The behavior of the vibration for nonlinear system with max active controller. | ||||
Bulletin of Faculty of Science, Zagazig University | ||||
Article 3, Volume 2023, Issue 2, June 2023, Page 23-32 PDF (1.45 MB) | ||||
Document Type: Original Article | ||||
DOI: 10.21608/bfszu.2022.111948.1105 | ||||
View on SCiNiTO | ||||
Authors | ||||
M.A. Elsayed 1; Y.A. Amer2 | ||||
1Mathematics Zagazig University | ||||
2Mathematics department, Faculty of Science, Zagazig University | ||||
Abstract | ||||
Vibration control can be divided into two categories: passive and active control. Active control is provided by the negative linear velocity and acceleration feedback controller. The vibration of a nonlinear dynamical system is reduced by the Negative linear velocity and acceleration feedback controller in the worst resonance case ( ). This system has one degree of freedom, which contains the third order of nonlinear terms, as well as an external force. The response of the nonlinear system is determined using the multiple scale perturbation technique. Frequency response equations are used to test the stability of the numerical solution. The impacts of different parameters on the vibrating system is studied and reported on. Numerically, we investigated the time histories of the system before and after using Negative linear velocity acceleration feedback controller using Runge – Kutta of the fourth order and studied the response curve with detuning parameter . Finally, the approximate and numerical solutions accord well. | ||||
Keywords | ||||
Vibration control; Negative linear velocity feedback; Resonance case; Stability | ||||
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