Sparse graphs with no polynomial-sized anticomplete pairs

Abstract

A graph is "H-free" if it has no induced subgraph isomorphic to H. A conjecture of Conlon, Fox and Sudakov states that for every graph H, there exists s>0 such that in every H-free graph with n>1 vertices, either some vertex has degree at least sn, or there are two disjoint sets of vertices, of sizes at least sns and sn, anticomplete to each other. We prove this holds for a large class of graphs H, and we prove that something like it holds for all graphs H. Say H is "almost-bipartite" if H is triangle-free and V(H) can be partitioned into a stable set and a set inducing a graph of maximum degree at most one. We prove that the conjecture above holds for when H is almost-bipartite. We also prove a stronger version where instead of excluding H we restrict the number of copies of H. We prove some variations on the conjecture, such as: for every graph H, there exists s >0 such that in every H-free graph with n>1 vertices, either some vertex has degree at least sn, or there are two disjoint sets A, B of vertices with |A||B| > s n1 + s, anticomplete to each other.