Bifurcations of backbone curves for systems of coupled nonlinear two mass oscillator
Bifurcations of backbone curves for systems of coupled nonlinear two mass oscillator
This paper considers the dynamic response of coupled, forced and lightly damped nonlinear oscillators with two degree-of-freedom. For these systems, backbone curves define the resonant peaks in the frequency–displacement plane and give valuable information on the prediction of the frequency response of the system. Previously, it has been shown that bifurcations can occur in the backbone curves. In this paper, we present an analytical method enabling the identification of the conditions under which such bifurcations occur. The method, based on second-order nonlinear normal forms, is also able to provide information on the nature of the bifurcations and how they affect the characteristics of the response. This approach is applied to a two-degree-of-freedom mass, spring, damper system with cubic hardening springs. We use the second-order normal form method to transform the system coordinates and identify which parameter values will lead to resonant interactions and bifurcations of the backbone curves. Furthermore, the relationship between the backbone curves and the complex dynamics of the forced system is shown.
311–320
Cammarano, A.
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Hill, T.L.
96922dda-e993-4889-a519-5f89fe6ebca8
Neild, S.A.
e11b68bb-ddff-4cac-a8a7-798cc3cc3891
Wagg, D.J.
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22 February 2014
Cammarano, A.
c0c85f55-3dfc-4b97-9b79-e2554406a12b
Hill, T.L.
96922dda-e993-4889-a519-5f89fe6ebca8
Neild, S.A.
e11b68bb-ddff-4cac-a8a7-798cc3cc3891
Wagg, D.J.
7aa7d661-df7e-4ecc-86b1-823d4adaf05f
Cammarano, A., Hill, T.L., Neild, S.A. and Wagg, D.J.
(2014)
Bifurcations of backbone curves for systems of coupled nonlinear two mass oscillator.
Nonlinear Dynamics, 77, .
(doi:10.1007/s11071-014-1295-3).
Abstract
This paper considers the dynamic response of coupled, forced and lightly damped nonlinear oscillators with two degree-of-freedom. For these systems, backbone curves define the resonant peaks in the frequency–displacement plane and give valuable information on the prediction of the frequency response of the system. Previously, it has been shown that bifurcations can occur in the backbone curves. In this paper, we present an analytical method enabling the identification of the conditions under which such bifurcations occur. The method, based on second-order nonlinear normal forms, is also able to provide information on the nature of the bifurcations and how they affect the characteristics of the response. This approach is applied to a two-degree-of-freedom mass, spring, damper system with cubic hardening springs. We use the second-order normal form method to transform the system coordinates and identify which parameter values will lead to resonant interactions and bifurcations of the backbone curves. Furthermore, the relationship between the backbone curves and the complex dynamics of the forced system is shown.
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Accepted/In Press date: 3 February 2014
Published date: 22 February 2014
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Local EPrints ID: 490828
URI: http://eprints.soton.ac.uk/id/eprint/490828
ISSN: 0924-090X
PURE UUID: ea00c254-9940-4b16-b8b8-baf0d82e1a15
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Date deposited: 06 Jun 2024 17:10
Last modified: 07 Jun 2024 02:08
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Author:
A. Cammarano
Author:
T.L. Hill
Author:
S.A. Neild
Author:
D.J. Wagg
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