Positive Real Lemmas for Fractional-Order Two-Dimensional Roesser Model: The 0 < ρ1 ≤ 1,0 <ρ2 ≤ 1 Case

被引:0
|
作者
Zhang, Jia-Rui [1 ,2 ,3 ]
Lu, Jun-Guo [1 ,2 ,3 ]
机构
[1] Shanghai Jiao Tong Univ, Dept Automat, Shanghai, Peoples R China
[2] Minist Educ China, Key Lab Syst Control & Informat Proc, Shanghai 200240, Peoples R China
[3] Shanghai Engn Res Ctr Intelligent Control & Manag, Shanghai 200240, Peoples R China
来源
CIRCUITS SYSTEMS AND SIGNAL PROCESSING | 2024年 / 43卷 / 04期
基金
中国国家自然科学基金;
关键词
Dynamic output feedback; State feedback; Continuous two-dimensional Roesser model; Linear matrix inequality; Fractional-order; Positive real lemma; 2D CONTINUOUS SYSTEMS; STABILITY ANALYSIS; STATE; STABILIZATION; INEQUALITY;
D O I
10.1007/s00034-023-02560-7
中图分类号
TM [电工技术]; TN [电子技术、通信技术];
学科分类号
0808 ; 0809 ;
摘要
This paper investigates the positive realness of continuous fractional-order (FO) two-dimensional (2D) Roesser model with the FO rho(1)is an element of (0,1],rho(2)is an element of (0,1]. A sufficient condition that ensures that the continuous FO 2D Roesser model is stable and positive real is given as linear matrix inequalities (LMIs). Then, the positive real control problem for continuous FO 2D Roesser model with state feedback and dynamic output feedback controllers is addressed. The sufficient conditions are given in LMI form, and the parameters of the controllers can be achieved from the solution of the LMIs easily. Finally, the validity of the results is checked by several examples.
引用
收藏
页码:2073 / 2094
页数:22
相关论文
共 50 条
  • [21] Robust H∞ control for fractional order singular systems 0 < α < 1 with uncertainty
    Li, Bingxin
    Zhao, Xin
    OPTIMAL CONTROL APPLICATIONS & METHODS, 2023, 44 (01): : 332 - 348
  • [22] One Adaptive Synchronization Approach for Fractional-Order Chaotic System with Fractional-Order 1 < q < 2
    Zhou, Ping
    Bai, Rongji
    SCIENTIFIC WORLD JOURNAL, 2014,
  • [23] Stability and Stabilization of a Class of Fractional-Order Nonlinear Systems for 1 < α < 2
    Huang, Sunhua
    Wang, Bin
    JOURNAL OF COMPUTATIONAL AND NONLINEAR DYNAMICS, 2018, 13 (03):
  • [24] ON SYSTEMS OF FRACTIONAL-ORDER DIFFERENTIAL EQUATIONS FOR ORDER 1 < ν ≤ 2
    Xu, Changjin
    Tahir, Sana
    Ansari, Khursheed j.
    Ur Rahman, Mati
    Al-duais, Fuad s.
    FRACTALS-COMPLEX GEOMETRY PATTERNS AND SCALING IN NATURE AND SOCIETY, 2023, 31 (10)
  • [25] Impulse invariance-based method for the computation of fractional integral of order 0 < α < 1
    Ferdi, Youcef
    COMPUTERS & ELECTRICAL ENGINEERING, 2009, 35 (05) : 722 - 729
  • [26] Quadratic Admissibility for a Class of LTI Uncertain Singular Fractional-Order Systems with 0 < α < 2
    Wang, Yuying
    Zhang, Xuefeng
    Boutat, Driss
    Shi, Peng
    FRACTAL AND FRACTIONAL, 2023, 7 (01)
  • [27] Two-Weight Lp → Lq Bounds for Positive Dyadic Operators in the Case 0 < q < 1 ≤ p < ∞
    Hanninen, Timo S.
    Verbitsky, Igor E.
    INDIANA UNIVERSITY MATHEMATICS JOURNAL, 2020, 69 (03) : 837 - 871
  • [28] LMI stability conditions and stabilization of fractional-order systems with poly-topic and two-norm bounded uncertainties for fractional-order α: the 1 < α < 2 case
    Li, Sulan
    COMPUTATIONAL & APPLIED MATHEMATICS, 2018, 37 (04): : 5000 - 5012
  • [29] Novel robust stability conditions of fractional-order systems with structured uncertain parameters based on parameter-dependent functions: the 0 < α < 1 case
    Kang, Chenfei
    Lu, Jun-Guo
    Qiu, Xu-Yi
    Zhang, Qing-Hao
    INTERNATIONAL JOURNAL OF GENERAL SYSTEMS, 2023, 52 (02) : 169 - 190
  • [30] A Numerical Iterative Scheme for Solving Nonlinear Boundary Value Problems of Fractional Order 0 < α < 1
    Anwar, Muhammad Adnan
    Rehman, Shafiq Ur
    Ahmad, Fayyaz
    Qadir, Muhammad Irfan
    PUNJAB UNIVERSITY JOURNAL OF MATHEMATICS, 2019, 51 (01): : 115 - 126
12345