A relative entropy rate method for path space sensitivity analysis of stationary complex stochastic dynamics

Pantazis, Yannis; Katsoulakis, Markos A.

doi:10.1063/1.4789612

Cited by 44 publications

(127 citation statements)

References 62 publications

Supporting

Mentioning

125

Contrasting

Order By: Relevance

“…A similar expression can in fact be obtained for the trajectory probability density of Markovian processes in general, 22 and the derivation for the continuous time and continuous space Langevin dynamics is shown here for completion. The second term in eq 7 can be viewed as the entropy of the conditional probability density of time propagation and is defined as the Caliber by Jaynes.…”

Section: ■ Differential-equation Approach To Deriving the Trajectory mentioning

confidence: 56%

“…The probability density of a trajectory X(t) following the Langevin equation is described by the OM action: 29−31 (22) In this equation, the dynamic parameters of reference dynamics are labeled with the subscript of "ref" to explicitly illustrate the term cancelation discussed later. Furthermore, we also employ the ⟨g[X(t)]⟩ X(t) = ∫ X(t) [X(t)]g[X(t)] notation for an arbitrary functional of the trajectory X(t), g[X(t)].…”

Section: ■ Differential-equation Approach To Deriving the Trajectory mentioning

confidence: 99%

See 1 more Smart Citation

Analysis of Trajectory Entropy for Continuous Stochastic Processes at Equilibrium

2014

View full text Add to dashboard Cite

The analytical expression for the trajectory entropy of the overdamped Langevin equation is derived via two approaches. The first route goes through the Fokker−Planck equation that governs the propagation of the conditional probability density, while the second method goes through the path integral of the Onsager− Machlup action. The agreement of these two approaches in the continuum limit underscores the equivalence between the partial differential equation and the path integral formulations for stochastic processes in the context of trajectory entropy. The values obtained using the analytical expression are also compared with those calculated with numerical solutions for arbitrary time resolutions of the trajectory. Quantitative agreement is clearly observed consistently across different models as the time interval between snapshots in the trajectories decreases. Furthermore, analysis of different scenarios illustrates how the deterministic and stochastic forces in the Langevin equation contribute to the variation in dynamics measured by the trajectory entropy. ■ INTRODUCTIONConsider very generally a system that interacts with its environment and evolves over time. Let x be some continuous order parameter of interest (or an experimental or computational observable) that characterizes the spatial configuration and represents the state of the system. For example, x could be a molecule-scale observable in single-molecule experiments, such as the orientation-averaged dipole−dipole distance in a single-molecule Forster-type resonance energy transfer experiment, 1 the constant-force extension in a laser tweezers/atomic force pulling experiment, 2 or a collective coordinate from molecular dynamics simulations, 3 even a state variable in a quantum-control experiment. 4 In many problems of this type, including the examples given above, the time evolution of x can be described by the overdamped Langevin equation, 5where the subscript in x t is time. In the Langevin equation, D is the diffusion coefficient specifying the magnitude of the stochastic forces modeled by the Wiener process, dW t , satisfying ⟨dW t dW t′ ⟩ = δ(t − t′) dt. On the other hand, the deterministic component of the Langevin equation comes from the potential of mean force (PMF), V(x), and the mean force is F(x) = −dV(x)/dx. Here, we consider the PMF as nondimensionalized by k B T, where k B is the Boltzmann constant and T is the temperature. Suppose in one realization that the system is at an initial configuration x 0 at time zero. Then propagating the Langevin equation will trace out a trajectory X(t), a continuous but nondifferentiable function that gives a value of x t at time t, with t varying between 0 and the finite period of observation, t obs . For stationary processes, the system reaches equilibrium and the probability density of obtaining a particular value of X(t) = x along the trajectory is given by p eq (x) = exp(−V(x))/Z eq , where Z eq = ∫ dx exp(−V(x)) is the equilibrium partition function. 6 In this work, we consider an ense...

show abstract

Section: ■ Differential-equation Approach To Deriving the Trajectory mentioning

confidence: 56%

Section: ■ Differential-equation Approach To Deriving the Trajectory mentioning

confidence: 99%

Analysis of Trajectory Entropy for Continuous Stochastic Processes at Equilibrium

