Partitioning 2-edge-coloured bipartite graphs into monochromatic cycles

Abstract

Given an r-edge-colouring of the edges of a graph G, we say that it can be partitioned into p monochromatic cycles when there exists a set of p vertex-disjoint monochromatic cycles covering all the vertices of G. In the literature of this problem, an edge and a single vertex both count as a cycle. We show that for every 2-colouring of the edges of a complete balanced bipartite graph, Kn,n, it can be partitioned into at most 4 monochromatic cycles. This type of question was first studied in 1970 for complete graphs and in 1983, by Gy\'arf\'as and Lehel, for Kn,n. In 2014, Pokrovskiy showed for all n that, given any 2-colouring of its edges, Kn,n can be partitioned into at most three monochromatic paths. It turns out that finding monochromatic cycles instead of paths is a natural question that has also been raised for other graphs. In 2015, Schaudt and Stein showed that 14 cycles are sufficient for sufficiently large 2-edge-coloured Kn,n.