Derivation of the generalized Langevin equation in nonstationary environments

Kawai, Shinnosuke; Komatsuzaki, Tamiki

doi:10.1063/1.3561065

Cited by 39 publications

(63 citation statements)

References 41 publications

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“…Equation (15) shows that the error in the spectral density can cancel or accumulate depending on the phase difference ∆φ(ω). Let us assume that the error magnitudes, r pp (ω) and r pF (ω) are similar.…”

Section: Error Analysismentioning

confidence: 99%

“…Another approach to reduced EOMs is to employ formal projection operator techniques to project out the bath from the system's EOM resulting in linear or nonlinear GLE forms [5,[13][14][15]. In the former, the resulting system potential is effectively harmonic, whereas in the latter the system potential is formed by a (non-linear) meanfield potential.…”

Section: Introductionmentioning

confidence: 99%

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Vibrational spectroscopy via the Caldeira-Leggett model with anharmonic system potentials

Gottwald

Ivanov

Kühn

2016

The Journal of Chemical Physics

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Abstract. The Caldeira-Leggett (CL) model, which describes a system bi-linearly coupled to a harmonic bath, has enjoyed popularity in condensed phase spectroscopy owing to its utmost simplicity. However, the applicability of the model to cases with anharmonic system potentials, as it is required for the description of realistic systems in solution, is questionable due to the presence of the invertibility problem [J. Phys. Chem. Lett., 6, 2722Lett., 6, (2015] unless the system itself resembles the CL model form. This might well be the case at surfaces or in the solid regime, which we here confirm for a particular example of an iodine molecule in the atomic argon environment under high pressure. For this purpose we extend the recently proposed Fourier method for parameterizing linear generalized Langevin dynamics [J. Chem. Phys., 142, 244110 (2015)] to the non-linear case based on the CL model and perform an extensive error analysis. In order to judge on the applicability of this model in advance, we give handy empirical criteria and discuss the effect of the potential renormalization term. The obtained results provide evidence that the CL model can be used for describing a potentially broad class of systems.

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Section: Error Analysismentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

Vibrational spectroscopy via the Caldeira-Leggett model with anharmonic system potentials

Gottwald

Ivanov

Kühn

2016

The Journal of Chemical Physics

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“…In this formalism the memory kernel carries a functional dependence on the system's positions and momenta and the fluctuating force has more complicated statistical properties than given by the FDT in Eq. (4) [26]. This functional dependence is hardly tractable and an apparent simplification is to linearize the kernel with respect to positions and momenta.…”

mentioning

confidence: 99%

“…The third route employs a non-linear projection. Here, the system potential is given by the potential of the mean force, V mean (x), felt by the system at coordinate x, averaged over all bath coordinates Q [8,26,27]. In this formalism the memory kernel carries a functional dependence on the system's positions and momenta and the fluctuating force has more complicated statistical properties than given by the FDT in Eq.…”

mentioning

confidence: 99%

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Applicability of the Caldeira–Leggett Model to Vibrational Spectroscopy in Solution

Gottwald

Ivanov

Kühn

2015

J. Phys. Chem. Lett.

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Formulating a rigorous system-bath partitioning approach remains an open issue. In this context the famous Caldeira-Leggett model that enables quantum and classical treatment of Brownian motion on equal footing has enjoyed popularity. Although this model is by any means a useful theoretical tool, its ability to describe anharmonic dynamics of real systems is often taken for granted. In this Letter we show that the mapping between a molecular system under study and the model cannot be established in a self-consistent way, unless the system part of the potential is taken effectively harmonic. Mathematically, this implies that the mapping is not invertible. This 'invertibility problem' is not dependent on the peculiarities of particular molecular systems under study and is rooted in the anharmonicity of the system part of the potential.PACS numbers: 78.20. Bh, 33.20.Ea, 05.40.Jc Introduction and Theory. Model systems play an important role for our understanding of complex manybody dynamics. Reducing the description to a few parameters can not only ease the interpretation, but enable the identification of key properties [1]. In condensed phase dynamics the spin-boson [2] and Caldeira-Leggett (CL) [3, 4] models have been the conceptual backbone of countless studies [5]. The latter has been extended to describe linear and non-linear spectroscopy within the second-order cumulant approximation, termed multimode Brownian oscillator model in this context [6,7]. It has become a popular tool for assigning spectroscopic signals in the last two decades.The CL model comprises an arbitrary system (coordinates x, potential V S (x)), which is bi-linearly coupled to a bath of harmonic oscillators (coordinates Q i , potential V B ({Q i })) via a system-bath coupling potential V S−B (x, {Q i }) [3]. Later Caldeira and Leggett extended the model to an arbitrary function of system coordinates in the coupling and motivated the linearity of the coupling on the bath side [4]. Here, we limit ourselves to the bi-linear version for the reasons that will become apparent later. Restricting ourselves to a one-dimensional case yields [5]

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A Numerical Procedure to Evaluate Memory Effects in Non‐Equilibrium Coarse‐Grained Models

Meyer

Wolf

Stock

et al. 2020

Advcd Theory and Sims

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When developing coarse‐grained models of complex processes out of equilibrium, one encounters the non‐stationary generalized Langevin equation. The most important feature of this equation is the presence of a non‐stationary memory kernel. Here, a method is presented to infer this memory kernel from MD simulation data in non‐equilibrium processes. The method provides an improvement of a previously published numerical scheme, the applicability of which is limited by a truncation problem. As an illustration, the method is applied to ion dissociation of NaCl in water, for which non‐trivial dampened oscillations are observed in the memory kernel.

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Derivation of the generalized Langevin equation in nonstationary environments

Cited by 39 publications

References 41 publications

Vibrational spectroscopy via the Caldeira-Leggett model with anharmonic system potentials

Vibrational spectroscopy via the Caldeira-Leggett model with anharmonic system potentials

Applicability of the Caldeira–Leggett Model to Vibrational Spectroscopy in Solution

A Numerical Procedure to Evaluate Memory Effects in Non‐Equilibrium Coarse‐Grained Models

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