Gaussian pseudo-Orthogonal Ensemble of Real Random Matrices

Abstract

Here, using two real non-zero parameters λ and μ, we construct Gaussian pseudo-orthogonal ensembles of a large number N of n × n (n even and large) real pseudo-symmetric matrices under the metric η using N=n(n+1)/2 elements independently drawn from a Gaussian random population and investigate the statistical properties of the eigenvalues. When λ μ >0, we show that the pseudo-symmetric matrix is similar to a real symmetric matrix, consequently, all the eigenvalues are real and so the spectral distributions satisfy Wigner's statistics. But when λ μ <0 the eigenvalues are either real or complex conjugate pairs. We find that these real eigenvalues exhibit intermediate statistics. We show that the diagonalizing matrices D of these pseudo-symmetric matrices are pseudo-orthogonal under a constant metric ζ as Dt ζ D= ζ, and hence they belong to a pseudo-orthogonal group. These pseudo-symmetric matrices serve to represent the parity-time (PT)-symmetric quantum systems having exact (un-broken) or broken PT-symmetry.