Interpolating non-Hermitian universality classes A and AI: eigenvalue density and transition regime

Abstract

We employ the recently developed Kac-Rice formalism for non-Hermitian random matrices to derive the joint distribution of an eigenvalue and its associated normalised right eigenvector in a Gaussian ensemble that interpolates between complex Ginibre (Class A) and complex symmetric matrices (Class AI). This distribution is valid at finite matrix size, N, for any value of the interpolation parameter σ∈ [0,1], with 0 and 1 corresponding to classes A and AI respectively. The marginal distribution for the density of the eigenvalues is derived at finite N and then considered asymptotically as N ∞. When considering bulk eigenvalues, we recover the standard circular law for all σ. Furthermore, for edge eigenvalues we find that for fixed σ, the eigenvalues follow the edge density associated with matrices in Class A. However, a transitional regime is discovered for the interpolation parameter being scaled as σ= 1 - κN-1/2, where new edge behaviour is observed for the density of eigenvalues - smoothly interpolating two previously known results. This transitional regime and the associated density of eigenvalues is conjectured to be universal for non-Gaussian matrices and we provide numerical evidence in support of this.