A Note on Pseudofinite W*-Probability Spaces

Abstract

We introduce pseudofinite W*-probability spaces. These are W*-probability spaces that are elementarily equivalent to Ocneanu ultraproducts of finite-dimensional von Neumann algebras equipped with arbitrary faithful normal states. We are particularly interested in the case where these finite-dimensional von Neumann algebras are full matrix algebras: the pseudofinite factors. We show that these are indeed factors. We see as a consequence that pseudofinite factors are never of type III0. Mimicking the construction of the Powers factors, we give explicit families of examples of matrix algebra ultraproducts that are IIIλ factors for λ∈ (0,1]. We show that these examples share their universal theories with the corresponding Powers factor and thus have uncomputable universal theories. Finally, we show that pseudofinite factors are full. This generalizes a theorem of Farah-Hart-Sherman which shows that pseudofinite tracial factors do not have property Γ. It has the consequence that hyperfinite factors of type III (the Powers factors) are never pseudofinite. Our proofs combine operator algebraic insights with routine continuous logic syntactic arguments: using Łos' theorem to prove that certain sentences which are true for all matrix algebras are inherited by their ultraproducts.