Time-series forecasting using manifold learning, radial basis function interpolation, and geometric harmonics

Author:

Papaioannou Panagiotis G.1,Talmon Ronen2ORCID,Kevrekidis Ioannis G.3ORCID,Siettos Constantinos4ORCID

Affiliation:

1. Dipartimento di Matematica e Applicazioni “Renato Caccioppoli,” Università degli Studi di Napoli Federico II, Naples 80126, Italy

2. Viterbi Faculty of Electrical and Computer Engineering, Technion, Israel Institute of Technology, Haifa 3200003, Israel

3. Department of Chemical and Biomolecular Engineering, Department of Applied Mathematics and Statistics, and the School of Medicine, Johns Hopkins University, Baltimore, Maryland 21218, USA

4. Dipartimento di Matematica e Applicazioni “Renato Caccioppoli” and Scuola Superiore Meridionale, Università degli Studi di Napoli Federico II, Naples 80126, Italy

Abstract

We address a three-tier numerical framework based on nonlinear manifold learning for the forecasting of high-dimensional time series, relaxing the “curse of dimensionality” related to the training phase of surrogate/machine learning models. At the first step, we embed the high-dimensional time series into a reduced low-dimensional space using nonlinear manifold learning (local linear embedding and parsimonious diffusion maps). Then, we construct reduced-order surrogate models on the manifold (here, for our illustrations, we used multivariate autoregressive and Gaussian process regression models) to forecast the embedded dynamics. Finally, we solve the pre-image problem, thus lifting the embedded time series back to the original high-dimensional space using radial basis function interpolation and geometric harmonics. The proposed numerical data-driven scheme can also be applied as a reduced-order model procedure for the numerical solution/propagation of the (transient) dynamics of partial differential equations (PDEs). We assess the performance of the proposed scheme via three different families of problems: (a) the forecasting of synthetic time series generated by three simplistic linear and weakly nonlinear stochastic models resembling electroencephalography signals, (b) the prediction/propagation of the solution profiles of a linear parabolic PDE and the Brusselator model (a set of two nonlinear parabolic PDEs), and (c) the forecasting of a real-world data set containing daily time series of ten key foreign exchange rates spanning the time period 3 September 2001–29 October 2020.

Funder

Ministero dell'Istruzione, dell'Università e della Ricerca

U.S. Department of Energy

Publisher

AIP Publishing

Subject

Applied Mathematics,General Physics and Astronomy,Mathematical Physics,Statistical and Nonlinear Physics

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