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Statistical Spatially Inhomogeneous Diffusion Inference

Machine Learning 2023-12-12 v1 Machine Learning Numerical Analysis Numerical Analysis Statistics Theory Statistics Theory

Abstract

Inferring a diffusion equation from discretely-observed measurements is a statistical challenge of significant importance in a variety of fields, from single-molecule tracking in biophysical systems to modeling financial instruments. Assuming that the underlying dynamical process obeys a dd-dimensional stochastic differential equation of the form dxt=b(xt)dt+Σ(xt)dwt,\mathrm{d}\boldsymbol{x}_t=\boldsymbol{b}(\boldsymbol{x}_t)\mathrm{d} t+\Sigma(\boldsymbol{x}_t)\mathrm{d}\boldsymbol{w}_t, we propose neural network-based estimators of both the drift b\boldsymbol{b} and the spatially-inhomogeneous diffusion tensor D=ΣΣTD = \Sigma\Sigma^{T} and provide statistical convergence guarantees when b\boldsymbol{b} and DD are ss-H\"older continuous. Notably, our bound aligns with the minimax optimal rate N2s2s+dN^{-\frac{2s}{2s+d}} for nonparametric function estimation even in the presence of correlation within observational data, which necessitates careful handling when establishing fast-rate generalization bounds. Our theoretical results are bolstered by numerical experiments demonstrating accurate inference of spatially-inhomogeneous diffusion tensors.

Keywords

Cite

@article{arxiv.2312.05793,
  title  = {Statistical Spatially Inhomogeneous Diffusion Inference},
  author = {Yinuo Ren and Yiping Lu and Lexing Ying and Grant M. Rotskoff},
  journal= {arXiv preprint arXiv:2312.05793},
  year   = {2023}
}

Comments

Accepted by AAAI 2024

R2 v1 2026-06-28T13:46:12.204Z