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TECHNICAL PAPERS

Lagrangian Formulation of Rotating Beam With Active Constrained Layer Damping in Time Domain Analysis

[+] Author and Article Information
E. H. K. Fung, J. Q. Zou

Department of Mechanical Engineering, The Hong Kong Polytechnic University, Hung Hom, Kowloon, Hong Kong

H. W. J. Lee

Department of Applied Mathematics, The Hong Kong Polytechnic University, Hung Hom, Kowloon, Hong Kong

J. Mech. Des 126(2), 359-364 (May 05, 2004) (6 pages) doi:10.1115/1.1649969 History: Received October 01, 2002; Revised July 01, 2003; Online May 05, 2004
Copyright © 2004 by ASME
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References

DiTaranto,  R. A., 1965, “Theory of Vibratory Bending for Elastic and Viscoelastic Layered Finite-Length Beam,” ASME J. Appl. Mech., 87, pp. 881–886.
Bhimaraddi,  A., 1995, “Sandwich Beam Theory and Analysis of Constrained Layer Damping,” J. Sound Vib., 179(4), pp. 591–602.
Shen, I. Y., 1994, “Stability and Controllability of Euler-Bernoulli Beams With Intelligent Constrained Layer Treatments,” ASME Active Control Vib. Noise, Vol. 75, pp. 169–78.
Baz,  A., 1997, “Dynamic Boundary Control of Beams Using Active Constrained Layer Damping,” Systems and Signal Processing ,11(6), pp. 811–825.
Tawfeic,  S. R., Baz,  A., Ismail,  A. A., Azim,  O. A., and Karar,  S. S., 1997, “Vibration Control of a Flexible Arm With Active Constrained Layer Damping,” Journal of Low Frequency Noise, Vibration and Active Control, 16 (4), pp. 271–287.
Lesieutre,  G. A., and Lee,  U., 1996, “A Finite Element for Beams Having Segmented Active Constrained Layers With Frequency-Dependent Viscoelastics,” Smart Mater. Struct., 5, pp. 615–627.
Piedboeuf, J. C., Pagė, L.-L., Tremblay, I., and Potvin, M.-J., 1999, “Efficient Simulation of a Multilayer Viscoelastic Beam Using an Equivalent Homogeneous Beam,” Proc. 1999 IEEE International Conference on Robotics and Automation, Vol. 2, pp. 1188–1193.
Lim,  Y.-H., Varadan,  V. V., and Varadan,  V. K., 2002, “Closed Loop Finite-Element Modeling of Active Constrained Layer Damping in Time Domain Analysis,” Smart Mater. Struct., 11, pp. 89–97.
McTavish,  D. J., and Hughes,  P. C., 1993, “Modeling of Linear Viscoelastic Space Structures,” ASME J. Vibr. Acoust., 115, pp. 103–110.
Lesieutre,  G. A., and Mingori,  D. L., 1990, “Finite Element Modeling of Frequency Dependent Materials Damping Using Augmenting Thermodynamic Fields,” AIAA J., 13, pp. 1040–1050.
Trindade,  M. A., Benjeddou,  A., and Ohayon,  R., 2000, “Modeling of Frequency-Dependent Viscoelastic Materials for Active-Passive Vibration Damping,” ASME J. Vibr. Acoust., 122, pp. 169–174.
Baz,  A., 2000, “Spectral Finite-Element Modeling of the Longitudinal Wave Propagation in Rods Treated With Active Constrained Layer Damping,” Smart Mater. Struct., 9, pp. 372–377.
Lee,  U., and Kim,  J., 2001, “Spectral Element Modeling for the Beams Treated With Active Constrained Layer Damping,” Int. J. Solids Struct., 38, pp. 5679–5702.
Wang,  G., and Wereley,  N. M., 2002, “Spectral Finite-Element Analysis of Sandwich Beams With Passive Constrained Layer Damping,” ASME J. Vibr. Acoust., 124, pp. 376–386.
Lam,  M. J., Inman,  D. J., and Saunders,  W. R., 2002, “Hybrid Damping Models Using the Golla-Hughes-McTavish Method With Internally Balanced Model Reduction and Output Feedback,” Smart Mater. Struct., 9, pp. 362–371.
Fasana,  A., and Marchesiello,  S., 2001, “Rayleigh-Ritz Analysis of Sandwich Beams,” J. Sound Vib., 241(4), pp. 643–652.
Sturla,  F. A., and Argento,  A., 1996, “Free and Forced Vibrations of a Spinning Viscoelastic Beam,” ASME J. Vibr. Acoust., 118, pp. 463–468.
Baz,  A., and Ro,  J., 2001, “Vibration Control of Rotating Beams With Active Constrained Layer Damping,” Smart Mater. Struct., 10, pp. 112–120.
Liu,  Q., Chattopadhyay,  A., Gu,  H., and Zhou,  X., 2000, “Use of Segmented Constrained Layer Damping Treatment for Improved Helicopter Aeromechanical Stability,” Smart Mater. Struct., 9, pp. 523–532.
Silva, L. A., Austin, E. M., and Inman, D. J., 2002, “The Role of Internal Variables on the Control of Viscoelastic Structures,” Proc. 2002 ASME International Mechanical Engineering Congress and Exposition, IMECE 2002-33991.
Baz,  A., and Ro,  J., 1995, “Optimum Design and Control of Active Constrained Layer Damping,” (Special 50th Anniversary Design Issue), ASME J. Mech. Des., 117, pp. 135–144.

Figures

Grahic Jump Location
Comparison of rotating AC beam and ACLD beam
Grahic Jump Location
History of applied voltage
Grahic Jump Location
Effect of control gains on rotating ACLD beam
Grahic Jump Location
Effect of loss factor of VEM layer
Grahic Jump Location
Effect of storage modulus of VEM layer

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