Sharp bounds for covering with large cliques and independent sets

Abstract

Let n(k1, k2) be the least integer n such that there exists a graph on n vertices in which every vertex is contained in both a clique of size k1 and an independent set of size k2. Recently, Feige and Pauzner showed that n(k, k) ≥ 4k-O(k23), and conjectured that n(k,k)=4k-4. We prove this conjecture, and also establish the optimal lower bound in the more general case where k1 and k2 are arbitrary. We further consider the generalisation of the problem to r-edge-coloured complete graphs in which every vertex is contained in a size-k monochromatic clique of each colour, and obtain upper and lower bounds on the size of such graphs.