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Finite-time coordination control for networked bilateral teleoperation

Published online by Cambridge University Press:  05 March 2014

Yana Yang
Affiliation:
Institute of Electrical Engineering, Yanshan University, Qinhuangdao City, Qinhuangdao 066004, China
Changchun Hua*
Affiliation:
Institute of Electrical Engineering, Yanshan University, Qinhuangdao City, Qinhuangdao 066004, China
Huafeng Ding
Affiliation:
Institute of Electrical Engineering, Yanshan University, Qinhuangdao City, Qinhuangdao 066004, China
Xinping Guan
Affiliation:
Institute of Electrical Engineering, Yanshan University, Qinhuangdao City, Qinhuangdao 066004, China
*
*Corresponding author. E-mail: [email protected]

Summary

A continuous finite-time control scheme for networked bilateral teleoperation is proposed in this brief. The terminal sliding mode technology is used and new master–slave torques are designed. With the new controller, the coordination error of the master manipulator and the slave manipulator converges to zero in finite time. Moreover, the reaching time and the sliding time can be derived. Finally, the comparisons are performed and simulations show the effectiveness of the proposed approach.

Type
Articles
Copyright
Copyright © Cambridge University Press 2014 

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References

1.Hokayem, P. F. and Spong, M. W., “Bilateral teleoperation: An historical survey,” Automatica 42 (12), 20352057 (2006).Google Scholar
2.He, Y., Wang, Q. and Lin, C., “An improved H filter design for systems with time-varying interval delay,” IEEE Trans. Circu. Syst. II 53 (11), 12351239 (2006).Google Scholar
3.Hua, L. Y., Liu, X. P., Liu, G. P. and Xu, S. P., “Trajectory tracking compensation for teleoperation with transmission delays,” Robotica 29 (6), 863871 (2011).Google Scholar
4.Slawinski, E., Mutal, V., Salinas, L. and Garcia, S., “Teleoperation of a mobile robot with time-varying delay and force feedback,” Robotica 30 (1), 6777 (2012).Google Scholar
5.Anderson, R. J. and Spong, M. W., “Bilateral control of teleoperators with time delay,” IEEE Trans. Autom. Control 34 (5), 494501 (1989).Google Scholar
6.Niemeyer, G. and Slotine, J. J. E., “Stable adaptive teleoperation,” IEEE J. Ocean. Eng. 16 (1), 152162 (1991).CrossRefGoogle Scholar
7.Lee, D. and Spong, M. W., “Passive bilateral teleoperation with constant time delay,” IEEE Trans. Robot. 22 (2), 269281 (2006).Google Scholar
8.Nuno, E., Basanez, L., Ortega, R. and Spong, M. W., “Position tracking for nonlinear teleoperators with variable time-delay,” Int. J. Robot. Res. 28 (7), 895910 (2009).Google Scholar
9.Hua, C. C. and Liu, X. P., “Delay-dependent stability criteria of teleoperation systems with asymmetric time-varying delays,” IEEE Trans. Robot. 25 (5), 925932 (2010).Google Scholar
10.Li, Z. J., Cao, X. Q. and Ding, N., “Adaptive fuzzy control for synchronization of nonlinear teleoperators with stochastic time-varying communication delays,” IEEE Trans. Fuzzy Syst. 19 (4), 745757 (2011).CrossRefGoogle Scholar
11.Park, J. H. and Cho, H. C., “Sliding Mode Control of Bilateral Teleoperation Systems with Force-section on the Internet,” Proceedings of the IEEE International Conference on Intelligent Robots and Systems, vol. 2 (2000) pp. 1187–1192.Google Scholar
12.Park, J. H. and Cho, H. C., “Sliding-Mode Controller for Bilateral Teleoperation with Varying Time Delay,” Proceedings of the IEEE/ASME International Conference on Advanced Intelligent Mechatronics (AIM) (1999) pp. 311–316.Google Scholar
13.Guiatni, M., Kheddarm, A. and Melouah, H., “Sliding Mode Bilateral Control and Four Channels Schemes Control of a Force Reflecting Master/Slave Teleoperator,” Proceedings of the IEEE International Conference on Mechatronics and Automation (ICMA) (2005) pp. 1660–1665.Google Scholar
14.Venkataraman, S. T. and Gulati, S., “Control of nonlinear systems using terminal sliding modes,” ASME J. Dyn. Syst. Meas. Control 115, 554560 (1993).Google Scholar
15.Feng, Y., Yu, X. H. and Man, Z. H., “Non-singular terminal sliding mode control of rigid manipulators,” Automatica 38, 21592167 (2002).Google Scholar
16.Yu, S. H., Yu, X. H., Shirinzadeh, B. J. and Man, Z. H., “Continuous finite-time control for robotic manipulators with terminal sliding mode,” Automatica 41 (11), 19571964 (2005).Google Scholar
17.Nekoukar, V. and Erfanian, A., “Adaptive fuzzy terminal sliding mode control for a class of MIMO uncertain nonlinear systems,” Fuzzy Sets Syst. 179, 3449 (2011).Google Scholar
18.Su, Y. X. and Zheng, C. H., “Global finite-time inverse tracking control of robot manipulators,” Robot. Comput.-Integr. Manuf. 27, 550557 (2011).Google Scholar
19.Zhao, D., Li, S., Zhu, Q. and Gao, F., “Robust finite-time control approach for robotic manipulators,” IET Control Theory Appl. 4 (1), 115 (2010).Google Scholar
20.Wang, L. Y., Chai, T. Y. and Zhai, L. F., “Neural-network-based terminal sliding-mode control of robotic manipulators including actuator dynamics,” IEEE Trans. Indus. Elect. 56 (9), 32963304 (2009).Google Scholar