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    Intrinsic Localized Modes of Harmonic Oscillations in Nonlinear Oscillator Arrays

    Source: Journal of Computational and Nonlinear Dynamics:;2013:;volume( 008 ):;issue: 004::page 41009
    Author:
    Ikeda, Takashi
    ,
    Harata, Yuji
    ,
    Nishimura, Keisuke
    DOI: 10.1115/1.4023866
    Publisher: The American Society of Mechanical Engineers (ASME)
    Abstract: Intrinsic localized modes (ILMs) are investigated in an array with N Duffing oscillators that are weakly coupled with each other when each oscillator is subjected to sinusoidal excitation. The purpose of this study is to investigate the behavior of ILMs in nonlinear multidegreeoffreedom (MDOF) systems. In the theoretical analysis, van der Pol's method is employed to determine the expressions for the frequency response curves for fundamental harmonic oscillations. In the numerical calculations, the frequency response curves are shown for N = 2 and 3 and compared with the results of the numerical simulations. Basins of attraction are shown for a twooscillator array with hardtype nonlinearities to examine the possibility of appearance of ILMs when an oscillator is disturbed. The influences of the connecting springs for both hardand softtype nonlinearities on the appearance of the ILMs are examined. Increasing the values of the connecting spring constants may cause Hopf bifurcation followed by amplitude modulated motion (AMM) including chaotic vibrations. The influence of the imperfection of an oscillator is also investigated. Bifurcation sets are calculated to show the influence of the system parameters on the excitation frequency range of ILMs. Furthermore, time histories are shown for the case of N = 10, and many patterns of ILMs may appear depending on the initial conditions.
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      Intrinsic Localized Modes of Harmonic Oscillations in Nonlinear Oscillator Arrays

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    contributor authorIkeda, Takashi
    contributor authorHarata, Yuji
    contributor authorNishimura, Keisuke
    date accessioned2017-05-09T00:57:00Z
    date available2017-05-09T00:57:00Z
    date issued2013
    identifier issn1555-1415
    identifier othercnd_8_4_041009.pdf
    identifier urihttp://yetl.yabesh.ir/yetl/handle/yetl/151159
    description abstractIntrinsic localized modes (ILMs) are investigated in an array with N Duffing oscillators that are weakly coupled with each other when each oscillator is subjected to sinusoidal excitation. The purpose of this study is to investigate the behavior of ILMs in nonlinear multidegreeoffreedom (MDOF) systems. In the theoretical analysis, van der Pol's method is employed to determine the expressions for the frequency response curves for fundamental harmonic oscillations. In the numerical calculations, the frequency response curves are shown for N = 2 and 3 and compared with the results of the numerical simulations. Basins of attraction are shown for a twooscillator array with hardtype nonlinearities to examine the possibility of appearance of ILMs when an oscillator is disturbed. The influences of the connecting springs for both hardand softtype nonlinearities on the appearance of the ILMs are examined. Increasing the values of the connecting spring constants may cause Hopf bifurcation followed by amplitude modulated motion (AMM) including chaotic vibrations. The influence of the imperfection of an oscillator is also investigated. Bifurcation sets are calculated to show the influence of the system parameters on the excitation frequency range of ILMs. Furthermore, time histories are shown for the case of N = 10, and many patterns of ILMs may appear depending on the initial conditions.
    publisherThe American Society of Mechanical Engineers (ASME)
    titleIntrinsic Localized Modes of Harmonic Oscillations in Nonlinear Oscillator Arrays
    typeJournal Paper
    journal volume8
    journal issue4
    journal titleJournal of Computational and Nonlinear Dynamics
    identifier doi10.1115/1.4023866
    journal fristpage41009
    journal lastpage41009
    identifier eissn1555-1423
    treeJournal of Computational and Nonlinear Dynamics:;2013:;volume( 008 ):;issue: 004
    contenttypeFulltext
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