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The Discovery of Dynamics via Linear Multistep Methods and Deep Learning: Error Estimation

Qiang Du, Yiqi Gu, Haizhao Yang, Chao Zhou

2022SIAM Journal on Numerical Analysis21 citationsDOI

Abstract

Identifying hidden dynamics from observed data is a significant and challenging task in a wide range of applications. Recently, the combination of linear multistep methods (LMMs) and deep learning has been successfully employed to discover dynamics, whereas a complete convergence analysis of this approach is still under development. In this work, we consider the deep network-based LMMs for the discovery of dynamics. We put forward error estimates for these methods using the approximation property of deep networks. It indicates, for certain families of LMMs, that the $\ell^2$ grid error is bounded by the sum of $O(h^p)$ and the network approximation error, where $h$ is the time step size and $p$ is the local truncation error order. Numerical results of several physically relevant examples are provided to demonstrate our theory.

Topics & Concepts

Linear multistep methodTruncation errorMathematicsBounded functionConvergence (economics)Deep learningAlgorithmTruncation (statistics)Approximation errorRange (aeronautics)Applied mathematicsArtificial intelligenceComputer scienceMachine learningMathematical optimizationStatisticsMathematical analysisComposite materialEconomic growthDifferential algebraic equationMaterials scienceEconomicsOrdinary differential equationDifferential equationModel Reduction and Neural NetworksNumerical methods for differential equationsPower System Optimization and Stability
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