|
|
论文:2016,Vol:34,Issue(5):817-822 |
|
|
引用本文: |
|
|
周军, 赵金龙. 基于扩张干扰观测器的再入飞行器终端滑模控制[J]. 西北工业大学学报 |
|
|
Zhou Jun, Zhao Jinlong. Extended Disturbance Observer Based Terminal SlidingMode Control for Reentry Vehicles[J]. Northwestern polytechnical university |
|
|
|
|
|
|
|
| 基于扩张干扰观测器的再入飞行器终端滑模控制 |
|
| 周军, 赵金龙 |
|
| 西北工业大学 精确制导与控制研究所, 陕西 西安 710072 |
| 摘要: |
| 针对再入滑翔飞行器存在时变非匹配不确定干扰的问题,设计了一种非线性扩张干扰观测器和新型双回路非奇异终端滑模控制律。首先将观测器状态变量扩张为干扰及其变化速率的估计值,再基于Lyapunov稳定性定理设计新型非线性干扰观测器;将再入飞行器系统方程分为姿态角外回路和姿态角速率内回路,分别设计具有干扰补偿作用的新型滑模面,以及能够有限时间收敛的非奇异终端滑模控制律。仿真结果表明,该方法可将传统非线性干扰观测器的估计精度提高约4%,控制系统跟踪误差得到明显降低,具有良好的动态特性。 |
| 关键词:
非线性干扰观测器
再入飞行器
非奇异
终端滑模控制
|
|
| Extended Disturbance Observer Based Terminal SlidingMode Control for Reentry Vehicles |
|
| Zhou Jun, Zhao Jinlong |
|
| Institute of Precision Guidance and Control, Northwestern Polytechnical University, Xi'an 710072, China |
| Abstract: |
| This paper presents an extended nonlinear disturbance observer and novel double loop nonsingular terminal sliding mode control for reentry vehicles with time-varying unmatched disturbance. Firstly, the Lyapunov theorem is employed to design the extended nonlinear disturbance observer, where the state variables are extended to observe the disturbances and their changing rates simultaneously. The motion of reentry vehicle is separated into inner loop of angle and outer loop of angular rate, and a nonsingular terminal sliding mode control laws based on novel sliding mode is developed. The disturbance can be efficiently compensated and the tracking error is guaranteed to converge to zero in finite time. Simulation results and comparisons illustrate the effectiveness of the control strategy. |
| Key words:
nonlinear disturbance observer
reentry vehicles
nonsingular
terminal sliding mode control
|
|
| 收稿日期: 2016-04-02
修回日期:
|
| DOI: |
| 基金项目: 国家自然科学基金(61473226)资助 |
| 通讯作者:
Email: |
| 作者简介: 周军(1966-),西北工业大学教授,主要从事飞行器先进制导与控制技术研究。
|
|
| 相关功能 |
|
|
|
|
| 作者相关文章 |
|
| 周军 在本刊中的所有文章 |
| 赵金龙 在本刊中的所有文章 |
|
|
|
|
|
|
|
|
参考文献: |
|
|
[1] 李菁菁,任章,宋剑爽. 高超声速再入滑翔飞行器的模糊变结构控制[J]. 上海交通大学学报, 2011,45(2):295-300 Li Jingjing, Ren Zhang, Song Jianshuang. Fuzzy Sliding Mode Control for Hypersonic Re-Entry Vehicles[J]. Journal of Shanghai Jiaotong University, 2011,45(2):295-300(in Chinese)
[2] Xu H, Mirmirani M D, Ioannou P A. Adaptive Sliding Mode Control Design for a Hypersonic Flight Vehicle[J]. Journal of Guidance, Control, and Dynamics, 2004, 27(5):829-838
[3] Lian B H, Bang H, Hurtado J E. Adaptive Backstepping Control Based Autopilot Design for Reentry Vehicle[C]//Proc AIAA Guidance Navigation and Control Conf and Exhibit, 2004, 1210
[4] Hall C E, Shtessel Y B. Sliding Mode Disturbance Observer-Based Control for a Reusable Launch Vehicle[J]. Journal of Guidance, Control, and Dynamics, 2006, 29(6):1315-1328
[5] Koosun Lee, Juhoon Back, Ick Choy. Nonlinear Disturbance Observer Based Robust Attitude Tracking Controller for Quadrotor UAVs[J]. International Journal of Control Automation and Systems, 2014:12(6):1266-1275
[6] Yang Jun. Nonlinear Disturbance Observer Based Robust Flight Control for Airbreathing Hypersonic Vehicles[J]. IEEE Trans on Aerospace and Electronics Systems, 2013:49(2):1263-1275
[7] Yang Jun, Li Shihua, Yu Xinghuo. Sliding-Mode Control for Systems with Mismatched Uncertainties via A Disturbance Observer[J]. IEEE Trans on Industrial Electronics, 2013, 60(1):160-169
[8] 卜祥伟,吴晓燕,陈永兴,等. 非线性干扰观测器的高超声速飞行器自适应反演控制[J]. 国防科技大学学报, 2014,36(5):44-49 Bu Xiangwei, Wu Xiaoyan, Chen Yongxing, et al. Adaptive Backstepping Control of Hypersonic Vehicles Based on Nonlinear Disturbance Observer[J]. Journal of National University of Defense Technology, 2014, 36(5):44-49(in Chinese)
[9] 郭超,梁晓庚,王俊伟. 基于非线性干扰观测器的拦截弹动态逆控制[J]. 系统工程与电子技术,2014,36(11):2259-2265 Guo Chao, Liang Xiaogeng, Wang Junwei. Nonlinear Disturbance Observer-Based Dynamic Inverse Control for Near Space Interceptor[J]. System Engineering and Electronics, 2014,36(11):2259-2265(in Chinese)
[10] 于靖,陈谋,姜长生. 基于干扰观测器的非线性不确定系统自适应滑模控制[J]. 控制理论与应用, 2014,31(8):993-999 Yu Jing, Chen Mou, Jiang Changsheng. Adaptive Sliding Mode Control for Nonlinear Uncertain Systems Based on Disturbance Observer[J]. Control Theory & Applications, 2014,31(8):993-999(in Chinese)
[11] Ginoya Divyesh, Shendge P D, Phadke S B. Sliding Mode Control for Mismatched Uncertain Systems Using an Extended Disturbance Observer[J]. IEEE Trans on Industrial Electronics, 2014, 61(4):1983-1992
[12] 蒲明,吴庆宪,姜长生,等. 新型快速Terminal滑模及其在近空间飞行器上的应用[J]. 航空学报,2011,32(7):1283-1291 Pu Ming, Wu Qingxian, Jiang Changsheng, et al. New Fast Terminal Sliding Mode and Its Application to Near Space Vehicles[J]. Acta Aeronautica et Astronautica Sinica, 32(7):1283-1291(in Chinese)
[13] Yu Shuanghe. Continuous Finite-Time Control for Robotic Manipulators with Terminal Sliding Mode[J]. Automatica, 2005:411957-1964
[14] Cybenko G. Approximation by Superpositions of a Sigmoidal Function[J]. Mathematics of Control, Singnals and Systems, 1989, 2(4):303-314 |
|
|
|
|
|
|
|
