Розглянуто двовимірні динамічні задачі теорії пружності, що зводяться до сингулярних інтегральних або інтегро-диференціальних рівнянь з нерухомими особливостями. Це задачі про визначення напруженого стану в тілах з крайовими дефектами, з дефектами з перерізом у вигляді ламаної, а також деякі контактні задачі. Для розв’язування отриманих рівнянь запропоновано числовий метод, який враховує справжню асимптотику розв’язків і ґрунтується на застосуванні спеціальних квадратурних формул для сингулярних інтегралів.

 

Зразок для цитування: В. Г. Попов, “Двовимірні динамічні задачі теорії пружності, що зводяться до сингулярних інтегральних рівнянь з нерухомими особливостями,” Мат. методи та фіз.-мех. поля, 63, No. 1, 94–105 (2020), https://doi.org/10.15407/mmpmf2020.63.1.94-105

Translation: V. G. Popov, “Two-dimensional dynamic problems of the theory of elasticity reduced to singular integral equations with immobile singularities,” J. Math. Sci., 270, No. 1, 107–122 (2023), https://doi.org/10.1007/s10958-023-06335-y

тріщина, тонке включення, контактна взаємодія, сингулярне інтегральне рівняння

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