An Analogue of Hilton-Milner Theorem for Set Partitions

Abstract

Let B(n) denote the collection of all set partitions of [n]. Suppose A ⊂eq B(n) is a non-trivial t-intersecting family of set partitions i.e. any two members of have at least t blocks in common, but there is no fixed t blocks of size one which belong to all of them. It is proved that for sufficiently large n depending on t, \[ |A| Bn-t-Bn-t-Bn-t-1+t \] where Bn is the n-th Bell number and Bn is the number of set partitions of [n] without blocks of size one. Moreover, equality holds if and only if A is equivalent to \[ \P ∈ B(n): \1\, \2\,..., \t\, \i\ ∈ P for some i = 1,2,..., t,n \ \Q(i,n)\ :\ 1≤ i≤ t\ \] where Q(i,n)=\\i,n\\\\j\\ :\ j∈ [n] \i,n\\. This is an analogue of the Hilton-Milner theorem for set partitions.