Hamilton transversals in random Latin squares

Abstract

Gy\'arf\'as and S\'ark\"ozy conjectured that every n× n Latin square has a `cycle-free' partial transversal of size n-2. We confirm this conjecture in a strong sense for almost all Latin squares, by showing that as n → ∞, all but a vanishing proportion of n× n Latin squares have a Hamilton transversal, i.e. a full transversal for which any proper subset is cycle-free. In fact, we prove a counting result that in almost all Latin squares, the number of Hamilton transversals is essentially that of Taranenko's upper bound on the number of full transversals. This result strengthens a result of Kwan (which in turn implies that almost all Latin squares also satisfy the famous Ryser-Brualdi-Stein conjecture).