2020
DOI: 10.1016/j.jmps.2020.103919
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Non-holonomic constraints inducing flutter instability in structures under conservative loadings

Abstract: Non-conservative loads of the follower type are usually believed to be the source of dynamic instabilities such as flutter and divergence. It is shown that these instabilities (including Hopf bifurcation, flutter, divergence, and destabilizing effects connected to dissipation phenomena) can be obtained in structural systems loaded by conservative forces, as a consequence of the application of non-holonomic constraints. These constraints may be realized through a 'perfect skate' (or a non-sliding wheel), or, mo… Show more

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Cited by 11 publications
(19 citation statements)
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“…Because the characteristic equation (58) applies to the elastic rod connected to both the 'skate' and 'violin bow', flutter and divergence loads are the same for both structures and in turn coincide with the Beck and Reut columns. This feature corresponds to an analogous property found for discrete columns made up of of rigid bars connected by visco-elastic hinges [8].…”
Section: Evaluation Of the Flutter And Divergence Loadssupporting
confidence: 72%
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“…Because the characteristic equation (58) applies to the elastic rod connected to both the 'skate' and 'violin bow', flutter and divergence loads are the same for both structures and in turn coincide with the Beck and Reut columns. This feature corresponds to an analogous property found for discrete columns made up of of rigid bars connected by visco-elastic hinges [8].…”
Section: Evaluation Of the Flutter And Divergence Loadssupporting
confidence: 72%
“…The behaviour of the elastic rod analyzed in this paper is also confirmed using a discretized rod model[8] at increasing number of its constituent rigid bars, so that the continuous and discrete models show coincidence of the instability loads in the limit.…”
supporting
confidence: 59%
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