English

On the Classification of Binary Completely Transitive Codes with Almost-Simple Top-Group

Combinatorics 2022-08-02 v2

Abstract

A code CC in the Hamming metric, that is, is a subset of the vertex set VΓV\varGamma of the Hamming graph Γ=H(m,q)\varGamma=H(m,q), gives rise to a natural distance partition {C,C1,,Cρ}\{C,C_1,\ldots,C_\rho\}, where ρ\rho is the covering radius of CC. Such a code CC is called completely transitive if the automorphism group Aut(C)\rm{Aut}(C) acts transitively on each of the sets CC, C1C_1, \ldots, CρC_\rho. A code CC is called 22-neighbour-transitive if ρ2\rho\geq 2 and Aut(C)\rm{Aut}(C) acts transitively on each of CC, C1C_1 and C2C_2. Let CC be a completely transitive code in a binary (q=2q=2) Hamming graph having full automorphism group Aut(C)\rm{Aut}(C) and minimum distance δ5\delta\geq 5. Then it is known that Aut(C)\rm{Aut}(C) induces a 22-homogeneous action on the coordinates of the vertices of the Hamming graph. The main result of this paper classifies those CC for which this induced 22-homogeneous action is not an affine, linear or symplectic group. We find that there are 1313 such codes, 44 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 22-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}
}
R2 v1 2026-06-23T20:59:31.642Z