This paper’s primary motivation is to present a globally predefined-time sliding mode control (PtSMC) strategy to stabilize a class of second-order systems subjected to matched and mismatched disturbances. To achieve this, the paper proposes a new exact time disturbance observer (DOB) based on a terminal time regulator, which accurately estimates the disturbances within a prescribed time, effectively preventing the system state from escaping to infinity due to high gains and overestimation. In addition, a new predefined-time sliding mode variable with the estimation of DOB is developed to ensure a predefined-time convergence on the sliding mode phase against mismatched disturbances. The proposed DOB-based technique can alleviate the chattering resulting from the use of an overestimated gain, in contrast to the controller without employing a DOB. Furthermore, a predefined-time reaching law is introduced to guarantee a global predefined-time convergence. This paper establishes the stability of the disturbed second-order system under the proposed controller through strict Lyapunov analysis. The novelty of the proposed method lies in its global predefined-time convergence, chattering-reduced properties and robustness against matched and mismatched disturbances. Finally, numerical simulations and application examples validate the proposed methodology’s effectiveness.
AldanaRGomezDJimenezE, et al. (2019) Enhancing the settling time estimation of a class of fixed-time stable systems. International Journal of Robust and Nonlinear Control29(12): 4135–4148.
2.
BecerraHMColungaJARomeroJG (2018) Simultaneous convergence of position and orientation of wheeled mobile robots using trajectory planning and robust controllers. International Journal of Advanced Robotic Systems15(1): 1–22.
3.
BhatSBernsteinD (2000) Finite-time stability of continuous autonomous systems. SIAM Journal on Control and Optimization38(3): 751–766.
4.
ChangLHanQLGeXH, et al. (2019) On designing distributed prescribed finite-time observers for strict-feedback nonlinear systems. IEEE Transactions on Cybernetics51(9): 4695–4706.
5.
ChenJSunFHuaC (2022) Finite/fixed/predefined/exact time control: A unified framework. International Journal of Systems Science54: 977–990.
6.
CruzEMorenoJA (2019) Levant’s arbitrary-order exact differentiator: A Lyapunov approach. IEEE Transactions on Automatic Control64(7): 3034–3039.
7.
CuiLJinN (2021) Prescribed-time ESO-based prescribed-time control and its application to partial IGC design. Nonlinear Dynamics106(1): 491–508.
8.
DongHYangXGaoH, et al. (2023) Practical terminal sliding-mode control and its applications in servo systems. IEEE Transactions on Industrial Electronics70(1): 752–761.
9.
GuoJGYangSJ (2021) New fixed-time sliding mode control for a mismatched second-order system. Transactions of the Institute of Measurement and Control43(2): 325–334.
10.
JiaFHuangJHeX (2022) Adaptive predefined-time tracking control for high-order strict-feedback nonlinear systems with unknown mismatched disturbances. International Journal of Adaptive Control Signal Process36(11): 2903–2919.
11.
JiangBHuQFriswellI (2018) Fixed-time attitude control for rigid spacecraft with actuator saturation and faults. IEEE Transactions on Control Systems Technology24: 1892–1898.
12.
LiangCDGeMFLiuZW, et al. (2021) A novel sliding surface design for predefined-time stabilization of Euler-Lagrange systems. Nonlinear Dynamics106(1): 445–458.
13.
LvJXJuXZJingL, et al. (2023) Adaptive predefined-time observer design for generalized strict-feedback second-order systems under perturbations. International Journal of Robust and Nonlinear Control33(1): 311–335.
14.
MaQGuoJGZhouJ (2019) A finite-time sliding mode control for hypersonic vehicle. Transactions of the Institute of Measurement and Control41(15): 4339–4350.
15.
MeiKQDingSH (2022) Fixed-time HOSM controller design for constrained sliding mode systems with mismatched terms. Information Sciences585: 366–381.
16.
MoulayELéchappéVBernuauE, et al. (2021) Fixed-time sliding mode control with mismatched disturbances. Automatica136: 110009.
17.
MoulayELéchappéVBernuauE, et al. (2022) Robust fixed-time stability: Application to sliding-mode control. IEEE Transactions on Automatic Control67(2): 1061–1066.
18.
MunozVSanchezTJimenezR, et al. (2019) Predefined-time robust stabilization of robotic manipulators. IEEE/ASME Transactions on Mechatronics24(3): 1033–1040.
19.
NabanitaAChitralekhaM (2013) Integral backstepping sliding mode control for underactuated systems: Swing-up and stabilization of the Cart–Pendulum System. ISA Transactions52(6): 870–880.
20.
NiJLiuLTangY, et al. (2021) Predefined-time consensus tracking of second-order multiagent systems. IEEE Transactions on Systems, Man, and Cybernetics: Systems51(4): 2550–2560.
21.
PalAKamalSNagarS, et al. (2020) Design of controllers with arbitrary convergence time. Automatica112: 108710.
22.
PolyakovA (2012) Nonlinear feedback design for fixed-time stabilization of linear control systems. IEEE Transactions on Automatic Control57(8): 2106–2110.
23.
RaufALiSHMadonskiR, et al. (2020) Continuous dynamic sliding mode control of converter-fed DC motor system with high order mismatched disturbance compensation. Transactions of the Institute of Measurement and Control42(14): 2812–2821.
24.
ShaoK (2021) Nested adaptive integral terminal sliding mode control for high-order uncertain nonlinear systems. International Journal of Robust and Nonlinear Control31: 6668–6680.
25.
ShaoKZhengJC (2022) Predefined-time sliding mode control with prescribed convergent region. IEEE/CAA Journal of Automatica Sinica9(5): 934–936.
26.
SongYYeHLewisF (2023) Prescribed-time control and its latest developments. IEEE Transactions on Systems, Man, and Cybernetics9: 4102–4116.
27.
TaoCWTaurJSChanKL (2004) Adaptive fuzzy terminal sliding mode controller for linear systems with mismatched time-varying uncertainties. IEEE Transactions on Systems, Man, and Cybernetics, Part B (Cybernetics)34(1): 255–262.
28.
TianBLuHZuoZ, et al. (2018) Fixed-time stabilization of high-order integrator systems with mismatched disturbances. Nonlinear Dynamics94: 2889–2899.
29.
WangLDuHZhangW, et al. (2020) Implementation of integral fixed-time sliding mode controller for speed regulation of PMSM servo system. Nonlinear Dynamics102: 185–196.
30.
YangJLiSYuX (2013) Sliding-mode control for systems with mismatched uncertainties via a disturbance observer. IEEE Transactions on Industrial Electronics60(1): 160–169.
31.
YangXWDengWXLiuL, et al. (2022) A novel adaptive-gain disturbance estimator-based asymptotic adaptive tracking control for uncertain nonlinear systems. Transactions of the Institute of Measurement and Control44(5): 1045–1055.
32.
ZakM (1988) Terminal attractors for addressable memory in neural network. Physics Letters A133(1–2): 18–22.
33.
ZhangDDuanG (2019) Distributed fixed-time consensus tracking for high-order uncertain non-linear multi-agent systems with switching topologies. IET Control Theory and Applications13(11): 1761–1772.
34.
ZuoZYSongJWTianB, et al. (2022) Robust fixed-time stabilization control of generic linear systems with mismatched disturbances. IEEE Transactions on Systems, Man, and Cybernetics: Systems52(2): 759–768.
