Rational-based model order reduction of Helmholtz frequency response problems with adaptive finite element snapshots
Bonizzoni, Francesca and Pradovera, Davide and Ruggeri, Michele (2021) Rational-based model order reduction of Helmholtz frequency response problems with adaptive finite element snapshots. Other. arXiv.org, Ithaca, New York. (https://doi.org/10.48550/arXiv.2112.04302)
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Abstract
We introduce several spatially adaptive model order reduction approaches tailored to non-coercive elliptic boundary value problems, specifically, parametric-in-frequency Helmholtz problems. The offline information is computed by means of adaptive finite elements, so that each snapshot lives on a different discrete space that resolves the local singularities of the solution and is adjusted to the considered frequency value. A rational surrogate is then assembled adopting either a least-squares or an interpolatory approach, yielding the standard rational interpolation method (SRI), a vector- or function-valued version of it (V-SRI), and the minimal rational interpolation method (MRI). In the context of building an approximation for linear or quadratic functionals of the Helmholtz solution, we perform several numerical experiments to compare the proposed methodologies. Our simulations show that, for interior resonant problems (whose singularities are encoded by poles on the real axis), the spatially adaptive V-SRI and MRI work comparably well. Instead, when dealing with exterior scattering problems, whose frequency response is mostly smooth, theV-SRI method seems to be the best-performing one.
ORCID iDs
Bonizzoni, Francesca, Pradovera, Davide and Ruggeri, Michele ORCID: https://orcid.org/0000-0001-6213-1602;-
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Item type: Monograph(Other) ID code: 80642 Dates: DateEvent8 December 2021PublishedSubjects: Science > Mathematics Department: Faculty of Science > Mathematics and Statistics Depositing user: Pure Administrator Date deposited: 10 May 2022 14:38 Last modified: 12 Dec 2024 01:54 URI: https://strathprints.strath.ac.uk/id/eprint/80642