On Diximier's averaging theorem for operators in type II1 factors

Abstract

Let be a type II1 factor and let τ be the faithful normal tracial state on . In this paper, we prove that given finite elements X1,·s Xn ∈ , there is a finite decomposition of the identity into N ∈ mutually orthogonal nonzero projections Ej∈, I=Σj=1NEj, such that EjXiEj=τ(Xi) Ej for all j=1,·s,N and i=1,·s,n. Equivalently, there is a unitary operator U ∈ such that 1NΣj=0N-1U*jXiUj=τ(Xi)I for i=1,·s,n. This result is a stronger version of Dixmier's averaging theorem for type II1 factors. As the first application, we show that all elements of trace zero in a type II1 factor are single commutators and any self-adjoint elements of trace zero are single self-commutators. This result answers affirmatively Question 1.1 in [10]. As the second application, we prove that any self-adjoint element in a type II1 factor can be written a linear combination of 4 projections. This result answers affirmatively Question 6(2) in [15]. As the third application, we show that if (M,τ) is a finite factor, X ∈ M, then there exists a normal operator N ∈ M and a nilpotent operator K such that X= N+ K. This result answers affirmatively Question 1.1 in [9].