Universal distributions from non-Hermitian perturbation of zero modes

Abstract: Hermitian operators with exact zero modes subject to non-Hermitian perturbations are considered. Specific focus is on the average distribution of the initial zero modes of the Hermitian operators. The broadening of these zero modes is found to follow an elliptic Gaussian random matrix ensemble of fixed size, where the symmetry class of the perturbation determines the behaviour of the modes. This distribution follows from a central limit theorem of matrices, and is shown to be robust to deformations of the aver… Show more

Hermitian and non-Hermitian perturbations of chiral Gaussian β-ensembles

Hermitian and non-Hermitian perturbations of chiral Gaussian β-ensembles