Piecewise Lyapunov function based stability analysis of fuzzy parameter varying systems

The fuzzy parameter varying (FPV) system is a novel kind of nonlinear time-varying model with advantages in handing nonlinear time-varying systems than the general T-S fuzzy model. Few researches have been conducted on the stability analysis of FPV systems, except for some results derived based on the quadratic Lyapunov function. In this study, stability analysis of the FPV system is conducted on the basis of a piecewise Lyapunov function and some stability conditions are derived and formulated in terms of Linear matrix inequalities (LMIs), which can be efficiently solved by some numerical algorithms. Numerical simulations demonstrate the effectiveness of our results and also indicate that our conditions are less conservative comparing to the results derived from the quadratic Lyapunov function.

[1]  Baocang Ding,et al.  Homogeneous Polynomially Nonquadratic Stabilization of Discrete-Time Takagi–Sugeno Systems via Nonparallel Distributed Compensation Law , 2010, IEEE Transactions on Fuzzy Systems.

[2]  Huaguang Zhang,et al.  Stability Analysis of T–S Fuzzy Control Systems by Using Set Theory , 2015, IEEE Transactions on Fuzzy Systems.

[3]  Hak-Keung Lam,et al.  Stabilization of Interval Type-2 Polynomial-Fuzzy-Model-Based Control Systems , 2017, IEEE Transactions on Fuzzy Systems.

[4]  Kazuo Tanaka,et al.  A multiple Lyapunov function approach to stabilization of fuzzy control systems , 2003, IEEE Trans. Fuzzy Syst..

[5]  Hao Ying,et al.  A sufficient condition on a general class of interval type-2 Takagi-Sugeno fuzzy systems with linear rule consequent as universal approximators , 2015, J. Intell. Fuzzy Syst..

[6]  Yongsheng Ding,et al.  Comparison of necessary conditions for typical Takagi-Sugeno and Mamdani fuzzy systems as universal approximators , 1999, IEEE Trans. Syst. Man Cybern. Part A.

[7]  Yan Shi,et al.  Switched Fuzzy Output Feedback Control and Its Application to a Mass–Spring–Damping System , 2016, IEEE Transactions on Fuzzy Systems.

[8]  Yongsheng Ding,et al.  Typical Takagi-Sugeno PI and PD fuzzy controllers: analytical structures and stability analysis , 2003, Inf. Sci..

[9]  Guang-Hong Yang,et al.  Control Synthesis of T–S Fuzzy Systems Based on a New Control Scheme , 2011, IEEE Transactions on Fuzzy Systems.

[10]  H. Lam,et al.  A Gain-Scheduling Control Approach for Takagi–Sugeno Fuzzy Systems Based on Linear Parameter-Varying Control Theory , 2016 .

[11]  Kazuo Tanaka,et al.  Fuzzy descriptor systems and nonlinear model following control , 2000, IEEE Trans. Fuzzy Syst..

[12]  Guang-Hong Yang,et al.  Observer-Based Output Feedback Control for Discrete-Time T-S Fuzzy Systems With Partly Immeasurable Premise Variables , 2017, IEEE Transactions on Systems, Man, and Cybernetics: Systems.

[13]  Karl-Erik Årzén,et al.  Piecewise quadratic stability of fuzzy systems , 1999, IEEE Trans. Fuzzy Syst..

[14]  Fuchun Sun,et al.  Hinfinity control for fuzzy singularly perturbed systems , 2005, Fuzzy Sets Syst..