On the three-dimensional Singer Conjecture for Coxeter groups

Abstract

We give a proof of the Singer conjecture (on the vanishing of reduced 2-homology except in the middle dimension) for the Davis Complex associated to a Coxeter system (W,S) whose nerve L is a triangulation of S2. We show that it follows from a theorem of Andreev, which gives the necessary and sufficient conditions for a classical reflection group to act on H3.