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Main Author: Chasapi, Margarita
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2510.10624
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author Chasapi, Margarita
author_facet Chasapi, Margarita
contents This contribution presents a model order reduction strategy for fast parametric modelling of problems with cracks formulated on spline discretizations. In the context of damage detection, parametric reduced order models (ROMs) are well suited for fast computations by establishing an efficient offline/online split of the simulation process. The problems of interest focus on geometric parameters that describe the crack configuration and may pose challenges to constructing efficient ROMs. This work proposes a framework based on non-intrusive reduced basis methods and a localization strategy tailored to parametric problems with moving discontinuities. The combined benefits of non-intrusive ROMs and localization enable accurate and efficient reduction with low online cost. We demonstrate the applicability of the ROM approach with benchmark tests on linear elastic problems discretized with splines and the extended isogeometric method (XIGA) for crack modelling. The results we obtain show the accuracy and real-time efficiency of the constructed reduced order models.
format Preprint
id arxiv_https___arxiv_org_abs_2510_10624
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Parameterized crack modelling based on a localized non-intrusive reduced basis method
Chasapi, Margarita
Computational Engineering, Finance, and Science
This contribution presents a model order reduction strategy for fast parametric modelling of problems with cracks formulated on spline discretizations. In the context of damage detection, parametric reduced order models (ROMs) are well suited for fast computations by establishing an efficient offline/online split of the simulation process. The problems of interest focus on geometric parameters that describe the crack configuration and may pose challenges to constructing efficient ROMs. This work proposes a framework based on non-intrusive reduced basis methods and a localization strategy tailored to parametric problems with moving discontinuities. The combined benefits of non-intrusive ROMs and localization enable accurate and efficient reduction with low online cost. We demonstrate the applicability of the ROM approach with benchmark tests on linear elastic problems discretized with splines and the extended isogeometric method (XIGA) for crack modelling. The results we obtain show the accuracy and real-time efficiency of the constructed reduced order models.
title Parameterized crack modelling based on a localized non-intrusive reduced basis method
topic Computational Engineering, Finance, and Science
url https://arxiv.org/abs/2510.10624