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TECHNICAL PAPERS

The Fiber Composite With Nonlinear Interface—Part I: Axial Tension

[+] Author and Article Information
A. J. Levy

Department of Mechanical, Aerospace and Manufacturing Engineering, Syracuse University, Syracuse, NY 13244-1240

J. Appl. Mech 67(4), 727-732 (Jun 25, 2000) (6 pages) doi:10.1115/1.1329319 History: Received May 07, 1999; Revised June 25, 2000
Copyright © 2000 by ASME
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References

Levy,  A. J., 1996, “The Effective Dilatational Response of Fiber Reinforced Composites With Nonlinear Interface,” ASME J. Appl. Mech., 63, pp. 357–364.
Levy,  A. J., and Dong,  Z., 1998, “Effective Transverse Response of Fiber Composites With Nonlinear Interface,” J. Mech. Phys. Solids, 46, pp. 1279–1300.
Dong, Z., and Levy, A. J., 2000, “Mean Field Estimates of the Response of Fiber Composites With Nonlinear Interface,” Mech. Mater., to appear.
Needleman,  A., 1987, “A Continuum Model for Void Nucleation by Inclusion Debonding,” ASME J. Appl. Mech., 54, pp. 525–531.
Hashin,  Z., and Rosen,  B. W., 1964, “The Elastic Moduli of Fiber Reinforced Materials,” ASME J. Appl. Mech., 31, pp. 223–232.
Hashin,  Z., 1990, “Thermoelastic Properties of Fiber Composites With Imperfect Interface,” Mech. Mater., 8, pp. 333–348.
Benveniste,  Y., 1985, “The Effective Mechanical Behavior of Composite Materials With Imperfect Contact Between the Constituents,” Mech. Mater., 4, pp. 197–208.
Aboudi, J., 1991, Mechanics of Composite Materials, Elsevier, Amsterdam.
Gurtin, M. E., 1984, “The Linear Theory of Elasticity,” Mechanics of Solids, Vol. 2, C. Truesdell, ed., Springer-Verlag, Heidelberg, pp. 1–273.
Ferrante, J., Smith, J. R. and Rose, J. H., 1982, “Universal Binding Energy Relations in Metallic Adhesion,” Microscopic Aspects of Adhesion and Lubrication, J. M. Georges, ed., Elsevier, Amsterdam, pp. 19–30.
Needleman,  A., 1993, “Void Nucleation by Inclusion Debonding in a Crystal Matrix,” Modell. Simul. Mater. Sci. Eng., 1, pp. 111–132.
Hashin,  Z., 1991, “Thermoelastic Properties of Particulate Composites With Imperfect Interface,” J. Mech. Phys. Solids, 39, pp. 745–762.

Figures

Grahic Jump Location
Composite cylinder geometry
Grahic Jump Location
The normal interface force law
Grahic Jump Location
Effect of concentration on Poisson contraction response, ρ=0.001
Grahic Jump Location
Effect of force length ratio on Poisson contraction response, c=0.5

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