A large number of m-coloured complete infinite subgraphs

Abstract

Given an edge colouring of a graph with a set of m colours, we say that the graph is m-coloured if each of the m colours is used. For an m-colouring of N(2), the complete graph on N, we denote by F the set all values γ for which there exists an infinite subset X⊂ N such that X(2) is γ-coloured. Properties of this set were first studied by Erickson in 1994. Here, we are interested in estimating the minimum size of F over all m-colourings of N(2). Indeed, we shall prove the following result. There exists an absolute constant α > 0 such that for any positive integer m ≠ \ n 2+1, n 2+2: n≥ 2\, |F| ≥ (1+α)2m, for any m-colouring of N(2), thus proving a conjecture of Narayanan. This result is tight up to the order of the constant α.