Journal of the Institute of Electronics Engineers of Korea SC (전자공학회논문지SC)

The Institute of Electronics and Information Engineers (대한전자공학회)
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Robust and Non-fragile $H_{\infty}$ Decentralized Fuzzy Model Control Method for Nonlinear Interconnected System with Time Delay

시간지연을 가지는 비선형 상호연결시스템의 견실비약성 $H_{\infty}$ 분산 퍼지모델 제어기법

  • Published : 2010.11.25
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Abstract

In general, due to the interactions among subsystems, it is difficult to design an decentralized controller for nonlinear interconnected systems. In this study, the model of nonlinear interconnected systems is studied via decentralized fuzzy control method with time delay and polytopic uncertainty. First, the nonlinear interconnected system is represented by an equivalent Takagi-Sugeno type fuzzy model. And the represented model can be rewritten as Parameterized Linear Matrix Inequalities(PLMIs), that is, LMIs whose coefficients are functions of a parameter confined to a compact set. We show that the resulting fuzzy controller guarantees the asymptotic stability and disturbance attenuation of the closed-loop system in spite of controller gain variations within a resulted polytopic region by example and simulations.

본 논문에서는 폴리토프 불확실성과 시간지연, 그리고 제어기 섭동을 가지는 비선형 상호연결시스템의 상태궤환 제어기에 대한 견실비약성 $H_{\infty}$ 분산 퍼지제어기 설계 방법을 다룬다. 먼저 시간지연을 가지는 비선형 상호연결시스템을 Takagi-Sugeno 퍼지모델로 나타내고, 이로부터 지연종속 견실비약성 $H_{\infty}$ 퍼지제어기가 존재하기 위한 충분조건, 제어기 설계방법 및 비약성을 만족하는 제어기의 꽉찬집합(compact set)을 제시한다. 이 때 제시한 조건은 변수치환과 슈어여수(Schur complement)정리를 통해 선형행렬부등식(LMI: Linear Matrix Inequality)의 계수가 꽉찬 집합 내의 파라미터의 함수로 정의되는 파라미터화 선형행렬부등식(PLMIs: Parameterized Linear Matrix Inequalities)으로 표현되며, 이를 완화기법(relaxation technique)를 사용하여 유한개의 선형행렬부등식으로 변환하고, 제어기와 비약성을 만족하는 제어기 영역을 구한다. 마지막으로 예제와 모의실험을 통해 불확실성과 시간지연, 제어기이득 섭동에도 불구하고 제안한 퍼지제어기가 폐루프시스템을 안정화시키고 외란감쇠를 보장함을 확인한다.

Keywords

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