Finite sums of projections in von Neumann algebras

Abstract

We first prove that in a sigma-finite von Neumann factor M, a positive element a with properly infinite range projection Ra is a linear combination of projections with positive coefficients if and only if the essential norm ||a||e with respect to the closed two-sided ideal J(M) generated by the finite projections of M does not vanish. Then we show that if ||a||e>1, then a is a finite sum of projections. Both these results are extended to general properly infinite von Neumann algebras in terms of central essential spectra. Secondly, we provide a necessary condition for a positive operator a to be a finite sum of projections in terms of the principal ideals generated by the excess part a+:=(a-I)a(1,∞) and the defect part a-:= (I-a)a(0, 1) of a; this result appears to be new also for B(H). Thirdly, we prove that in a type II1 factor a sufficient condition for a positive diagonalizable operators to be a finite sum of projections is that τ(a+)- τ(a-)>0.