On R\"odl's Theorem for Cographs

Abstract

A theorem of R\"odl states that for every fixed F and >0 there is δ=δF() so that every induced F-free graph contains a vertex set of size δ n whose edge density is either at most or at least 1-. R\"odl's proof relied on the regularity lemma, hence it supplied only a tower-type bound for δ. Fox and Sudakov conjectured that δ can be made polynomial in , and a recent result of Fox, Nguyen, Scott and Seymour shows that this conjecture holds when F=P4. In fact, they show that the same conclusion holds even if G contains few copies of P4. In this note we give a short proof of a more general statement.