A Common Generalization of the Theorems of Erdos-Ko-Rado and Hilton-Milner
Abstract
Let m, n, and k be integers satisfying 0 < k ≤ n < 2k ≤ m. A family of sets F is called an (m,n,k)-intersecting family if [n]k ⊂eq F ⊂eq [m]k and any pair of members of F have nonempty intersection. Maximum (m,k,k)- and (m,k+1,k)-intersecting families are determined by the theorems of Erdos-Ko-Rado and Hilton-Milner, respectively. We determine the maximum families for the cases n = 2k-1, 2k-2, 2k-3, and m sufficiently large.
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