B-Valued Free Convolution for Unbounded Operators

Abstract

Consider the B-valued probability space (A, E, B), where A is a tracial von Neumann algebra. We extend the theory of operator valued free probability to the algebra of affiliated operators A. For a random variable X ∈ Asa we study the Cauchy transform GX and show that the operator algebra (B \X\)" can be recovered from this function. In the case where B is finite dimensional, we show that, when X, Y ∈ Asa are assumed to be B-free, the R-transforms are defined on universal subsets of the resolvent and satisfy RX + RY = RX + Y. Examples indicating a failure of the theory for infinite dimensional B are provided. Lastly, we show that the class of functions that arise as the Cauchy transform of affiliated operators is, in a natural way, the closure of the set of Cauchy transforms of bounded operators.