Related papers: Unified Formulation of Phase Space Mapping Approaches for Nonadiabatic Quantum Dynamics

Unified Formulation of Phase Space Mapping Approaches for Nonadiabatic Quantum Dynamics

URL: http://arxiv.org/abs/2205.11354v1
Date: Mon, 23 May 2022 14:40:22 GMT
Title: Unified Formulation of Phase Space Mapping Approaches for Nonadiabatic Quantum Dynamics
Authors: Jian Liu, Xin He, Baihua Wu
Abstract summary: Nonadiabatic dynamical processes are important quantum mechanical phenomena in chemical, materials, biological, and environmental molecular systems. The mapping Hamiltonian on phase space coupled F-state systems is a special case. An isomorphism between the mapping phase space approach for nonadiabatic systems and that for nonequilibrium electron transport processes is presented.
Score: 17.514476953380125
License: http://creativecommons.org/licenses/by/4.0/
Abstract: Nonadiabatic dynamical processes are one of the most important quantum mechanical phenomena in chemical, materials, biological, and environmental molecular systems, where the coupling between different electronic states is either inherent in the molecular structure or induced by the (intense) external field. The curse of dimensionality indicates the intractable exponential scaling of calculation effort with system size and restricts the implementation of numerically exact approaches for realistic large systems. The phase space formulation of quantum mechanics offers an important theoretical framework for constructing practical approximate trajectory-based methods for quantum dynamics. This Account reviews our recent progress in phase space mapping theory: a unified framework for constructing the mapping Hamiltonian on phase space for coupled F-state systems where the renowned Meyer-Miller Hamiltonian model is a special case, a general phase space formulation of quantum mechanics for nonadiabatic systems where the electronic degrees of freedom are mapped onto constraint space and the nuclear degrees of freedom are mapped onto infinite space, and an isomorphism between the mapping phase space approach for nonadiabatic systems and that for nonequilibrium electron transport processes.

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