Almost and weakly almost periodic functions on the unitary groups of von Neumann algebras

Abstract

Let M⊂ B( H) be a von Neumann algebra acting on the Hilbert space H. We prove that M is finite if and only if, for every x∈ M and for all vectors ,η∈ H, the coefficient function u uxu*|η is weakly almost periodic on the topological group UM of unitaries in M (equipped with the weak or strong operator topology). The main device is the unique invariant mean on the C*-algebra WAP(UM) of weakly almost periodic functions on UM. Next, we prove that every coefficient function u uxu*|η is almost periodic if and only if M is a direct sum of a diffuse, abelian von Neumann algebra and finite-dimensional factors. Incidentally, we prove that if M is a diffuse von Neumann algebra, then its unitary group is minimally almost periodic.