Refinements of the braid arrangement and two parameter Fuss-Catalan numbers

Abstract

A hyperplane arrangement in Rn is a finite collection of affine hyperplanes. Counting regions of hyperplane arrangements is an active research direction in enumerative combinatorics. In this paper, we consider the arrangement An(m) in Rn given by \xi=0 i ∈ [n]\ \xi=akxj k ∈ [-m,m], 1≤ i<j ≤ n\ for some fixed a>1. It turns out that this family of arrangements is closely related to the well-studied extended Catalan arrangement of type A. We prove that the number of regions of An(m) is a certain generalization of Catalan numbers called two parameter Fuss-Catalan numbers. We then exhibit a bijection between these regions and certain decorated Dyck paths. We also compute the characteristic polynomial and give a combinatorial interpretation for its coefficients. Most of our results also generalize to sub-arrangements of An(m) by relating them to deformations of the braid arrangement.