The Erdos-Rothschild problem on edge-colourings with forbidden monochromatic cliques

Abstract

Let k := (k1,…,ks) be a sequence of natural numbers. For a graph G, let F(G;k) denote the number of colourings of the edges of G with colours 1,…,s such that, for every c ∈ \1,…,s\, the edges of colour c contain no clique of order kc. Write F(n;k) to denote the maximum of F(G;k) over all graphs G on n vertices. This problem was first considered by Erdos and Rothschild in 1974, but it has been solved only for a very small number of non-trivial cases. We prove that, for every k and n, there is a complete multipartite graph G on n vertices with F(G;k) = F(n;k). Also, for every k we construct a finite optimisation problem whose maximum is equal to the limit of 2 F(n;k)/n 2 as n tends to infinity. Our final result is a stability theorem for complete multipartite graphs G, describing the asymptotic structure of such G with F(G;k) = F(n;k) · 2o(n2) in terms of solutions to the optimisation problem.