Investigated are sliding motions of a rigid body on a harmonically driven inclined plane. Coulomb’s law with a random coefficient of friction is assumed. The mean sliding velocity in a steady state of deterministic motions is taken as a measure to compare deterministic with stochastic behavior. Not only do the random parameters influence the deviation in the results but strongly influence the typical features of the different motions themselves. [S0021-8936(00)01701-3]
Issue Section:
Technical Papers
1.
Ibrahim
, R. A.
, 1994
, “Friction-Induced Vibration, Chatter, Squeal, and Chaos, Part II: Dynamics and Modeling
,” ASME Appl. Mech. Rev.
, 47
, pp. 227
–253
.2.
Kilburn
, R. F.
, 1974
, “Friction Viewed as a Random Process
,” ASME J. Lubr. Technol.
, 96
, pp. 291
–299
.3.
Vielsack
, P.
, 1996
, “Regularisierung des Haftzustandes bei Coulombscher Reibung
,” Z. Angew. Math. Mech.
, 76
, pp. 439
–446
.4.
Soom
, A.
, and Chen
, J. W.
, 1986
, “Simulation of Random Surface Roughness-Induced Contact Vibrations at Hertzian Contacts During Steady Sliding
,” ASME J. Tribol.
, 108
, pp. 123
–127
.5.
Vielsack
, P.
, and Hartung
, A.
, 1999
, “An example for the Orbital Stability of Permanently Disturbed Non-Smooth Motions
,” Z. Angew. Math. Mech.
, 79
, pp. 389
–397
.6.
Adams
, G. G.
, 1998
, “Steady sliding of Two Elastic Half-Spaces With Friction Reduction due to Interface Stick-Slip
,” ASME J. Appl. Mech.
, 65
, pp. 470
–475
.7.
Kikuchi, N., and Oden, F. T., 1988, “Contact Problems in Elasticity: A Study of Variational Inequalities and Finite Element Methods,” SIAM.
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