In this paper the stability of nonlinear misaligned rotor-bearing systems is investigated, using the Lyapunov direct method. A finite element formulation is used to determine the journal bearing pressure distribution. Then the linear and nonlinear stiffness, damping, and hybrid (depending on both displacement and velocity) coefficients are calculated. A general method of analysis based on Lyapunov’s stability criteria is used to investigate the stability of nonlinear misaligned rotor bearing systems. The equations of motion of the rigid rotor on the nonlinear bearings are used to find a Lyapunov function using some of these coefficients, which depend on L/D ratio and the misalignment angles ψx, ψy. The analytical conditions for the stability or instability of some examined cases are given and some examples for the orbital stability are also demonstrated.

Issue Section:
Gas Turbines: Structures and Dynamics
Topics:
Journal bearings, Stability, Bearings, Rotors, Damping, Displacement, Equations of motion, Finite element analysis, Pressure, Stiffness
1.
Dimarogonas
A. D.
, “
A General Method for Stability Analysis of Rotating Shafts
,”
Ingenieur-Archiv.
, Vol.
44
,
1975
, pp.
9
20
.
2.
Glienicke, J., “Experimental Investigation of the Stiffness and Damping Coefficients of Turbine Bearings and Their Application to Instability Prediction,” Proc. Inst. Mech. Eng., Vol. 181, Pt. 3 B, pp. 1966–67.
3.
Majumbar
B. C.
,
Brewe
D. E.
, and
Khonsari
M. M.
, “
Stability of a Rigid Rotor Supported on Flexible Oil Journal Bearings
,”
ASME Journal of Tribology
, Vol.
110
,
1988
, pp.
181
187
.
4.
Crosby
W. A.
, “
The Stability of Rigid Rotor in Rapture Finite Journal Bearings
,”
Wear
, Vol.
80
,
1982
, pp.
333
346
.
5.
Muszynska
A.
, “
Stability of Whirl and Whip in Rotor/Bearing Systems
,”
Journal of Sound and Vibration
, Vol.
127
(
1
),
1988
, pp.
49
64
.
6.
Muszynska
A.
, “
Whirl and Whip in Rotor/Bearing Systems Stability Problems
,”
Journal of Sound and Vibration
, Vol.
110
(
3
),
1986
, pp.
443
462
.
7.
Parszewski
Z. A.
, and
Krynicki
K.
, “
Rotor/Bearing Systems Stability: Composition Approach With Bearing Shape Function Presentation
,”
Tribology Transactions
, Vol.
32
,
1989
, No.
4
, pp.
517
523
.
8.
Ogrodnik, P. J., Goodwin, M. J., and Penny, J. E. T., “The Effect of Translational and Conical Bearing Misalignment on the Response and Stability of a Non-linear Rotor Bearing System,” in: Vibration and Wear in High Speed Rotating Machinery, 1990 Kluwer Academic Publishers, pp. 547–558.
9.
El-Marhomy
Abd. Alla
, and
Schack
A. L.
, “
Dynamic Stability of Elastic Rotor-Bearing System via Lyapynov’s Direct Method
,”
ASME Journal of Applied Mechanics
, Vol.
58
,
1991
, pp.
1056
1063
.
10.
Hashish
E.
,
Sankar
T. S.
, and
Osman
M. O. M.
, “
Finite Journal Bearing With Non-linear Stiffness and Damping. Part 2: Stability Analysis
,”
ASME Journal of Mechanical Design
, Vol.
104
,
1982
, pp.
406
411
.
11.
Adams
M. L.
, “
Non-linear Dynamics of Flexible Multi-Bearing Rotors
,”
Journal of Sound and Vibration
, Vol.
71
(
1
),
1980
, pp.
129
144
.
12.
Crooijmans
M. T. M.
,
Brouwers
H. J. H.
,
Van Campen
and D. H.
, and
de Kraker
A.
, “
Limit Cycle Predictions of Non-Linear Journal Bearing System
,”
ASME Journal of Engineering for Industry
, Vol.
112
,
1990
, pp.
168
171
.
13.
Nikolakopoulos
P. G.
, and
Papadopoulos
C. A.
, “
Nonlinearities in Misaligned Journal Bearings
,”
Tribology International
, Vol.
27
(
4
), 1994, pp.
243
257
.
14.
Hubner, K. H., The Finite Element Method for Engineers, Wiley, New York, 1999.
15.
Lyapunov, A. M., “Probleme General de la Stabilite´ du mouvement.” Kharkov, 1892; Princeton University Press, Princeton, NJ, 1947.
16.
Pafelias, T., “Solution of Certain Problems of Viscous Laminar Flow With Applications in Engineering Problems,” PhD Thesis, Rensselaer Polytechnic Institute, Troy, NY, Jan. 1974.
17.
Bannister, R. H., “Theoretical and Experimental Investigations Illustrating the Influence of Non-linearity and Misalignment on the Eight Oil Film Coefficients,” I. Mech. E, 1976.
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