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TECHNICAL NOTES

Static Friction Model for Rough Surfaces With Asymmetric Distribution of Asperity Heights

[+] Author and Article Information
Ning Yu, Shaun R. Pergande, Andreas A. Polycarpou

Department of Mechanical and Industrial Engineering, University of Illinois at Urbana-Champaign, Urbana, IL 61801, USA e-mail: polycarp@uiuc.edu

J. Tribol 126(3), 626-629 (Jun 28, 2004) (4 pages) doi:10.1115/1.1739406 History: Received July 14, 2003; Revised October 24, 2003; Online June 28, 2004
Copyright © 2004 by ASME
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References

Dowson, D., 1998, History of Tribology, 2nd ed., Professional Engineering Publishers, London.
Chang,  W. R., Etsion,  I., and Bogy,  D. B., 1988, “Static Friction Coefficient Model for Metallic Rough Surfaces,” ASME J. Tribol., 110, pp. 57–63.
Tabor,  D., 1981, “Friction-The Present State of Our Understanding,” ASME J. Lubr. Technol., 103, pp. 169–179.
Polycarpou,  A. A., and Etsion,  I., 1998, “Comparison of the Static Friction Sub-Boundary Lubrication Model With Experimental Measurements on Thin Film Disks,” STLE Tribol. Trans., 41(2), pp. 217–224.
Whitehouse, D. J., 1994, Handbook of Surface Metrology, Institute of Physics Publishing, Bristol, UK.
Bhushan, B., 1999, Handbook of Micro/Nanotribology, second edition, CRC Press.
McCool,  J. I., 1992, “Non-Gaussian Effects in Microcontact,” Int. J. Mach. Tools Manuf., 32(1), pp. 115–123.
Yu,  N., and Polycarpou,  A. A., 2002, “Contact of Rough Surfaces With Asymmetric Distribution of Asperity Heights,” ASME J. Tribol., 124, pp. 367–376.
Kotwal,  C. A., and Bhushan,  B., 1996, “Contact Analysis of Non-Gaussian Surfaces for Minimum Static and Kinetic Friction and Wear,” Tribol. Trans., 39, pp. 890–898.
Hamilton,  G. M., 1983, “Explicit Equations for the Stresses Beneath a Sliding Contact,” Proceedings of the Institution of Mechanical Engineers,197(C), pp. 53–59.
Greenwood,  J. A., and Williamson,  J. P. B., 1966, “Contact of Nominally Flat Surfaces,” Proc. R. Soc. London, Ser. A, 295, pp. 300–319.
Chang,  W. R., Etsion,  I., and Bogy,  D. B., 1987, “An Elastic-Plastic Model for the Contact of Rough Surfaces,” ASME J. Tribol., 109, pp. 257–263.
Chang,  W. R., Etsion,  I., and Bogy,  D. B., 1988, “Adhesion Model for Metallic Rough Surfaces,” ASME J. Tribol., 110, pp. 50–56.
Derjaguin,  B. V., Muller,  V. M., and Toporov,  Y. P., 1975, “Effect of Contact Deformations on the Adhesion of Particles,” J. Colloid Interface Sci., 53, pp. 314–326.
Liu,  X., Chetwynd,  G., and Gardner,  J. W., 1998, “Surface Characterization of Electro-Active Thin Polymeric Film Bearings,” Int. J. Mach. Tools Manuf., 38, pp. 669–675.
Bay,  L., Skaarup,  S., West,  K., Mazur,  T. , 2001, “Properties of Polypyrrole Doped With Alkylbenzene Sulfonates,” Proc. SPIE, 4329, pp. 101–105.
Kogut,  L., and Etsion,  I., 2003, “A Semi-Analytical Solution for the Sliding Inception of a Spherical Contact,” ASME J. Tribol., 125, pp. 499–506.

Figures

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System of forces in a static friction pair
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Interfacial force simulations for intermediate roughness case II (ψ=1.0) and energy of adhesion Δγ=2.5 J/m2 using Gaussian and Weibull distributions with various skewness values: (a) P* versus d*; (b) Q* versus d*; (c) Fs* versus d*; and (d) F* versus d*
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Static friction coefficient versus dimensionless external force for intermediate roughness case II (ψ=1.0) and energy of adhesion Δγ=2.5 J/m2 , using Gaussian and Weibull distributions of various skewness values
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Static friction coefficient versus Weibull distribution skewness for different constant dimensionless external loads. Intermediate roughness case II (ψ=1.0) and energy of adhesion Δγ=2.5 J/m2 .
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Roughness effect on the static friction coefficient using Gaussian and Weibull distributions with skewness of ±0.5. Roughness parameters are given in Table 1: (a) energy of adhesion Δγ=2.5 J/m2 ; and (b) energy of adhesion Δγ=0.5 J/m2 .

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