Pairs of MOLS of order ten satisfying non-trivial relations

Abstract

A relation on a k-net(n) (or, equivalently, a set of k-2 mutually orthogonal Latin squares of order n) is an F2 linear dependence within the incidence matrix of the net. Dukes and Howard (2014) showed that any 6-net(10) satisfies at least two non-trivial relations, and classified the relations that could appear in such a net. We find that, up to equivalence, there are 18\,526\,320 pairs of MOLS satisfying at least one non-trivial relation. None of these pairs extend to a triple. We also rule out one other relation on a set of 3-MOLS from Dukes and Howard's classification.