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Analysis of regular and chaotic dynamics of the Euler-Bernoulli beams using finite difference and finite element methods 被引量:3

Analysis of regular and chaotic dynamics of the Euler-Bernoulli beams using finite difference and finite element methods
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摘要 Chaotic vibrations of flexible non-linear Euler-Bernoulli beams subjected to harmonic load and with various boundary conditions(symmetric and non-symmetric)are studied in this work.Reliability of the obtained results is verified by the finite difference method(FDM)and the finite element method(FEM)with the Bubnov-Galerkin approximation for various boundary conditions and various dynamic regimes(regular and non-regular).The influence of boundary conditions on the Euler-Bernoulli beams dynamics is studied mainly,dynamic behavior vs.control parameters { ωp,q0 } is reported,and scenarios of the system transition into chaos are illustrated. Chaotic vibrations of flexible non-linear Euler-Bernoulli beams subjected to harmonic load and with various boundary conditions(symmetric and non-symmetric)are studied in this work.Reliability of the obtained results is verified by the finite difference method(FDM)and the finite element method(FEM)with the Bubnov-Galerkin approximation for various boundary conditions and various dynamic regimes(regular and non-regular).The influence of boundary conditions on the Euler-Bernoulli beams dynamics is studied mainly,dynamic behavior vs.control parameters { ωp,q0 } is reported,and scenarios of the system transition into chaos are illustrated.
作者 J.Awrejcewicz A.V.Krysko J.Mrozowski O.A.Saltykova M.V.Zhigalov
机构地区 Department Automation and Biomechanics Department of Mathematics and Modeling
出处 《Acta Mechanica Sinica》 SCIE EI CAS CSCD 2011年第1期36-43,共8页 力学学报(英文版)
关键词 Euler-Bernoulli beams · Chaos · Finite differ-ence method · Finite element method Euler-Bernoulli beams · Chaos · Finite differ-ence method · Finite element method
分类号 O415.5 [理学—理论物理]
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参考文献11

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  • 2Ravindra, B., Zhu, W.D.: Low dimensional chaotic response of axially accelerating continuum in the supercritical regime. Arch. Appl. Mech. 68(3-4), 195-205 (1998).
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  • 6Awrejcewicz, J., Krysko, V.A.: Feigenbaum scenario exhibited by thin plate dynamics. Nonl. Dyn. 24(4), 373-398 (2001).
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Acta Mechanica Sinica
2011年 第1期

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