Robust \((Q, S, R)\)-\(\gamma\)-dissipative control of Takagi-Sugeno fuzzy systems with interval time-varying delay and sampling. (English) Zbl 1531.93067
Summary: The robust \((Q, S, R)\)-\(\gamma\)-dissipative control of Takagi-Sugeno fuzzy time-delay model is considered by the developed robust control with sampling in this article. The proposed Lyapunov-Krasovskii functional and inequality are investigated to improve the main results in this article. Full matrix formulation approach is present to show our proposed results by some linear matrix inequalities. Interval delay and sampling period are contemplated instead of constant delay and fixed sampling in some circulated literatures. The less conservatism of our proposed results is demonstrated by our proposed numerical examples. Finally, we illustrate a mass-spring-damper nonlinear system to show our developed results.
{© 2022 John Wiley & Sons Ltd.}
{© 2022 John Wiley & Sons Ltd.}
MSC:
| 93B35 | Sensitivity (robustness) |
| 93C42 | Fuzzy control/observation systems |
| 93C43 | Delay control/observation systems |
Keywords:
LMI optimization approach; parallel distributed compensator; robust \((Q, S, R)\)-\(\gamma\)-dissipative control; sampling input; T-S fuzzy time-delay systemReferences:
| [1] | GuK, KharitonovVL, ChenJ. Stability of Time‐Delay Systems. Birkhauser; 2003. · Zbl 1039.34067 |
| [2] | HaleJK, Verduyn LunelSM. Introduction to Functional Differential Equations. Springer‐Verlag; 1993. · Zbl 0787.34002 |
| [3] | LienCH, ChangHC, YuKW, LeeHC, HouYY. Robust mixed performance of uncertain switched systems with interval time‐varying delay by synchronous switching on signal and sampled‐data input. Int J Robust Nonlinear Control.2022;32:917‐946. · Zbl 1527.93260 |
| [4] | YangF, HeJ, KangP, PanQ. Delay range‐and‐rate dependent stability criteria for systems with interval time‐varying delay via a quasi‐quadratic convex framework. Int J Robust Nonlinear Control. 2019;29:2494‐2509. · Zbl 1418.93208 |
| [5] | QiR, TaoG, JiangB. Fuzzy System Identification and Adaptive Control. Springer Nature; 2019. · Zbl 1432.93004 |
| [6] | TanakaK, SugenoM. Stability analysis and design of fuzzy control systems. Fuzzy Set Syst. 1992;45:135‐156. · Zbl 0758.93042 |
| [7] | ChangXH. Robust nonfragile [( {H}_{\infty } \]\) filtering of fuzzy systems with linear fractional parametric uncertainties. IEEE Trans Fuzzy Syst. 2012;20:1001‐1011. |
| [8] | LienCH, ChangHC, YuKW, LeeHC, HouYY. Robust mixed performance control of uncertain T‐S fuzzy systems with interval time‐varying delay by sampled‐data input. IEEE Access. 2022;10:28109‐28121. |
| [9] | NingZ, CaiB, WengR, ZhangL, SuSF. Stability and control of fuzzy semi‐Markov jump systems under unknown semi‐Markov kernel. IEEE Trans Fuzzy Syst. 2022;30:2452‐2465. |
| [10] | ChenP, WenLY, YangJQ. On delay‐dependent robust stability criteria for uncertain T‐S fuzzy systems with interval time‐varying delay. Int J Fuzzy Syst. 2011;13:35‐44. |
| [11] | DattaR, DeyR, BhattacharyaB. Improved delay‐range‐dependent stability condition for T‐S fuzzy systems with variable delays using new extended affine Wirtinger inequality. Int J Fuzzy Syst. 2020;22:985‐998. |
| [12] | TianE, YueD, ZhangY. Delay‐dependent robust [( {H}_{\infty } \]\) control for T‐S fuzzy system with interval time‐varying delay. Fuzzy Sets Syst. 2009;160:1708‐1719. · Zbl 1175.93134 |
