Smooth bimodules and cohomology of II1 factors

Abstract

We prove that, under rather general conditions, the 1-cohomology of a von Neumann algebra M with values in a Banach M-bimodule satisfying a combination of smoothness and operatorial conditions, vanishes. For instance, we show that if M acts normally on a Hilbert space H and B0⊂ B( H) is a norm closed M-bimodule such that any T∈ B0 is smooth (i.e. the left and right multiplication of T by x∈ M are continuous from the unit ball of M with the s*-topology to B0 with its norm), then any derivation of M into B0 is inner. The compact operators are smooth over any M⊂ B( H), but there is a large variety of non-compact smooth elements as well.