On Permutation Weights and $q$-Eulerian Polynomials
Abstract
Weights of permutations were originally introduced by Dugan, Glennon, Gunnells, and Steingr\'imsson (Journal of Combinatorial Theory, Series A 164:24-49, 2019) in their study of the combinatorics of tiered trees. Given a permutation viewed as a sequence of integers, computing the weight of involves recursively counting descents of certain subpermutations of . Using this weight function, one can define a -analog of the Eulerian polynomials. We prove two main results regarding weights of permutations and the polynomials . First, we show that the coefficients of stabilize as goes to infinity, which was conjectured by Dugan, Glennon, Gunnells, and Steingr\'imsson (Journal of Combinatorial Theory, Series A 164:24-49, 2019), and enables the definition of the formal power series , which has interesting combinatorial properties. Second, we derive a recurrence relation for , similar to the known recurrence for the classical Eulerian polynomials . Finally, we give a recursive formula for the numbers of certain integer partitions and, from this, conjecture a recursive formula for the stabilized coefficients mentioned above.
Cite
@article{arxiv.1809.07398,
title = {On Permutation Weights and $q$-Eulerian Polynomials},
author = {Aman Agrawal and Caroline Choi and Nathan Sun},
journal= {arXiv preprint arXiv:1809.07398},
year = {2020}
}
Comments
11 pages