A non-Hermitian PT-symmetric kicked top

TL;DR

This paper introduces a non-Hermitian PT-symmetric kicked top to explore quantum chaos with balanced loss and gain, revealing stable dynamics, classical-quantum structure correspondence, and universal spectral statistics.

Contribution

It presents the first analysis of a PT-symmetric kicked top, linking classical structures with quantum spectra and identifying universal level spacing distributions in non-Hermitian quantum chaos.

Findings

PT-symmetry enables stable mixed regular-chaotic behavior.

Classical structures influence quantum Husimi distributions.

Eigenvalue statistics follow universal distributions depending on symmetry.

Abstract

A non-Hermitian PT-symmetric version of the kicked top is introduced to study the interplay of quantum chaos with balanced loss and gain. The classical dynamics arising from the quantum dynamics of the angular momentum expectation values are derived. The presence of PT-symmetry can lead to stable mixed regular chaotic behaviour without sinks or sources for subcritical values of the gain-loss parameter. This is an example of what is known in classical dynamical systems as reversible dynamical systems. For large values of the kicking strength a strange attractor is observed that also persists if PT-symmetry is broken. The intensity dynamics of the classical map is found to provide the main structure for the Husimi distributions of the subspaces of the quantum system belonging to certain ranges of the imaginary parts of the quasienergies. Classical structures are identified in the quantum dynamics. Finally, the statistics of the eigenvalues of the quantum system are analysed and it is shown that if most of the eigenvalues are complex (which is the case already for fairly small non-Hermiticity parameters) the nearest-neighbour distances of the (unfolded) quasienergies follow a two-dimensional Posisson distribution when the classical dynamics is regular. In the chaotic regime, they are in line with recently identified universal complex level spacing distributions for non-Hermitian systems, with transpose symmetry $A^T= A$. It is demonstrated how breaking this symmetry (by introducing an extra term in the Hamiltonian) recovers the more familiar universality class for non-Hermitian systems given by the complex Ginibre ensemble. Both universality classes display cubic level repulsion. The PT-symmetry of the system does not seem to influence the complex level spacings. Similar behaviour is also observed for the spectrum of a PT-symmetric extension of the triadic Baker map.