The Chromatic Number of Finite Group Cayley Tables

Abstract

The chromatic number of a latin square L, denoted (L), is the minimum number of partial transversals needed to cover all of its cells. It has been conjectured that every latin square satisfies (L) ≤ |L|+2. If true, this would resolve a longstanding conjecture---commonly attributed to Brualdi---that every latin square has a partial transversal of size |L|-1. Restricting our attention to Cayley tables of finite groups, we prove two main results. First, we resolve the chromatic number question for Cayley tables of finite Abelian groups: the Cayley table of an Abelian group G has chromatic number |G| or |G|+2, with the latter case occurring if and only if G has nontrivial cyclic Sylow 2-subgroups. Second, we give an upper bound for the chromatic number of Cayley tables of arbitrary finite groups. For |G|≥ 3, this improves the best-known general upper bound from 2|G| to 32|G|, while yielding an even stronger result in infinitely many cases.