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A Generalized Reciprocally Convex Inequality on Stability and Stabilization for T–S Fuzzy Systems With Time-Varying Delay

Yibo Wang, Changchun Hua, PooGyeon Park

2022IEEE Transactions on Fuzzy Systems33 citationsDOI

Abstract

This article investigates the stability and stabilization issues of Takagi–Sugeno (T–S) fuzzy systems with time-varying delay via a generalized reciprocally convex inequality (GRCI). The enhanced stability criteria with less conservatism are achieved by employing a novel GRCI and establishing an asymmetric Lyapunov–Krasovskii (L–K). The proposed reciprocally convex method encompasses some previous methods as exceptional examples by introducing a matrix-valued polynomial. Moreover, an asymmetric L–K functional with delay-product terms is proposed for the stability of the T–S fuzzy systems. Then, a stabilization method is produced based on the parallel distributed compensation. Finally, case studies are carried out to indicate the effectiveness and advantages of the stability and stabilization criteria.

Topics & Concepts

Linear matrix inequalityControl theory (sociology)MathematicsStability (learning theory)Fuzzy control systemFuzzy logicRegular polygonCompensation (psychology)Convex combinationConvex optimizationStability conditionsPolynomialMathematical optimizationComputer scienceControl (management)Mathematical analysisMachine learningArtificial intelligenceStatisticsPsychoanalysisDiscrete time and continuous timePsychologyGeometryNeural Networks Stability and SynchronizationStability and Control of Uncertain SystemsElasticity and Wave Propagation
A Generalized Reciprocally Convex Inequality on Stability and Stabilization for T–S Fuzzy Systems With Time-Varying Delay | Litcius