Quantum bath augmented stochastic nonequilibrium atomistic simulations for molecular heat conduction

TL;DR

This paper introduces a quantum bath augmented stochastic simulation method for molecular heat conduction that effectively incorporates quantum effects across all temperature ranges, improving upon classical MD limitations.

Contribution

The authors develop a quasi-classical MD approach using modified Langevin equations to include quantum Bose-Einstein statistics, enabling accurate simulations of quantum effects in heat conduction.

Findings

Deviations from classical MD at low temperatures

Convergence to classical results at high temperatures

Effective modeling of anharmonicities and high-frequency modes

Abstract

Classical molecular dynamics (MD) has been shown to be effective in simulating heat conduction in certain molecular junctions since it inherently takes into account some essential methodological components which are lacking with quantum Landauer-type transport model, such as many-body full force-field interactions, anharmonicity effects and nonlinear responses for large temperature biases. However, the classical mechanics reaches its limit in the environments where the quantum effects are significant (e.g. with low-temperatures substrates, presence of extremely high frequency molecular modes). Here, we present an atomistic simulation methodology for molecular heat conduction that incorporates the quantum Bose-Einstein statistics into an effective temperature in the form of modified Langevin equation. We show that the results from such a quasi-classical effective temperature (QCET) MD method deviates drastically when the baths temperature approaches zero from classical MD simulations and the results converge to the classical ones when the bath approaches the high-temperature limit, which makes the method suitable for full temperature range. In addition, we show that our quasi-classical thermal transport method can be used to model the conducting substrate layout and molecular composition (e.g. anharmonicities, high-frequency modes). Anharmonic models are explicitly simulated via the Morse potential and compared to pure harmonic interactions, to show the effects of anharmonicities under quantum colored bath setups. Finally, the chain length dependence of heat conduction is examined for one-dimensional polymer chains placed in between quantum augmented baths.