English

Mode localization and sensitivity in weakly coupled resonators

Applied Physics 2018-05-29 v1

Abstract

Localization of normal modes is used in recent microelectromechanical systems (MEMS) technologies with orders of magnitude improvements in sensitivity. A pair of eigenvalues veer, or avoid crossing each other, as a single parameter of a vibrating system is varied. While it is well-known that the sensitivity (ss) of modal amplitude ratio varies with strength of coupling (κ\kappa) as sκ1s \propto\kappa^{-1} in the case of two identical coupled oscillators, recently, we showed that asymmetry α\alpha will also influence sensitivity according to s(ακ)1s \propto (\alpha \kappa)^{-1}. Here, we show that further enhancements in sensitivity is possible in higher degrees of freedom (nn) systems using energy analysis. In the case of n2n-2 uniformly coupled oscillators embedded between two oscillators, we show that sα1κ1ns \propto \alpha^{-1}\kappa^{1-n}, if the blocked resonance spectra of the embedded oscillators and the end oscillators are well-separated. We also show that asymmetric coupled oscillators also enhance linear range in addition to sensitivity when compared to their symmetric counterparts. We do not use a perturbation approach in our energy analysis; hence the sensitivity and linear range expressions derived have a wider range of accuracy.

Keywords

Cite

@article{arxiv.1805.10380,
  title  = {Mode localization and sensitivity in weakly coupled resonators},
  author = {M. Manav and A. S. Phani and E. Cretu},
  journal= {arXiv preprint arXiv:1805.10380},
  year   = {2018}
}
R2 v1 2026-06-23T02:08:58.557Z