Induced subdivisions in Ks,s-free graphs with polynomial average degree
Abstract
In this paper we prove that for every s≥ 2 and every graph H the following holds. Let G be a graph with average degree H(sC|H|2), for some absolute constant C>0, then G either contains a Ks,s or an induced subdivision of H. This is essentially tight and confirms a conjecture of Bonamy, Bousquet, Pilipczuk, Rza\.zewski, Thomass\'e, and Walczak. A slightly weaker form of this has been independently proved by Bourneuf, Buci\'c, Cook, and Davies. We actually prove a much more general result which implies the above (with worse dependence on |H|). We show that for every k≥ 2 there is Ck>0 such that any graph G with average degree sCk either contains a Ks,s or an induced subgraph G'⊂eq G without C4's and with average degree at least k. Finally, using similar methods we can prove the following. For every k,t≥ 2 every graph G with average degree at least Ctk(t) must contain either a Kk, an induced Kt,t or an induced subdivision of Kk. This is again essentially tight up to the implied constants and answers in a strong form a question of Davies.
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