An experimentally observed reverse flow phenomenon at the end tip of the cavitation zone of a submerged journal bearing is modeled and theoretically investigated. The shape of the cavity, the nature of the reverse flow and the pressure distribution in the bearing are calculated in an attempt to understand previous experimental observations of pressure build up in the cavitation zone. A comparison with the available experimental results reveals that the cavitation shape, the behavior of the reverse flow and the pressure distribution are fairly well predicted by the present model. The reverse flow mechanism is indeed capable to generate the level of the experimentally measured pressures, particularly towards the end of the cavitation zone.

1.
Groper
,
M.
, and
Etsion
,
I.
,
2001
, “
The Effect of Shear Flow and Dissolved Gas Diffusion on the Cavitation in a Submerged Journal Bearing
,”
ASME J. of Tribol.
,
123
, pp.
494
500
.
2.
Etsion
,
I.
, and
Ludwig
,
L. P.
,
1982
, “
Observation of Pressure Variation in the Cavitation Region of Submerged Journal Bearings
,”
ASME J. Lubr. Technol.
,
104
, pp.
157
163
.
3.
Braun
,
M. J.
, and
Hendricks
,
R. C.
,
1984
, “
An Experimental Investigation of the Vaporous/Gaseous Cavity Characteristics of an Eccentric Journal Bearing
,”
STLE Tribol. Trans.
,
27
, No.
1
, pp.
1
14
.
4.
Heshmat
,
H.
, and
Pinkus
,
O.
,
1985
, “
Performance of Starved Journal Bearings With Oil Ring Lubrication
,”
ASME J. Tribol.
,
107
, pp.
23
32
.
5.
Knapp, R. T., Daily, J. W., and Hammit, F. G., 1970, Cavitation, McGraw-Hill, New-York.
6.
Brennen, C. E., 1995, Cavitation and Bubble Dynamics, Oxford University Press, New York.
7.
Coyne
,
J. C.
, and
Elrod
,
H. G.
,
1971
, “
Conditions for the Rupture of a Lubricating Film, Part 2: New Boundary Conditions for Reynolds’ Equation
,”
ASME J. Lubr. Technol.
,
93
, pp.
156
167
.
8.
Pan
,
C. H. T.
,
1980
, “
An Improved Short Bearing Analysis for the Submerged Operation of Plain Journal Bearings and Squeeze-Film Dampers
,”
ASME J. Lubr. Technol.
,
102
, pp.
320
332
.
9.
Yih
,
C. S.
,
1967
, “
Stability of Parallel Laminar Flow With a Free Surface
,”
J. Fluid Mech.
,
27
, pp.
337
352
.
10.
Hooper
,
A. P.
, and
Grimshaw
,
R.
,
1985
, “
Nonlinear Instability at the Interface Between Two Viscous Fluids
,”
Phys. Fluids
,
28
, No.
1
, pp.
37
45
.
11.
Oron
,
A
, and
Rosenau
,
P.
,
1989
, “
Nonlinear Evolution and Breaking of Interfacial, Rayleigh-Taylon Waves
,”
Phys. Fluids A
,
A1
, pp.
1155
1165
.
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