Hyperplane Arrangements and Diagonal Harmonics
Abstract
In 2003, Haglund's {\sf bounce} statistic gave the first combinatorial interpretation of the -Catalan numbers and the Hilbert series of diagonal harmonics. In this paper we propose a new combinatorial interpretation in terms of the affine Weyl group of type . In particular, we define two statistics on affine permutations; one in terms of the Shi hyperplane arrangement, and one in terms of a new arrangement - which we call the Ish arrangement. We prove that our statistics are equivalent to the {\sf area'} and {\sf bounce} statistics of Haglund and Loehr. In this setting, we observe that {\sf bounce} is naturally expressed as a statistic on the root lattice. We extend our statistics in two directions: to "extended" Shi arrangements and to the bounded chambers of these arrangements. This leads to a (conjectural) combinatorial interpretation for all integral powers of the Bergeron-Garsia nabla operator applied to the elementary symmetric functions.
Keywords
Cite
@article{arxiv.1005.1949,
title = {Hyperplane Arrangements and Diagonal Harmonics},
author = {Drew Armstrong},
journal= {arXiv preprint arXiv:1005.1949},
year = {2015}
}
Comments
27 pages, 12 figures