Fluctuations for analytic test functions in the Single Ring Theorem

Abstract

We consider a non-Hermitian random matrix A whose distribution is invariant under the left and right actions of the unitary group. The so-called Single Ring Theorem, proved by Guionnet, Krishnapur and Zeitouni, states that the empirical eigenvalue distribution of A converges to a limit measure supported by a ring S. In this text, we establish the convergence in distribution of random variables of the type Tr (f(A)M) where f is analytic on S and the Frobenius norm of M has order N. As corollaries, we obtain central limit theorems for linear spectral statistics of A (for analytic test functions) and for finite rank projections of f(A) (like matrix entries). As an application, we locate outliers in multiplicative perturbations of A.