Neural partial differential equations for chaotic systems

Gelbrecht, Maximilian; Boers, Niklas; Kurths, Jürgen

doi:10.1088/1367-2630/abeb90

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Neural partial differential equations for chaotic systems

Gelbrecht, M., Boers, N., Kurths, J. (2021): Neural partial differential equations for chaotic systems. - New Journal of Physics, 23, 043005.
https://doi.org/10.1088/1367-2630/abeb90

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Item Permalink: https://publications.pik-potsdam.de/pubman/item/item_25408 Version Permalink: https://publications.pik-potsdam.de/pubman/item/item_25408_4

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Creators:
Gelbrecht, Maximilian¹, Author
Boers, Niklas¹, Author
Kurths, Jürgen¹, Author

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1Potsdam Institute for Climate Impact Research, Potsdam, ou_persistent13

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Abstract: When predicting complex systems one typically relies on differential equation which can often be incomplete, missing unknown infl uences or higher order effects. By augmenting the equations with artificial neural networks we can compensate these deficiencies. We show that this can be used to predict paradigmatic, high-dimensional chaotic partial differential equations even when only short and incomplete datasets are available. The forecast horizon for these high dimensional systems is about an order of magnitude larger than the length of the training data.

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Dates: Accepted: 2021-03-03Published Online: 2021-03-03Finally published : 2021-04-02

Publication Status: Finally published

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Rev. Type: Peer

Identifiers: DOI: 10.1088/1367-2630/abeb90
PIKDOMAIN: RD4 - Complexity Science
Organisational keyword: RD4 - Complexity Science
MDB-ID: yes - 3195
Research topic keyword: Nonlinear Dynamics
Organisational keyword: FutureLab - Artificial Intelligence in the Anthropocene
Model / method: Machine Learning
Model / method: Nonlinear Data Analysis
OATYPE: Gold Open Access

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Title: New Journal of Physics

Source Genre: Journal, SCI, Scopus, p3, oa

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Pages: - Volume / Issue: 23 Sequence Number: 043005 Start / End Page: - Identifier: CoNE: https://publications.pik-potsdam.de/cone/journals/resource/1911272
Publisher: IOP Publishing