The New Second-Order Sliding Mode Control Algorithm

A new class of regulators on the basis of the second-order sliding mode control is proposed. For the second-order system with smooth disturbances, special feedback is chosen with a discontinuous component and a radical function component. The synthesized control law provides a transient oscillatory...

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Bibliographic Details
Main Authors: Kochetkov, S. (Author), Krasnova, S.A (Author), Utkin, V.A (Author)
Format: Article
Language:English
Published: MDPI 2022
Subjects:
Online Access:View Fulltext in Publisher
LEADER 01848nam a2200217Ia 4500
001 10.3390-math10132214
008 220718s2022 CNT 000 0 und d
020 |a 22277390 (ISSN) 
245 1 0 |a The New Second-Order Sliding Mode Control Algorithm 
260 0 |b MDPI  |c 2022 
856 |z View Fulltext in Publisher  |u https://doi.org/10.3390/math10132214 
520 3 |a A new class of regulators on the basis of the second-order sliding mode control is proposed. For the second-order system with smooth disturbances, special feedback is chosen with a discontinuous component and a radical function component. The synthesized control law provides a transient oscillatory process with decaying amplitudes, which converge to zero in finite time. In contrast to existing algorithms, the condition of homogeneity of the closed-loop system differential equations is omitted. In comparison to the "twisting"-algorithm, which is well known, designed feedback provides an invariance property with respect to smooth external perturbation with less relay amplitude. With the help of a special Lyapunov function, the convergence proof is considered by using the averaging approach. It is shown that the average oscillation period convergence speed is strictly negative, and the estimation of the convergence time is presented. The simulation results of the designed control law for the one link robot-manipulator are presented, which shows less steady-state oscillations in comparison to existing approaches. © 2022 by the authors. Licensee MDPI, Basel, Switzerland. 
650 0 4 |a discontinuous control 
650 0 4 |a external perturbation 
650 0 4 |a finite time convergence 
650 0 4 |a invariance 
650 0 4 |a second-order sliding mode 
700 1 |a Kochetkov, S.  |e author 
700 1 |a Krasnova, S.A.  |e author 
700 1 |a Utkin, V.A.  |e author 
773 |t Mathematics