On Reflection Orders Compatible with a Coxeter Element

Abstract

In this article we give a simple, almost uniform proof that the lattice of noncrossing partitions associated with a well-generated complex reflection group is lexicographically shellable. So far a uniform proof is available only for Coxeter groups. In particular we show that, for any complex reflection group W and any element x∈ W, every x-compatible reflection order is a recursive atom order of the corresponding interval in absolute order. Since any Coxeter element γ in any well-generated complex reflection group admits a γ-compatible reflection order, the lexicographic shellability follows from a well-known result due to Bj\"orner and Wachs.