Mutually orthogonal cycle systems

Abstract

An -cycle system F of a graph is a set of -cycles which partition the edge set of . Two such cycle systems F and F' are said to be orthogonal if no two distinct cycles from F F' share more than one edge. Orthogonal cycle systems naturally arise from face 2-colourable polyehdra and in higher genus from Heffter arrays with certain orderings. A set of pairwise orthogonal -cycle systems of is said to be a set of mutually orthogonal cycle systems of . Let μ(,n) (respectively, μ'(,n)) be the maximum integer μ such that there exists a set of μ mutually orthogonal (cyclic) -cycle systems of the complete graph Kn. We show that if ≥ 4 is even and n 12, then μ'(,n), and hence μ(,n), is bounded below by a constant multiple of n/2. In contrast, we obtain the following upper bounds: μ(,n)≤ n-2; μ(,n)≤ (n-2)(n-3)/(2(-3)) when ≥ 4; μ(,n)≤ 1 when >n/2; and μ'(,n)≤ n-3 when n ≥ 4. We also obtain computational results for small values of n and .