Asymptotics of the hypergraph bipartite Tur\'an problem

Abstract

For positive integers s,t,r, let Ks,t(r) denote the r-uniform hypergraph whose vertex set is the union of pairwise disjoint sets X,Y1,…,Yt, where |X| = s and |Y1| = … = |Yt| = r-1, and whose edge set is \\x\ Yi: x ∈ X, 1≤ i≤ t\. The study of the Tur\'an function of Ks,t(r) received considerable interest in recent years. Our main results are as follows. First, we show that equation ex(n,Ks,t(r)) = Os,r(t1s-1nr - 1s-1) equation for all s,t≥ 2 and r≥ 3, improving the power of n in the previously best bound and resolving a question of Mubayi and Verstra\"ete about the dependence of ex(n,K2,t(3)) on t. Second, we show that this upper bound is tight when r is even and t s. This disproves a conjecture of Xu, Zhang and Ge. Third, we show that the above upper bound is not tight for r = 3, namely that ex(n,Ks,t(3)) = Os,t(n3 - 1s-1 - s) (for all s≥ 3). This indicates that the behaviour of ex(n,Ks,t(r)) might depend on the parity of r. Lastly, we prove a conjecture of Ergemlidze, Jiang and Methuku on the hypergraph analogue of the bipartite Tur\'an problem for graphs with bounded degrees on one side. Our tools include a novel twist on the dependent random choice method as well as a variant of the celebrated norm graphs constructed by Koll\'ar, R\'onyai and Szab\'o.