Stability, Bifurcation, and Chaos of a Structure with a Nonlinear Actuator
スポンサーリンク
概要
- 論文の詳細を見る
In this work, the steady-state behaviors of a structure with a nonlinear actuator subjected to linear feedback control are investigated analytically. We apply the methods of harmonic balance, Floquet theory, and Melnikov theory with the assistance of numerical computations to plot the global bifurcation diagram in parametric space. Attention is focused on the effects of feedback gains on qualitative behaviors such as the stability of steady-state solutions, chaotic vibrations, fractal basin boundaries, jump phenomena, and the control effectiveness in terms of amplitude modulation.
- 社団法人応用物理学会の論文
- 1995-07-15
著者
-
Tung Pi-cheng
Department Of Mech. Engineering National Central University
-
Tseng Chyuan-yow
Department Of Mechanical Engineering National Central University
関連論文
- An Analytic Algorithm for Simulation of Stick-Slip Friction
- Suppression of Limit Cycles in Servo Systems Using Gain Limit Compensator
- Dynamics of a Nonlinear Electromagnetic System
- Nonlinear Identification of a Magnetic Bearing System with Closed Loop Control
- Dynamics of Nonlinear Structure with Magnetic Actuator
- Dynamics Analysis of an Asymmetric Nonlinear Vibration Absorber
- Stability, Bifurcation, and Chaos of a Structure with a Nonlinear Actuator
- The Vibro-Impact Response of a Nonharmonically Excited System
- Dynamics of A Nonharmonically Forced Impact Oscillator