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Title: Solving Inverse Stochastic Problems from Discrete Particle Observations Using the Fokker--Planck Equation and Physics-Informed Neural Networks

Journal Article · · SIAM Journal on Scientific Computing
DOI:https://doi.org/10.1137/20m1360153· OSTI ID:2282021
ORCiD logo [1]; ORCiD logo [1]; ORCiD logo [2]; ORCiD logo [3]
  1. Brown University, Providence, RI (United States)
  2. Illinois Institute of Technology,Chicago, IL (United States)
  3. Pacific Northwest National Laboratory (PNNL), Richland, WA (United States)
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The Fokker--Planck (FP) equation governing the evolution of the probability density function (PDF) is applicable to many disciplines, but it requires specification of the coefficients for each case, which can be functions of space-time and not just constants and hence require the development of a data-driven modeling approach. When the data available is directly on the PDF, there exist methods for inverse problems that can be employed to infer the coefficients and thus determine the FP equation and subsequently obtain its solution. Herein, we address a more realistic scenario, where only sparse data are given on the particles' positions at a few time instants, which are not sufficient to accurately construct directly the PDF even at those times from existing methods, e.g., kernel estimation algorithms. To this end, we develop a general framework based on physics-informed neural networks (PINNs) that introduces a new loss function using the Kullback--Leibler divergence to connect the stochastic samples with the FP equation to simultaneously learn the equation and infer the multidimensional PDF at all times. In particular, we consider two types of inverse problems, type I, where the FP equation is known but the initial PDF is unknown, and type II, in which, in addition to the unknown initial PDF, the drift and diffusion terms are also unknown. In both cases, we investigate problems with either Brownian or Lévy noise or a combination of both. Here, we demonstrate the new PINN framework in detail in the one-dimensional (1D) case, but we also provide results for up to five dimensions demonstrating that we can infer both the FP equation and dynamics simultaneously at all times with high accuracy using only very few discrete observations of the particles.

Research Organization:
Brown Univ., Providence, RI (United States)
Sponsoring Organization:
USDOE; OSD/ARO/MURI; National Institutes of Health (NIH); China Scholarship Council
Grant/Contract Number:
SC0019453; W911NF-15-1-0562; U01 HL142518; 01806160038; NSF11801192
OSTI ID:
2282021
Journal Information:
SIAM Journal on Scientific Computing, Vol. 43, Issue 3; ISSN 1064-8275
Publisher:
Society for Industrial and Applied Mathematics (SIAM)Copyright Statement
Country of Publication:
United States
Language:
English

References (13)

Solving high-dimensional partial differential equations using deep learning journal August 2018
Estimating Divergence Functionals and the Likelihood Ratio by Convex Risk Minimization journal November 2010
Solving Fokker-Planck equation using deep learning journal January 2020
A Novel High Order Space-Time Spectral Method for the Time Fractional Fokker--Planck Equation journal January 2015
Finite Element Method for the Space and Time Fractional Fokker–Planck Equation journal January 2009
Most probable dynamics of a genetic regulatory network under stable Lévy noise journal May 2019
Fokker–Planck equations for stochastic dynamical systems with symmetric Lévy motions journal March 2016
Sparse learning of stochastic dynamical equations journal June 2018
Physics-informed neural networks: A deep learning framework for solving forward and inverse problems involving nonlinear partial differential equations journal February 2019
fPINNs: Fractional Physics-Informed Neural Networks journal January 2019
Variational Inference for Stochastic Differential Equations journal January 2019
Data-driven discovery of coarse-grained equations journal June 2021
Bandwidth selection for kernel density estimation: a review of fully automatic selectors journal June 2013

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Related Subjects

97 MATHEMATICS AND COMPUTING
physics-informed learning
small data
deep neural networks
Lévy noise
Kullback-Leibler divergence
nonlocality