Litcius/Paper detail

Chattering-Free Terminal Sliding Mode Control Based on Adaptive Barrier Function for Chaotic Systems With Unknown Uncertainties

Mohammadreza Askari Sepestanaki, Mojtaba Hadi Barhaghtalab, Saleh Mobayen, Abolfazl Jalilvand, Afef Fekih, Paweł Skruch

2022IEEE Access29 citationsDOIOpen Access PDF

Abstract

This paper designs and implements a chattering-free terminal sliding mode control approach for a class of chaotic systems with unknown uncertainties. It considers sliding mode control (SMC) to deal with the dynamic model uncertainties of the chaos system, and uses a combination of SMC with an adaptive control approach to solve the upper boundaries problem of unknown model uncertainties and their estimation. Chattering is completely eliminated without over estimating the control gains by adopting an adaptive continuous barrier function in the dynamic switching function. Using the Lyapunov’s stability theory, it was shown that the proposed scheme can guarantee the convergence of system states to the vicinity of the sliding surface in finite time. Additionally, the adoption of a sliding surface with a nonlinear and integral switching function resulted in removing the reaching phase of the sliding surface and yielding a controller that is robust to uncertainties from the start. The effectiveness of the proposed control method was assessed using three scenarios implemented to a Liu’s uncertain chaotic system in MATLAB/Simulink environment. The obtained results confirmed the ability of the proposed approach to achieve continuous and smooth control rules for such chaotic systems. Among the main attributes of the proposed control method are its ability to completely eliminate chattering and yield a robust performance against model uncertainties and unknown external disturbances; common issues in chaotic systems.

Topics & Concepts

Control theory (sociology)Sliding mode controlTerminal sliding modeChaoticController (irrigation)Robust controlComputer scienceLyapunov functionLyapunov stabilityAdaptive controlMATLABConvergence (economics)Function (biology)Nonlinear systemControl systemEngineeringControl (management)Artificial intelligencePhysicsEconomicsEconomic growthBiologyQuantum mechanicsEvolutionary biologyElectrical engineeringOperating systemAgronomyChaos control and synchronizationAdaptive Control of Nonlinear SystemsQuantum chaos and dynamical systems