Stability and ℋ_∞ disturbance attenuation analysis for symmetric takagi-sugeno fuzzy systems

In this paper, we study the stability and ℋ_∞ disturbance attenuation properties for a class of Takagi-Sugeno fuzzy systems composed of a finite number of linear time-invariant symmetric subsystems. We focus our attention on discrete-time systems. We show that when all the subsystems are Schur stable, the fuzzy system is asymptotically stable under arbitrary IF-THEN rule. Furthermore, we show that when all the subsystems are Schur stable and have the- ℋ_∞ disturbance attenuation level less than a constant γ, the fuzzy system is asymptotically stable and achieves the ℋ_∞ disturbance attenuation level γ under arbitrary IF-THEN rule. The key idea for both stability and ℋ_∞ disturbance attenuation analysis in this paper is to establish a common Lyapunov function for all the subsystems in the fuzzy system.