Ahlswede-Khachatrian Theorems: Weighted, Infinite, and Hamming

Abstract

The seminal complete intersection theorem of Ahlswede and Khachatrian gives the maximum cardinality of a k-uniform t-intersecting family on n points, and describes all optimal families. We extend this theorem to several other settings: the weighted case, the case of infinitely many points, and the Hamming scheme. The weighted Ahlswede-Khachatrian theorem gives the maximal μp measure of a t-intersecting family on n points, where μp(A) = p|A| (1-p)n-|A|. As has been observed by Ahlswede and Khachatrian and by Dinur and Safra, this theorem can be derived from the classical one by a simple reduction. However, this reduction fails to identify the optimal families, and only works for p < 1/2. We translate the two original proofs of Ahlswede and Khachatrian to the weighted case, thus identifying the optimal families in all cases. We also extend the theorem to the case p > 1/2, using a different technique of Ahlswede and Khachatrian (the case p = 1/2 is Katona's intersection theorem). We then extend the weighted Ahlswede-Khachatrian theorem to the case of infinitely many points. The Ahlswede-Khachatrian theorem on the Hamming scheme gives the maximum cardinality of a subset of Zmn in which any two elements x,y have t positions i1,…,it such that xij - yij ∈ \-(s-1),…,s-1\. We show that this case corresponds to μp with p = s/m, extending work of Ahlswede and Khachatrian, who considered the case s = 1. We also determine the maximum cardinality families. We obtain similar results for subsets of [0,1]n, though in this case we are not able to identify all maximum cardinality families.