The Brown measure of a sum of two free nonselfadjoint random variables, one of which is R-diagonal

Abstract

Suppose that X1 and X2 are two *-free (generally unbounded) random variables with Brown measures μX1 and μX2, respectively. Using properties of classical free additive convolutions, we develop a method for calculating μX1+X2when X2 is R-diagonal. This method determines a density relative to Lebesgue measure on an open set whose closure contains the support of μX1+X2. Effective calculations are possible in important cases. Biane and Lehner were the first to make significant progress on the problem we consider, even in some cases in which neither X1 nor X2 is R-diagonal. Our examples overlap with theirs, but we emphasize the use of subordination functions. When X2 is circular, μX1+X2 was studied earlier using two different approaches, one involving Hamilton-Jacobi equations, and another using standard free probability techniques. Our work extends the second approach.