Related papers: Chaos and subdiffusion in the infinite-range coupled quantum kicked rotors

Chaos and subdiffusion in the infinite-range coupled quantum kicked rotors

URL: http://arxiv.org/abs/2102.07872v2
Date: Wed, 2 Jun 2021 08:54:50 GMT
Title: Chaos and subdiffusion in the infinite-range coupled quantum kicked rotors
Authors: Angelo Russomanno, Michele Fava, and Rosario Fazio
Abstract summary: We map the infinite-range coupled quantum kicked rotors over an infinite-range coupled interacting bosonic model. In the thermodynamic limit the system is described by a set of coupled Gross-Pitaevskij equations equivalent to an effective nonlinear single-rotor Hamiltonian.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: We map the infinite-range coupled quantum kicked rotors over an infinite-range coupled interacting bosonic model. In this way we can apply exact diagonalization up to quite large system sizes and confirm that the system tends to ergodicity in the large-size limit. In the thermodynamic limit the system is described by a set of coupled Gross-Pitaevskij equations equivalent to an effective nonlinear single-rotor Hamiltonian. These equations give rise to a power-law increase in time of the energy with exponent $\gamma\sim 2/3$ in a wide range of parameters. We explain this finding by means of a master-equation approach based on the noisy behaviour of the effective nonlinear single-rotor Hamiltonian and on the Anderson localization of the single-rotor Floquet states. Furthermore, we study chaos by means of the largest Lyapunov exponent and find that it decreases towards zero for portions of the phase space with increasing momentum. Finally, we show that some stroboscopic Floquet integrals of motion of the noninteracting dynamics deviate from their initial values over a time scale related to the interaction strength according to the Nekhoroshev theorem.

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