A note on the Erdos-Hajnal hypergraph Ramsey problem

Abstract

We show that there is an absolute constant c>0 such that the following holds. For every n > 1, there is a 5-uniform hypergraph on at least 22cn1/4 vertices with independence number at most n, where every set of 6 vertices induces at most 3 edges. The double exponential growth rate for the number of vertices is sharp. By applying a stepping-up lemma established by the first two authors, analogous sharp results are proved for k-uniform hypergraphs. This answers the penultimate open case of a conjecture in Ramsey theory posed by Erdos and Hajnal in 1972.