English

Semi-regular Relative Difference Sets with Large Forbidden Subgroups

Combinatorics 2008-01-23 v1

Abstract

Motivated by a connection between semi-regular relative difference sets and mutually unbiased bases, we study relative difference sets with parameters (m,n,m,m/n)(m,n,m,m/n) in groups of non-prime-power orders. Let pp be an odd prime. We prove that there does not exist a (2p,p,2p,2)(2p,p,2p,2) relative difference set in any group of order 2p22p^2, and an abelian (4p,p,4p,4)(4p,p,4p,4) relative difference set can only exist in the group Z22×Z32\Bbb{Z}_2^2\times \Bbb{Z}_3^2. On the other hand, we construct a family of non-abelian relative difference sets with parameters (4q,q,4q,4)(4q,q,4q,4), where qq is an odd prime power greater than 9 and q1q\equiv 1 (mod 4). When q=pq=p is a prime, p>9p>9, and pp\equiv 1 (mod 4), the (4p,p,4p,4)(4p,p,4p,4) non-abelian relative difference sets constructed here are genuinely non-abelian in the sense that there does not exist an abelian relative difference set with the same parameters.

Keywords

Cite

@article{arxiv.0801.3394,
  title  = {Semi-regular Relative Difference Sets with Large Forbidden Subgroups},
  author = {Tao Feng and Qing Xiang},
  journal= {arXiv preprint arXiv:0801.3394},
  year   = {2008}
}
R2 v1 2026-06-21T10:05:17.064Z