Parabolic subgroups of complex braid groups

TL;DR

This paper introduces a new class of parabolic subgroups for complex braid groups, proves their lattice structure, and constructs a generalized simplicial complex akin to the curve complex, extending known results from real reflection groups.

Contribution

It defines parabolic subgroups for complex braid groups, proves their lattice structure, and constructs a generalized curve complex, extending previous work on real reflection groups.

Findings

Parabolic subgroups form a lattice structure.

Every element has a unique parabolic closure.

The associated simplicial complex generalizes the curve complex.

Abstract

In this paper we introduce a class of `parabolic' subgroups for the generalized braid group associated to an arbitrary irreducible complex reflection group, which maps onto the collection of parabolic subgroups of the reflection group. Except for one case, which is proven separately elsewhere, we prove that this collection forms a lattice, so that intersections of parabolic subgroups are parabolic subgroups. In particular, every element admits a parabolic closure, which is the smallest parabolic subgroup containing it. We furthermore prove that it provides a simplicial complex which generalizes the curve complex of the usual braid group. In the case of real reflection groups, this complex generalizes the one previously introduced by Cumplido, Gebhardt, Gonz\'alez-Meneses and Wiest for Artin groups of spherical type. We show that it shares similar properties, and similarly conjecture its hyperbolicity, with a few additional results in this direction.