An extension of Mantel's theorem to random 4-uniform hypergraphs

Abstract

A sparse version of Mantel's Theorem is that, for sufficiently large p, with high probability (w.h.p.), every maximum triangle-free subgraph of G(n,p) is bipartite. DeMarco and Kahn proved this for p>K n/n for some constant K, and apart from the value of the constant, this bound is the best possible. Denote by T3 the 3-uniform hypergraph with vertex set \a,b,c,d,e\ and edge set \abc,ade,bde\. Frankl and F\"uredi showed that the maximum 3-uniform hypergraph on n vertices containing no copy of T3 is tripartite for n> 3000. For some integer k, let Gk(n,p) be the random k-uniform hypergraph. Balogh et al. proved that for p>K n/n for some constant K, every maximum T3-free subhypergraph of G3(n,p) w.h.p. is tripartite and it does not hold when p=0.1 n/n. Denote by T4 the 4-uniform hypergraph with vertex set \1,2,3,4,5,6,7\ and edge set \1234,1235,4567\. Pikhurko proved that there is an n0 such that for all n n0, the maximum 4-uniform hypergraph on n vertices containing no copy of T4 is 4-partite. In this paper, we extend this type of extremal problem in random 4-uniform hypergraphs. We show that for some constant K and p>K n/n, w.h.p. every maximum T4-free subhypergraph of G4(n,p) is 4-partite.