Analysis of the associated stress distributions to the nonlinear forced vibrations of functionally graded multi-cracked beams

Chajdi, Mohcine; Adri, Ahmed; Bikri, Khalid El; Benamar, Rhali

doi:10.29354/diag/133702

Cited by 2 publications

(3 citation statements)

References 32 publications

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“…In Figs. 10, the curvature distributions are plotted, associated to the first linear and non-linear deflection, of a C-C shallow arch in free vibration case, for various initial rise (2,4,8) and a maximum non-dimensional amplitudes ( * = 1.5). The corresponding values are summarized in Table 6, in which the percentage correction at the clamps and at the middles are given for various values of initial rise.…”

Section: Resultsmentioning

confidence: 99%

“…Investigating the geometrical non-linearity is one of the major consideration on the design process of the arches. The study of the geometrical non-linearity of a beams, plates ,shells and circular arches were investigated by the authors of [1][2][3][4][5][6][7][8]. The authors classified the arches following their shallowness ratio into two classes; shallow arches and deep or no-shallow arches.…”

Section: Introductionmentioning

confidence: 99%

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Geometrically non-linear free and forced vibration of a shallow arch

Outassafte¹,

Adri²,

Khouddar³

et al. 2021

J. vibroeng.

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The purpose of this present work is to investigate the geometrical non-linearity in free and forced vibration of a shallow arch elastically restrained at the ends. The non-linear governing equilibrium equation of the shallow arch is obtained after the Euler Bernoulli theory and the Von Karman geometrical non-linearity assumptions. After applying the ends conditions, the eigenvalues problem of the generalized trancendant equation have been determined iteratively using the Newton-Raphson algorithm. The kinetic and total strain energy have been discretized into a series of a finite spatial functions which are a combination of linear modes and basic function contribution coefficients. Using Hamilton's principle energy and spectral analysis, the problem is reduced into a set of non-linear algebraic equations that solved numerically using an approximate explicit method developed previously the so-called second formulation. Considering a multimode approach, the effect of initial rise and concentrated force on non-linear behaviour of system has been illustrated in the backbone curves giving the non-linear amplitude-frequency dependence. The corresponding non-linear deflections and curvatures have been plotted for various vibration amplitudes.

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Section: Resultsmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

Geometrically non-linear free and forced vibration of a shallow arch

Outassafte¹,

Adri²,

Khouddar³

et al. 2021

J. vibroeng.

Self Cite

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“…El khouddar et al [8] studied the free and forced non-linear vibrations of laminated composite beams under different boundary conditions, using the Euler-Bernoulli beam theory and the Green-Lagrang nonlinearity. From the Euler-Bernoulli beam theory, Chajdi et al [9] examined the forced nonlinear vibrations of an FGM beam with multiple cracks. Based on the Euler-Bernoulli beam theory, Outassafte et al [10], [11] contributed to the geometrically non-linear free vibration of a fixed-ended arch.…”

Section: Introductionmentioning

confidence: 99%

Analysis of Geometrically Non-Linear Free Vibrations of Functional Graded Beams in a Thermal Environment

Khouddar¹,

Adri²,

Outassafte³

et al. 2021

Proceedings of the 8th International Conference on Computational Methods in Structural Dynamics and Earthquake Engineering (COM

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The thermal non-linear vibrational behavior of functional graded beams is analyzed using Euler-Bernoulli beam theory and Hamilton's theorem, combined with spectral analysis. A set of non-linear equations is derived based on the von Kármán deformation-displacement relationship and the properties of the functional graded material are assumed to be temperature dependent and to follow a simple power distribution in the thickness direction. Numerical solutions of the non-linear dynamic equations of functional graded beams are obtained by an approximate method called the second formulation. In addition, numerical examples were performed to highlight the accuracy of the method used in this study, and the results are very consistent with those found in the literature. In the numerical examples, the influences played by thermal environmental conditions and volume fraction index are discussed in detail.

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Analysis of the associated stress distributions to the nonlinear forced vibrations of functionally graded multi-cracked beams

Cited by 2 publications

References 32 publications

Geometrically non-linear free and forced vibration of a shallow arch

Geometrically non-linear free and forced vibration of a shallow arch

Analysis of Geometrically Non-Linear Free Vibrations of Functional Graded Beams in a Thermal Environment

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