On The Random Tur\'an number of linear cycles

Abstract

Given two r-uniform hypergraphs G and H the Tur\'an number ex(G, H) is the maximum number of edges in an H-free subgraph of G. We study the typical value of ex(G, H) when G=Gn,p(r), the Erdos-R\'enyi random r-uniform hypergraph, and H=C2(r), the r-uniform linear cycle of length 2. The case of graphs (r=2) is a longstanding open problem that has been investigated by many researchers. We determine the order of magnitude of ex(Gn,p(r), C2(r)) for all r≥ 4 and all ≥ 2 up to polylogarithmic factors for all values of p=p(n). Our proof is based on the container method and uses a balanced supersaturation result for linear even cycles which improves upon previous such results by Ferber-Mckinley-Samotij and Balogh-Narayanan-Skokan.