Quantization of Out-of-Time-Ordered Correlators in non-Hermitian Chaotic Systems

Abstract

This letter reports the findings of the late time behavior of the out-of-time-ordered correlators (OTOCs) via a quantum kicked rotor model with PT-symmetric driving potential. An analytical expression of the OTOCs' quadratic growth with time is yielded as C(t)=G(K)t2. Interestingly, the growth rate G features a quantized response to the increase of the kick strength K, which indicates the chaos-assisted quantization in the OTOCs' dynamics. The physics behind this is the quantized absorption of energy from the non-Hermitian driving potential. This discovery and the ensuing establishment of the quantization mechanism in the dynamics of quantum chaos with non-Hermiticity will provide insights in chaotic dynamics, promising unprecedented observations in updated experiments.