Li, X., Su, Y., Chen, Z.-H., Wang, Y., Xu, R.-X., Zheng, X., & Yan, Y. (2024). Dissipatons as generalized Brownian particles for open quantum systems: Dissipaton-embedded quantum master equation. [Journal Name], [Volume], [Page Range]. [DOI or URL]
This paper aims to revisit the dissipaton equation of motion (DEOM) theory and establish an equivalent dissipaton-embedded quantum master equation (DQME) that provides a more direct approach to investigating the statistical characteristics of dissipatons and hybrid bath modes in open quantum systems.
The authors establish the DQME by introducing a one-to-one correspondence between dissipaton operators and real dimensionless variables, effectively embedding the dissipaton degrees of freedom into the system. They then demonstrate the equivalence of DQME to DEOM and analyze the statistical characteristics of dissipatons, treating them as generalized Brownian particles. Finally, they validate their approach through numerical simulations of an electron transfer model.
The DQME offers a powerful and versatile alternative to DEOM for studying open quantum system dynamics. By treating dissipatons as generalized Brownian particles, DQME provides a more intuitive and computationally advantageous framework for analyzing the complex interplay between the system and its environment.
This work significantly contributes to the field of open quantum systems by introducing a novel and potentially more efficient approach to simulating their dynamics. The DQME framework opens up new avenues for investigating non-Markovian dynamics and incorporating advanced numerical methods, paving the way for more accurate and comprehensive simulations of complex quantum systems.
While the paper focuses on bosonic environments, extending the DQME formalism to fermionic systems is crucial for applications in spintronics and superconductivity. Further research is also needed to explore the full potential of DQME in simulating non-Markovian dynamics and incorporating advanced numerical techniques like matrix product states and real-space renormalization group methods.
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