Reflection trees of graphs as boundaries of Coxeter groups

Abstract

To any finite graph X (viewed as a topological space) we assosiate some explicit compact metric space Xr(X) which we call the reflection tree of graphs X. This space is of topological dimension 1 and its connected components are locally connected. We show that if X is appropriately triangulated (as a simplicial graph for which X is the geometric realization) then the visual boundary ∂∞(W,S) of the right angled Coxeter system (W,S) with the nerve isomorphic to is homeomorphic to Xr(X). For each X, this yields in particular many word hyperbolic groups with Gromov boundary homeomorphic to the space Xr(X).