On the Maximum F5-free Subhypergraphs of a Random Hypergraph

Abstract

Denote by F5 the 3-uniform hypergraph on vertex set \1,2,3,4,5\ with hyperedges \123,124,345\. Balogh, Butterfield, Hu, and Lenz proved that if p > K n / n for some large constant K, then every maximum F5-free subhypergraph of G3(n,p) is tripartite with high probability, and showed that if p0 = 0.1 n / n, then with high probability there exists a maximum F5-free subhypergraph of G3(n,p0) that is not tripartite. In this paper, we sharpen the upper bound to be best possible up to a constant factor. We prove that if p > C n / n for some large constant C, then every maximum F5-free subhypergraph of G3(n, p) is tripartite with high probability.