Abstract
Changes in the frequency spectrum of the vibrations of a one-dimensional model of a crystal, which is perturbed by dislocations, are determined by the method described in paper [10]. The influence of an external homogeneous stress on the frequency of the local vibrations is qualitatively evaluated.
Similar content being viewed by others
References
Конторова Т. А., Френкель Я. Н.: ЖЭТФ8 (1938), 89, 1940.
Kratochvíl J., Indenbom V. L.: Czech. J. Phys.B 13 (1963), 814.
Brillouin L., Parodi M.: Propagation des ondes dans les milieux periodiques, Paris 1956.
Гантмахер Ф. Р., Креин М. Г.: Осцилляционные матрицы и ядра и малые колебания механииских систем, Москва 1950.
Klemens P. G.: Proc. Phys. Soc. (London)A 68 (1955), 1113.
Klemens P. G.: Solid State Physics (Ed. F. Seitz and D. Turnbull) Vol. 7, Academic Press, New York 1958.
Carruthers P.: Rev. Mod. Phys.33 (1961), 92.
Bross H., Seeger A., Haberkorn R.: Phys. Stat. Sol.3 (1963), No. 6.
Ishioka S., Suzuki H.: Preprints, International Conference on Crystal Lattice Defects, Kyoto, Japan 1962, I C-2.
Litzman O.: Czech. J. Phys.8 (1958), 521.
Litzman O.: Czech. J. Phys.7 (1957), 410, 690.
Indenbom V. L.: Private communication.
Author information
Authors and Affiliations
Additional information
The author thanks assist. prof. O. Litzman for valuable discussions and help in solving the problem.
Rights and permissions
About this article
Cite this article
Kratochvíl, J. Local vibrations of one-dimensional model of dislocation. Czech J Phys 14, 328–336 (1964). https://doi.org/10.1007/BF01689141
Received:
Revised:
Issue Date:
DOI: https://doi.org/10.1007/BF01689141