Probabilistic Extensions of the Erd os-Ko-Rado Property
Abstract
The classical Erd os-Ko-Rado (EKR) Theorem states that if we choose a family of subsets, each of size (k), from a fixed set of size (n (n > 2k)), then the largest possible pairwise intersecting family has size (t =n-1 k-1). We consider the probability that a randomly selected family of size (t=tn) has the EKR property (pairwise nonempty intersection) as n and k=kn tend to infinity, the latter at a specific rate. As t gets large, the EKR property is less likely to occur, while as t gets smaller, the EKR property is satisfied with high probability. We derive the threshold value for t using Janson's inequality. Using the Stein-Chen method we show that the distribution of X0, defined as the number of disjoint pairs of subsets in our family, can be approximated by a Poisson distribution. We extend our results to yield similar conclusions for Xi, the number of pairs of subsets that overlap in exactly i elements. Finally, we show that the joint distribution (X0, X1, ..., Xb) can be approximated by a multidimensional Poisson vector with independent components.
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