Параметри
The stress state in an elastic body with a rigid inclusion of the shape of three segments broken line under the action of the harmonic oscillation of the longitudinal shift
Тип публікації :
Стаття
Дата випуску :
2019
Автор(и) :
Popov, V. G.
Lytvyn, O. V.
Мова основного тексту :
English
eKNUTSHIR URL :
Випуск :
1
ISSN :
1812-5409
Початкова сторінка :
158
Кінцева сторінка :
161
Цитування :
Popov, V. G., Lytvyn, O. V. (2019). The stress state in an elastic body with a rigid inclusion of the shape of three segments broken line under the action of the harmonic oscillation of the longitudinal shift. Bulletin of Taras Shevchenko National University of Kyiv. Physics and Mathematics(1), 158–161. https://doi.org/10.17721/1812-5409.2019/1.36
There is a thin absolutely rigid inclusion that in a cross-section represents three segments broken line in an infinite elastic medium (matrix) that is in the conditions of antiplane strain. The inclusion is under the action of harmonic shear force Pe^{iwt} along the axis Oz. Under the conditions of the antiplane strain the only one different from 0 z-component of displacement vector W (x; y) satisfies the Helmholtz equation. The inclusion is fully couple with the matrix. The tangential stresses are discontinuous on the inclusion with unknown jumps.The method of the solution is based on the representation of displacement W (x; y) by discontinuous solutions of the Helmholtz equation. After the satisfaction of the conditions on the inclusion the system of integral equations relatively unknown jumps is obtained. One of the main results is a numerical method for solving the obtained system, which takes into account the singularity of the solution and is based on the use of the special quadrature formulas for singular integrals.Key words: inclusion, shear force, fixed singularities.Pages of the article in the issue: 158-161Language of the article: Ukrainian
Тип зібрання :
Publication
Файл(и) :
Ескіз недоступний
Формат
Adobe PDF
Розмір :
979.97 KB
Контрольна сума:
(MD5):452a2a697a2f28a6622e90618a7b3495
Ця робота розповсюджується на умовах ліцензії Creative Commons CC BY
10.17721/1812-5409.2019/1.36