Induced subgraph density. I. A loglog step towards Erdos-Hajnal

Abstract

In 1977, Erdos and Hajnal made the conjecture that, for every graph H, there exists c>0 such that every H-free graph G has a clique or stable set of size at least |G|c; and they proved that this is true with |G|c replaced by 2c |G|. Until now, there has been no improvement on this result (for general H). We prove a strengthening: that for every graph H, there exists c>0 such that every H-free graph G with |G| 2 has a clique or stable set of size at least 2c |G||G|. Indeed, we prove the corresponding strengthening of a theorem of Fox and Sudakov, which in turn was a common strengthening of theorems of R\"odl, Nikiforov, and the theorem of Erdos and Hajnal mentioned above.