Enregistré dans:
Détails bibliographiques
Auteurs principaux: Ji, Kathy Q., Zhang, Dax T. X.
Format: Preprint
Publié: 2024
Sujets:
Accès en ligne:https://arxiv.org/abs/2402.03644
Tags: Ajouter un tag
Pas de tags, Soyez le premier à ajouter un tag!
_version_ 1866910688663830528
author Ji, Kathy Q.
Zhang, Dax T. X.
author_facet Ji, Kathy Q.
Zhang, Dax T. X.
contents The polynomial of the major index ${\rm maj}_W (σ)$ over the subset $T$ of the Coxeter group $W$ is called the Mahonian polynomial over $T$, where ${\rm maj}_W (σ)$ is a Mahonian statistic of an element $σ\in T$, whereas the polynomial of the major index ${\rm maj}_W (σ)$ with the sign $(-1)^{\ell_W(σ)}$ over the subset $T$ is referred to as the signed Mahonian polynomial over $T$, where ${\ell_W(σ)}$ is the length of $σ\in T$. Gessel, Wachs, and Chow established the formulas for the Mahonian polynomials over the sets of derangements in the symmetric group $S_n$ and the hyperoctahedral group $B_n$. By extending Wachs' approach and employing a refinement of Stanley's shuffle theorem established in our recent paper, we derive the formula for the Mahonian polynomials over the set of derangements in the even-signed permutation group $D_n$. This completes a picture which is now known for all the classical Weyl groups. Gessel-Simion, Adin-Gessel-Roichman, and Biagioli previously established formulas for the signed Mahonian polynomials over the classical Weyl groups. Building upon their formulas, we derive the formulas for the signed Mahonian polynomials over the set of derangements in classical Weyl groups. As applications of the formulas for the (signed) Mahonian polynomials over the sets of derangements in the classical Weyl groups, we obtain enumerative formulas of the number of derangements in classical Weyl groups with even lengths.
format Preprint
id arxiv_https___arxiv_org_abs_2402_03644
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Signed Mahonian Polynomials on Derangements in Classical Weyl Groups
Ji, Kathy Q.
Zhang, Dax T. X.
Combinatorics
The polynomial of the major index ${\rm maj}_W (σ)$ over the subset $T$ of the Coxeter group $W$ is called the Mahonian polynomial over $T$, where ${\rm maj}_W (σ)$ is a Mahonian statistic of an element $σ\in T$, whereas the polynomial of the major index ${\rm maj}_W (σ)$ with the sign $(-1)^{\ell_W(σ)}$ over the subset $T$ is referred to as the signed Mahonian polynomial over $T$, where ${\ell_W(σ)}$ is the length of $σ\in T$. Gessel, Wachs, and Chow established the formulas for the Mahonian polynomials over the sets of derangements in the symmetric group $S_n$ and the hyperoctahedral group $B_n$. By extending Wachs' approach and employing a refinement of Stanley's shuffle theorem established in our recent paper, we derive the formula for the Mahonian polynomials over the set of derangements in the even-signed permutation group $D_n$. This completes a picture which is now known for all the classical Weyl groups. Gessel-Simion, Adin-Gessel-Roichman, and Biagioli previously established formulas for the signed Mahonian polynomials over the classical Weyl groups. Building upon their formulas, we derive the formulas for the signed Mahonian polynomials over the set of derangements in classical Weyl groups. As applications of the formulas for the (signed) Mahonian polynomials over the sets of derangements in the classical Weyl groups, we obtain enumerative formulas of the number of derangements in classical Weyl groups with even lengths.
title Signed Mahonian Polynomials on Derangements in Classical Weyl Groups
topic Combinatorics
url https://arxiv.org/abs/2402.03644