On suppression of chaotic motion of a nonlinear MEMS oscillator
DOI10.1007/S11071-019-05421-8zbMath1430.70076OpenAlexW2994899445WikidataQ126561656 ScholiaQ126561656MaRDI QIDQ2296413
Mauricio A. Ribeiro, Wagner B. Lenz, Angelo Marcelo Tusset, Rodrigo Tumolin Rocha, José Manoel Balthazar
Publication date: 18 February 2020
Published in: Nonlinear Dynamics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s11071-019-05421-8
optimal controlchaosnonlinear dynamicsperturbation methodwaveletfractional-orderLyapunov-Floquet transformation
Forced motions for nonlinear problems in mechanics (70K40) General perturbation schemes for nonlinear problems in mechanics (70K60) Fractional derivatives and integrals (26A33) Nonlinear resonances for nonlinear problems in mechanics (70K30)
Related Items (1)
Uses Software
Cites Work
- Unnamed Item
- A wavelet-based tool for studying non-periodicity
- Nonlinear control in an electromechanical transducer with chaotic behaviour
- Dynamic analysis of a fractional-order Lorenz chaotic system
- Fractional-order nonlinear systems. Modeling, analysis and simulation
- A note on the stability of fractional order systems
- Adaptive control with guaranteed transient and steady state tracking error bounds for strict feedback systems
- Suboptimal control for the nonlinear quadratic regulator problem
- A study of the nonlinear response of a resonant microbeam to an electric actuation
- On an optimal control applied in MEMS oscillator with chaotic behavior including fractional order
- Statements on chaos control designs, including a fractional order dynamical system, applied to a ``MEMS comb-drive actuator
- The effect of time-delayed feedback controller on an electrically actuated resonator
- On an optimal control design for Rössler system
- Effects of Nonlinearities on the Steady State Dynamic Behavior of Electric Actuated Microcantilever-based Resonators
- SYMBOLIC COMPUTATION OF FUNDAMENTAL SOLUTION MATRICES FOR LINEAR TIME-PERIODIC DYNAMICAL SYSTEMS
- Control designs for the nonlinear benchmark problem via the state-dependent Riccati equation method
- The dynamic behavior of a parametrically excited time-periodic MEMS taking into account parametric errors
- Control of General Dynamic Systems With Periodically Varying Parameters Via Liapunov-Floquet Transformation
- Mathematical Modeling and Simulation of Thermal Effects in Flexural Microcantilever Resonator Dynamics
- A GENERAL APPROACH IN THE DESIGN OF ACTIVE CONTROLLERS FOR NONLINEAR SYSTEMS EXHIBITING CHAOS
This page was built for publication: On suppression of chaotic motion of a nonlinear MEMS oscillator
