Inferring nonlinear fractional diffusion processes from single trajectories
Abstract
We present a method to infer the arbitrary space-dependent drift and diffusion of a nonlinear stochastic model driven by multiplicative fractional Gaussian noise from a single trajectory. Our method, fractional Onsager-Machlup optimisation (fOMo), introduces a maximum likelihood estimator by minimising a field-theoretic action which we construct from the observed time series. We successfully test fOMo for a wide range of Hurst exponents using artificial data with strong nonlinearities, and apply it to a data set of daily mean temperatures. We further highlight the significant systematic estimation errors when ignoring non-Markovianity, underlining the need for nonlinear fractional inference methods when studying real-world long-range (anti-)correlated systems.
Cite
@article{arxiv.2304.02536,
title = {Inferring nonlinear fractional diffusion processes from single trajectories},
author = {Johannes A. Kassel and Benjamin Walter and Holger Kantz},
journal= {arXiv preprint arXiv:2304.02536},
year = {2023}
}
Comments
21 pages, 5 figures, appendices