Optimal design method for force in vibration control of multi-body system with quick startup and brake

A kind of active vibration control method was presented through optimal design of driving load of multibody system with quick startup and brake. Dynamical equation of multi-body system with quick startup and brake was built, and mathematical model of representing vibration control was also set up according to the moving process from startup to brake. Then optimization vibration control model of system driving load was founded by applying theory of optimization control, which takes rigid body moving variable of braking moment as the known condition, and vibration control equation of multi-body system with quick startup and brake was converted into boundary value problem of differential equation. The transient control algorithm of vibration was put forward, which is the analysis basis for the further research. Theoretical analysis and calculation of numerical examples show that the optimal design method for the multi-body system driving load can decrease the vibration of system with duplication.

[1]  S. S. Kim Nordsieck form of multirate integration method for flexible multibody dynamic analysis , 2002 .

[2]  M. B. Muller,et al.  Reducing NVH analysis burden using Automated Multi-Level Substructuring , 1999 .

[3]  Qiu Yang,et al.  Active control of vibration using a fuzzy control method , 2004 .

[4]  隆史 藤田,et al.  ピエゾアクチュエータを用いた大形アクティブ微振動制御装置の半導体製造装置への適用 ( インテリジェント材料・流体システム) , 1997 .

[5]  B. Thompson,et al.  A note on the experimentally determined elastodynamic response of a Slider-Crank mechanism featuring a macroscopically smart connecting rod with ceramic piezoelectric actuators and strain Gauge sensors , 1995 .

[6]  C. Y. Liao,et al.  An Elastodynamic Analysis and Control of Flexible Linkages Using Piezoceramic Sensors and Actuators , 1993 .

[7]  Y. C. Chen,et al.  Vibration Control of the Elastodynamic Response of High-Speed Flexible Linkage Mechanisms , 1991 .

[8]  Elisabetta Rugi INTEGRATED STRUCTURE AND CONTROLLER SYSTEMS: A DESIGN PROCEDURE FOR CONTROLLED MULTI-BODY FLEXIBLE HIGH PERFORMANCE MECHANISMS , 2001 .

[9]  Optimal boundary obstacle of the string vibration , 2000, Proceedings of the 2000. IEEE International Conference on Control Applications. Conference Proceedings (Cat. No.00CH37162).

[10]  Edward J. Haug,et al.  Flexible multibody dynamic simulation using optimal lumped inertia matrices , 1999 .

[11]  Takafumi Fujita,et al.  Application of large-scale active microvibration control system using piezoelectric actuators to semiconductor manufacturing equipment , 1997, Smart Structures.

[12]  Seung-Bok Choi,et al.  Vibration control of flexible linkage mechanisms using piezoelectric films , 1994 .

[13]  Ming Xin,et al.  Robust state dependent Riccati equation based robot manipulator control , 2001, Proceedings of the 2001 IEEE International Conference on Control Applications (CCA'01) (Cat. No.01CH37204).