Variations on Descents and Inversions in Permutations

Abstract

We study new statistics on permutations that are variations on the descent and the inversion statistics. In particular, we consider the alternating descent set of a permutation sigma = sigma1sigma2...sigman defined as the set of indices i such that either i is odd and sigmai > sigmai+1, or i is even and sigmai < sigmai+1. We show that this statistic is equidistributed with the 3-descent set statistic on permutations sigma = sigma1sigma2...sigman+1 with sigma1 = 1, defined to be the set of indices i such that the triple sigmai sigmai+1 sigmai+2 forms an odd permutation of size 3. We then introduce Mahonian inversion statistics corresponding to the two new variations of descents and show that the joint distributions of the resulting descent-inversion pairs are the same. We examine the generating functions involving alternating Eulerian polynomials, defined by analogy with the classical Eulerian polynomials sumsigma in Sn tdes(sigma)+1 using alternating descents. For the alternating descent set statistic, we define the generating polynomial in two non-commutative variables by analogy with the ab-index of the Boolean algebra Bn, and make observations about it. By looking at the number of alternating inversions in alternating (down-up) permutations, we obtain a new q-analog of the Euler number En and show how it emerges in a q-analog of an identity expressing En as a weighted sum of Dyck paths.