On the Brown measure of x + i y, with x,y selfadjoint and y free Poisson

Abstract

Let x,y be freely independent selfadjoint elements in a W*-probability space, where y has free Poisson distribution of parameter p. We pursue a methodology for computing the absolutely continuous part of the Brown measure of x + i y, which relies on the matrix-valued subordination function Ω of the Hermitization of x + i y, and on the fact that Ω has an explicitly described left inverse H. Our main point is that the Brown measure of x + i y becomes more approachable when it is reparametrized via a certain change of variable h : D M, with D, M open subsets of C, where D and h are defined in terms of the aforementioned left inverse H, and cl \,(M) contains the support of the Brown measure. More precisely, we find (with some conditions on the distribution of x, which have to be imposed for certain values of the parameter p) the following formula: \[ f(s + i \, t) =14π[2t(∂ α∂ s +∂ β∂ t)-2t-2βt2], \ \ s + i \, t ∈ M, \] where f is the density of the absolutely continuous part of the Brown measure and the functions α, β: M R are the real and respectively the imaginary part of h-1.