A structure-preserving numerical discretization of reversible diffusions

Latorre, Juan C.; Metzner, Ph.; Hartmann, Carsten; Schütte, Ch.

doi:10.4310/cms.2011.v9.n4.a6

Cited by 18 publications

(6 citation statements)

References 45 publications

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“…For convenience of simulation and analysis, here we utilize a reversibility preserving numerical discretization scheme proposed in Ref. 33 with spatial mesh size 0.2 × 0.2 to generate the simulation trajectories and calculate the eigenvalues and eigenfunctions of the system.…”

Section: Appendix D: Diffusion Process Model Description and Simulationmentioning

confidence: 99%

Projected metastable Markov processes and their estimation with observable operator models

Prinz

Noé

2015

The Journal of Chemical Physics

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The determination of kinetics of high-dimensional dynamical systems, such as macromolecules, polymers, or spin systems, is a difficult and generally unsolved problem - both in simulation, where the optimal reaction coordinate(s) are generally unknown and are difficult to compute, and in experimental measurements, where only specific coordinates are observable. Markov models, or Markov state models, are widely used but suffer from the fact that the dynamics on a coarsely discretized state spaced are no longer Markovian, even if the dynamics in the full phase space are. The recently proposed projected Markov models (PMMs) are a formulation that provides a description of the kinetics on a low-dimensional projection without making the Markovianity assumption. However, as yet no general way of estimating PMMs from data has been available. Here, we show that the observed dynamics of a PMM can be exactly described by an observable operator model (OOM) and derive a PMM estimator based on the OOM learning.

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Section: Appendix D: Diffusion Process Model Description and Simulationmentioning

confidence: 99%

Projected metastable Markov processes and their estimation with observable operator models

Prinz

Noé

2015

The Journal of Chemical Physics

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“…invariant measure, reversibility, stability, stochastic interpretation). One prominent example of a spatial discretization scheme meeting these requirements is the so-called square-root approximation (SQRA) (Donati, Heida, Keller and Weber 2018, Donati, Weber and Keller 2021, Latorre, Metzner, Hartmann and Schütte 2011. In order to see how it works, we consider diffusive molecular dynamics, i.e.…”

Section: Spatial Discretization Of the Fokker-planck Equationmentioning

confidence: 99%

“…The master equation (4.2) inherits the main structural properties of the Fokker-Planck equation (4.1): is a rate matrix (non-negative off-diagonal entries and row-sums all equal to 0) with leading eigenvalues 0 and it satisfies the detailed balance condition, that is, ˆ = ˆ , where ˆ = Vol( ), which is thus also the invariant measure of the master equation (4.2). Donati et al (2021) and Latorre et al (2011) have given several alternative derivations of SQRA and its variants (leading to different ). SQRA is a method to calculate transition rates as a ratio of the invariant measure of neighbouring discretization sets times a flux.…”

Section: Spatial Discretization Of the Fokker-planck Equationmentioning

confidence: 99%

Overcoming the timescale barrier in molecular dynamics: Transfer operators, variational principles and machine learning

Schütte¹,

Klus²,

Hartmann³

2023

Acta Numerica

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One of the main challenges in molecular dynamics is overcoming the ‘timescale barrier’: in many realistic molecular systems, biologically important rare transitions occur on timescales that are not accessible to direct numerical simulation, even on the largest or specifically dedicated supercomputers. This article discusses how to circumvent the timescale barrier by a collection of transfer operator-based techniques that have emerged from dynamical systems theory, numerical mathematics and machine learning over the last two decades. We will focus on how transfer operators can be used to approximate the dynamical behaviour on long timescales, review the introduction of this approach into molecular dynamics, and outline the respective theory, as well as the algorithmic development, from the early numerics-based methods, via variational reformulations, to modern data-based techniques utilizing and improving concepts from machine learning. Furthermore, its relation to rare event simulation techniques will be explained, revealing a broad equivalence of variational principles for long-time quantities in molecular dynamics. The article will mainly take a mathematical perspective and will leave the application to real-world molecular systems to the more than 1000 research articles already written on this subject.

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“…The discretization can be made such that this matrix is a generator indeed. [12][13][14][15] The associated master equation, describing the propagation of probability distributions over the discrete state space, reads asμ…”

Section: Settingmentioning

confidence: 99%

“…The fineness of the discretization is chosen such that further refinement essentially does not alter the results on the level of accuracy we consider. The discrete generators L(t) ∈ R N ×N are obtained by discretizating [13][14][15] the continuous Fokker-Planck equation (5). This yields the propagator P = P(0, 3) by solving…”

Section: A Shifting Potentialmentioning

confidence: 99%

On metastability and Markov state models for non-stationary molecular dynamics

Koltai

Ciccotti

Schütte

2016

The Journal of Chemical Physics

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Unlike for systems in equilibrium, a straightforward definition of a metastable set in the non-stationary, non-equilibrium case may only be given case-by-case-and therefore it is not directly useful any more, in particular in cases where the slowest relaxation time scales are comparable to the time scales at which the external field driving the system varies. We generalize the concept of metastability by relying on the theory of coherent sets. A pair of sets A and B is called coherent with respect to the time interval [t, t] if (a) most of the trajectories starting in A at t end up in B at t and (b) most of the trajectories arriving in B at t actually started from A at t. Based on this definition, we can show how to compute coherent sets and then derive finite-time non-stationary Markov state models. We illustrate this concept and its main differences to equilibrium Markov state modeling on simple, one-dimensional examples.

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A structure-preserving numerical discretization of reversible diffusions

Cited by 18 publications

References 45 publications

Projected metastable Markov processes and their estimation with observable operator models

Projected metastable Markov processes and their estimation with observable operator models

Overcoming the timescale barrier in molecular dynamics: Transfer operators, variational principles and machine learning

On metastability and Markov state models for non-stationary molecular dynamics

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