Partitioning a graph into monochromatic connected subgraphs

Abstract

A well-known result by Haxell and Kohayakawa states that the vertices of an r-coloured complete graph can be partitioned into r monochromatic connected subgraphs of distinct colours; this is a slightly weaker variant of a conjecture by Erdos, Pyber and Gy\'arf\'as that states that there exists a partition into r-1 monochromatic connected subgraphs. We consider a variant of this problem, where the complete graph is replaced by a graph with large minimum degree, and prove two conjectures of Bal and DeBiasio, for two and three colours.