Outer space for RAAGs

Abstract

For any right-angled Artin group A we construct a finite-dimensional space O on which the group Out(A) of outer automorphisms of A acts with finite point stabilizers. We prove that O is contractible, so that the quotient is a rational classifying space for Out(A). The space O blends features of the symmetric space of lattices in Rn with those of Outer space for the free group Fn. Points in O are locally CAT(0) metric spaces that are homeomorphic (but not isometric) to certain locally CAT(0) cube complexes, marked by an isomorphism of their fundamental group with A.