Sidorenko Hypergraphs and Random Tur\'an Numbers

Abstract

Let ex(Gn,pr,F) denote the maximum number of edges in an F-free subgraph of the random r-uniform hypergraph Gn,pr, and let s(F):=\s: ∃ H,\ tF(H)=tKrr(H)s+e(F)>0\. Following recent work of Conlon, Lee, and Sidorenko, we prove non-trivial lower bounds on ex(Gn,pr,F) whenever s(F)>0, i.e. F is not Sidorenko. This connection between Sidorenko's conjecture and random Tur\'an problems gives new lower bounds on ex(Gn,pr,F) whenever s(F)>0, and further allows us to establish upper bounds for s(F) whenever upper bounds for ex(Gn,pr,F) are known. As a consequence, we prove that s(Er(Kk+1k))=1r-k where Er(Kk+1k) is the r-expansion of Kk+1k.