Asymptotic optimal control of uncertain nonlinear Euler–Lagrange systems

Dupree, K.; Patre, Parag; Wilcox, Z. D.; Dixon, Warren E.

doi:10.1016/j.automatica.2010.10.007

Cited by 49 publications

(23 citation statements)

References 25 publications

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“…While this work makes a contribution as the first analysis to explore an optimal controller for NMES, given a nonlinear uncertain muscle model, the development is limited by the restriction to use a derived cost functional. Future efforts will explore the use of implicit learning methods to solve for a value function that minimizes the cost of a given desired functional versus a derived cost, as in our preliminary work for generic nonlinear systems in [44].…”

Section: Discussionmentioning

confidence: 99%

Adaptive Inverse Optimal Neuromuscular Electrical Stimulation

Wang

Sharma

Johnson

et al. 2013

IEEE Trans. Cybern.

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Neuromuscular electrical stimulation (NMES) is a prescribed treatment for various neuromuscular disorders, where an electrical stimulus is provided to elicit a muscle contraction. Barriers to the development of NMES controllers exist because the muscle response to an electrical stimulation is nonlinear and the muscle model is uncertain. Efforts in this paper focus on the development of an adaptive inverse optimal NMES controller. The controller yields desired limb trajectory tracking while simultaneously minimizing a cost functional that is positive in the error states and stimulation input. The development of this framework allows tradeoffs to be made between tracking performance and control effort by putting different penalties on error states and control input, depending on the clinical goal or functional task. The controller is examined through a Lyapunov-based analysis. Experiments on able-bodied individuals are provided to demonstrate the performance of the developed controller.

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Section: Discussionmentioning

confidence: 99%

Adaptive Inverse Optimal Neuromuscular Electrical Stimulation

Wang

Sharma

Johnson

et al. 2013

IEEE Trans. Cybern.

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“…Remark 4: There already exist several continuous control strategies to guarantee global or semiglobal stability of linearly parameterized NN approximation-based adaptive control systems, including the integrated RISE feedback and NN feedforward control [18]- [21], the adaptive NN feedforward control [28], and the variable-gain PD control [30], [31]. Among these approaches, the variable-gain PD control is relatively simple but effective since it does not complicate the control structure.…”

Section: Thus It Can Be Shown Thaṫmentioning

confidence: 98%

“…To make the NN approximation in Section V-A applicable, x ∈ D x should be ensured such that x e ∈ xe . Choose a Lyapunov function candidate V s (e n ) = e 2 n /2 (21) for the system given by (4). Then, the following result is provided to solve this issue.…”

Section: B Semiglobal Robust Stabilizationmentioning

confidence: 99%

“…By virtue of a second-order sliding-mode control technique, adaptive approximation-based continuous control strategies using robust integral of the sign of the error (RISE) feedback and NN feedforward were developed to achieve semiglobal asymptotic tracking for various types of uncertain nonlinear systems in [18]- [21], where RISE feedback is applied to compensate for transient-state uncertainties, and NN feedforward is utilized to cancel out steady-state plant dynamics. However, the increase of the plant order during control design in these approaches results in several drawbacks as follows:…”

Section: Introductionmentioning

confidence: 99%

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Adaptive Neural PD Control With Semiglobal Asymptotic Stabilization Guarantee

Pan

Huang

2014

IEEE Trans. Neural Netw. Learning Syst.

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This paper proves that adaptive neural plus proportional-derivative (PD) control can lead to semiglobal asymptotic stabilization rather than uniform ultimate boundedness for a class of uncertain affine nonlinear systems. An integral Lyapunov function-based ideal control law is introduced to avoid the control singularity problem. A variable-gain PD control term without the knowledge of plant bounds is presented to semiglobally stabilize the closed-loop system. Based on a linearly parameterized raised-cosine radial basis function neural network, a key property of optimal approximation is exploited to facilitate stability analysis. It is proved that the closed-loop system achieves semiglobal asymptotic stability by the appropriate choice of control parameters. Compared with previous adaptive approximation-based semiglobal or asymptotic stabilization approaches, our approach not only significantly simplifies control design, but also relaxes constraint conditions on the plant. Two illustrative examples have been provided to verify the theoretical results.

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“…[28] Wang et al introduced an adaptive dynamic programming algorithm for the optimal control of the non-affine nonlinear discrete-time systems. [29] Keith Dupree used the implicit learning capabilities to learn the dynamics asymptotically and studied the optimal control of uncertain nonlinear Euler-Lagrange systems. [30] Wu et al presented a min-max optimal control of linear systems with uncertainty and terminal state constraints, which is solved through solving a sequence of semi-definite programming problems.…”

Section: Control Strategy Of Tsrmentioning

confidence: 99%

An Effective Approach Control Scheme for the Tethered Space Robot System

Meng

Huang

2014

International Journal of Advanced Robotic Systems

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The tethered space robot system (TSR), which is composed of a platform, a gripper and a space tether, has great potential in future space missions. Given the relative motion among the platform, tether, gripper and the target, an integrated approach model is derived. Then, a novel coordinated approach control scheme is presented, in which the tether tension, thrusters and the reaction wheel are all utilized. It contains the open-loop trajectory optimization, the feedback trajectory control and attitude control. The numerical simulation results show that the rendezvous between TSR and the target can be realized by the proposed coordinated control scheme, and the propellant consumption is efficiently reduced. Moreover, the control scheme performs well in the presence of the initial state's perturbations, actuator characteristics and sensor errors.

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Asymptotic optimal control of uncertain nonlinear Euler–Lagrange systems

Cited by 49 publications

References 25 publications

Adaptive Inverse Optimal Neuromuscular Electrical Stimulation

Adaptive Inverse Optimal Neuromuscular Electrical Stimulation

Adaptive Neural PD Control With Semiglobal Asymptotic Stabilization Guarantee

An Effective Approach Control Scheme for the Tethered Space Robot System

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