Mahonian and Euler-Mahonian statistics for set partitions

Abstract

A partition of the set [n]:=\1,2,…,n\ is a collection of disjoint nonempty subsets (or blocks) of [n], whose union is [n]. In this paper we consider the following rarely used representation for set partitions: given a partition of [n] with blocks B1,B2,…,Bm satisfying B1< B2<·s< Bm, we represent it by a word w=w1w2… wn such that i∈ Bwi, 1≤ i≤ n. We prove that the Mahonian statistics INV, MAJ, MAJd, r-MAJ, Z, DEN, MAK, MAD are all equidistributed on set partitions via this representation, and that the Euler-Mahonian statistics (des, MAJ), (mstc, INV), (exc, DEN), (des, MAK) are all equidistributed on set partitions via this representation.