REFERENCES
- D. Stevenson and H. Schaub, “Nonlinear control analysis of a double-gimbal variable-speed control moment gyroscope,” J. Guidance Control Dyn., Vol. 35, pp. 787–793, May–Jun. 2012.
- T. J. Yeh, C. Y. Su, and W. J. Wang, “Modelling and control of a hydraulically actuated two-degree-of-freedom inertial platform,” Proc. Inst. Mech. Eng. J. Syst. Control Eng., Vol. 219, pp. 405–417, Sept. 2005.
- J. M. Hilkert, “Inertially stabilized platform technology concepts and principles,” IEEE Control Syst. Mag., Vol. 28, pp. 26–46, Feb. 2008.
- A. K. Rue, “Precision stabilization systems,” IEEE Trans. Aerosp. Electron. Syst., Vol. 10, pp. 34–42, Jan. 1974.
- M. K. Masten, “Inertially stabilized platforms for optical imaging systems,” IEEE Control Syst. Mag., Vol. 28, pp. 47–64, Feb. 2008.
- B. Ekstrand, “Equations of motion for a two-axes gimbal system,” IEEE Trans. Aerosp. Electron. Syst., Vol. 37, pp. 1083–1091, Jul. 2001.
- P. J. Kennedy and R. L. Kennedy, “Direct versus indirect Line Of Sight (LOS) stabilization,” IEEE Trans. Control Syst. Technol., Vol. 11, pp. 3–15, Jan. 2003.
- M. Abdo, A. R. Vali, A. Toloei, and M. R. Arvan, “Research on the cross-coupling of a two axes gimbal system with dynamic unbalance,” Int. J. Adv. Rob. Syst., Vol. 10, pp. 1–13, Oct. 2013.
- Q. Luo, D. Li, and J. Jiang, “Coupled dynamics analysis of a single gimbal control moment gyro cluster integrated with an isolation system,” J. Sound Vib., Vol. 333, pp. 345–363, Jan. 2014.
- A. S. Salatun and P. M. Bainum, “Analysis of a double gimbaled reaction wheel spacecraft attitude stabilization system,” Acta Astronaut., Vol. 10, pp. 55–66, Feb. 1983.
- C. L Lin, and Y. H. Hsiao, “Adaptive feedforward control for disturbance torque rejection in seeker stabilizing loop,” IEEE Trans. Control Syst. Technol., Vol. 9, pp. 108–121, Jan. 2001.
- K. J. Seong, H. G. Kang, B. Y. Yeo, and H. P. Lee, “The stabilization loop design for a two-axis gimbal system using LQG/LTR controller,” in Proceedings of the SICE-ICASE International Joint Conference, Bexco, Busan, Korea, 2006, pp. 755–759.
- S. B. Kim, S. H. Kim, and Y. K. Kwak, “Robust control for two-axis gimbaled sensor system with multivariable feedback systems,” IET Control Theory Appl., Vol. 4, pp. 539–551, Apr. 2010.
- O. Hasturk, A. M. Erkmen, and I. Erkmen, “Proxy-based sliding mode stabilization of a two-axis gimbaled platform,” in Proceedings of the World Congress on Engineering and Computer Science (WCECS), San Francisco, USA, 2011.
- W. Ji, Q. Li, B. Xu, D. Zhao, and S. Fang, “Adaptive fuzzy PID composite control with hysteresis-band switching for line of sight stabilization servo system,” Aerosp. Sci. Technol., Vol. 15, pp. 25–32, Jan.–Feb. 2011.
- S. T. Zhan, W. X. Yan, Z. Fu, G. Pan, and Y. Z. Zhao, “Robust control of a yaw-pitch gimballed seeker,” Aircraft Eng. Aerosp. Technol., Vol. 87, pp. 83–91, Jan. 2013.
- S. Zhan, W. Yan, Z. Fu, and Y. Zhao, “Optimal feedback stabilization of a two-axis gimbaled system subject to saturation nonlinearity and multiple disturbances,” Proc. Inst. Mech. Eng. G J Aerosp. Eng., Vol. 228, pp. 248–261, Feb. 2014.
- M. M. Abdo, A. R. Vali, A. R Toloei, and M. R. Arvan, “Stabilization loop of a two axes gimbal system using self-tuning PID type fuzzy controller,” ISA Trans., Vol. 53, pp. 591–602, Mar. 2014.
- A. Qadir, W. Semke, and J. Neubert, “Vision based neuro-fuzzy controller for a two axes gimbal system with small UAV,” J Intell. Robot. Syst., Vol. 74, pp. 1029–1047, Jun. 2014.
- X. Zhou, H. Zhang, and R. Yu, “Decoupling control for two-axis inertially stabilized platform based on an inverse system and internal model control,” Mechatronics, Vol. 24, pp. 1203–1213, Dec. 2014.
- B. Li, D. Hullender, and M. Direnzo, “Nonlinear induced disturbance rejection in inertial stabilization systems,” IEEE Trans. Control Syst. Technol., Vol. 6, pp. 421–427, May 1998.
- B. Kurkcu and C. Kasnakoglu, “Estimation of unknown disturbances in gimbal systems,” Appl. Mech. Mater., Vol. 789–790, pp. 949–954, Jun. 2015.
- S. Li and M. Zhong, “High-precision disturbance compensation for a three-axis gyro-stabilized camera mount,” IEEE/ASME Trans. Mechatron., Vol. 20, pp. 3135–3147, Dec. 2015.
- X. Zhou, Y. Jia, Q. Zhao, and T. Cai, “Dual-rate-loop control based on disturbance observer of angular acceleration for a three-axis aerial inertially stabilized platform,” ISA Trans., Vol. 63, pp. 288–298, Jul. 2016. doi:10.1016/j.isatra.2016.02.021
- I. Podlubny, Fractional Differential Equations. San Diego, CA: Academic Press, 1999.
- M. L. Corradini, R. Giambo, and S. Pettinari, “On the adoption of a fractional-order sliding surface for the robust control of integer-order LTI plants,” Automatica, Vol. 51, pp. 364–371, Jan. 2015.
- A. J. Calderon, B. M. Vinagre, and V. Feliu, “Fractional order control strategies for power electronic buck converters,” Signal Process., Vol. 86, pp. 2803–2819, Oct. 2006.
- D. Valério and J. S Da Costa, “Ninteger: A non-integer control toolbox for Matlab,” in Proceedings of the 1st IFAC Workshop on Fractional Differentiation and its Applications, Bordeaux, France, 19–21 July 2004.