On the solution of plate bending problems for multiply connected regions

1. O. M. Guz', “An approximation method of calculating the stress concentrations around curvilinear openings in shells,” Prikl. Mekhan.,8, No. 6 (1962).

2. A. N. Guz', “Solution of problems for a flat spherical shell in the case of multiply connected regions,” Dokl. Akad. Nauk SSSR,158, No. 6 (1964).

3. A. N. Guz', “Some problems for shells weakened by a finite number of openings,” Proceedings of the V All-Union Conference on the Theory of Shells and Plates [in Russian], Moscow (1965).

4. A. N. Guz', “Periodic problems for thin elastic shells weakened by openings,” Proceedings of the Scientific-Technological Branch Shipbuilding Industry [in Russian], No. 66, Sudpromgiz, Leningrad (1965).

   Google Scholar 

5. L. V. Kantorovich and V. I. Krylov, Approximate Methods of Higher Analysis [in Russian], Fizmatgiz, Moscow-Leningrad (1962).

   Google Scholar 

6. A. Kratzer and W. Franz, Transcendental Functions [Russian translation], IL, Moscow (1963).

   Google Scholar 

7. B. L. Pelekh, “Determination of concentration factors in the bending of slabs with openings,” Prikl. Mekhan.,1, No. 7 (1965).

8. G. N. Savin, Stress Concentration around Openings [in Russian], GITTL, Moscow-Leningrad (1951).

   Google Scholar 

9. G. N. Savin and A. N. Guz', “State of stress around curvilinear openings in shells,” Izv. Akad. Nauk SSSR, Mekhan. i Mashinostr., No. 6 (1964).

10. G. N. Savin and A. N. Guz', “A method of solving plane problems of the couple-stress theory of elasticity for multiply connected regions,” Prikl. Mekhan.,2, No. 1 (1966).

11. G. N. Savin, A. S. Kosmodamianskii, and A. N. Guz', “Stress concentration around openings,” Prikl. Mekhan.,3, No. 10 (1967).

12. S. P. Timoshenko, “On the correction for shear of the differential equations for transverse vibrations of prismatic bars,” Phil. Mag., Ser. 6,41 (1921).

Download references