GSE spectra in uni-directional quantum systems

Abstract

Abstract Generically, spectral statistics of spinless systems with time reversal invariance (TRI) and chaotic dynamics are well-described by the Gaussian orthogonal ensemble (GOE). However, if an additional symmetry is present, the spectrum can be split into independent sectors which statistics depend on the type of the group’s irreducible representation. In particular, this allows for the construction of TRI quantum graphs with spectral statistics characteristic of the Gaussian symplectic ensembles (GSE). To this end one usually has to use groups admitting pseudo-real irreducible representations. In this paper we show how GSE spectral statistics can be realized in TRI systems with simpler symmetry groups lacking pseudo-real representations. As an application, we provide a class of quantum graphs with only C 4 rotational symmetry possessing GSE spectral statistics.