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arxiv: 2110.07653 · v4 · pith:CPR6SU2Fnew · submitted 2021-10-14 · 💻 cs.CE · cs.NA· math.NA

Non-intrusive reduced-order models for parametric partial differential equations via data-driven operator inference

classification 💻 cs.CE cs.NAmath.NA
keywords reduced-orderparametricdata-drivenequationslearningmodelparameterizeddifferential
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This work formulates a new approach to reduced modeling of parameterized, time-dependent partial differential equations (PDEs). The method employs Operator Inference, a scientific machine learning framework combining data-driven learning and physics-based modeling. The parametric structure of the governing equations is embedded directly into the reduced-order model, and parameterized reduced-order operators are learned via a data-driven linear regression problem. The result is a reduced-order model that can be solved rapidly to map parameter values to approximate PDE solutions. Such parameterized reduced-order models may be used as physics-based surrogates for uncertainty quantification and inverse problems that require many forward solves of parametric PDEs. Numerical issues such as well-posedness and the need for appropriate regularization in the learning problem are considered, and an algorithm for hyperparameter selection is presented. The method is illustrated for a parametric heat equation and demonstrated for the FitzHugh-Nagumo neuron model.

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