English

The Primitive Eulerian polynomial

Combinatorics 2025-02-14 v1

Abstract

We introduce the Primitive Eulerian polynomial PA(z)P_{\cal A}(z) of a central hyperplane arrangement A{\cal A}. It is a reparametrization of its cocharacteristic polynomial. Previous work of the first author implicitly show that, for simplicial arrangements, PA(z)P_{\cal A}(z) has nonnegative coefficients. For reflection arrangements of type A and B, the same work interprets the coefficients of PA(z)P_{\cal A}(z) using the (flag)excedance statistic on (signed) permutations. The main result of this article is to provide an interpretation of the coefficients of PA(z)P_{\cal A}(z) for all simplicial arrangements only using the geometry and combinatorics of A{\cal A}. This new interpretation sheds more light to the case of reflection arrangements and, for the first time, gives combinatorial meaning to the coefficients of the Primitive Eulerian polynomial of the reflection arrangement of type D. In type B, we find a connection between the Primitive Eulerian polynomial and the 1/21/2-Eulerian polynomial of Savage and Viswanathan (2012). We present some real-rootedness results and conjectures for PA(z)P_{\cal A}(z).

Keywords

Cite

@article{arxiv.2306.15556,
  title  = {The Primitive Eulerian polynomial},
  author = {Jose Bastidas and Christophe Hohlweg and Franco Saliola},
  journal= {arXiv preprint arXiv:2306.15556},
  year   = {2025}
}

Comments

30 pages, 11 figures. Comments welcome

R2 v1 2026-06-28T11:15:48.863Z