Vibration and Stability Analysis of Axially Moving Beams with Variable Speed and Axial Force

Özhan, B. Burak

doi:10.1142/s0219455414500151

Cited by 27 publications

(4 citation statements)

References 35 publications

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“…and numerical analysis to predict the dynamic response of the belt systems [13]- [17], and there is an obvious lack of research on measurement techniques for on-line monitoring and diagnosis purposes.…”

Section: Table I Comparison Of the Techniques Currently Ava I L A B Lmentioning

confidence: 99%

Non-Contact Vibration Monitoring of Power Transmission Belts Through Electrostatic Sensing

Yan

Wang

et al. 2016

IEEE Sensors J.

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Section: Table I Comparison Of the Techniques Currently Ava I L A B Lmentioning

confidence: 99%

Non-Contact Vibration Monitoring of Power Transmission Belts Through Electrostatic Sensing

Yan

Wang

et al. 2016

IEEE Sensors J.

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“…Ghayesh et al 11 examine the influence of mean longitudinal speed on the paired lateral and longitudinal oscillations of a beam moving with variable axial speed. The nonlinear stability of axially traveling beams having time‐dependent speed and excitation force by Burak et al 12 Chen and Yang 13 developed a dynamics model of a moving viscoelastic beam and examined the influence of the viscoelastic coefficient and motion parameters on stability in terms of bifurcation. Using the asymptotic expansion, Lenci et al 14 presented the transverse oscillation of a Timoshenko beam.…”

Section: Introductionmentioning

confidence: 99%

Nonlinear dynamic and stability of a small size moving beam under thermal conditions

Ali

2023

Math Methods in App Sciences

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Nonlinear transverse vibration of a micro‐size moving beam like structure under the influence of thermal conditions is studied. Hamilton principle is used to derive the nonlinear equation of motion. The derived equation of transverse motion is discretized using the Galerkin technique. The vibration attributes of the moving beam, such as frequencies of the transverse response, time response, and stability analysis, are investigated at different temperatures. For stability analysis, bifurcation diagrams are presented under the influence of temperature, length‐scale parameter, and excitation frequencies at various axial speeds of the beam.

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“…Chen et al [7] investigated the nonlinear vibration of axially moving beams using the harmonic balance method. Burak et al [8] used a method of multiple time scales (a perturbation method) to examine the nonlinear vibration and stability of axially moving beams with variable velocity and axial force values. Lenci et al [9] investigated the nonlinear free oscillations of a planar Timoshenko straight beam using the asymptotic expansion method.…”

Section: Introductionmentioning

confidence: 99%

Parametric Random Vibration Analysis of an Axially Moving Laminated Shape Memory Alloy Beam Based on Monte Carlo Simulation

2022

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The study of the bifurcation, random vibration, chaotic dynamics, and control of laminated composite beams are research hotspots. In this paper, the parametric random vibration of an axially moving laminated shape memory alloy (SMA) beam was investigated. In light of the Timoshenko beam theory and taking into consideration axial motion effects and axial forces, a random dynamic equation of laminated SMA beams was deduced. The Falk’s polynomial constitutive model of SMA was used to simulate the nonlinear random dynamic behavior of the laminated beam. Additionally, the numerical of the probability density function and power spectral density curves was obtained through the Monte Carlo simulation. The results indicated that the large amplitude vibration character of the beam can be caused by random perturbation on axial velocity.

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Vibration and Stability Analysis of Axially Moving Beams with Variable Speed and Axial Force

Cited by 27 publications

References 35 publications

Non-Contact Vibration Monitoring of Power Transmission Belts Through Electrostatic Sensing

Non-Contact Vibration Monitoring of Power Transmission Belts Through Electrostatic Sensing

Nonlinear dynamic and stability of a small size moving beam under thermal conditions

Parametric Random Vibration Analysis of an Axially Moving Laminated Shape Memory Alloy Beam Based on Monte Carlo Simulation

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