A fast and accurate physics-informed neural network reduced order model with shallow masked autoencoder

•A novel physics-informed neural network reduced order model is introduced.•It is based on nonlinear manifold solution representation.•A sparse shallow neural network structure is used for the nonlinear manifold.•The existing numerical discretization of the full order model is utilized.•Advection-do...

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Vydáno v:	Journal of computational physics Ročník 451; s. 110841
Hlavní autoři:	Kim, Youngkyu, Choi, Youngsoo, Widemann, David, Zohdi, Tarek
Médium:	Journal Article
Jazyk:	angličtina
Vydáno:	Cambridge Elsevier Inc 15.02.2022 Elsevier Science Ltd
Témata:	Advection Air flow Atmospheric models Burgers equation Computational physics Hyper-reduction Mathematical models Neural networks Nonlinear dynamical system Nonlinear manifold solution representation Numerical methods Operators (mathematics) Physics-informed neural network Reduced order model Reduced order models Reduction Solution space Subspaces Traffic flow Hyper-reduction Physics-informed neural network Nonlinear dynamical system Nonlinear manifold solution representation Reduced order model
ISSN:	0021-9991, 1090-2716
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Popis
Shrnutí:	•A novel physics-informed neural network reduced order model is introduced.•It is based on nonlinear manifold solution representation.•A sparse shallow neural network structure is used for the nonlinear manifold.•The existing numerical discretization of the full order model is utilized.•Advection-dominated problems are accelerated with great accuracy. Traditional linear subspace reduced order models (LS-ROMs) are able to accelerate physical simulations in which the intrinsic solution space falls into a subspace with a small dimension, i.e., the solution space has a small Kolmogorov n-width. However, for physical phenomena not of this type, e.g., any advection-dominated flow phenomena such as in traffic flow, atmospheric flows, and air flow over vehicles, a low-dimensional linear subspace poorly approximates the solution. To address cases such as these, we have developed a fast and accurate physics-informed neural network ROM, namely nonlinear manifold ROM (NM-ROM), which can better approximate high-fidelity model solutions with a smaller latent space dimension than the LS-ROMs. Our method takes advantage of the existing numerical methods that are used to solve the corresponding full order models. The efficiency is achieved by developing a hyper-reduction technique in the context of the NM-ROM. Numerical results show that neural networks can learn a more efficient latent space representation on advection-dominated data from 1D and 2D Burgers' equations. A speedup of up to 2.6 for 1D Burgers' and a speedup of 11.7 for 2D Burgers' equations are achieved with an appropriate treatment of the nonlinear terms through a hyper-reduction technique. Finally, a posteriori error bounds for the NM-ROMs are derived that take account of the hyper-reduced operators.
Bibliografie:	ObjectType-Article-1 SourceType-Scholarly Journals-1 ObjectType-Feature-2 content type line 14
ISSN:	0021-9991 1090-2716
DOI:	10.1016/j.jcp.2021.110841