Mutually orthogonal cycle systems
Abstract
An -cycle system of a graph is a set of -cycles which partition the edge set of . Two such cycle systems and are said to be {\em orthogonal} if no two distinct cycles from share more than one edge. Orthogonal cycle systems naturally arise from face -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 (respectively, ) be the maximum integer such that there exists a set of mutually orthogonal (cyclic) -cycle systems of the complete graph . We show that if is even and , then , and hence , is bounded below by a constant multiple of . In contrast, we obtain the following upper bounds: ; when ; when ; and when . We also obtain computational results for small values of and .
Cite
@article{arxiv.2203.00816,
title = {Mutually orthogonal cycle systems},
author = {Andrea C. Burgess and Nicholas J. Cavenagh and David A. Pike},
journal= {arXiv preprint arXiv:2203.00816},
year = {2022}
}