Level density and level-spacing distributions of random, self-adjoint, non-Hermitian matrices

Abstract

We investigate the level-density σ(x) and level-spacing distribution p(s) of random matrices M=AF≠ M where F is a (diagonal) inner-product and A is a random, real symmetric or complex Hermitian matrix with independent entries drawn from a probability distribution q(x) with zero mean and finite higher moments. Although not Hermitian, the matrix M is self-adjoint with respect to F and thus has purely real eigenvalues. We find that the level density σF(x) is independent of the underlying distribution q(x), is solely characterized by F, and therefore generalizes Wigner's semicircle distribution σW(x). We find that the level-spacing distributions p(s) are independent of q(x), are dependent upon the inner-product F and whether A is real or complex, and therefore generalize the Wigner's surmise for level spacing. Our results suggest F-dependent generalizations of the well-known Gaussian Orthogonal Ensemble (GOE) and Gaussian Unitary Ensemble (GUE) classes.