ZHAO Guang-hui, ZHANG Nian-mei, YANG Gui-tong. Analysis of Breather State in Thin Bar by Using Collective Coordinate[J]. Applied Mathematics and Mechanics, 2006, 27(12): 1397-1404.
Citation: ZHAO Guang-hui, ZHANG Nian-mei, YANG Gui-tong. Analysis of Breather State in Thin Bar by Using Collective Coordinate[J]. Applied Mathematics and Mechanics, 2006, 27(12): 1397-1404.

Analysis of Breather State in Thin Bar by Using Collective Coordinate

  • Received Date: 2005-05-20
  • Rev Recd Date: 2006-07-19
  • Publish Date: 2006-12-15
  • Considering Peierls-Nabarro (P-N) force and visco us effect of material, the dynamic behavior of one-dimensional infinite metallic thin barsubjected to axially periodic load was investigated. Governing equation, which was sine-Gordon type equation, was derived. By means of collective-coordinates, the partialequation could be reduced into ordinary differential dynamical system to describemotion of breather. Nonlinear dynamic analysis shows that the amplitude and frequency of P-N force would influence positions of hyperbolic saddlepoints and change subharmonic bifurcation point, while the path to chaos through oddsubhar monic bifurcations remains. Several examples were taken to indicate the effects of amplitude and perio d of P-N force o n the dy namical re sponse o f the bar. The simulatio n states that the area of chaos is half-infinite. This are a incre ases along with enhancement of the amplitude of P-N force. And the frequency of P-N force has similar influence on the system.
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  • [1]
    赵广慧,张年梅,杨桂通.考虑耗散效应的金属杆受扰动后的非线性动力学现象分析[J].应用数学和力学,2005,26(2):130—136.
    [2]
    Kivshar Y S,Malomed B A.Dynamics of solitons in nearly integrable systems[J].Rev Mod Phys,1989,61:763—916. doi: 10.1103/RevModPhys.61.763
    [3]
    Quintero N R, Sánchez A. DC motion of ac driven SG solitons[J].Physics Letters A,1998,247:161—166. doi: 10.1016/S0375-9601(98)00554-4
    [4]
    Forinash K, Willis C R.Nonlinear response of the SG breather to an ac driver[J].Physica D,2001,149:95—106. doi: 10.1016/S0167-2789(00)00194-9
    [5]
    Laurent Nana, Timoléon C Kofané, Ernest Kaptouom. Subharmonic and homoclinic bifurcations in the driven and damped SG system[J].Physica D,1999,134:61—74. doi: 10.1016/S0167-2789(98)00312-1
    [6]
    Matsuda T.A variational analysis of the collision of solitary solutions[J].Lett Nuovo Cimento,1979,24(7):207—212. doi: 10.1007/BF02733908
    [7]
    Meyers M A,Chawla K K.Mechanical Metallurgy[M].New Jersey:Prentice Hall, Inc,1984.
    [8]
    SHU Xue-feng,YANG Gui-tong.The influence of material properties on dynamic behavior of structures[A].In:Senoo M,Ed.Proceedings of IMMM'97[C].Kamihama:Mie University Press,1997,279—284.
    [9]
    Bishop A B, Lomdahl P S.Nonlinear dynamics in driven, damped sine-Gordon systems[J].Physica D,1986,18:54—66. doi: 10.1016/0167-2789(86)90162-4
    [10]
    Cicogna G.A theoretical prediction of the threshold for chaos in a Josephson junction[J].Physics Letters A,1987,121(8/9):403—406. doi: 10.1016/0375-9601(87)90486-5
    [11]
    ZHANG Nian-mei,YANG Gui-tong.Solitary waves and chaos in nonlinear visco-elastic rod[J].European Journal of Mechanics A/Solids,2003,22(6):917—923. doi: 10.1016/S0997-7538(03)00072-X
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