A technique for solving problems in inhomogeneous theory of elasticity with deformations
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- 1.V. N. Ionov and P. M. Ogibalov, The Strength of Three-Dimensional Structural Elements [in Russian], Vysshaya Shkola, Moscow, Sec. 2 (1979).Google Scholar
- 2.G. B. Kolchin, Design of Structural Elements Using Inhomogeneous Materials [in Russian], Kartya Moldovenyaske, Kishinev (1971).Google Scholar
- 3.V. A. Lomakin, Theory of Elasticity for Inhomogenous Solids [in Russian], Moscow Univ., Moscow (1976).Google Scholar
- 4.A. I. Lur'e, Theory of Elasticity [in Russian], Nauka, Moscow (1970).Google Scholar
- 5.A. I. Lur'e, “The theory of thick plates,” Prikl. Mat. Mekh.,6, Nos. 2/3, 151–168 (1942).Google Scholar
- 6.S. Ya. Makovenko, “Two theorems for the Saint-Venant continuity equations of deformations,” in: Questions on the Mechanics of Deformable Media, All-Union Institute of Scientific and Technical Information (VINITI), Moscow, Sec. 2, 96–100 (1981).Google Scholar
- 7.V. P. Plevako, “The theory of elasticity for inhomogeneous media,” Prikl. Mat. Mekh.,35, No. 5, 853–860 (1971).Google Scholar
- 8.V. P. Plevako, “Deformation of an inhomogeneous half-space by a surface load,” Prikl. Mekh.,9, No. 6, 16–23 (1973).Google Scholar
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