Vibration Dynamics of an Inclined Cable Excited Near Its Second Natural Frequency

Tzanov, Vassil; Krauskopf, Bernd; Neild, Simon A

doi:10.1142/s0218127414300249

Cited by 8 publications

(2 citation statements)

References 33 publications

(55 reference statements)

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“…In the modeling of cable vibration, Tagata [31] reduces the cable to a massless tensioned string and derives the dimensionless Mathieu equation. On this basis, many scholars have done a lot of research on the parametric vibration of cables [32][33][34][35]. However, in the above studies, the cable is stationary along its axial direction and the cable length is invariable.…”

Section: Introductionmentioning

confidence: 99%

Dynamic modeling and characterization of compliant cable-driven parallel robots containing flexible cables

et al. 2023

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Flexible cables in cable-driven parallel robots (CDPRs) are easy to be excited and vibrate. Cable vibration will react on the end-effector, causing attitude deviation of the end-effector. The main objective of this study is to accurately model axially moving flexible cables and characterize the dynamic behaviors of associated compliant CDPRs. Firstly, a model for transverse vibration of the axially moving length-variable cable is developed. On this basis, an original nonlinear dynamic model of the CDPRs able to capture the vibration of the cables and the dynamics of the end-effector is proposed. Secondly, the frequency–amplitude relationship of the CDPR is obtained. Moreover, the significance of the excitation effect caused by the axially moving length-variable cables is demonstrated, by comparing the results with and without excitation effect at different frequencies. It turns out that, as the oscillation frequency of the end-effector increases, the end-effector and cables exhibit the dynamics process from steady state to unstable large-amplitude vibration and finally to stable small-amplitude vibration. This indicates that the dynamics of the CDPR exhibit non-linear characteristics, due to the influence of flexible cables. Finally, the proposed dynamic model of compliant CDPRs is validated by experiments performed in the laboratory.

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Section: Introductionmentioning

confidence: 99%

Dynamic modeling and characterization of compliant cable-driven parallel robots containing flexible cables

et al. 2023

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“…By considering how the system's equilibria (or other invariant objects) change under the variation of a parameter of interest, it is possible to build up a global picture of the structure of equilibria that govern the dynamic behaviour. Several examples in the literature have shown the benefits offered by this approach for the analysis of engineering systems: with applications in aerospace [17][18][19][20][21], civil [22] and automotive engineering [23,24], a dynamical systems approach has been shown to provide a useful, complementary tool, when paired with more traditional dynamic simulations.…”

Section: Introductionmentioning

confidence: 99%

A bifurcation study to guide the design of a landing gear with a combined uplock/downlock mechanism

et al. 2014

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This paper discusses the insights that a bifurcation analysis can provide when designing mechanisms. A model, in the form of a set of coupled steady-state equations, can be derived to describe the mechanism. Solutions to this model can be traced through the mechanism's state versus parameter space via numerical continuation, under the simultaneous variation of one or more parameters. With this approach, crucial features in the response surface, such as bifurcation points, can be identified. By numerically continuing these points in the appropriate parameter space, the resulting bifurcation diagram can be used to guide parameter selection and optimization. In this paper, we demonstrate the potential of this technique by considering an aircraft nose landing gear, with a novel locking strategy that uses a combined uplock/downlock mechanism. The landing gear is locked when in the retracted or deployed states. Transitions between these locked states and the unlocked state (where the landing gear is a mechanism) are shown to depend upon the positions of two fold point bifurcations. By performing a two-parameter continuation, the critical points are traced to identify operational boundaries. Following the variation of the fold points through parameter space, a minimum spring stiffness is identified that enables the landing gear to be locked in the retracted state. The bifurcation analysis also shows that the unlocking of a retracted landing gear should use an unlock force measure, rather than a position indicator, to de-couple the effects of the retraction and locking actuators. Overall, the study demonstrates that bifurcation analysis can enhance the understanding of the influence of design choices over a wide operating range where nonlinearity is significant.

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Underwater Target Tracking of Offshore Crane System in Subsea Operations

Kang

Quen

et al. 2017

Communications in Computer and Information Science

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Vibration Dynamics of an Inclined Cable Excited Near Its Second Natural Frequency

Cited by 8 publications

References 33 publications

Dynamic modeling and characterization of compliant cable-driven parallel robots containing flexible cables

Dynamic modeling and characterization of compliant cable-driven parallel robots containing flexible cables

A bifurcation study to guide the design of a landing gear with a combined uplock/downlock mechanism

Underwater Target Tracking of Offshore Crane System in Subsea Operations

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