint arXiv:2012.08436},
year = {2022}
}