The real Ginibre ensemble with k = O(n) real eigenvalues

Abstract

We consider the ensemble of Real Ginibre matrices with a positive fraction α>0 of real eigenvalues. We demonstrate a large deviations principle for the joint eigenvalue density of such matrices and we introduce a two phase log-gas whose stationary distribution coincides with the spectral measure of the ensemble. Using these tools we provide an asymptotic expansion for the probability pnα n that an n× n Ginibre matrix has k=α n real eigenvalues and we characterize the spectral measures of these matrices.