Hilton-Milner theorem for k-multisets

Abstract

Let k, n ∈ N+ and m ∈ N+ \∞ \ . A k -multiset in [n]m is a k -set whose elements are integers from \1, 2, …, n\ , and each element is allowed to have at most m repetitions. A family of k -multisets in [n]m is said to be intersecting if every pair of k -multisets from the family have non-empty intersection. In this paper, we give the size and structure of the largest non-trivial intersecting family of k -multisets in [n]m for n ≥ k + k/m . In the special case when m=∞, our result gives rise to an unbounded multiset version for Hilton-Milner Theorem given by Meagher and Purdy. Furthermore, our main theorem unites the statements of the Hilton-Milner Theorem for finite sets and unbounded multisets.