Universal localizations, Atiyah conjectures and graphs of groups

Abstract

Let G be a countable group that is the fundamental group of a graph of groups with finite edge groups and vertex groups that satisfy the strong Atiyah conjecture over K ⊂eq C a field closed under complex conjugation. Assume that the orders of finite subgroups of G are bounded above. We show that G satisfies the strong Atiyah conjecture over K. In particular, this implies that the strong Atiyah conjecture is closed under free products. Moreover, we prove that the -regular closure of K[G] in U(G), R K[G], is a universal localization of the graph of rings associated to the graph of groups, where the rings are the corresponding -regular closures. As a result, we obtain that the algebraic and center-valued Atiyah conjecture over K are also closed under the graph of groups construction provided that the edge groups are finite. We also infer some consequences on the structure of the K0 and K1-groups of R K[G]. The techniques developed allow us to prove that K[G] fulfills the strong, algebraic and center-valued Atiyah conjectures and that R K[G] is the universal localization of K[G] over the set of all matrices that become invertible in U(G) if G lies in a certain class of groups T VLI, which contains in particular virtually-locally indicable groups that are the fundamental group of a graph of virtually free groups.