Abstract
This paper presents a novel nonsingular fast terminal sliding mode control scheme for a class of second-order uncertain nonlinear systems. First, a novel nonsingular fast terminal sliding mode manifold (NNFTSM) with adaptive coefficients is put forward, and a novel double power reaching law (NDP) with dynamic exponential power terms is presented. Afterwards, a novel nonsingular fast terminal sliding mode (NNFTSMNDP) controller is designed by employing NNFTSM and NDP, which can improve the convergence rate and the robustness of the system. Due to the existence of external disturbances and parameter uncertainties, the system states under controller NNFTSMNDP cannot converge to the equilibrium but only to the neighborhood of the equilibrium in finite time. Considering the unsatisfying performance of controller NNFTSMNDP, an adaptive disturbance observer (ADO) is employed to estimate the lumped disturbance that is compensated in the controller in real-time. A novel composite controller is presented by combining the NNFTSMNDP method with the ADO technique. The finite-time stability of the closed-loop system under the proposed control method is proven by virtue of the Lyapunov stability theory. Both simulation results and theoretical analysis illustrate that the proposed method shows excellent control performance in the existence of disturbances and uncertainties.
Highlights
Sliding mode control (SMC) is a popular method to control nonlinear systems owing to its simplicity and strong robustness [1,2,3,4,5,6]
terminal sliding mode control (TSMC) adopts terminal sliding mode manifold that can drive the system states converge to the equilibrium within finite time, and it has been widely utilized in many physical systems [7,8,9,10], such as spacecrafts, robots, and permanent magnet synchronous motors
For (1), to guarantee that the system states can quickly converge to the origin, a novel nonsingular fast terminal sliding mode manifold (NNFTSM) is proposed as s k1′x1 + k2′sig x1c1 + sig x2c2, (5)
Summary
Sliding mode control (SMC) is a popular method to control nonlinear systems owing to its simplicity and strong robustness [1,2,3,4,5,6]. One is that it has slower convergence rate than the linear sliding mode (LSM) when the system states are far away from the equilibrium point. Fast terminal sliding mode (FTSM) combining the advantages of LSM and TSM was given in [11]. One approach is to switch the TSM to a general sliding surface, when the states enter the region near the origin [12, 13]. Another approach is to design a new form of TSM with nonsingularity known as nonsingular TSM (NTSM) [14, 15].
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