Online Adaptive Model Reduction for Nonlinear Systems via Low-Rank Updates
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This work presents a nonlinear model reduction approach for systems of equations stemming from the discretization of partial differential equations with nonlinear terms. Our approach constructs a reduced system with proper orthogonal decomposition and the discrete empirical interpolation method (DEIM); however, whereas classical DEIM derives a linear approximation of the nonlinear terms in a static DEIM space generated in an offline phase, our method adapts the DEIM space as the online calculation proceeds and thus provides a nonlinear approximation. The online adaptation uses new data to produce a reduced system that accurately approximates behavior not anticipated in the offline phase. These online data are obtained by querying the full-order system during the online phase, but only at a few selected components to guarantee a computationally efficient adaptation. Compared to the classical static approach, our online adaptive and nonlinear model reduction approach achieves accuracy improvements of up to three orders of magnitude in our numerical experiments with time-dependent and steady-state nonlinear problems. The examples also demonstrate that through adaptivity, our reduced systems provide valid approximations of the full-order systems outside of the parameter domains for which they were initially built in the offline phase.
Date issued
2015-08Department
Massachusetts Institute of Technology. Department of Aeronautics and AstronauticsJournal
SIAM Journal on Scientific Computing
Publisher
Society for Industrial and Applied Mathematics
Citation
Peherstorfer, Benjamin, and Karen Willcox. “Online Adaptive Model Reduction for Nonlinear Systems via Low-Rank Updates.” SIAM Journal on Scientific Computing 37, no. 4 (January 2015): A2123–A2150. © 2015, Society for Industrial and Applied Mathematics
Version: Final published version
ISSN
1064-8275
1095-7197