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Main Authors: Long, Tobias, Barnett, Robert, Jefferson-Loveday, Richard, Stabile, Giovanni, Icardi, Matteo
Format: Preprint
Published: 2023
Subjects:
Online Access:https://arxiv.org/abs/2304.14883
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author Long, Tobias
Barnett, Robert
Jefferson-Loveday, Richard
Stabile, Giovanni
Icardi, Matteo
author_facet Long, Tobias
Barnett, Robert
Jefferson-Loveday, Richard
Stabile, Giovanni
Icardi, Matteo
contents Problems with dominant advection, discontinuities, travelling features, or shape variations are widespread in computational mechanics. However, classical linear model reduction and interpolation methods typically fail to reproduce even relatively small parameter variations, making the reduced models inefficient and inaccurate. This work proposes a model order reduction approach based on the Radon-Cumulative-Distribution transform (RCDT). We demonstrate numerically that this non-linear transformation can overcome some limitations of standard proper orthogonal decomposition (POD) reconstructions and is capable of interpolating accurately some advection-dominated phenomena, although it may introduce artefacts due to the discrete forward and inverse transform. The method is tested on various test cases coming from both manufactured examples and fluid dynamics problems.
format Preprint
id arxiv_https___arxiv_org_abs_2304_14883
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle A reduced-order model for advection-dominated problems based on Radon Cumulative Distribution Transform
Long, Tobias
Barnett, Robert
Jefferson-Loveday, Richard
Stabile, Giovanni
Icardi, Matteo
Numerical Analysis
Problems with dominant advection, discontinuities, travelling features, or shape variations are widespread in computational mechanics. However, classical linear model reduction and interpolation methods typically fail to reproduce even relatively small parameter variations, making the reduced models inefficient and inaccurate. This work proposes a model order reduction approach based on the Radon-Cumulative-Distribution transform (RCDT). We demonstrate numerically that this non-linear transformation can overcome some limitations of standard proper orthogonal decomposition (POD) reconstructions and is capable of interpolating accurately some advection-dominated phenomena, although it may introduce artefacts due to the discrete forward and inverse transform. The method is tested on various test cases coming from both manufactured examples and fluid dynamics problems.
title A reduced-order model for advection-dominated problems based on Radon Cumulative Distribution Transform
topic Numerical Analysis
url https://arxiv.org/abs/2304.14883