Abstract
The complete solution for an edge dislocation in the non-linear isotropic continuum of the second order is given by complex variable method. The solution is given for boundary conditions formulated in both deformed and undeformed body.
Similar content being viewed by others
References
Murnaghan F. D.: Finite Deformation of an Elastic Solid. J. Wiley, New York 1951.
Seeger A., Mann E.: Z. Naturforschg.14a (1959), 154.
Wesolowski Z., Seeger A.:in Mechanics of Generalised Continua, ed. E. Kröner, Springer 1968, p. 295.
Seeger A., Wesolowski Z.:in Physics of Strength and Plasticity, ed. A. S. Argon, M.I.T. Press 1969, p. 15.
Kröner E., Seeger A.: Arch. Rat. Mech. Anal.3 (1959), 97.
Pfleiderer H., Seeger A., Kröner E.: Z. Naturforschg.15a (1960), 758.
Seeger A.:in International Symposium on Second Order Effects in Elasticity, Plasticity and Fluid Dynamics, ed. M. Reiner, D. Abir, Haifa 1962, Pergamon Press 1964, p. 129.
Seeger A.: Nuovo Cimento7 ser. X (1958), 632.
Knésl Z., Kroupa F.: Czech. J. Phys.B22 (1972), 189.
Muschelischvili N. I.: Nekotorye osnovnye zadači matematičeskoj teorii uprugosti. Moskau 1954 (in Russian).
Adkins J. E., Green A. E., Nicholas G. C.: Phil. Trans. Roy. Soc. Lond.A247 (1954/55), 279.
Seeger A., Buck O.: Z. Naturforschg.15a (1960), 1056.
Nabarro F. R. N.: Theory of Crystal Dislocations. Oxford 1967.
Author information
Authors and Affiliations
Additional information
Žižkova 22, Brno, Czechoslovakia.
Rights and permissions
About this article
Cite this article
Knésl, Z. Edge dislocation in the non-linear continuum of the second order. Czech J Phys 22, 398–404 (1972). https://doi.org/10.1007/BF01690700
Received:
Issue Date:
DOI: https://doi.org/10.1007/BF01690700