Further refinements of Euler-Mahonian statistics for multipermutations

Abstract

Permutation statistics constitute a classical subject of enumerative combinatorics. In her study of the genus zeta function, Denert discovered a new Mahonian statistic for permutations, which is called the Denert's statistic ( ) by Foata and Zeilberger. As natural extensions of the r-descent number ( r) and the r-major index ( r) introduced by Rawlings, Liu introduced the g-gap -level descent number ( g) and the g-gap -level major index ( g) for permutations. In this paper, we introduce the g-gap -level Denert's statistic ( g) and the g-gap -level excedance number ( g) for multipermutations, which serve as natural generalizations of the Denert's statistic ( ) and the excedance number ( ) for multipermutations first introduced by Han. By constructing two explicit bijections, we establish the equidistribution of the pairs (g, gh ) and (g, g) over multipermutations for all 1≤ h≤ g+. Our result provides a new proof of the equidistribution of the pairs (, ) and (, ) over multipermutations originally derived by Han and enables us to confirm a recent conjecture posed by Huang-Lin-Yan. Furthermore, we demonstrate that for all 1≤ h≤ g+, the pair (g, gh) is r-Euler-Mahonian over multipermutations of M=\1k, 2k, …, nk\ where r=g+-1 and k≥ 1, which extends a recent novel result derived by Liu from permutations to multipermutations.