On finite sums of projections and Dixmier's averaging theorem for type II1 factors

Abstract

Let M be a type II1 factor and let τ be the faithful normal tracial state on M. In this paper, we prove that given an X ∈ M, X=X*, then there is a decomposition of the identity into N ∈ N mutually orthogonal nonzero projections Ej∈M, I=Σj=1NEj, such that EjXEj=τ(X) Ej for all j=1,·s,N. Equivalently, there is a unitary operator U ∈ M with UN=I and 1NΣj=0N-1U*jXUj=τ(X)I. As the first application, we prove that a positive operator A∈ M can be written as a finite sum of projections in M if and only if τ(A)≥ τ(RA), where RA is the range projection of A. This result answers affirmatively Question 6.7 of [9]. As the second application, we show that if X∈ M, X=X* and τ(X)=0, then there exists a nilpotent element Z ∈ M such that X is the real part of Z. This result answers affirmatively Question 1.1 of [4]. As the third application, we show that let X1,·s,Xn∈ M. Then there exist unitary operators U1,·s,Uk∈M such that 1kΣi=1kUi-1XjUi=τ(Xj)I, ∀ 1≤ j≤ n. This result is a stronger version of Dixmier's averaging theorem for type II1 factors.