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Multiple Quantum Mpemba Effect: Exceptional Points and Oscillations: Model and Protocolby@oscillation

Multiple Quantum Mpemba Effect: Exceptional Points and Oscillations: Model and Protocol

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March 5th, 2024
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In this paper, we explore the role of exceptional points and complex eigenvalues on the occurrence of the quantum Mpemba effect.
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This paper is available on arxiv under CC 4.0 license.

Authors:

(1) Amit Kumar Chatterjee, Yukawa Institute for Theoretical Physics, Kyoto University & Department of Physics, Ramakrishna Mission Vidyamandira;

(2) Satoshi Takada, Department of Mechanical Systems Engineering and Institute of Engineering;

(3) Hisao Hayakawa, Yukawa Institute for Theoretical Physics, Kyoto University.

II. MODEL AND PROTOCOL

We consider a two-level open quantum system, subjected to a periodic drive and dissipatively coupled to the environment. Following Ref. [95], we hereafter refer to this model as Hatano’s model in the present manuscript. In this paper, we adopt ~ = 1. The two levels of the system, ground state and excited state, have energies Eg and Ee, respectively. The gap between the two levels is denoted by ∆ := Ee − Eg. In Hatano’s model, the transfers between the energy levels are enabled by the external oscillatory electric field E = E0cos(ωt) and the dissipation of the system to the environment via coupling Γ. The parameter δ := ∆ −ω represents the detuning of the periodic drive with respect to the system and d := DE0, where D is the electric dipole moment, denotes the effective electric field. The tuning parameters in Hatano’s model are d, Γ and δ . However, one of them fixes the unit of energy, so we essentially have two free parameters ˜d := d/δ and Γ := Γ ˜ /δ.


Hatano’s model, within Markovian approximation, can be described by the Gorini-Kossakowski-SudarshanLindblad (GKSL) equation [101–104] (see [95] for the present context):


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