Tiling with monochromatic bipartite graphs of bounded maximum degree

Abstract

We prove that for any r∈ N, there exists a constant Cr such that the following is true. Let F=\F1,F2,…\ be an infinite sequence of bipartite graphs such that |V(Fi)|=i and (Fi)≤ hold for all i. Then in any r-edge coloured complete graph Kn, there is a collection of at most (Cr) monochromatic subgraphs, each of which is isomorphic to an element of F, whose vertex sets partition V(Kn). This proves a conjecture of Corsten and Mendonca in a strong form and generalizes results on the multicolour Ramsey numbers of bounded-degree bipartite graphs.