Quaternionic R transform and non-hermitian random matrices

Abstract

Using the Cayley-Dickson construction we rephrase and review the non-hermitian diagrammatic formalism [R. A. Janik, M. A. Nowak, G. Papp and I. Zahed, Nucl.Phys. B 501, 603 (1997)], that generalizes the free probability calculus to asymptotically large non-hermitian random matrices. The main object in this generalization is a quaternionic extension of the R transform which is a generating function for planar (non-crossing) cumulants. We demonstrate that the quaternionic R transform generates all connected averages of all distinct powers of X and its hermitian conjugate X: 1N Tr Xa X b Xc … for N→ ∞. We show that the R transform for gaussian elliptic laws is given by a simple linear quaternionic map R(z+wj) = x + σ2 (μ e2iφ z + w j) where (z,w) is the Cayley-Dickson pair of complex numbers forming a quaternion q=(z,w) z+ wj. This map has five real parameters e x, m x, φ, σ and μ. We use the R transform to calculate the limiting eigenvalue densities of several products of gaussian random matrices.