Clique density vs blowups

Abstract

A well-known theorem of Nikiforov asserts that any graph with a positive Kr-density contains a logarithmic blowup of Kr. In this paper, we explore variants of Nikiforov's result in the following form. Given r,t∈N, when a positive Kr-density implies the existence of a significantly larger (with almost linear size) blowup of Kt? Our results include: For an n-vertex ordered graph G with no induced monotone path P6, if its complement G has positive triangle density, then G contains a biclique of size (nn). This strengthens a recent result of Pach and Tomon. For general k, let g(k) be the minimum r∈ N such that for any n-vertex ordered graph G with no induced monotone P2k, if G has positive Kr-density, then G contains a biclique of size (nn). Using concentration of measure and the isodiametric inequality on high dimensional spheres, we provide constructions showing that, surprisingly, g(k) grows quadratically. On the other hand, we relate the problem of upper bounding g(k) to a certain Ramsey problem and determine g(k) up to a factor of 2. Any incomparability graph with positive Kr-density contains a blowup of Kr of size (nn). This confirms a conjecture of Tomon in a stronger form. In doing so, we obtain a strong regularity type lemma for incomparability graphs with no large blowups of a clique, which is of independent interest. We also prove that any r-comparability graph with positive K(2h-2)r+1-density contains a blowup of Kh of size (n), where the constant (2h-2)r+1 is optimal. The n n size of the blowups in all our results are optimal up to a constant factor.

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