Tur\'an problems in pseudorandom graphs

Abstract

Given a graph F, we consider the problem of determining the densest possible pseudorandom graph that contains no copy of F. We provide an embedding procedure that improves a general result of Conlon, Fox, and Zhao which gives an upper bound on the density. In particular, our result implies that optimally pseudorandom graphs with density greater than n-1/3 must contain a copy of the Peterson graph, while the previous best result gives the bound n-1/4. Moreover, we conjecture that the exponent 1/3 in our bound is tight. We also construct the densest known pseudorandom K2,3-free graphs that are also triangle-free. Finally, we obtain the densest known construction of clique-free pseudorandom graphs due to Bishnoi, Ihringer and Pepe in a novel way and give a different proof that they have no large clique.