Lattice envelopes of right-angled Artin groups

Abstract

Let be a finite simplicial graph with at least two vertices, and let G() be the associated right-angled Artin group. We describe a locally compact group U containing G() as a cocompact lattice. If is not a join (i.e. the complement graph is connected), the group U is non-discrete, almost simple, but not virtually simple: it has a smallest normal subgroup U+ which is an open simple subgroup, and the quotient U/ U+ is isomorphic to the right-angled Coxeter group W(). Under suitable assumptions on , we rely on work by Bader-Furman-Sauer and Huang-Kleiner to show that U Aut() is the universal lattice envelope of G(): for every lattice envelope H of G(), there is a continuous proper homomorphism H U Aut(). In particular, no lattice envelope of G() is virtually simple. We also show that no locally compact group quasi-isometric to G() is virtually simple. This contrasts with the case of free groups. The group U is a universal automorphism group of the Davis building of G(), with prescribed local actions. As an application, we describe the algebraic structure of the full automorphism group of the Cayley graph of G() with respect to its standard generating set.