Hypergraphs without complete partite subgraphs

Abstract

Fix integers r 2 and 1 s1 ·s sr-1 t and set s=Πi=1r-1si. Let K=K(s1, …, sr-1, t) denote the complete r-partite r-uniform hypergraph with parts of size s1, …, sr-1, t. We prove that the Zarankiewicz number z(n, K)= nr-1/s-o(1) provided t> 3s+o(s). Previously this was known only for t > ((r-1)(s-1))! due to Pohoata and Zakharov. Our novel approach, which uses Behrend's construction of sets with no 3 term arithmetic progression, also applies for small values of si, for example, it gives z(n, K(2,2,7))=n11/4-o(1) where the exponent 11/4 is optimal, whereas previously this was only known with 7 replaced by 721.