Параметри
Representation of solutions to the plane elasticity problems for a rectangular domain via Vihak’s functions
Тип публікації :
Стаття
Дата випуску :
2021
Автор(и) :
Токовий, Ю. В.
Юзв’як, М. Й.
Ясінський, А. В.
Мова основного тексту :
English
eKNUTSHIR URL :
Випуск :
3
ISSN :
1812-5409
Початкова сторінка :
123
Кінцева сторінка :
126
Цитування :
Токовий, Ю. В., Юзв’як, М. Й., Ясінський, А. В. (2021). Representation of solutions to the plane elasticity problems for a rectangular domain via Vihak’s functions. Bulletin of Taras Shevchenko National University of Kyiv. Physics and Mathematics(3), 123–126. https://doi.org/10.17721/1812-5409.2021/3.24
The paper presents the generalization of the direct integration method for the governing equations of the basic elasticity problems for the bounded domains with corner points. An important stage in the realization of the method is the representation of the unknown stress-tensor components via the key functions. The selection of these functions is motivated by some specific features of the problems and thus was regarded as a weakest part of the solution algorithm. Herein, we suggest an universal approach for the selection of the key functions, which we started to call the Vihak functions (to honor Prof. Vasyl M. Vihak, the founder and developer of the direct integration method) by using the integral relationships derived from the equilibrium equations. The approach is illustrated by the solution of a plane elasticity problem for an elastic rectangle. The relationship between Vihak’s function for the considered problem and the classical biharmonic Airy stress function is shown.
Pages of the article in the issue: 123 - 126
Language of the article: Ukrainian
Pages of the article in the issue: 123 - 126
Language of the article: Ukrainian
Тип зібрання :
Publication
Файл(и) :
Ескіз недоступний
Формат
Adobe PDF
Розмір :
564.43 KB
Контрольна сума:
(MD5):1be8b3da48d258fcb3be8d7577153138
Ця робота розповсюджується на умовах ліцензії Creative Commons CC BY
10.17721/1812-5409.2021/3.24