Litcius/Paper detail

Analysis of the Nonlinear Response of Piezo-Micromirrors with the Harmonic Balance Method

Andrea Opreni, Nicolò Boni, Roberto Carminati, Attilio Frangi

2021Actuators38 citationsDOIOpen Access PDF

Abstract

In this work, we address the simulation and testing of MEMS micromirrors with hardening and softening behaviour excited with patches of piezoelectric materials. The forces exerted by the piezoelectric patches are modelled by means of the theory of ferroelectrics developed by Landau–Devonshire and are based on the experimentally measured polarisation hysteresis loops. The large rotations experienced by the mirrors also induce geometrical nonlinearities in the formulation up to cubic order. The solution of the proposed model is performed by discretising the device geometry using the Finite Element Method, and the resulting large system of coupled differential equations is solved by means of the Harmonic Balance Method. Numerical results were validated with experimental data collected on the devices.

Topics & Concepts

Harmonic balancePiezoelectricityNonlinear systemHysteresisFinite element methodHardening (computing)HarmonicMicroelectromechanical systemsMaterials scienceSofteningWork (physics)MechanicsAcousticsStructural engineeringClassical mechanicsControl theory (sociology)PhysicsMechanical engineeringComputer scienceEngineeringComposite materialCondensed matter physicsLayer (electronics)Quantum mechanicsArtificial intelligenceControl (management)OptoelectronicsAcoustic Wave Resonator TechnologiesAdvanced MEMS and NEMS TechnologiesAdhesion, Friction, and Surface Interactions