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Nano-resonator frequency response based on strain gradient theory

Miandoab, E. M ; Sharif University of Technology

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  1. Type of Document: Article
  2. DOI: 10.1088/0022-3727/47/36/365303
  3. Abstract:
  4. This paper aims to explore the dynamic behaviour of a nano-resonator under ac and dc excitation using strain gradient theory. To achieve this goal, the partial differential equation of nano-beam vibration is first converted to an ordinary differential equation by the Galerkin projection method and the lumped model is derived. Lumped parameters of the nano-resonator, such as linear and nonlinear springs and damper coefficients, are compared with those of classical theory and it is demonstrated that beams with smaller thickness display greater deviation from classical parameters. Stable and unstable equilibrium points based on classic and non-classical theories are also compared. The results show that, regarding the applied dc voltage, the dynamic behaviours expected by classical and non-classical theories are significantly different, such that one theory predicts the un-deformed shape as the stable condition, while the other theory predicts that the beam will experience bi-stability. To obtain the frequency response of the nano-resonator, a general equation including cubic and quadratic nonlinearities in addition to parametric electrostatic excitation terms is derived, and the analytical solution is determined using a second-order multiple scales method. Based on frequency response analysis, the softening and hardening effects given by two theories are investigated and compared, and it is observed that neglecting the size effect can lead to two completely different predictions in the dynamic behaviour of the resonators. The findings of this article can be helpful in the design and characterization of the size-dependent dynamic behaviour of resonators on small scales
  5. Keywords:
  6. Multiple scales method ; Nano-resonator ; Size effect ; Strain gradient ; Algorithms ; Dynamic response ; Frequency response ; Ordinary differential equations ; Electrostatic excitation ; Frequency response analysis ; Multiple scales methods ; Quadratic nonlinearities ; Size effects ; Strain gradients ; Unstable equilibrium points ; Resonators
  7. Source: Journal of Physics D: Applied Physics ; Vol. 47, Issue. 36 , 2014 ; ISSN: 00223727
  8. URL: http://iopscience.iop.org/0022-3727/47/36/365303