Adaptive POD-DEIM correction for Turing pattern approximation in reaction-diffusion PDE systems

Alla, Alessandro; Monti, Angela; Sgura, Ivonne

doi:10.48550/arxiv.2203.05998

Cited by 2 publications

(2 citation statements)

References 39 publications

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“…This step can alleviate the cost of low-fidelity model approximations significantly. For some of the current research work one can refer to the articles [42,43] on adaptive hyper reduction techniques which allows enrichment of the reduced integration domain during the online stage as the simulation progresses.…”

Section: Discussionmentioning

confidence: 99%

An iterative multi-fidelity approach for model order reduction of multi-dimensional input parametric PDE systems

Chetry¹,

Borzacchiello²,

Lestandi³

et al. 2023

Preprint

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We propose a parametric sampling strategy for the reduction of large-scale PDE systems with multidimensional input parametric spaces by leveraging models of different fidelity. The design of this methodology allows a user to adaptively sample points ad hoc from a discrete training set with no prior requirement of error estimators.It is achieved by exploiting low-fidelity models throughout the parametric space to sample points using an efficient sampling strategy, and at the sampled parametric points, high-fidelity models are evaluated to recover the reduced basis functions. The low-fidelity models are then adapted with the reduced order models ( ROMs) built by projection onto the subspace spanned by the recovered basis functions. The process continues until the low-fidelity model can represent the high-fidelity model adequately for all the parameters in the parametric space. Since the proposed methodology leverages the use of low-fidelity models to assimilate the solution database, it significantly reduces the computational cost in the offline stage. The highlight of this article is to present the construction of the initial low-fidelity model, and a sampling strategy based on the discrete empirical interpolation method (DEIM). We test this approach on a 2D steady-state heat conduction problem for two different input parameters and make a qualitative comparison with the classical greedy reduced basis method (RBM), and further test on a 9-dimensional parametric non-coercive elliptic problem and analyze the computational performance based on different tuning of greedy selection of points.

show abstract

Section: Discussionmentioning

confidence: 99%

An iterative multi-fidelity approach for model order reduction of multi-dimensional input parametric PDE systems

Chetry¹,

Borzacchiello²,

Lestandi³

et al. 2023

Preprint

View full text Add to dashboard Cite

show abstract

“…This step can alleviate the cost of low-fidelity model approximations significantly. For some of the current research work one can refer to the articles [46][47][48] on adaptive hyper reduction techniques which allows enrichment of the reduced integration domain during the online stage as the simulation progresses.…”

Section: Discussionmentioning

confidence: 99%

An iterative multi‐fidelity approach for model order reduction of multidimensional input parametric PDE systems

Chetry

Borzacchiello

Lestandi

et al. 2023

Numerical Meth Engineering

View full text Add to dashboard Cite

We propose a parametric sampling strategy for reduction of large scale PDE systems with multidimensional input parametric spaces by leveraging models of different fidelity. The design of this methodology allows a user to adaptively sample points ad hoc from a discrete training set with no prior requirement of error estimators. It is achieved by exploiting low‐fidelity models throughout the parametric space to sample points using an efficient sampling strategy, and at the sampled parametric points, high‐fidelity models are evaluated to recover the reduced basis functions. The low‐fidelity models are then adapted with the reduced order models built by projection onto the subspace spanned by the recovered basis functions. The process continues until the low‐fidelity model can represent the high‐fidelity model adequately for all the parameters in the parametric space. Since the proposed methodology leverages the use of low‐fidelity models to assimilate the solution database, it significantly reduces the computational cost in the offline stage. The highlight of this article is to present the construction of the initial low‐fidelity model, and a sampling strategy based on the discrete empirical interpolation method. We test this approach on a 2D steady‐state heat conduction problem for two different input parameters and make a qualitative comparison with the classical greedy reduced basis method and with random selection of points. Further, we test the efficacy of the proposed method on a 9‐dimensional parametric non‐coercive elliptic problem and analyze the computational performance based on different tuning of greedy selection of points.

show abstract

Adaptive POD-DEIM correction for Turing pattern approximation in reaction-diffusion PDE systems

Cited by 2 publications

References 39 publications

An iterative multi-fidelity approach for model order reduction of multi-dimensional input parametric PDE systems

An iterative multi-fidelity approach for model order reduction of multi-dimensional input parametric PDE systems

An iterative multi‐fidelity approach for model order reduction of multidimensional input parametric PDE systems

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