Efficient and Deterministic Propagation of Mixed Quantum-Classical
Liouville Dynamics
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Abstract
We
propose a highly efficient mixed quantum-classical molecular
dynamics scheme based on a solution of the quantum-classical Liouville
equation (QCLE). By casting the equations of motion for the quantum
subsystem and classical bath degrees of freedom onto an approximate
set of coupled first-order differential equations for <i>c</i>-numbers, this scheme propagates the composite system in time deterministically
in terms of independent classical-like trajectories. To demonstrate
its performance, we apply the method to the spin-boson model, a photoinduced
electron transfer model, and a Fenna–Matthews–Olsen
complex model, and find excellent agreement out to long times with
the numerically exact results, using several orders of magnitude fewer
trajectories than surface-hopping solutions of the QCLE. Owing to
its accuracy and efficiency, this method promises to be very useful
for studying the dynamics of mixed quantum-classical systems