Comparison of nonlinear mappings for reduced-order modelling of vibrating structures: normal form theory and quadratic manifold method with modal derivatives

Vizzaccaro, Alessandra; Salles, Loïc; Touzé, Cyril

doi:10.1007/s11071-020-05813-1

Article (Scientific journals)

Comparison of nonlinear mappings for reduced-order modelling of vibrating structures: normal form theory and quadratic manifold method with modal derivatives

Vizzaccaro, Alessandra; Salles, Loïc; Touzé, Cyril

2021 • In Nonlinear Dynamics, 103 (4), p. 3335 - 3370

Peer reviewed

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https://hdl.handle.net/2268/334054

DOI
10.1007/s11071-020-05813-1

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Keywords :

Reduced-order modelling; Normal form; Quadratic manifold; Modal derivatives

Abstract :

[en] The objective of this contribution is to compare two methods proposed recently in order to build efficient reduced-order models for geometrically nonlinear structures. The first method relies on the normal form theory that allows one to obtain a nonlinear change of coordinates for expressing the reduced-order dynamics in an invariant-based span of the phase space. The second method is the modal derivative approach, and more specifically, the quadratic manifold defined in order to derive a second-order nonlinear change of coordinates. Both methods share a common point of view, willing to introduce a nonlinear mapping to better define a reduced-order model that could take more properly into account the nonlinear restoring forces. However, the calculation methods are different and the quadratic manifold approach has not the invariance property embedded in its definition. Modal derivatives and static modal derivatives are investigated, and their distinctive features in the treatment of the quadratic nonlinearity are underlined. Assuming a slow/fast decomposition allows understanding how the three methods tend to share equivalent properties. While they give proper estimations for flat symmetric structures having a specific shape of nonlinearities and a clear slow/fast decomposition between flexural and in-plane modes, the treatment of the quadratic nonlinearity makes the predictions different in the case of curved structures such as arches and shells. In the more general case, normal form approach appears preferable since it allows correct predictions of a number of important nonlinear features, including the hardening/softening behaviour, whatever the relationships between slave and master coordinates are.

Disciplines :

Aerospace & aeronautics engineering
Mechanical engineering

Author, co-author :

Vizzaccaro, Alessandra

Salles, Loïc ; Université de Liège - ULiège > Aérospatiale et Mécanique (A&M) ; Université de Liège - ULiège > Département d'aérospatiale et mécanique > Vibration of Turbomachines ; Imperial College London > Mechanical Engineering > Vibration University Technology Center

Touzé, Cyril

Language :

English

Title :

Comparison of nonlinear mappings for reduced-order modelling of vibrating structures: normal form theory and quadratic manifold method with modal derivatives

Publication date :

2021

Journal title :

Nonlinear Dynamics

ISSN :

0924-090X

eISSN :

1573-269X

Volume :

103

Issue :

Pages :

3335 - 3370

Peer reviewed :

Peer reviewed

Available on ORBi :

since 06 July 2025

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