Lamplighter groups and von Neumann's continuous regular rings

Abstract

Let be a discrete group. Following Linnell and Schick one can define a continuous ring c() associated with . They proved that if the Atiyah Conjecture holds for a torsion-free group , then c() is a skew field. Also, if has torsion and the Strong Atiyah Conjecture holds for , then c() is a matrix ring over a skew field. The simplest example when the Strong Atiyah Conjecture fails is the lamplighter group =Z2 Z. It is known that C(Z2 Z) does not even have a classical ring of quotients. Our main result is that if H is amenable, then c(Z2 H) is isomorphic to a continuous ring constructed by John von Neumann in the 1930's.