Paper detail

Facets of the $m$-generalized cluster complex and regions in the $m$-extended Catalan arrangement of type $A_n$

In this paper we present a bijection $ω_n$ between two well known families of Catalan objects: the set of facets of the $m$-generalized cluster complex $Δ^m(A_n)$ and the set of dominant regions in the $m$-Catalan arrangement ${\rm Cat}^m(A_n)$, where $m\in\mathbb{N}_{>0}$. In particular, $ω_n$ bijects the facets containing the negative simple root $-α$ to dominant regions having the hyperplane $\{v\in V\mid<v,α>=m\}$ as separating wall. As a result, $ω_n$ restricts to a bijection between the set of facets of the positive part of $Δ^m(A_n)$ and the set of bounded dominant regions in ${\rm Cat}^m(A_n)$. The map $ω_n$ is a composition of two bijections in which integer partitions in an $m$-staircase shape come into play.