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Convergence Study on the C-Beam Using Joint Modes Based on Trial Vector Derivatives Read chapter Read first chapter

2021 | OriginalPaper | Chapter

36. Experimental Spectral Submanifold Reduced Order Models from Machine Learning

Authors : Mattia Cenedese, George Haller

Published in: Nonlinear Structures & Systems, Volume 1

Publisher: Springer International Publishing

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Abstract

Nonlinear system identification is a challenging problem in experimental modal analysis. It is currently tackled using a toolbox approach, where different techniques are employed depending on the structural system under investigation, the identification goals and the type of excitation used. In this contribution, we exploit analytic reduction to spectral submanifolds combined with machine learning techniques in order to obtain the nonlinear coefficients up to cubic order of a single-degree-of-freedom reduced order model. The system measurements aimed at model fitting can be performed using any type of excitation techniques, ranging from free-decay to sine-sweeps or random shaker testing. We illustrate the accuracy of our method using both simulated and real experimental data.

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previous chapter Simulation-Free Reduction Basis Interpolation to Reduce Parametrized Dynamic Models of Geometrically Non-linear Structures
next chapter Development of an Experimental Rig for Emulating Undulatory Locomotion
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Metadata
Title
Experimental Spectral Submanifold Reduced Order Models from Machine Learning
Authors
Mattia Cenedese
George Haller
Copyright Year
2021
Book
Nonlinear Structures & Systems, Volume 1

Print ISBN: 978-3-030-47625-0

Electronic ISBN: 978-3-030-47626-7

Copyright Year: 2021

DOI
https://doi.org/10.1007/978-3-030-47626-7_36