Integrable measure equivalence rigidity of right-angled Artin groups via quasi-isometry

Abstract

Let G be a right-angled Artin group with |Out(G)|<+∞. We prove that if a countable group H with bounded torsion is measure equivalent to G, with an L1-integrable measure equivalence cocycle towards G, then H is finitely generated and quasi-isometric to G. In particular, through work of Kleiner and the second-named author, H acts properly and cocompactly on a CAT(0) cube complex which is quasi-isometric to G and equivariantly projects to the right-angled building of G. As a consequence of work of the second-named author, we derive a superrigidity theorem in integrable measure equivalence for an infinite class of right-angled Artin groups, including those whose defining graph is an n-gon with n 5. In contrast, we also prove that if a right-angled Artin group G with |Out(G)|<+∞ splits non-trivially as a product, then there does not exist any locally compact group which contains all groups H that are L1-measure equivalent to G as lattices, even up to replacing H by a finite-index subgroup and taking the quotient by a finite normal subgroup.