English

Association schemes for diagonal groups

Group Theory 2020-09-25 v2 Combinatorics

Abstract

For any finite group GG, and any positive integer nn, we construct an association scheme which admits the diagonal group Dn(G)D_n(G) as a group of automorphisms. The rank of the association scheme is the number of partitions of nn into at most G|G| parts, so is p(n)p(n) if Gn|G|\ge n; its parameters depend only on nn and G|G|. For n=2n=2, the association scheme is trivial, while for n=3n=3 its relations are the Latin square graph associated with the Cayley table of GG and its complement. A transitive permutation group GG is said to be \emph{AS-free} if there is no non-trivial association scheme admitting GG as a group of automorphisms. A consequence of our construction is that an AS-free group must be either 22-homogeneous or almost simple. We construct another association scheme, finer than the above scheme if n>3n>3, from the Latin hypercube consisting of nn-tuples of elements of GG with product the identity.

Keywords

Cite

@article{arxiv.1905.06569,
  title  = {Association schemes for diagonal groups},
  author = {Peter J. Cameron and Sean Eberhard},
  journal= {arXiv preprint arXiv:1905.06569},
  year   = {2020}
}

Comments

There is an error in Section 2 which invalidates the main result

R2 v1 2026-06-23T09:08:20.063Z