A possible generalization of the nonlinear theory of small deformations

1. A. E. Green and J. E. Adkins, Large Elastic Deformations and Nonlinear Continuum Mechanics, Clarendon Press, Oxford (1960).

   Google Scholar 

2. A. N. Guz', Stability of Three-Dimensional Deformable Bodies [in Russian], Naukova Dumka, Kiev (1971).

   Google Scholar 

3. A. N. Guz', Stability of Elastic Bodies Under Finite Deformations [in Russian], Naukova Dumka, Kiev (1973).

   Google Scholar 

4. A. N. Guz', Stability of Elastic Bodies Under Hydrostatic Compression [in Russian], Naukova Dumka, Kiev (1979).

   Google Scholar 

5. A. N. Guz', F. G. Makhort, and O. I. Gushcha, Introduction to Acoustoelasticity [in Russian], Naukova Dumka, Kiev (1977).

   Google Scholar 

6. Zh. S. Erzhanov and I. A. Garagash, “Linearized equations of equilibrium and stability of a strip under hydrostatic compression,” Izv. Akad. Nauk KazSSR, Ser. Fiz.-Mat.,5, 29 (1975).

   Google Scholar 

7. V. V. Novozhilov, Fundamentals of the Nonlinear Theory of Elasticity [in Russian], Gostekhizdat, Moscow (1948).

   Google Scholar 

8. D. D. Rabotyagov, Mechanics of Materials under Large Deformations [in Russian], Shtiintsa, Kishinev (1975).

   Google Scholar 

9. M. A. Biot, “Stability of elastic equilibrium. Equations of elasticity in a region subjected to an initial tension,” Ann. Soc. Sci. Ser. B,54, Part 1, 91 (1934).

   Google Scholar 

10. M. A. Biot, “Nonlinear theory of elasticity and the linearized case for a body under initial stress,” Phil. Mag. Ser. 7,27, 89 (1939).

    Google Scholar 

11. A. E. Green, R. S. Rivlin, and R. T. Shield, “General theory of small elastic deformations superposed on finite elastic deformations,” Proc. Roy. Soc.,211A, 128 (1952).

    Google Scholar 

12. R. Kappus, “Elasticity theory of finite displacements,” Z. Angew. Mat. Mech.,19, No. 5, 271; No. 6, 344 (1939).

    Google Scholar 

Download references