Further results on r-Euler-Mahonian statistics

Abstract

As natural generalizations of the descent number () and the major index (), Rawlings introduced the notions of the r-descent number (r) and the r-major index (r) for a given positive integer r. A pair (1, 2) of permutation statistics is said to be r-Euler-Mahonian if (st1, st2) and (r, r) are equidistributed over the set Sn of all permutations of \1,2,…, n\. The main objective of this paper is to confirm a recent conjecture posed by Liu which asserts that (g, g) is (g+-1)-Euler-Mahonian for all positive integers g and , where g denotes the g-gap -level excedance number and g denotes the g-gap -level Denert's statistic. This is accomplished via a bijective proof of the equidistribution of (g, g) and (r, r) where r=g+-1. Setting g==1, our result recovers the equidistribution of (, ) and (, ), which was first conjectured by Denert and proved by Foata and Zeilberger. Our second main result is concerned with the analogous result for (g, gg+) which states that (g, gg+) is (g+-1)-Euler-Mahonian for all positive integers g and .