Smallest Gaps Between Eigenvalues of Random Matrices With Complex Ginibre, Wishart and Universal Unitary Ensembles

Abstract

In this paper we study the limiting distribution of the k smallest gaps between eigenvalues of three kinds of random matrices -- the Ginibre ensemble, the Wishart ensemble and the universal unitary ensemble. All of them follow a Poissonian ansatz. More precisely, for the Ginibre ensemble we have a global result in which the k-th smallest gap has typical length n-3/4 with density x4k-1e-x4 after normalization. For the Wishart and the universal unitary ensemble, it has typical length n-4/3 and has density x3k-1e-x3 after normalization.