2014

View full text Add to dashboard Cite

show abstract

“…A similar quantity, in the context of sensitivity analysis, was recently considered in 33 , where the authors also developed efficient statistical estimators for the derivatives of RER ∂ θ k H(P | Q θ ) and ∂ 2 θiθj H(P | Q θ ). We discuss related estimators in Section IV.…”

Section: Parametrization Of Coarse-grained Dynamics and Inverse mentioning

confidence: 99%

“…While the evaluation of the Hessian Hess(H(P | Q θ n )) presents an additional computational cost, it also offers additional information about the parametrization, sensitivity and identifiability of the approximating model, 33 . Indeed the first and the second derivatives of the rate function H(P | Q θ n ) are of the form:…”

Section: Parametrization Of Coarse-grained Dynamics and Inverse mentioning

confidence: 99%

“…Furthermore, RER and in particular the pathspace FIM where introduced recently as gradient-free sensitivity analysis tools for complex, non-equilibrium stochastic systems with a wide range of applicability to reaction networks, lattice Kinetic Monte Carlo and Langevin dynamics 33 . Unlike the coarse-graining setting we propose here and where models are set in different state spaces depending on their granularity, in the latter work the same state space is assumed between compared models.…”

Section: Introductionmentioning

confidence: 99%

See 1 more Smart Citation

Information-theoretic tools for parametrized coarse-graining of non-equilibrium extended systems

Katsoulakis

Plecháč

2013

The Journal of Chemical Physics

Self Cite

View full text Add to dashboard Cite

In this paper we focus on the development of new methods suitable for efficient and reliable coarse-graining of non-equilibrium molecular systems. In this context, we propose error estimation and controlled-fidelity model reduction methods based on Path-Space Information Theory, combined with statistical parametric estimation of rates for non-equilibrium stationary processes. The approach we propose extends the applicability of existing information-based methods for deriving parametrized coarse-grained models to Non-Equilibrium systems with Stationary States (NESS). In the context of coarse-graining it allows for constructing optimal parametrized Markovian coarse-grained dynamics within a parametric family, by minimizing information loss (due to coarse-graining) on the path space. Furthermore, we propose an asymptotically equivalent methodrelated to maximum likelihood estimators for stochastic processes-where the coarse-graining is obtained by optimizing the information content in path space of the coarse variables, with respect to the projected computational data from a fine-scale simulation. Finally, the associated path-space Fisher Information Matrix can provide confidence intervals for the corresponding parameter estimators. We demonstrate the proposed coarse-graining method in (a) non-equilibrium systems with diffusing interacting particles, driven by out-ofequilibrium boundary conditions, as well as (b) multi-scale diffusions and their well-studied corresponding stochastic averaging limits, comparing them to our proposed methodologies.

show abstract

Nonparametric inference of stochastic differential equations based on the relative entropy rate

Dai

Duan

et al. 2022

Math Methods in App Sciences

View full text Add to dashboard Cite

The information detection of complex systems from data is currently undergoing a revolution, driven by the emergence of big data and machine learning methodology. Discovering governing equations and quantifying the dynamical properties of complex systems are among the central challenges. In this work, we devised a nonparametric approach to learning the relative entropy rate from observations of stochastic differential equations with different drift functions. The estimator corresponding to the relative entropy rate is then presented via the Gaussian process kernel theory. Meanwhile, this approach enables us to extract the governing equations. We illustrate our approach with several examples. Numerical experiments show the proposed approach performs well for rational drift functions, not only polynomial drift functions.

show abstract

A relative entropy rate method for path space sensitivity analysis of stationary complex stochastic dynamics

Cited by 44 publications

References 62 publications

Analysis of Trajectory Entropy for Continuous Stochastic Processes at Equilibrium

Analysis of Trajectory Entropy for Continuous Stochastic Processes at Equilibrium

Information-theoretic tools for parametrized coarse-graining of non-equilibrium extended systems

Nonparametric inference of stochastic differential equations based on the relative entropy rate

Contact Info

Product

Resources

About