Chaotic dynamics of flexible Euler-Bernoulli beams

Awrejcewicz, Jan; Krysko, Anton V.; Кутепов, И. Е.; Загниборода, Н. А.; Dobriyan, V.; Кrysko, V.А.

doi:10.1063/1.4838955

Cited by 27 publications

(7 citation statements)

References 53 publications

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“…The rigorous discussion of the advantages of the FDM can be found in numerous papers, including [40,41]. The shells considered in the present study Table 7 Fourier frequency power spectra, 2D wavelet spectra, It should be emphasized that in the paper [42], the authors studied the dynamics of geometrically nonlinear beams by means of employing both the FEM in the Galerkin form and the FDM.…”

Section: Discussionmentioning

confidence: 99%

Chaotic vibrations of flexible shallow axially symmetric shells

et al. 2018

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In this work, chaotic dynamics of flexible spherical axially symmetric shallow shells subjected to sinusoidal transverse load is studied with emphasis put on the vibration modes. Chaos reliability is verified and validated by solving the implemented mathematical model by partial nonlinear equations governing the dynamics of flexible spherical shells and by estimating the signs of the largest Lyapunov exponents with the help of qualitatively different approaches. It is shown how the scenario of transition of the investigated shells from regular to chaotic vibrations depends on the boundary condition. The following cases are considered: (1) movable and fixed simple supports along the shell contours, taking into account shell stiffness (Feigenbaum scenario) and shell damping (RuelleTakens-Newhouse scenario), and (2) movable clamping (regular shell vibrations). The presence of dents, the location and character of which essentially depend on the shell geometric parameters, boundary conditions, and the external load parameters, is detected in some regions of the shell surface and discussed.

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Section: Discussionmentioning

confidence: 99%

Chaotic vibrations of flexible shallow axially symmetric shells

et al. 2018

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“…Onozato et al [20] analyzed chaotic vibrations of a post-buckled L-shaped beam with an axial constraint. Chaotic dynamics of flexible Euler-Bernoulli beams has been studied by Awrejcewicz et al [21]. They analyzed time histories, phase and modal portraits, autocorrelation functions, the Poincaré and pseudo-Poincaré maps, signs of the first four Lyapunov exponents, as well as the compression factor of the phase volume of an attractor.…”

Section: Introductionmentioning

confidence: 99%

Chaotic vibrations of beams on nonlinear elastic foundations subjected to reciprocating loads

Norouzi¹,

Younesian²

2015

Mechanics Research Communications

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“…For more examples of spurious numerical simulations, please refer to Yee et al [19][20] . What's more, analysis of chaotic dynamics were numerically studied in non-linear vibrations of spatial structures such as shells [21][22] , plates [23] and beams [24][25][26] . Qualitative theory of differential equations is widely used in study of chaotic dynamic systems.…”

Section: Introductionmentioning

confidence: 99%

“…Qualitative theory of differential equations is widely used in study of chaotic dynamic systems. Researchers [23][24][25][26][27][28][29][30][31] investigated chaotic dynamic systems by means of the Poincaré maps, Lyanponuv expoent, phase portraits, Fourier and wavelet power spectra, autocorrelation functions, etc. Therefore, it is necessary to verify reliability of these results for chaotic dynamic systems.…”

Section: Introductionmentioning

confidence: 99%

Clean numerical simulation: a new strategy to obtain reliable solutions of chaotic dynamic systems

Liao

2018

Appl. Math. Mech.-Engl. Ed.

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It is well known that chaotic dynamic systems (such as three-body system, turbulent flow and so on) have the sensitive dependence on initial conditions (SDIC). Unfortunately, numerical noises (such as truncation error and roundoff error) always exist in practice. Thus, due to the SDIC, long-term accurate prediction of chaotic dynamic systems is practically impossible. In this paper, a new strategy for chaotic dynamic systems, i.e. the Clean Numerical Simulation (CNS), is briefly described, together with its applications to a few Hamiltonian chaotic systems. With negligible numerical noises, the CNS can provide convergent (reliable) chaotic trajectories in a long enough interval of time. This is very important for Hamiltonian systems such as three-body problem, and thus should have many applications in various fields. We find that the traditional numerical methods in double precision cannot give not only reliable trajectories but also reliable Fourier power spectra and autocorrelation functions. In addition, it is found that even statistic properties of chaotic systems can not be correctly obtained by means of traditional numerical algorithms in double precision, as long as these statistics are timedependent. Thus, our CNS results strongly suggest that one had better to be very careful on DNS results of statistically unsteady turbulent flows, al- * Corresponding author.though DNS results often agree well with experimental data when turbulent flows are in a statistical stationary state.

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Chaotic dynamics of flexible Euler-Bernoulli beams

Cited by 27 publications

References 53 publications

Chaotic vibrations of flexible shallow axially symmetric shells

Chaotic vibrations of flexible shallow axially symmetric shells

Chaotic vibrations of beams on nonlinear elastic foundations subjected to reciprocating loads

Clean numerical simulation: a new strategy to obtain reliable solutions of chaotic dynamic systems

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