Brown Measures of Unbounded Operators Affiliated with a Finite von Neumann Algebra
Abstract
In this paper we generalize Brown's spectral distribution measure to a large class of unbounded operators affiliated with a finite von Neumann algebra. Moreover, we compute the Brown measure of all unbounded R-diagonal operators in this class. As a particular case, we determine the Brown measure of z=xy-1, where (x,y) is a circular system in the sense of Voiculescu, and we prove that for all positive integers n, zn is in Lp(M) iff 0<p< 2/(n+1).
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