On r-cross t-intersecting families of partitions

Abstract

In this paper, we address several intersection problems for r-cross t-intersecting families of partitions. A k-partition of an n-set X is a set of k pairwise disjoint non-empty subsets whose union is X. For 1≤ i≤ r, let Fi be a family of ki-partitions of X. We say that F1,F2,…,Fr are r-cross t-intersecting if |i=1rFi|≥ t for all Fi∈Fi. The families are called non-trivial if |i=1r(F∈FiF)|<t. Proving an Erdos-Ko-Rado type theorem, we determine the families maximizing Πi=1r|Fi|. We further determine non-trivial r-cross t-intersecting families with maximum product of sizes; this result also serves as a Hilton-Milner type theorem. In particular, for r=2 there are two potential structures for optimal families, and for r≥3 exactly one remains.