Presentation	2011-03-10 A study on stability and bifurcation of intrinsic localized modes in a coupled cantilever array with tunable nonlinearity Masayuki KIMURA, Takashi HIKIHARA,
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Abstract(in English)	Bifurcations concerning spatially localized solutions are analytically investigated in a 2-DOF nonlinear coupled oscillators. The angular frequency and the amplitude of solution at which bifurcations occur are derived by using the simple averaging method. By confirming the result with bifurcation sets obtained by numerical simulations, it is shown that the result partially coincides with that of numerical one. In addition, the result can be applied to bifurcations of intrinsic localized modes in 8-DOF system.
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Keyword(in English)	intrinsic localized mode / ILM / coupled cantilever array / bifurcation
Paper #	NLP2010-180
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Committee	NLP
Conference Date	2011/3/3(1days)
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Registration To	Nonlinear Problems (NLP)
Language	JPN
Title (in Japanese)	(See Japanese page)
Sub Title (in Japanese)	(See Japanese page)
Title (in English)	A study on stability and bifurcation of intrinsic localized modes in a coupled cantilever array with tunable nonlinearity
Sub Title (in English)
Keyword(1)	intrinsic localized mode
Keyword(2)	ILM
Keyword(3)	coupled cantilever array
Keyword(4)	bifurcation
1st Author's Name	Masayuki KIMURA
1st Author's Affiliation	Department of Electronic Systems Engineering, The University of Shiga Prefecture()
2nd Author's Name	Takashi HIKIHARA
2nd Author's Affiliation	Department of Electrical Engineering, Kyoto University
Date	2011-03-10
Paper #	NLP2010-180
Volume (vol)	vol.110
Number (no)	465
Page	pp.pp.-
#Pages	6
Date of Issue