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IssuesArchive of Issues2024-2pp.581-604

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V.V. Vasiliev, "The Theory of Thin Elastic Plates–History and Current State of the Problem," Mech. Solids. 59 (2), 581-604 (2024)
Year 2024 Volume 59 Number 2 Pages 581-604
DOI 10.1134/S0025654424700286
Title The Theory of Thin Elastic Plates–History and Current State of the Problem
Author(s) V.V. Vasiliev (JSC Central Research Institute for Special Machinery, Khotkovo, 141371 Russia, vvvas@dol.ru)
Abstract The article is an analytical review and is devoted to the theory of thin, isotropic elastic plates. The basic relations of the theory based on the kinematic hypothesis are presented, according to which tangential displacements are distributed linearly over the thickness of the plate, and its deflection does not depend on the normal coordinate. As a result, a system of sixth-order equations was obtained for two potential functions: the penetrating potential, which determines the deflection of the plate, and the edge potential, which makes it possible to set three boundary conditions on the edge of the plate and eliminate the well-known contradiction in the theory of Kirchhoff plates. Problems that do not have a correct solution within the framework of Kirchhoff’s theory are considered - cylindrical bending of a plate with a free edge, bending of a rectangular plate with a non-classical hinge, torsion of a square plate by moments distributed along the contour, bending of a plate with a rigid stamp. In conclusion, a brief historical review of works devoted to the theory of plate bending is presented.
Keywords theory of thin elastic plates
Received 09 October 2023Revised 24 October 2023Accepted 27 October 2023
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