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Learning dynamical systems from data: A simple cross-validation perspective, part III: Irregularly-Sampled Time Series

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arxiv 2111.13037 v2 pith:FTPXLM6Y submitted 2021-11-25 stat.ML cs.LGmath.DSstat.CO

Learning dynamical systems from data: A simple cross-validation perspective, part III: Irregularly-Sampled Time Series

classification stat.ML cs.LGmath.DSstat.CO
keywords dynamicalkerneltimeaccuracydatasimplesystemdata-adapted
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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A simple and interpretable way to learn a dynamical system from data is to interpolate its vector-field with a kernel. In particular, this strategy is highly efficient (both in terms of accuracy and complexity) when the kernel is data-adapted using Kernel Flows (KF)\cite{Owhadi19} (which uses gradient-based optimization to learn a kernel based on the premise that a kernel is good if there is no significant loss in accuracy if half of the data is used for interpolation). Despite its previous successes, this strategy (based on interpolating the vector field driving the dynamical system) breaks down when the observed time series is not regularly sampled in time. In this work, we propose to address this problem by directly approximating the vector field of the dynamical system by incorporating time differences between observations in the (KF) data-adapted kernels. We compare our approach with the classical one over different benchmark dynamical systems and show that it significantly improves the forecasting accuracy while remaining simple, fast, and robust.

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