Universality for fluctuations of counting statistics of random normal matrices

Abstract

We consider the fluctuations of the number of eigenvalues of n× n random normal matrices depending on a potential Q in a given set A. These eigenvalues are known to form a determinantal point process, and are known to accumulate on a compact set called the droplet under mild conditions on Q. When A is a Borel set strictly inside the droplet, we show that the variance of the number of eigenvalues NA(n) in A has a limiting behavior given by align* n∞ 1 nVar NA(n) = 12ππ∫∂* A Q(z) \, d H1(z), align* where ∂* A is the measure theoretic boundary of A, d H1(z) denotes the one-dimensional Hausdorff measure, and = ∂z ∂z. We also consider the case where A is a microscopic dilation of the droplet and fully generalize a result by Akemann, Byun and Ebke for arbitrary potentials. In this result d H1(z) is replaced by the harmonic measure at ∞ associated with the exterior of the droplet. This second result is proved by strengthening results due to Hedenmalm-Wennman and Ameur-Cronvall on the asymptotic behavior of the associated correlation kernel near the droplet boundary.