English

Cayley graphs of diameter two from difference sets

Combinatorics 2015-06-19 v1

Abstract

Let C(d,k)C(d,k) and AC(d,k)AC(d,k) be the largest order of a Cayley graph and a Cayley graph based on an abelian group, respectively, of degree dd and diameter kk. When k=2k=2, it is well-known that C(d,2)d2+1C(d,2)\le d^2+1 with equality if and only if the graph is a Moore graph. In the abelian case, we have AC(d,2)d22+d+1AC(d,2)\le \frac{d^2}{2}+d+1. The best currently lower bound on AC(d,2)AC(d,2) is 38d21.45d1.525\frac{3}{8}d^2-1.45 d^{1.525} for all sufficiently large dd. In this paper, we consider the construction of large graphs of diameter 22 using generalized difference sets. We show that AC(d,2)2564d22.1d1.525AC(d,2)\ge \frac{25}{64}d^2-2.1 d^{1.525} for sufficiently large dd and AC(d,2)49d2AC(d,2) \ge \frac{4}{9}d^2 if d=3qd=3q, q=2mq=2^m and mm is odd.

Keywords

Cite

@article{arxiv.1506.05780,
  title  = {Cayley graphs of diameter two from difference sets},
  author = {Alexander Pott and Yue Zhou},
  journal= {arXiv preprint arXiv:1506.05780},
  year   = {2015}
}
R2 v1 2026-06-22T09:56:11.490Z