The maximal sum of sizes of cross intersecting families for multisets
Abstract
Let k, t and m be positive integers. A k-multiset of [m] is a collection of k elements of [m] with repetition and without ordering. We use ( [m]k) to denote all the k-multisets of [m]. Two multiset families F and G in ( [m]k) are called cross t-intersecting if |F G|≥ t for any F∈ F and G∈ G. Moreover, if F=G, we call F a t-intersecting family in ( [m]k). Meagher and Purdy~(2011) presented a multiset variant of Erdos-Ko-Rado Theorem for t-intersecting family in ( [m]k) when t=1, and F\"uredi, Gerbner and Vizer~(2016) extended this result to general t 2 with m≥ 2k-t, verified a conjecture proposed by Meagher and Purdy~(2011). In this paper, we determine the maximum sum of cross t-intersecting families F and G in ( [m]k) and characterize the extremal families achieving the upper bound. For t=1 and m≥ k+1, the method involves constructing a bijection between multiset family and set family while preserving the intersecting relation. For t 2 and m 2k-t, we employ a shifting operation, specifically the down-compression, which was initiated by F\"uredi, Gerbner and Vizer~(2016). These results extend the sum-type intersecting theorem for set families originally given by Hilton and Milner (1967).
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.