Effective elastic properties of solids with cavities of various shapes are derived in two approximations: the approximation of non-interacting cavities and the approximation of the average stress field (Mori-Tanaka’s scheme); the latter appears to be appropriate when mutual positions of defects are random. We construct the elastic potential of a solid with cavities. Such an approach covers, in a unified way, cavities of various shapes and any mixture of them. No degeneracies (or a need in a special limiting procedure) arise when cavities shrink to cracks. It also provides a unified description of both isotropic and anisotropic effective properties and recovers results available in the literature for special cases. Elastic potentials dictate the choice of proper parameters of cavity density. These parameters depend on defect shapes. Even in the case of random orientations, the isotropic overall properties cannot be characterized in terms of porosity alone; for elliptical holes, for example, a second parameter - “eccentricity” - is needed.
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January 1994
Review Articles
Effective Moduli of Solids With Cavities of Various Shapes
M. Kachanov,
M. Kachanov
Department of Mechanical Engineering, Tufts University, Medford MA 02155
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I. Tsukrov,
I. Tsukrov
Department of Mechanical Engineering, Tufts University, Medford MA 02155
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B. Shafiro
B. Shafiro
Department of Mechanical Engineering, Tufts University, Medford MA 02155
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M. Kachanov
Department of Mechanical Engineering, Tufts University, Medford MA 02155
I. Tsukrov
Department of Mechanical Engineering, Tufts University, Medford MA 02155
B. Shafiro
Department of Mechanical Engineering, Tufts University, Medford MA 02155
Appl. Mech. Rev. Jan 1994, 47(1S): S151-S174
Published Online: January 1, 1994
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Online:
April 29, 2009
Citation
Kachanov, M., Tsukrov, I., and Shafiro, B. (January 1, 1994). "Effective Moduli of Solids With Cavities of Various Shapes." ASME. Appl. Mech. Rev. January 1994; 47(1S): S151–S174. https://doi.org/10.1115/1.3122810
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