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TECHNICAL PAPERS

Optimal Boundary Control of an Axially Moving Material System

[+] Author and Article Information
Rong-Fong Fung, Jyh-Horng Chou

Department of Mechanical and Automation Engineering, National Kaohsiung First University of Science and Technology, University Road, Yenchau, Kaohsiung, Taiwan 824, ROC

Yu-Lung Kuo

Department of Mechanical Engineering, Chung Yuan Christian University, Chung-Li, Taiwan 32023, ROC

J. Dyn. Sys., Meas., Control 124(1), 55-61 (Feb 06, 2001) (7 pages) doi:10.1115/1.1435364 History: Received February 06, 2001
Copyright © 2002 by ASME
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References

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Figures

Grahic Jump Location
The axially moving material system with MDS controller
Grahic Jump Location
Optimal boundary control problem via the maximum principle theory in the space-time domain
Grahic Jump Location
Comparisons between the controlled and free vibration systems via the output feedback method. (a) Transverse amplitudes at ξ=1/2, (b) transverse amplitudes at ξ=1, (c) control inputs F. (d) Total mechanical energies (“—”: controlled systems; “---”: uncontrolled system.)
Grahic Jump Location
Comparisons between the controlled and free vibration systems via the maximum principle theory. (a) Transverse amplitudes at ξ=1, (b) control inputs F (c) total mechanical energies (“—”: μ3=0.5,“---”:μ3=1,“-⋅-”:μ3=2 for the controlled system; “[[ellipsis]]”: uncontrolled system.)

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