Induced C4-free subgraphs with large average degree

Abstract

We prove that there exists a constant C so that, for all s,k ∈ N, if G has average degree at least kCs3 and does not contain Ks,s as a subgraph then it contains an induced subgraph which is C4-free and has average degree at least k. It was known that some function of s and k suffices, but this is the first explicit bound. We give several applications of this result, including short and streamlined proofs of the following two corollaries. We show that there exists a constant C so that, for all s,k ∈ N, if G has average degree at least kCs3 and does not contain Ks,s as a subgraph then it contains an induced subdivision of Kk. This is the first quantitative improvement on a well-known theorem of K\"uhn and Osthus; their proof gives a bound that is triply exponential in both k and s. We also show that for any hereditary degree-bounded class F, there exists a constant C=CF so that Cs3 is a degree-bounding function for F. This is the first bound of any type on the rate of growth of such functions. It is open whether there is always a polynomial degree-bounding function.