posted on 2021-08-02, 21:14authored byXin He, Baihua Wu, Zhihao Gong, Jian Liu
We show that a novel, general phase
space mapping Hamiltonian for
nonadiabatic systems, which is reminiscent of the renowned Meyer–Miller
mapping Hamiltonian, involves a commutator variable matrix rather
than the conventional zero-point-energy parameter. In the exact mapping formulation on constraint space
for phase space approaches for nonadiabatic dynamics, the general
mapping Hamiltonian with commutator variables can be employed to generate
approximate trajectory-based dynamics. Various benchmark model tests,
which range from gas phase to condensed phase systems, suggest that
the overall performance of the general mapping Hamiltonian is better
than that of the conventional Meyer–Miller Hamiltonian.