Sharp threshold for the Erdos-Ko-Rado theorem

Abstract

For positive integers n and k with n≥ 2k+1, the Kneser graph K(n,k) is the graph with vertex set consisting of all k-sets of \1,…,n\, where two k-sets are adjacent exactly when they are disjoint. The independent sets of K(n,k) are k-uniform intersecting families, and hence the maximum size independent sets are given by the Erdos-Ko-Rado Theorem. Let Kp(n,k) be a random spanning subgraph of K(n,k) where each edge is included independently with probability p. Bollob\'as, Narayanan, and Raigorodskii asked for what p does Kp(n,k) have the same independence number as K(n,k) with high probability. For n=2k+1, we prove a hitting time result, which gives a sharp threshold for this problem at p=3/4. Additionally, completing work of Das and Tran and work of Devlin and Kahn, we determine a sharp threshold function for all n>2k+1.