Research on Trajectory Tracking Control Strategy of Backstepping Optimized Double Sliding Mode for Wheeled Mobile Robot

被引：0

作者：

Ma, Zijun ^{[1
]}

Zhang, Xingang ^{[1
]}

Zhang, Shucui ^{[1
]}

Yao, Wenli ^{[1
]}

机构：

[1] College of Science, Qingdao University of Technology, Qingdao

来源：

Beijing Daxue Xuebao (Ziran Kexue Ban)/Acta Scientiarum Naturalium Universitatis Pekinensis | 2024年 / 60卷 / 04期

关键词：

backstepping control; input saturation; particle swarm optimization (PSO); sliding mode control; wheeled mobile robot (WMR);

D O I：

10.13209/j.0479-8023.2024.011

中图分类号：

学科分类号：

摘要：

In order to improve the accuracy of trajectory tracking control of wheeled mobile robot (WMR), a backstepping optimized double sliding mode control strategy was proposed. Initially, based on the kinematics and dynamics model of WMR, the kinematic backstepping sliding mode controller and dynamic backstepping integral sliding mode controller are designed. The stability of the designed controllers is proved by Lyapunov theory. Then particle swarm optimization (PSO) algorithm is used to optimize the controller parameters. Finally, considering the external disturbance and system input saturation, Matlab/Simulink is used to verify the control strategy. The results show that the proposed control strategy not only ensures the robustness and real-time performance of the system, but also improves the control accuracy of the system. © 2024 Peking University. All rights reserved.

引用

页码：597 / 606

页数：9

共 30 条

[11] Chen C Y, Li T H S, Yeh Y C, Et al., Design and implementation of an adaptive sliding-mode dynamic controller for wheeled mobile robots, Mechatronics, 19, 2, pp. 156-166, (2009)
[12] Ahmadi S M, Behnam Taghadosi M, Haqshenas M A R., A state augmented adaptive backstepping control of wheeled mobile robots, Transactions of the Institute of Measurement and Control, 43, 2, pp. 434-450, (2021)
[13] Fierro R, Lewis F L., Control of a nonholomic mobile robot: backstepping kinematics into dynamics, Journal of Robotic Systems, 14, 3, pp. 149-163, (1997)
[14] Peng H, Li F, Liu J, Et al., A symplectic instantaneous optimal control for robot trajectory tracking with differential-algebraic equation models, IEEE Transactions on Industrial Electronics, 67, 5, pp. 3819-3829, (2019)
[15] Zhang K, Chen J, Li Y, Et al., Visual tracking and depth estimation of mobile robots without desired velocity information, IEEE Transactions on Cybernetics, 50, 1, pp. 361-373, (2018)
[16] Alipour K, Robat A B, Tarvirdizadeh B., Dynamics modeling and sliding mode control of tractor-trailer wheeled mobile robots subject to wheels slip, Mechanism and Machine Theory, 138, pp. 16-37, (2019)
[17] Kanellakopoulos I, Kokotovic P V, Morse A S., Systematic design of adaptive controllers for feedback linearizable systems, IEEE Transactions on Automatic Control, 36, 11, pp. 1241-1253, (1991)
[18] Zinober A S I, Liu P., Robust control of nonlinear uncertain systems via sliding mode with backstepping design, UKACC International Conference on CONTROL’96, 427, (1996)
[19] Zhou Y, Wu Y, Hu Y., Robust backstepping sliding mode control of a class of uncertain MIMO nonlinear systems, International conference on Control and Automation, pp. 1916-1921, (2007)
[20] Won M, Hedrick J K., Multiple-surface sliding control of a class of uncertain nonlinear system, International Journal of Control, 64, 4, pp. 693-706, (1996)

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