| [13] | YanH, ZhangH, MengMQ, ShiH. Delay‐range‐dependent robust [( {H}_{\infty } \]\) filtering for uncertain systems with interval time‐varying delays. Asian J Control. 2010;13:356‐360. · Zbl 1222.93227 |
| [14] | LienCH, HouYY, YuKW, ChangHC. Robust mixed performance control of uncertain T‐S fuzzy time‐delay systems with aperiodic sampled‐data input. Optim Control Appl Methods. 2021;42:744‐768. · Zbl 1472.93032 |
| [15] | LamHK, LeungFHF. Sampled‐data fuzzy controller for time‐delay nonlinear system: LMI‐based and fuzzy‐model‐based approaches. IEEE Trans Syst Man Cybern B. 2007;37:617‐629. |
| [16] | LienCH, YuKW, HuangCT, ChouPY, ChungLY, ChenJD. Robust [( {H}_{\infty } \]\) control for uncertain T‐S fuzzy time‐delay systems with sampled‐data input and nonlinear perturbations. Nonlinear Anal Hybrid Syst. 2010;4:550‐556. · Zbl 1200.93035 |
| [17] | LienCH, YuKW, HongBR, ChangHC. Guaranteed cost control for uncertain switched time‐delay systems with sampled‐data state feedback and nonlinear perturbations. ICIC Express Lett. 2012;6:657‐663. |
| [18] | WuZG, ShiP, SuH, LuR. Dissipativity‐based sampled‐data fuzzy control design and its application to truck‐trailer system. IEEE Trans Fuzzy Syst. 2015;23:1669‐1679. |
| [19] | ZengHB, TeoKL, HeY, WangW. Sampled‐data based dissipative control of T‐S fuzzy systems. Appl Math Model. 2019;65:415‐427. · Zbl 1481.93075 |
| [20] | KarimiHR, GaoH. Mixed [( {H}_2/{H}_{\infty } \]\) output‐feedback control of second‐order neutral systems with time‐varying state and input delays. ISA Trans. 2008;47:311‐324. |
| [21] | LiT, GuoL, SunC. Robust stability for neural networks with time‐varying delays and linear fractional uncertainties. Neurocomputing. 2007;71:421‐427. |
| [22] | YangJ, LuoW, LiG, ZhongS. Reliable guaranteed cost control for uncertain fuzzy neutral systems. Nonlinear Anal: Hybrid Syst. 2010;4:644‐658. · Zbl 1203.93114 |
| [23] | PhanlertC, BotmartT, WeeraW, JunsawangP. Finite‐time mixed H_∞/passivity for neural network with mixed interval time‐varying delays using the multiple integral Lyapunov-Krasovskii functional. IEEE Access. 2021;9:89461‐89475. |
| [24] | SeuretA, GouaisbautF. Wirtinger‐based integral inequality: application to time‐delay systems. Automatica. 2013;49:2860‐2866. · Zbl 1364.93740 |
| [25] | ChenP, YangM, ZhangJ, FeiM, HuS. Network‐based H_∞ control for T‐S fuzzy systems with an adaptive event‐triggered communication scheme. Fuzzy Set Syst. 2017;329:61‐76. · Zbl 1381.93065 |
| [26] | ShiS, FeiZ, KarimiHR, LamHK. Event‐triggered control for switched T‐S fuzzy systems with general asynchronism. IEEE Trans Fuzzy Syst. 2022;30:27‐38. |
| [27] | SongX, WangM, ZhangB, SongS. Event‐triggered reliable [( {H}_{\infty } \]\) fuzzy filtering for nonlinear parabolic PDE systems with Markovian jumping sensor faults. Inf Sci. 2020;510:50‐69. · Zbl 1461.93317 |
| [28] | YangJ, NingZ, ZhuY, ZhangL, LamHK. Semi‐Markov jump linear systems with bi‐boundary sojourn time: anti‐modal‐asynchrony control. Automatica. 2022;140:110270. · Zbl 1492.93208 |
| [29] | HuJ, ZhangH, YuX, LiuH, ChenD. Design of sliding‐mode‐based control for nonlinear systems with mixed‐delays and packet losses under uncertain missing probability. IEEE Trans Syst Man Cybern: Syst. 2021;51:3217‐3227. |
| [30] | BoydS, El GhaouiL, FeronE, BalakrishnanV. Linear Matrix Inequalities in System and Control Theory. SIAM Studies in Applied Mathematics. Society for Industrial and Applied Mathematics; 1994. · Zbl 0816.93004 |
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