Some tight lower bounds for Tur\'an problems via constructions of multi-hypergraphs

Abstract

Recently, several hypergraph Tur\'an problems were solved by the powerful random algebraic method. However, the random algebraic method usually requires some parameters to be very large, hence we are concerned about how these Tur\'an numbers depend on such large parameters of the forbidden hypergraphs. In this paper, we determine the dependence on such specified large constant for several hypergraph Tur\'an problems. More specifically, for complete r-partite r-uniform hypergraphs, we show that if sr is sufficiently larger than s1,s2,…,sr-1, then exr(n,Ks1,s2,…,sr(r))=(sr1s1s2·s sr-1nr-1s1s2·s sr-1). For complete bipartite r-uniform hypergraphs, we prove that if s is sufficiently larger than t, we have exr(n,Ks,t(r))=(s1tnr-1t). In particular, our results imply that the famous Kov\'ari--S\'os--Tur\'an's upper bound ex(n,Ks,t)=O(t1sn2-1s) has the correct dependence on large t. The main approach is to construct random multi-hypergraph via a variant of random algebraic method.