On Bi-free Multiplicative Convolution

Abstract

In this paper, we study the partial bi-free S-transform of a pair (a,b) of random variables, and the S-transform of the 2× 2 matrix-valued random variable (matrixa&0\\0&bmatrix) associated with (a,b) when restricted to upper triangular 2× 2 matrices. We first derive an explicit expression of bi-free multiplicative convolution (of probability measures on the bi-unit-sphere T2 of C2, or on R2+ in C2) from a subordination equation for bi-free multiplicative convolution. We then show that, when (a1, b1) and (a2,b2) are bi-free, the S-transforms of X1=(matrixa1&0\\0&b1matrix), X2=(matrixa2&0\\0&b2matrix) satisfy Dykema's twisted multiplicative equation for free operator-valued random variables if and only if at least one of the two partial bi-free S-transforms of the pairs of random variables is the constant function 1 in a neighborhood of (0,0). This is the case if and only if one of the two pairs, say (a1,b1), has factoring two-band moments (that is, (a1mb1n)=(a1m)(b1n), for all m,n=1, 2, ·s). We thus find tons of bi-free pairs of random variables to which the S-transforms of the corresponding matrix-value random variables do not satisfy Dykema's twisted multiplicative formula. Finally, if both (a1,b1) and (a2,b2) have factoring two-band moments, we prove that the -transforms of X1, X2, and X1X2 satisfy a subordination equation.