Monochromatic Clique Decompositions of Graphs

Abstract

Let G be a graph whose edges are coloured with k colours, and H=(H1,… , Hk) be a k-tuple of graphs. A monochromatic H-decomposition of G is a partition of the edge set of G such that each part is either a single edge or forms a monochromatic copy of Hi in colour i, for some 1 i k. Let φk(n, H) be the smallest number φ, such that, for every order-n graph and every k-edge-colouring, there is a monochromatic H-decomposition with at most φ elements. Extending the previous results of Liu and Sousa ["Monochromatic Kr-decompositions of graphs", Journal of Graph Theory, 76:89--100, 2014], we solve this problem when each graph in H is a clique and n n0( H) is sufficiently large.