Spatiotemporal Analysis Using Riemannian Composition of Diffusion Operators
Abstract
Multivariate time-series have become abundant in recent years, as many data-acquisition systems record information through multiple sensors simultaneously. In this paper, we assume the variables pertain to some geometry and present an operator-based approach for spatiotemporal analysis. Our approach combines three components that are often considered separately: (i) manifold learning for building operators representing the geometry of the variables, (ii) Riemannian geometry of symmetric positive-definite matrices for multiscale composition of operators corresponding to different time samples, and (iii) spectral analysis of the composite operators for extracting different dynamic modes. We propose a method that is analogous to the classical wavelet analysis, which we term Riemannian multi-resolution analysis (RMRA). We provide some theoretical results on the spectral analysis of the composite operators, and we demonstrate the proposed method on simulations and on real data.
Cite
@article{arxiv.2201.08530,
title = {Spatiotemporal Analysis Using Riemannian Composition of Diffusion Operators},
author = {Tal Shnitzer and Hau-Tieng Wu and Ronen Talmon},
journal= {arXiv preprint arXiv:2201.08530},
year = {2022}
}
Comments
48 pages, 13 figures