Fractal Fract, Vol. 9, Pages 805: Adaptive Fuzzy Finite-Time Synchronization Control of Fractional-Order Chaotic Systems with Uncertain Dynamics, Unknown Parameters and Input Nonlinearities

Fractal and Fractional doi: 10.3390/fractalfract9120805

Authors:
Xiyu Zhang
Chun Feng
Youjun Zhou
Xiongfeng Deng

This work focuses on the finite-time synchronization control (FTSC) for fractional-order chaotic systems (FOCSs) subject to uncertain dynamics, unknown parameters and input nonlinearities. In the control law design, the uncertain dynamics of the FOCSs are addressed by using fuzzy logic systems (FLSs), while the unknown control direction caused by unknown input nonlinearity is handled through applying the Nussbaum gain function (NGF) method. Parameter adaptive laws are derived to estimate the unknown parameters of the given FOCSs, the parameter vectors of the FLSs, and unknown bounded constants, respectively. By integrating these parameter-adaptive laws with the FT backstepping control framework and FO Lyapunov direct method, an adaptive fuzzy FTSC strategy is developed. This strategy ensures that the synchronization error (SE) can converge to a small neighborhood of zero (SNoZ) within a FT and all signals of the closed-loop system (CLS) remain ultimately bounded. In the end, three simulation cases are utilized to demonstrate the efficiency of the proposed control method.

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