Globalizing manifold-based reduced models for equations and data
Shranjeno v:
| izdano v: | Nature Communications vol. 16, no. 1 (2025), p. 5722 |
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Nature Publishing Group
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| Online dostop: | Citation/Abstract Full Text Full Text - PDF |
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| Resumen: | One of the very few mathematically rigorous nonlinear model reduction methods is the restriction of a dynamical system to a low-dimensional, sufficiently smooth, attracting invariant manifold. Such manifolds are usually found using local polynomial approximations and, hence, are limited by the unknown domains of convergence of their Taylor expansions. To address this limitation, we extend local expansions for invariant manifolds via Padé approximants, which re-express the Taylor expansions as rational functions for broader utility. This approach significantly expands the range of applicability of manifold-reduced models, enabling reduced modeling of global phenomena, such as large-scale oscillations and chaotic attractors of finite element models. We illustrate the power of globalized manifold-based model reduction on several equation-driven and data-driven examples from solid mechanics and fluid mechanics.Manifold-based model reduction often uses power series expansions that fail to converge on larger domains. Here, authors extend the reach of such approximations using global rational approximants. This enables the reduced models to capture previously inaccessible nonlinear dynamics. |
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| ISSN: | 2041-1723 |
| DOI: | 10.1038/s41467-025-61252-9 |
| Fuente: | Health & Medical Collection |