Equilibrium stability of three-dimensional orthotropic bodies under small deformations

1. E. L. Aines, Ordinary Differential Equations [Russian translation], GNTI, Ukrainy, Kharkov (1939).

   Google Scholar 

2. I. Yu. Babich, “Stability of transversally isotropic shells,” Dokl. Akad. Nauk UkrRSR, Ser. A, No. 5 (1968).

3. I. Yu. Babich, “Investigation of the stability of cylindrical shells by means of three-dimensional linearized equations,” Prikl. Mekhan.,4, No. 7 (1968).

4. I. Yu. Babich, “Equilibrium stability of orthotropic cylindrical shells,” Proceedings of the Seventh All-Union Conference on the Theory of Shells and Plates (Dnepropetrovsk, 1969), Izd-vo Nauka, Moscow (1970).

   Google Scholar 

5. I. Yu. Babich and A. N. Guz', “Effect of plate material properties on value of critical force,” Mekhan. Polim., No. 2 (1969).

6. I. Yu. Babich and A. N. Guz', “Effect of properties of rod material of circular cross section on value of critical force,” Stroitel'naya Mekhanika i Raschet Sooruzhenii, No. 4 (1969).

7. I. Yu. Babich and A. N. Guz', “Stability of a transversally isotropic cylindrical shell under axial compression,” Mekhan. Polim., No. 6 (1969).

8. A. N. Guz', “Stability of orthotropic bodies,” Prikl. Mekhan.,3, No. 5 (1967).

9. A. N. Guz', “Accuracy of the Kirchhoff-Love hypothesis for the determination of critical forces in the theory of elastic stability,” Dokl. Akad. Nauk SSSR,179, No. 3 (1968).

10. A. N. Guz', “Stability of three-dimensional elastic bodies,” Prikl. Mat. i Mekh.,32, No. 5 (1968).

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

    Google Scholar 

12. V. I. Smirnov, Course in Higher Mathematics [in Russian], Vol. III, Part 2, Izd-vo Nauka, Moscow (1969).

    Google Scholar 

Download references