Rainbow odd cycles

Abstract

We prove that every family of (not necessarily distinct) odd cycles O1, …, O2 n/2 -1 in the complete graph Kn on n vertices has a rainbow odd cycle (that is, a set of edges from distinct Oi's, forming an odd cycle). As part of the proof, we characterize those families of n odd cycles in Kn+1 that do not have any rainbow odd cycle. We also characterize those families of n cycles in Kn+1, as well as those of n edge-disjoint nonempty subgraphs of Kn+1, without any rainbow cycle.