Erdos-Ko-Rado for random hypergraphs: asymptotics and stability

Abstract

We investigate the asymptotic version of the Erdos-Ko-Rado theorem for the random k-uniform hypergraph Hk(n,p). For 2 ≤ k(n) ≤ n/2, let N=nk and D=n-kk. We show that with probability tending to 1 as n∞, the largest intersecting subhypergraph of Hk(n,p) has size (1+o(1))p kn N, for any p nk2\!( nk)D-1. This lower bound on p is asymptotically best possible for k=(n). For this range of k and p, we are able to show stability as well. A different behavior occurs when k = o(n). In this case, the lower bound on p is almost optimal. Further, for the small interval D-1 p ≤ (n/k)1-D-1, the largest intersecting subhypergraph of Hk(n,p) has size ( (pD)N D-1), provided that k n n. Together with previous work of Balogh, Bohman and Mubayi, these results settle the asymptotic size of the largest intersecting family in Hk(n,p), for essentially all values of p and k.