Path-Space Information Bounds for Uncertainty Quantification and Sensitivity Analysis of Stochastic Dynamics

Abstract: Uncertainty quantification is a primary challenge for reliable modeling and simulation of complex stochastic dynamics. Such problems are typically plagued with incomplete information that may enter as uncertainty in the model parameters, or even in the model itself. Furthermore, due to their dynamic nature, we need to assess the impact of these uncertainties on the transient and long-time behavior of the stochastic models and derive corresponding uncertainty bounds for observables of interest. A special class … Show more

“…It can be seen that Var {W θi (T )} = O(T ), so one must balance choosing a terminal time T large enough to ensure sufficient decay of the bias E pT (θ) {f (X(T ))} − E π(θ) {f (X)}, yet as small as possible to contain the growth of the Var {W θi (T )}. While centering as in (15) helps to reduce the variance of the estimator, the variance is usually much larger than comparable finite difference of pathwise derivative methods [16][17][18] . Instead of using the terminal distribution f (X(T )) as an approximation of the steady-state distribution, one could instead use the ergodic-average (timeaverage) 1/T T 0 f (X(s))ds.…”

“…Statistics are taken at a termination time of t = 0.5s. Species averages are calculated as arithmetic averages over the independent trajectories while sensitivities are computed with the CLR method shown in (15). The error due to statistical averaging is estimated using t-test statistics for averages and a bootstrapping method for sensitivities.…”

“…The sensitivities give important insight into the system, indicating directions for gradient-descent type optimization as well as determining bounds for quantifying the uncertainty 15 . Current techniques for estimating the sensitivities have large variance, requiring many more samples than those for estimating E θ {f (X)} alone [16][17][18][19] .…”

Stochastic averaging and sensitivity analysis for two scale reaction networks

“…It can be seen that Var {W θi (T )} = O(T ), so one must balance choosing a terminal time T large enough to ensure sufficient decay of the bias E pT (θ) {f (X(T ))} − E π(θ) {f (X)}, yet as small as possible to contain the growth of the Var {W θi (T )}. While centering as in (15) helps to reduce the variance of the estimator, the variance is usually much larger than comparable finite difference of pathwise derivative methods [16][17][18] . Instead of using the terminal distribution f (X(T )) as an approximation of the steady-state distribution, one could instead use the ergodic-average (timeaverage) 1/T T 0 f (X(s))ds.…”

“…Statistics are taken at a termination time of t = 0.5s. Species averages are calculated as arithmetic averages over the independent trajectories while sensitivities are computed with the CLR method shown in (15). The error due to statistical averaging is estimated using t-test statistics for averages and a bootstrapping method for sensitivities.…”

“…The sensitivities give important insight into the system, indicating directions for gradient-descent type optimization as well as determining bounds for quantifying the uncertainty 15 . Current techniques for estimating the sensitivities have large variance, requiring many more samples than those for estimating E θ {f (X)} alone [16][17][18][19] .…”

Stochastic averaging and sensitivity analysis for two scale reaction networks

“…Methods such as inverse Monte Carlo [1], inverse Boltzmann [2], force matching [3], relative entropy [4], provide parameterizations of coarse-grained effective potentials at equilibrium by minimizing a fitting functional over a parameter space. Then, we further extend these studies using path-space methods (relative entropy rate) for coarse-graining and uncertainty quantification for non-equilibrium processes, [5,6,7,8].…”

From Atomistic to Systematic Coarse-Grained Models for Molecular Systems

“…These bounds are well-behaved in the infinite-time limit and apply to steady-states.Keywords uncertainty quantification · Markov process · relative entropy · Poincaré inequality · log-Sobolev inequality · Liapunov function · Bernstein inequality Mathematics Subject Classification (2010) 47D07 · 39B72 · 60F10 · 60J25 1 Introduction Information-theory based variational principles have proven effective at providing uncertainty quantification (i.e. robustness) bounds for quantities-ofinterest in the presence of non-parametric model-form uncertainty [1,2,3,4,5,6,7,8,9,10]. In the present work, we combine these tools with functional…”

Uncertainty Quantification for Markov Processes via Variational Principles and Functional Inequalities