Realising VCD for untwisted automorphism groups of RAAGs

Abstract

The virtual cohomological dimension of~Out(Fn) is given precisely by the dimension of the spine of Culler--Vogtmann Outer space. However, the dimension of the spine of untwisted Outer space for a general right-angled Artin group~A does not necessarily match the virtual cohomological dimension~vcd(U(A)) of the untwisted subgroup~U(A) ≤ Out(A). Under certain graph-theoretic conditions, we perform an equivariant deformation retraction of this spine to produce a new contractible cube complex upon which~U(A) acts properly and cocompactly. Furthermore, we give conditions for when the dimension of this complex realises the virtual cohomological dimension of~U(A). We finish with two applications of our construction; in particular we show that the difference between the dimension of the untwisted spine and~vcd(U(A)) can be arbitrarily large.