On maximal dihedral reflection subgroups and generalized noncrossing partitions

Abstract

In this note, we give a new proof of a result of Matthew Dyer stating that in an arbitrary Coxeter group W, every pair t,t' of distinct reflections lie in a unique maximal dihedral reflection subgroup of W. Our proof only relies on the combinatorics of words, in particular we do not use root systems at all. As an application, we deduce a new proof of a recent result of Delucchi-Paolini-Salvetti, stating that the poset [1,c]T of generalized noncrossing partitions in any Coxeter group of rank 3 is a lattice. We achieve this by showing the more general statement that any interval of length 3 in the absolute order on an arbitrary Coxeter group is a lattice. This implies that the interval group attached to any interval [1,w]T where w is an element of an arbitrary Coxeter group with T(w)=3 is a quasi-Garside group.