Nonlinear superharmonic resonance analysis of a nonlocal beam on a fractional visco-Pasternak foundation
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2020-07Аутори
Nešić, Nikola
Cajić, Milan
Karličić, Danilo
Janevski, Goran
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This paper investigates the dynamic behaviour of a geometrically nonlinear nanobeam resting on
the fractional visco-Pasternak foundation and subjected to dynamic axial and transverse loads. The
fractional-order governing equation of the system is derived and then discretized by using the single-mode
Galerkin discretization. Corresponding forced Mathieu-Duffing equation is solved by using the perturbation
multiple time scales method for the weak nonlinearity and by the semi-numerical incremental harmonic
balance method for the strongly nonlinear case. A comparison of the results from two methods is performed
in the validation study for the weakly nonlinear case and a fine agreement is achieved. A parametric study
is performed and the advantages and deficiencies of each method are discussed for order two and three
superharmonic resonance conditions. The results demonstrate a significant influence of the fractionalorder damping of the visco-Pasternak foundation as well as the nonlocal parameter and external excitation
load on the frequency response of the system. The proposed methodology can be used in pre-design
procedures of novel energy harvesting and sensor devices at small scales exhibiting nonlinear dynamic
behaviour.
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