Primary resonance of traveling viscoelastic beam under internal resonance

Ding, Hu; Huang, Linglu; Mao, Xiao-Ye

doi:10.1007/s10483-016-2152-6

Cited by 60 publications

(10 citation statements)

References 27 publications

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“…The analytical and the numerical results perfectly agree in the stable portions for both heavy damping and light damping. To determine whether the method of harmonic balance correctly captures the dynamic behavior of the parameters chosen, the frequency response curves (FRC) of the two masses are plotted in Figure 6(a) and (b) with the numerical results via the Runge-Kutta scheme [27][28][29][30][31]. The figure shows that there is reasonable agreement, and the method of harmonic balance can be used for further investigation of the dynamic behavior.…”

Section: Numerical Validationmentioning

confidence: 99%

High-static-low-dynamic-stiffness vibration isolation enhanced by damping nonlinearity

Brennan

Ding

2018

Sci. China Technol. Sci.

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High-static-low-dynamic-stiffness (HSLDS) nonlinear isolators have proven to have an advantage over linear isolators, because HSLDS nonlinear isolators allow low-frequency vibration isolation without compromising the static stiffness. Previously, these isolators have generally been assumed to have linear viscous damping, degrading the performance of the isolator at high frequencies. An alternative is to use nonlinear damping, where the nonlinear behavior is achieved by configuring linear dampers so they are orthogonally aligned to the excitation direction. This report compares the performances of single-stage and two-stage isolators with this type of damping with the corresponding isolators containing only linear viscous damping. The results show that both isolators with linear viscous damping and nonlinear damping reduce the transmissibility around the resonance frequencies, but the results show that the isolators with nonlinear damping perform better at high frequencies.

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Section: Numerical Validationmentioning

confidence: 99%

High-static-low-dynamic-stiffness vibration isolation enhanced by damping nonlinearity

Brennan

Ding

2018

Sci. China Technol. Sci.

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“…( 29)-(31) into Eqs. ( 25)-( 27) and ignoring the effect of inertia in the inplane direction, and subsequently applying the Galerkin's method [22][23][24][25] , the ordinary differential equations for the variables W A 1,n and W B 1,n can be obtained,…”

Section: Steelmentioning

confidence: 99%

Nonlinear dynamic responses of sandwich functionally graded porous cylindrical shells embedded in elastic media under 1:1 internal resonance

Liu

Qin

Chu

2021

Appl. Math. Mech.-Engl. Ed.

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In this article, the nonlinear dynamic responses of sandwich functionally graded (FG) porous cylindrical shell embedded in elastic media are investigated. The shell studied here consists of three layers, of which the outer and inner skins are made of solid metal, while the core is FG porous metal foam. Partial differential equations are derived by utilizing the improved Donnell’s nonlinear shell theory and Hamilton’s principle. Afterwards, the Galerkin method is used to transform the governing equations into nonlinear ordinary differential equations, and an approximate analytical solution is obtained by using the multiple scales method. The effects of various system parameters, specifically, the radial load, core thickness, foam type, foam coefficient, structure damping, and Winkler-Pasternak foundation parameters on nonlinear internal resonance of the sandwich FG porous thin shells are evaluated.

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“…By the method of multiple scales, they established the modified solvability conditions in principal parametric and internal resonances. Hu et al [ 23 , 24 ] explored the nonlinear dynamics of a super critically moving beam and a traveling viscoelastic beam under the 3:1 internal resonance condition. The direct multi-scale method is used to derive the relationships between the excitation frequency and the response amplitudes.…”

Section: Introductionmentioning

confidence: 99%

Nonlinear Dynamic Analysis of Axially Moving Laminated Shape Memory Alloy Beam with 1:3 Internal Resonance

Hao

Gao

et al. 2021

Materials

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The remarkable properties of shape memory alloys (SMA) are attracting significant technological interest in many fields of science and engineering. In this paper, a nonlinear dynamic analytical model is developed for a laminated beam with a shape memory alloy layer. The model is derived based on Falk’s polynomial model for SMAs combined with Timoshenko beam theory. In addition, axial velocity, axial pressure, temperature, and complex boundary conditions are also parameters that have been taken into account in the creation of the SMA dynamical equation. The nonlinear vibration characteristics of SMA laminated beams under 1:3 internal resonance are studied. The multi-scale method is used to solve the discretized modal equation system, the characteristic equation of vibration modes coupled to each other in the case of internal resonance, as well as the time-history and phase diagrams of the common resonance amplitude in the system are obtained. The effects of axial velocity and initial conditions on the nonlinear internal resonance characteristics of the system were also studied.

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Primary resonance of traveling viscoelastic beam under internal resonance

Cited by 60 publications

References 27 publications

High-static-low-dynamic-stiffness vibration isolation enhanced by damping nonlinearity

High-static-low-dynamic-stiffness vibration isolation enhanced by damping nonlinearity

Nonlinear dynamic responses of sandwich functionally graded porous cylindrical shells embedded in elastic media under 1:1 internal resonance

Nonlinear Dynamic Analysis of Axially Moving Laminated Shape Memory Alloy Beam with 1:3 Internal Resonance

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