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contributor authorHarata, Yuji;Ikeda, Takashi
date accessioned2022-12-27T23:21:41Z
date available2022-12-27T23:21:41Z
date copyright9/26/2022 12:00:00 AM
date issued2022
identifier issn1555-1415
identifier othercnd_017_12_121001.pdf
identifier urihttp://yetl.yabesh.ir/yetl1/handle/yetl/4288468
description abstractWhen a nonlinear oscillator array is harmonically excited, specific oscillators in the array may oscillate with large amplitudes. This is known as the localization phenomenon; however, the reason for localization has not been clarified thus far. Thus, the aim of this study is to elucidate the reason for localization in nonlinear oscillator arrays. We theoretically investigated the behavior of a nonlinear oscillator array, which consists of N Duffing oscillators connected by linear springs under external and harmonic forces. The equations of motion in physical coordinates are transformed into modal equations of motion, which reveal that the array forms an autoparametric system in the modal coordinates when it consists of identical oscillators. The first mode of vibration is directly excited by the external force, whereas the remaining modes are indirectly excited by the nonlinear terms coupled with the first mode. The approximate solutions of the harmonic oscillations were obtained using van der Pol's method. The frequency response curves (FRCs) for both the physical and modal coordinates for N = 2 and 3 are presented. Localization can occur when multiple modes are excited simultaneously. Furthermore, the effects of imperfections in the restoring forces on the responses of the two-Duffing-oscillator array are examined.
publisherThe American Society of Mechanical Engineers (ASME)
titleModal Analysis for Localization of Harmonic Oscillations in Nonlinear Oscillator Arrays
typeJournal Paper
journal volume17
journal issue12
journal titleJournal of Computational and Nonlinear Dynamics
identifier doi10.1115/1.4055430
journal fristpage121001
journal lastpage121001_15
page15
treeJournal of Computational and Nonlinear Dynamics:;2022:;volume( 017 ):;issue: 012
contenttypeFulltext


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