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ЖУРНАЛЫ // Математические заметки СВФУ // Архив

Математические заметки СВФУ, 2020, том 27, выпуск 3, страницы 52–65 (Mi svfu293)

Математика

Equilibrium problems for Kirchhoff–Love plates with nonpenetration conditions for known configurations of crack edges

N. P. Lazareva, H. Itoub

a Ammosov North-Eastern Federal University, 48 Kulakovsky Street, Yakutsk 677000, Russia
b Tokyo University of Science, Department of Mathematics, 1-3 Kagurazaka, Shinjuku-ku, Tokyo 162–8601

Аннотация: The paper focuses on nonlinear problems describing the equilibrium of Kirchhoff–Love plates with cracks. We assume that under an appropriate load, plates have special deformations with previously known configurations of edges near a crack. Owing to this particular case, we propose two types of new nonpenetration conditions that allow us to more precisely describe the possibility of contact interaction of crack faces. These conditions correspond to two special cases of configurations of plate edges. In each case, the nonpenetration conditions are given in the form of a system of equalities and inequalities. For initial variational statements, we prove the existence and uniqueness of solutions in an appropriate Sobolev space. Assuming that the solutions are sufficiently smooth, we have found differential statements that are equivalent to the corresponding variational formulations. The relations of the obtained differential statements are compared with the well-known setting of an equilibrium problem for a Kirchhoff–Love plate with the general nonpenetration condition on crack faces.

Ключевые слова: variational inequality, nonpenetration condition, crack, Kirchhoff–Love plate.

УДК: 51-72

Поступила в редакцию: 24.04.2020
Исправленный вариант: 03.07.2020
Принята в печать: 30.08.2020

Язык публикации: английский

DOI: 10.25587/SVFU.2020.75.68.005



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