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BRIEF NOTES

Inertia Effects in a Curved Non-Newtonian Squeeze Film

[+] Author and Article Information
R. Usha, P. Vimala

Department of Mathematics, Indian Institute of Technology, Madras 600 036, India

J. Appl. Mech 68(6), 944-948 (Apr 28, 2001) (5 pages) doi:10.1115/1.1386695 History: Received August 16, 2000; Revised April 28, 2001
Copyright © 2001 by ASME
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References

Wada,  S., and Hayashi,  H., 1971, “Hydrodynamic Lubrication of Journal Bearings by Pseudoplastic Lubricants Part II: Experimental Studies,” Bull. JSME, 14, pp. 279–286.
Hashimoto,  H., and Wada,  S., 1986, “The Effects of Fluid Inertia Forces in Parallel Circular Squeeze Film Bearings Lubricated With Pseudoplastic Fluids,” ASME J. Tribol., 108, pp. 282–287.
Hashimoto,  H., and Wada,  S., 1986, “The Effects of Fluid Inertia Forces in Squeeze Film Bearings Lubricated With Pseudoplastic Fluids (2nd Report, Annular Parallel Plate Squeeze Film Bearings),” Bull. JSME, 29, pp. 1913–1918.
Tichy,  J. A., and Skinkle,  M. E., 1979, “An Analysis of the Flow of a Viscoelastic Fluid Between Arbitrary Two Dimensional Surface Subject to Normal High Frequency Oscillations,” ASME J. Lubr. Technol., 101, pp. 145–151.
Tichy,  J. A., 1982, “Effects of Fluid Inertia and Viscoelasticity on Squeeze Film Bearing Forces,” ASLE Trans., 25, pp. 125–132.
Tichy,  J. A., 1982, “Effects of Fluid Inertia and Viscoelasticity on Squeeze Film Bearing Forces at Large Vibration Amplitudes,” Wear, 76, pp. 69–89.
Tichy,  J. A., 1996, “Non-Newtonian Lubrication With the Convected Maxwell Model,” ASME J. Tribol., 118, pp. 344–348.
Murti,  P. R. K., 1975, “Squeeze Films in Curved Circular Plates,” Trans. ASME, 97, pp. 650–652.
Gupta,  R. S., and Kapur,  V. K., 1980, “The Simultaneous Effects of Thermal and Inertia in Curved Circular Squeeze Films,” ASME J. Lubr. Technol., 102, pp. 501–504.
Hasegawa,  E., 1985, “On Squeeze Film of a Curved Circular Plate,” Bull. JSME, 28, pp. 951–958.

Figures

Grahic Jump Location
(a) Curved squeeze film geometry, (b) configuration of the curved disk
Grahic Jump Location
Radial pressure distribution for different amplitudes of sinusoidal squeeze motion (numerical); T=0.8;-------δ1=1.0;–δ1=0.0
Grahic Jump Location
Effects of curvature on radial pressure distribution (numerical) ε=0.2,T=0.8;–δ1=0.0;[[dashed_line]]δ1=10

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