Erdos-Ko-Rado theorem and Hilton-Milner type theorem for k-partitions

Abstract

A k-partition of an n-set X is a collection of k pairwise disjoint non-empty subsets whose union is X. A family of k-partitions of X is called t-intersecting if any two of its members share at least t blocks. A t-intersecting family is trivial if every k-partition in it contains t fixed blocks, and is non-trivial otherwise. In this paper, we first prove that, for n≥ L(k,t):=(t+1)+(k-t+1)·2(t+1)(k-t+1), a t-intersecting family with maximum size must consist of all k-partitions containing t fixed singletons. This improves the results given by Erdos and Sz\'ekely (2000), and by Kupavskii (2023). We further determine the non-trivial t-intersecting families of k-partitions with maximum size for n 2L(k,t), which turn out to be natural analogs of the corresponding families for finite sets. In addition, we prove a stability result.

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