Periodic solutions of a graphene based model in micro-electro-mechanical pull-in device
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Date issued
2017
Journal Title
Journal ISSN
Volume Title
Publisher
University of West Bohemia
Abstract
Phase plane analysis of the nonlinear spring-mass equation arising in modeling vibrations of a lumped mass
attached to a graphene sheet with a fixed end is presented. The nonlinear lumped-mass model takes into account
the nonlinear behavior of the graphene by including the third-order elastic stiffness constant and the nonlinear
electrostatic force. Standard pull-in voltages are computed. Graphic phase diagrams are used to demonstrate the
conclusions. The nonlinear wave forms and the associated resonance frequencies are computed and presented
graphically to demonstrate the effects of the nonlinear stiffness constant comparing with the corresponding linear
model. The existence of periodic solutions of the model is proved analytically for physically admissible periodic
solutions, and conditions for bifurcation points on a parameter associated with the third-order elastic stiffness
constant are determined.
Description
Subject(s)
soustředěný model, nelineární pružina, grafen, elektrostatická zátěžová stabilita, periodická řešení
Citation
Applied and Computational Mechanics. 2017, vol. 11, no. 1, p. 1-10.