Non-quadratic exponential stabilisation of non-linear hyperbolic partial differential equation systems

In this study, a new systematic approach is proposed to design the fuzzy controller for a class of Takagi–Sugeno fuzzy-partial differential equation (TS fuzzy-PDE) systems which describe the non-linear distributed parameter system formulated by first-order semi-linear hyperbolic PDEs. In this study,...

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Vydané v:	IET science, measurement & technology Ročník 8; číslo 6; s. 537 - 545
Hlavní autori:	Sha Sadeghi, Mokhtar, Vafamand, Navid, Babaei, Mohammad Sadegh
Médium:	Journal Article
Jazyk:	English
Vydavateľské údaje:	The Institution of Engineering and Technology 01.11.2014
Predmet:	asymptotic stability control system synthesis Design engineering Design parameters Differential equations distributed parameter systems first order semilinear hyperbolic PDE Fuzzy control fuzzy controller design hyperbolic equations linear matrix inequalities LMI Lyapunov functions Lyapunov methods nonlinear control systems nonlinear differential equations nonlinear distributed parameter system nonlinear hyperbolic partial differential equation systems Nonlinearity nonquadratic exponential stabilisation nonquadratic Lyapunov function Partial differential equations Stability stability conditions systematic approach Takagi–Sugeno fuzzy partial differential equation TS fuzzy‐PDE system hyperbolic equations fuzzy controller design first order semilinear hyperbolic PDE nonlinear distributed parameter system nonquadratic Lyapunov function nonlinear hyperbolic partial differential equation systems control system synthesis LMI asymptotic stability stability conditions nonlinear differential equations fuzzy control linear matrix inequalities nonlinear control systems nonquadratic exponential stabilisation distributed parameter systems partial differential equations TS fuzzy-PDE system systematic approach Lyapunov methods Takagiâ€“Sugeno fuzzy partial differential equation
ISSN:	1751-8822, 1751-8830
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Popis
Shrnutí:	In this study, a new systematic approach is proposed to design the fuzzy controller for a class of Takagi–Sugeno fuzzy-partial differential equation (TS fuzzy-PDE) systems which describe the non-linear distributed parameter system formulated by first-order semi-linear hyperbolic PDEs. In this study, non-quadratic Lyapunov function is utilised and some slack matrices are introduced to derive stability conditions in terms of linear matrix inequalities (LMIs). The proposed approach has three main features. First, stability conditions are not derived in the form of spatial differential LMI. Second, conservativeness of LMI conditions is reduced. Third, there is no restriction on the form of semi-linear hyperbolic PDE systems and therefore more semi-linear systems classes can be stabilised. Also, the proposed approach is more suitable for practical implementation compared with the recently published papers.
Bibliografia:	ObjectType-Article-1 SourceType-Scholarly Journals-1 ObjectType-Feature-2 content type line 23
ISSN:	1751-8822 1751-8830
DOI:	10.1049/iet-smt.2014.0038