Memory effect in time fractional Schrödinger equation

doi:10.1088/1674-1056/ad02e6

中国物理B ›› 2024, Vol. 33 ›› Issue (2): 20501-020501.doi: 10.1088/1674-1056/ad02e6

Memory effect in time fractional Schrödinger equation

Chuanjin Zu(祖传金) and Xiangyang Yu(余向阳)^†

School of Physics, State Key Laboratory of Optoelectronic Materials and Technologies, Sun Yat-Sen University, Guangzhou 510275, China

收稿日期:2023-06-20 修回日期:2023-09-26 接受日期:2023-10-13 出版日期:2024-01-16 发布日期:2024-01-16
通讯作者: Xiangyang Yu E-mail:cesyxy@mail.sysu.edu.cn
基金资助:
Project supported by the National Natural Science Foundation of China (Grant No. 11274398).

Memory effect in time fractional Schrödinger equation

Chuanjin Zu(祖传金) and Xiangyang Yu(余向阳)^†

School of Physics, State Key Laboratory of Optoelectronic Materials and Technologies, Sun Yat-Sen University, Guangzhou 510275, China

Received:2023-06-20 Revised:2023-09-26 Accepted:2023-10-13 Online:2024-01-16 Published:2024-01-16
Contact: Xiangyang Yu E-mail:cesyxy@mail.sysu.edu.cn
Supported by:
Project supported by the National Natural Science Foundation of China (Grant No. 11274398).

摘要/Abstract

摘要： A significant obstacle impeding the advancement of the time fractional Schrödinger equation lies in the challenge of determining its precise mathematical formulation. In order to address this, we undertake an exploration of the time fractional Schrödinger equation within the context of a non-Markovian environment. By leveraging a two-level atom as an illustrative case, we find that the choice to raise i to the order of the time derivative is inappropriate. In contrast to the conventional approach used to depict the dynamic evolution of quantum states in a non-Markovian environment, the time fractional Schrödinger equation, when devoid of fractional-order operations on the imaginary unit i, emerges as a more intuitively comprehensible framework in physics and offers greater simplicity in computational aspects. Meanwhile, we also prove that it is meaningless to study the memory of time fractional Schrödinger equation with time derivative 1 < α ≤ 2. It should be noted that we have not yet constructed an open system that can be fully described by the time fractional Schrödinger equation. This will be the focus of future research. Our study might provide a new perspective on the role of time fractional Schrödinger equation.

关键词: time fractional Schrödinger equation, memory effect, non-Markovian environment

Abstract: A significant obstacle impeding the advancement of the time fractional Schrödinger equation lies in the challenge of determining its precise mathematical formulation. In order to address this, we undertake an exploration of the time fractional Schrödinger equation within the context of a non-Markovian environment. By leveraging a two-level atom as an illustrative case, we find that the choice to raise i to the order of the time derivative is inappropriate. In contrast to the conventional approach used to depict the dynamic evolution of quantum states in a non-Markovian environment, the time fractional Schrödinger equation, when devoid of fractional-order operations on the imaginary unit i, emerges as a more intuitively comprehensible framework in physics and offers greater simplicity in computational aspects. Meanwhile, we also prove that it is meaningless to study the memory of time fractional Schrödinger equation with time derivative 1 < α ≤ 2. It should be noted that we have not yet constructed an open system that can be fully described by the time fractional Schrödinger equation. This will be the focus of future research. Our study might provide a new perspective on the role of time fractional Schrödinger equation.

Key words: time fractional Schrödinger equation, memory effect, non-Markovian environment

中图分类号: (Operational calculus)

02.30.Vv

02.90.+p (Other topics in mathematical methods in physics) 05.45.-a (Nonlinear dynamics and chaos)

Chuanjin Zu(祖传金) and Xiangyang Yu(余向阳). Memory effect in time fractional Schrödinger equation[J]. 中国物理B, 2024, 33(2): 20501-020501.

Chuanjin Zu(祖传金) and Xiangyang Yu(余向阳). Memory effect in time fractional Schrödinger equation[J]. Chin. Phys. B, 2024, 33(2): 20501-020501.

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Memory effect in time fractional Schrödinger equation

Memory effect in time fractional Schrödinger equation

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