Outer automorphism groups and the Atiyah Conjecture

Abstract

Let G be the fundamental group of a compact surface, a finitely generated free group, or more generally a finitely generated right-angled Artin group. We prove that the von Neumann dimension function of Out(G) is valued in a discrete subgroup of Q. This is accomplished by establishing the Strong Atiyah Conjecture for a torsion-free subgroup of Out(G) of finite index. We also prove that for every field K, there exists a torsion-free subgroup H ≤slant Out(G) of finite index such that K[H] embeds into a division ring, and hence satisfies the Zero Divisor Conjecture. These results are obtained by establishing analogous ones for a suitable open subgroup of Out( G) and its completed group algebra, where G denotes the pro-p completion of G. In an appendix, the first author shows that an automorphism of a free nilpotent group is inner if and only if it induces an inner automorphism of its pro-p completion.