Antiplane deformation of an elastoplastic body with a thin rigid inclusion
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Keywords
Rigid Inclusion Elastoplastic Body Antiplane Deformation Thin Rigid Inclusion
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Literature cited
- 1.J. A. H. Halt and F. A. McClintock, “Elastic-plastic stress and strain distributions around sharp notches under repeated shear,” in: Ninth International Congress for Applied Mechanics, Brussels, 1957, Vol. 8, pp. 51–58.Google Scholar
- 2.G. P. Cherepanov, “The elastoplastic problem under conditions of antiplane deformation,” Prikl. Mat. Mekh.,26, No. 4, 697–708 (1962).Google Scholar
- 3.B. V. Kostrov and L. V. Nikitin, “A longitudinal shear crack with an infinitely narrow plastic zone,” Prikl. Mat. Mekh.,31, No. 2, 334–336 (1967).Google Scholar
- 4.J. Rice, “Mathematical methods in fracture mechanics,” in: Fracture [Russian translation], Vol. 2, Mir, Moscow (1975), pp. 204–335.Google Scholar
- 5.R. S. Gromyak, “The zone of plasticity in the vicinity of the tip of a rigid inclusion in antiplane deformation,” Fiz.-Khim. Mekh. Mater., No. 4, 124–126 (1979).Google Scholar
- 6.G. P. Cherepanov, “Solution of statically indeterminable elastoplastic problems under conditions of complex shear,” Inzh. Zh.,5, No. 6, 1126–1127 (1965).Google Scholar
- 7.P. M. Vitvitskii and V. A. Kriven', “Antiplane elastoplastic deformation of a body with a rigid thin inclusion,” Akad. Nauk Ukr.SSR, Ser. A, No. 2, 104–108 (1979).Google Scholar
- 8.V. A. Kriven', “Antiplane elastoplastic deformation of a body containing a thin rigid plastic inclusion and two symmetric cracks perpendicular to it,” Fiz.-Khim. Mekh. Mater., No. 2, 66–70 (1980).Google Scholar
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© Plenum Publishing Corporation 1984