Robust stability analysis of uncertain incommensurate fractional order quasi-polynomials in the presence of interval fractional orders and interval coefficients

Ghorbani, Majid; Tavakoli-Kakhki, Mahsan

doi:10.1177/0142331220968965

Cited by 14 publications

(10 citation statements)

References 38 publications

(74 reference statements)

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“…Robust stability analysis is fundamental to any control system. Accordingly, various design methods for robust stability analysis of fractional-order systems have been presented in [10,11] by benefiting from the value set concept. The value set method is mainly based on the zero exclusion principle.…”

Section: Introductionmentioning

confidence: 99%

Robust stabilization of interval fractional‐order plants with an interval time delay by fractional‐order proportional integral derivative controllers

Ghorbani,

Tepljakov,

Petlenkov

2023

IET Control Theory & Appl

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This paper concentrates on presenting a reliable procedure to compute the stabilizing region of fractional‐order proportional integral derivative (FOPID) controllers for interval fractional‐order plants having an interval time delay. An interval fractional‐order plant is defined as a fractional‐order transfer function whose denominator and numerator coefficients are all uncertain and lie in specified intervals. Also, an interval time delay points to a delay term whose value varies in a specific interval. The D‐decomposition technique and the value set concept are employed to determine the stabilizing region of FOPID controllers. In this study, first, a theorem is presented to compute the boundary of the value sets of systems having interval time day. Then, a lemma is provided for robust stability analysis of the given closed‐loop control system. For a convenient use of the paper results, an algorithm is proposed to solve the problem of robustly stabilizing interval fractional‐order plants with an interval time delay using FOPID controllers. Finally, four examples are provided to illustrate the proposed procedure.

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Section: Introductionmentioning

confidence: 99%

Robust stabilization of interval fractional‐order plants with an interval time delay by fractional‐order proportional integral derivative controllers

Ghorbani,

Tepljakov,

Petlenkov

2023

IET Control Theory & Appl

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“…Fractional calculus is a branch of mathematical analysis, which generalizes the integral and differential of integer order to the integral and differential of fractional order. There are some achievements in studying the stability of different fractional order systems, for example, fractional order chaotic systems, 1 commensurate fractional order networks, 2 incommensurate fractional order differential systems, 3 incommensurate pseudo‐state‐space model, 4 uncertain incommensurate fractional order quasi‐polynomials, 5 nonlinear nabla fractional order systems 6 and multi‐input‐single‐output‐type static synchronous series compensator, 7 and so forth.…”

Section: Introductionmentioning

confidence: 99%

Robust control for uncertain variable fractional order differential systems considering time‐varying delays and nonlinear perturbations

Wang

Zhou

Shi

et al. 2022

Optim Control Appl Methods

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The robust control for uncertain variable fractional order time‐varying delayed differential systems with nonlinear perturbations are concerned in this article. Firstly, by introducing a novel form of the control law which is inspired by the sliding mode design, a new state feedback controller is built. Besides, a specific and comprehensive Lyapunov–Krasovskii function is adopted to deduce the sufficient conditions for the stability and robust stabilization of the system by using some linear matrix inequalities. In addition, the controller gain matrix can also be derived from the point of stability. Finally, two comparison examples are presented to demonstrate the effectiveness of the proposed control technique. The simulation results show that this method can make the state variables converge to the steady ones more quickly and stably.

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“…Stability analysis is fundamental to any control system. Hence, some methods have been proposed to analyze the stability of LTI fractional-order systems in [11][12][13][14][15][16]. Lately, the value set-based approach has attracted many researchers to check the robust stability of LTI systems.…”

Section: Introductionmentioning

confidence: 99%

Robust Stability Analysis of Unstable Second Order Plus Time-Delay (SOPTD) Plant by Fractional-Order Proportional Integral (FOPI) Controllers

Asadi

Farnam

Nazifi³

et al. 2022

Mathematics

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This study investigates the robust stability analysis of an unstable second order plus time-delay (SOPTD) plant by using Fractional-Order Proportional Integral (FOPI) controllers. We assume that there are simultaneous uncertainties in gain, time-constants, and time-delay of the plant. At first, a graphical method is provided for a robust stability analysis of the closed-loop system. Then, a robust stability checking function is introduced to facilitate the robust stability analysis. Additionally, new bounds are presented to reduce the computational burden for the robust stability analysis. Finally, two examples are provided to show the correctness of the proposed method.

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Robust stability analysis of uncertain incommensurate fractional order quasi-polynomials in the presence of interval fractional orders and interval coefficients

Cited by 14 publications

References 38 publications

Robust stabilization of interval fractional‐order plants with an interval time delay by fractional‐order proportional integral derivative controllers

Robust stabilization of interval fractional‐order plants with an interval time delay by fractional‐order proportional integral derivative controllers

Robust control for uncertain variable fractional order differential systems considering time‐varying delays and nonlinear perturbations

Robust Stability Analysis of Unstable Second Order Plus Time-Delay (SOPTD) Plant by Fractional-Order Proportional Integral (FOPI) Controllers

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