Robust Reliable Control for Uncertain Vehicle Suspension Systems With Input Delays

Sakthivel, R.; Arunkumar, A.; Mathiyalagan, K.; Selvi, S. Chitra

doi:10.1115/1.4028776

Cited by 30 publications

(29 citation statements)

References 23 publications

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“…According to equation (12), we can obtain the method for solving robust controller and robust reliability, which is satisfied H N performance g for system. The method is as follows…”

Section: Control Model Of Panel and The Index Of Reliabilitymentioning

confidence: 99%

RETRACTED: Suppression of panel flutter of near-space aircraft based on non-probabilistic reliability theory

Zhang

Jiang

Fang

2016

Advances in Mechanical Engineering

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The vibration active control of the composite panels with the uncertain parameters in the hypersonic flow is studied using the non-probabilistic reliability theory. Using the piezoelectric patches as active control actuators, dynamic equations of panel are established by finite element method and Hamilton's principle. And the control model of panel with uncertain parameters is obtained. According to the non-probabilistic reliability index, and besides being based on H N robust control theory and non-probabilistic reliability theory, the non-probabilistic reliability performance function is given. Moreover, the relationships between the robust controller and H N performance index and reliability are established. Numerical results show that the control method under the influence of reliability, H N performance index, and approaching velocity is effective to the vibration suppression of panel in the whole interval of uncertain parameters.

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“…According to equation (12), we can obtain the method for solving robust controller and robust reliability, which is satisfied H N performance g for system. The method is as follows…”

Section: Control Model Of Panel and The Index Of Reliabilitymentioning

confidence: 99%

RETRACTED: Suppression of panel flutter of near-space aircraft based on non-probabilistic reliability theory

Zhang

Jiang

Fang

2016

Advances in Mechanical Engineering

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“…Assume that the system is controlled by the following control law:

u false(t false) = K x false(t false),

where K =[2.81 −363.43 −162.48 −9.17] is the state feedback gain matrix and the actuator time‐delay satisfies 0.1 ≤ τ ( t ) ≤ 0.2. The detailed description of designing the state feedback control law for a quarter‐car suspension system with actuator time‐delay can be found in other works . By using the zero‐order hold method with the sampling period T s , the discrete‐time state‐space model of the closed‐loop system can be described in the form of with the following parameters:

\begin{matrix} alignleft \\ align-1 & align-2 A = [\begin{array}{cccc} 0.4160 & 0.9923 & 0.0622 & 0.0097 \\ 0.4454 & - 0.1514 & 0.0276 & - 0.0053 \\ - 2.3146 & - 3.8502 & 0.7653 & 0.0382 \\ - 3.2122 & 4.7387 & 0.4083 & - 0.5138 \end{array}], A_{d} = [\begin{array}{cccc} 0 & - 0.005 & - 0.0022 & - 0.0001 \\ 0 & 0.0038 & 0.0017 & 0.0001 \\ 0.0002 & - 0.0197 & - 0.0088 & - 0.0005 \\ 0.0002 & - 0.0273 & - 0.0122 & - 0.0007 \end{array}] \\ align-1 & align-2 B = [\begin{array}{cc}  \end{array}] \end{matrix}

…”

Section: Simulation Resultsmentioning

confidence: 99%

Robust distributedH_∞filtering over an uncertain sensor network with multiple fading measurements and varying sensor delays

Hedayati

Rahmani

2019

Intl J Robust & Nonlinear

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Summary In this paper, the problem of robust distributed H∞ filtering is investigated for state‐delayed discrete‐time linear systems over a sensor network with multiple fading measurements, random time‐varying communication delays, and norm‐bounded uncertainties in all matrices of the system. The diagonal matrices, whose elements are individual independent random variables, are utilized to describe the multiple fading measurements. Furthermore, the Bernoulli‐distributed white sequences are introduced to model the random occurrence of time‐varying communication delays. In the proposed filtering approach, the stability of the estimation error system is first shown by the Lyapunov stability theory and the H∞ performance is then achieved using a linear matrix inequality method. Finally, two numerical examples are given to show the effectiveness and performance of the proposed approach.

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“…For the inequality of . V 2 (e 1 , e 2 ,̃, t) ≤ 0, integrating both of the sides in (19) from the range of 0 to t simultaneously, we can get…”

Section: Controller Design and Stability Analysismentioning

confidence: 99%

“…In nonlinear active suspension system, time delays are often encountered in the controlled channel, particularly in the digital controller as it carries out some calculations associated with the complex control law . The existence of time delay may result in unexpected degradation in control performance and even instability .…”

Section: Introductionmentioning

confidence: 99%

“…17,18 In nonlinear active suspension system, time delays are often encountered in the controlled channel, particularly in the digital controller as it carries out some calculations associated with the complex control law. 19 The existence of time delay may result in unexpected degradation in control performance and even instability. 20 Additionally, when modeling the real active suspension system, the model uncertainty generated from different vehicle body loads 21 is ubiquitous, and this may impose some difficulties in the implementation of the designed control scheme.…”

Section: Introductionmentioning

confidence: 99%

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Adaptive backstepping‐based control design for uncertain nonlinear active suspension system with input delay

Pang

Yang

et al. 2019

Intl J Robust & Nonlinear

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Summary This paper addresses the control problem of adaptive backstepping control for a class of nonlinear active suspension systems considering the model uncertainties and actuator input delays and presents a novel adaptive backstepping‐based controller design method. Based on the established nonlinear active suspension model, a projector operator–based adaptive control law is first developed to estimate the uncertain sprung‐mass online, and then the desirable controller design and stability analysis are conducted by combining backstepping technique and Lyapunov stability theory, which can not only deal with the actuator input delay but also achieve better dynamics performances and safety constraints requirements of the closed‐loop control system. Furthermore, the relationship between the input delay and the state variables of this vehicle suspension system is derived to present a simple and effective method of calculating the critical input delay. Finally, a numerical simulation investigation is provided to illustrate the effectiveness of the proposed controller.

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Robust Reliable Control for Uncertain Vehicle Suspension Systems With Input Delays

Cited by 30 publications

References 23 publications

RETRACTED: Suppression of panel flutter of near-space aircraft based on non-probabilistic reliability theory

RETRACTED: Suppression of panel flutter of near-space aircraft based on non-probabilistic reliability theory

Robust distributedH_∞filtering over an uncertain sensor network with multiple fading measurements and varying sensor delays

Adaptive backstepping‐based control design for uncertain nonlinear active suspension system with input delay

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Robust Reliable Control for Uncertain Vehicle Suspension Systems With Input Delays

Cited by 30 publications

References 23 publications

RETRACTED: Suppression of panel flutter of near-space aircraft based on non-probabilistic reliability theory

RETRACTED: Suppression of panel flutter of near-space aircraft based on non-probabilistic reliability theory

Robust distributedH∞filtering over an uncertain sensor network with multiple fading measurements and varying sensor delays

Adaptive backstepping‐based control design for uncertain nonlinear active suspension system with input delay

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Robust distributedH_∞filtering over an uncertain sensor network with multiple fading measurements and varying sensor delays