Non-linear vibration of nanobeams with various boundary condition based on nonlocal elasticity theory
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2015
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Abstract
In this study, nonlinear vibrations of Euler-Bernoulli nanobeams with various supports condition is investigated. The non-linear equations of motion including stretching of the neutral axis are derived. Forcing and damping effects are included in the analysis. Exact solutions for the mode shapes and frequencies are obtained for the linear part of the problem. For the non-linear problem approximate solutions using perturbation technique is applied to the equations of motion. The different of support cases are investigated and the cases analyzed in detail. The method of multiple time scale that is a perturbation technique is applied to the equations of motion. Natural frequencies and mode shapes for the linear problem are found for the nanobeam. Nonlinear frequencies are calculated; amplitude and phase modulation figures are presented for different cases. Frequency-response curves are drawn. © 2015 Elsevier Ltd.
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Elasticity , Equations of motion , Frequency response , Nanostructures , Nanowires , Perturbation techniques , Phase modulation , Amplitude and phase modulations , B. Vibration , Frequency-response curves , Natural frequencies and modes , Non-linear vibrations , Non-local elasticities , Non-local elasticity theories , Various boundary conditions , Vibration analysis