Flutter of Rotating Shells With a Co-rotating Axial Flow

[+] Author and Article Information
L. Cortelezzi, A. Pong, M. P. Paı̈doussis

Department of Mechanical Engineering, McGill University, Montreal, QC H3A 2K6, Canada

J. Appl. Mech 71(1), 143-145 (Mar 17, 2004) (3 pages) doi:10.1115/1.1636794 History: Received January 16, 2003; Revised June 09, 2003; Online March 17, 2004
Copyright © 2004 by ASME
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Lai,  Y.-C., and Chow,  C.-Y., 1973, “Stability of a Rotating Thin Elastic Tube Containing a Fluid Flow,” Zeitschrift für angewande Mathematik und Mechanik, 53, pp. 511–517.
Srinivasan,  A. V., 1971, “Flutter Analysis of Rotating Cylindrical Shells Immersed in a Circular Helical Flowfield of Air,” AIAA J., 9, pp. 394–400.
Dowell,  E. H., Srinivasan,  A. V., McLean,  J. D., and Ambrose,  J., 1974, “Aeroelastic Stability of Cylindrical Shells Subjected to a Rotating Flow,” AIAA J., 12, pp. 1644–1651.
Chen,  T. L. C., and Bert,  C. W., 1977, “Dynamic Stability of Isotropic or Composite-Material Cylindrical Shells Containing Swirling Fluid Flow,” ASME J. Appl. Mech., 44, pp. 112–116; 44, p. 513.
Paı̈doussis, M. P., 2003, Fluid-Structure Interactions: Slender Structures and Axial Flow, 2 , Elsevier, Oxford.


Grahic Jump Location
The dimensionless frequency ω̃ versus Ũ for different n, as given by Lai and Chow
Grahic Jump Location
The recalculated ω̃ versus Ũ plot for n=0



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