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E GUOKANG [3]
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Probabilistic Solutions of a Stretched Beam Discretized with Finite Difference Scheme and Excited by Kanai-Tajimi Ground Motion
Journal article
Er, G. K., Iu, V. P., Du, H. E.. Probabilistic Solutions of a Stretched Beam Discretized with Finite Difference Scheme and Excited by Kanai-Tajimi Ground Motion[J]. Archives of Mechanics, 2019, 433-457.
Authors:
Er, G. K.
;
Iu, V. P.
;
Du, H. E.
Favorite
|
TC[WOS]:
3
TC[Scopus]:
12
IF:
1.1
/
0.9
|
Submit date:2022/08/26
Stretched Beam
Nonlinear Random Vibration
Fpk Equation
Kanai-tajimi Ground Motion
Finite Difference Scheme
Probabilistic solutions of a stretched beam discretized with finite difference scheme and excited by Kanai–Tajimi ground motion
Journal article
Er,G. K., Iu,V. P., Du,H. E.. Probabilistic solutions of a stretched beam discretized with finite difference scheme and excited by Kanai–Tajimi ground motion[J]. Archives of Mechanics, 2019, 71(4-5), 433-457.
Authors:
Er,G. K.
;
Iu,V. P.
;
Du,H. E.
Favorite
|
TC[WOS]:
3
TC[Scopus]:
12
IF:
1.1
/
0.9
|
Submit date:2021/03/09
Finite Difference Scheme
Fpk Equation
Kanai–tajimi Ground Motion
Nonlinear Random Vibration
Stretched Beam
Probabilistic solutions of the stretched beam systems formulated by finite difference scheme and excited by gaussian white noise
Conference paper
Er,Guo Kang, Iu,Vai Pan, Wang,Kun, Du,Hai En. Probabilistic solutions of the stretched beam systems formulated by finite difference scheme and excited by gaussian white noise[C]:Springer, 2019, 99-114.
Authors:
Er,Guo Kang
;
Iu,Vai Pan
;
Wang,Kun
;
Du,Hai En
Favorite
|
TC[WOS]:
1
TC[Scopus]:
1
|
Submit date:2021/03/09
Finite Difference
Fpk Equation
Mdof System
Nonlinear Random Vibration
Sss-epc Method
Stretched Beam
Analysis of the forced vibration of geometrically nonlinear cantilever beam with lumping mass by multiple scale Lindstedt-Poincare method
Conference paper
Du, H., Er, G. K., Iu, V. P.. Analysis of the forced vibration of geometrically nonlinear cantilever beam with lumping mass by multiple scale Lindstedt-Poincare method[C], 2017.
Authors:
Du, H.
;
Er, G. K.
;
Iu, V. P.
Favorite
|
|
Submit date:2022/08/26
Forced Vibration
Geometrically Nonlinear Cantilever Beam
Multiple-Scales
Lindstedt-Poincaré Method
Nonlinear Random Vibrations of Stretched Beam Discretized by Finite Difference Scheme and Excited by Gaussian White Noise
Conference paper
Er, G. K., Iu, V. P., Wang, K., Du, H. E.. Nonlinear Random Vibrations of Stretched Beam Discretized by Finite Difference Scheme and Excited by Gaussian White Noise[C], 2017.
Authors:
Er, G. K.
;
Iu, V. P.
;
Wang, K.
;
Du, H. E.
Favorite
|
|
Submit date:2022/08/26
Nonlinear beam
Fokker-Planck-Kolmogorov equation
probabilistic solution
MDOF system
Nonlinear vibration of cantilever under the action of lateral harmonic excitations and axial load
Conference paper
Er G.-K., Du H.. Nonlinear vibration of cantilever under the action of lateral harmonic excitations and axial load[C], 2015, 410-421.
Authors:
Er G.-K.
;
Du H.
Favorite
|
|
Submit date:2019/02/13
Cantilever beam
Galerkin method
Hamilton principle
Nonlinear vibration
Runge-Kutta method
The probabilistic solutions of some nonlinear stretched beams excited by filtered white noise
Conference paper
Er G.K.. The probabilistic solutions of some nonlinear stretched beams excited by filtered white noise[C], 2013, 141-150.
Authors:
Er G.K.
Favorite
|
TC[WOS]:
11
TC[Scopus]:
12
|
Submit date:2019/02/13
Nonlinear Stretched Beam
Multi-degree-of-freedom System
Filtered White Noise
Probabilistic Solution