The Brown measure of the sum of a self-adjoint element and an elliptic element

Abstract

We completely determine the Brown measure of the sum of a self-adjoint element and an elliptic element, which is the limiting eigenvalue distribution of the random matrix \[YN+s-t2XN+it2XN'\] where YN is an N× N deterministic Hermitian matrix whose eigenvalue distribution converges as N∞ and XN and XN' are independent Gaussian unitary ensembles. We also study various asymptotic behaviors of this Brown measure as the variance of the elliptic element approaches infinity.