Abstract
For the control systems with higher-order sliding modes, a method was proposed to construct the Lyapunov functions on the basis of the method of characteristics for solution of a special first-order partial derivative equation. Its successful solution enables one to generate the Lyapunov function which proves that the convergence time is finite and estimates explicitly the time of reaching the sliding mode.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
Filippov, A.F., Differentsial’nye uravneniya s razryvnoi pravoi chast’yu (Differential Equations with Discontinuous Right-hand Side), Moscow: Nauka, 1985.
Utkin, V.I., Skol’zyashchie rezhimy v zadachakh optimizatsii i upravleniya, Moscow: Nauka, 1981. Translated into English under the title Sliding Modes in Control Optimization, Heidelberg: Springer, 1992.
Levant, A., Sliding Order and Sliding Accuracy in Sliding Mode Control, Int. J. Control, 1993, vol. 58, no. 6, pp. 1247–1263.
Edwards, C. and Spurgeon, S., Sliding Mode Control: Theory and Applications, London: Taylor & Francis, 1998.
Utkin, V.I., Guldner, J., and Shi, J., Sliding Modes in Electromechanical Systems, London: Taylor & Francis, 1999.
Emel’yanov, S.V., Korovin, S.K., and Levantovskii, L.V., New Class of Second-order Sliding Algorithms, Vychisl. Algorit. Metody, 1990, vol. 2, no. 3, pp. 89–100.
Orlov, Y., Extended Invariance Principle and Other Analysis Tools for Variable Structure Systems, in Advances in Variable Structure and Sliding Mode Control, Edwards, C., Colet, E.F., and Fridman, L., Eds., Berlin: Springer, 2006, pp. 3–22.
Bacciotti, A. and Rosier, L., Liapunov Functions and Stability in Control Theory, in Lecture Notes in Control and Information Sciences, vol. 267, New York: Springer, 2001.
Orlov, Y., Finite Time Stability and Robust Control Synthesis of Uncertain Switched Systems, SIAM J. Control Optim., 2005, vol. 43, no. 4, pp. 1253–1271.
Shtessel, Y.B., Shkolnikov, I.A., and Levant, A., Smooth Second-Order Sliding Modes: Missile Guidance Application, Automatica, 2007, vol. 43, no. 8, pp. 1470–1476.
Zubov, V.I., Ustoichivost’ dvizheniya (metody Lyapunova i ikh primenenie) (Motion Stability (Lyapunov Methods and Their Application)), Moscow: Vysshaya Shkola, 1984.
El’sgol’ts, L.E., Differentsial’nye uravneniya i variatsionnoe ischislenie (Differential Equations and Variational Calculus), Moscow: Nauka, 1965.
Levant, A., Principles of 2-sliding Mode Design, Automatica, 2007, vol. 43, no. 4, pp. 576–586.
Polyakov, A. and Poznyak, A., Lyapunov Function Design for Finite-Time Convergence Analysis: “Twisting” Controller for Second Order Sliding Mode Realization, Automatica, 2009, vol. 45, pp. 444–448.
Polyakov, A. and Poznyak, A., Reaching Time Estimation for “Super-Twisting” Second Order Sliding Mode Controller via Lyapunov Function Designing, IEEE Trans. Automatic Control, 2009, vol. 54, no. 8, pp. 1951–1955.
Author information
Authors and Affiliations
Additional information
Original Russian Text © A.E. Polyakov, A.S. Poznyak, 2011, published in Avtomatika i Telemekhanika, 2011, No. 5, pp. 47–68.
Rights and permissions
About this article
Cite this article
Polyakov, A.E., Poznyak, A.S. Method of Lyapunov functions for systems with higher-order sliding modes. Autom Remote Control 72, 944–963 (2011). https://doi.org/10.1134/S0005117911050043
Received:
Published:
Issue Date:
DOI: https://doi.org/10.1134/S0005117911050043