Related papers: Extracting stochastic dynamical systems with $\alpha$-stable L\'evy noise from data

Extracting stochastic dynamical systems with $\alpha$-stable L\'evy noise from data

URL: http://arxiv.org/abs/2109.14881v1
Date: Thu, 30 Sep 2021 06:57:42 GMT
Title: Extracting stochastic dynamical systems with $\alpha$-stable L\'evy noise from data
Authors: Yang Li, Yubin Lu, Shengyuan Xu, Jinqiao Duan
Abstract summary: We propose a data-driven method to extract systems with $alpha$-stable L'evy noise from short burst data. More specifically, we first estimate the L'evy jump measure and noise intensity. Then we approximate the drift coefficient by combining nonlocal Kramers-Moyal formulas with normalizing flows.
Score: 14.230182518492311
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: With the rapid increase of valuable observational, experimental and simulated data for complex systems, much efforts have been devoted to identifying governing laws underlying the evolution of these systems. Despite the wide applications of non-Gaussian fluctuations in numerous physical phenomena, the data-driven approaches to extract stochastic dynamical systems with (non-Gaussian) L\'evy noise are relatively few so far. In this work, we propose a data-driven method to extract stochastic dynamical systems with $\alpha$-stable L\'evy noise from short burst data based on the properties of $\alpha$-stable distributions. More specifically, we first estimate the L\'evy jump measure and noise intensity via computing mean and variance of the amplitude of the increment of the sample paths. Then we approximate the drift coefficient by combining nonlocal Kramers-Moyal formulas with normalizing flows. Numerical experiments on one- and two-dimensional prototypical examples illustrate the accuracy and effectiveness of our method. This approach will become an effective scientific tool in discovering stochastic governing laws of complex phenomena and understanding dynamical behaviors under non-Gaussian fluctuations.

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