Induced subgraph density. II. Sparse and dense sets in cographs

Abstract

A well-known theorem of R\"odl says that for every graph H, and every ε>0, there exists δ>0 such that if G does not contain an induced copy of H, then there exists X⊂eq V(G) with |X| δ|G| such that one of G[X],G[X] has edge-density at most ε. But how does δ depend on ε? Fox and Sudakov conjectured that the dependence is at most polynomial: that for all H there exists c>0 such that for all ε with 0<ε 1/2, R\"odl's theorem holds with δ=εc. This conjecture implies the Erdos-Hajnal conjecture, and until now it had not been verified for any non-trivial graphs H. Our first result shows that it is true when H=P4. Indeed, in that case we can take δ=ε, and insist that one of G[X],G[X] has maximum degree at most ε2|G|). Second, we will show that every graph H that can be obtained by substitution from copies of P4 satisfies the Fox-Sudakov conjecture. To prove this, we need to work with a stronger property. Let us say H is viral if there exists c>0 such that for all ε with 0<ε 1/2, if G contains at most εc|G||H| copies of H as induced subgraphs, then there exists X⊂eq V(G) with |X| εc|G| such that one of G[X],G[X] has edge-density at most ε. We will show that P4 is viral, using a ``polynomial P4-removal lemma'' of Alon and Fox. We will also show that the class of viral graphs is closed under vertex-substitution. Finally, we give a different strengthening of R\"odl's theorem: we show that if G does not contain an induced copy of P4, then its vertices can be partitioned into at most 480ε-4 subsets X such that one of G[X],G[X] has maximum degree at most ε|X|.