Mechanics of Solids
A Journal of Russian Academy of Sciences

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Issues > Archive of Issues > 2023-5 > pp.1545-1550

Archive of Issues

Total articles in the database:		11262
In Russian (Изв. РАН. МТТ):		8011
In English (Mech. Solids):		3251

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N.B. Rasulova and T.M. Mahmudzade, "Solution of the Dynamic Lame Problem," Mech. Solids. 58 (5), 1545-1550 (2023)
Year	2023	Volume	58	Number	5	Pages	1545-1550
DOI	10.3103/S0025654423600137
Title	Solution of the Dynamic Lame Problem
Author(s)	N.B. Rasulova (Institute of Mathematics and Mechanics, Azerbaijan National Academy of Sciences, Baku, AZ1141 Azerbaijan, rasulova@gmail.com) T.M. Mahmudzade (Baku State University, Baku, AZ1148 Azerbaijan, tehminemahmudzade1996@gmail.com)
Abstract	The well-known Lame problem, posed in 1852, involves solving the static equilibrium of a parallelepiped with free side surfaces subjected to action of opposite end forces. In this article, the same problem for a more complicated case of impacts of end forces is considered. An exact analytical solution of this problem is found. Emphasizing the particular difficulty of solving this problem, Lamé, in his book "Leçons sur la thorie mathematique de Ielasticite des corps solides" (Paris, 1852), wrote: "C’est une sorte d’engine aussi digne d’exercer la sagasite des analystes que le fameux problem des trios corps de la Mécanique celeste", – "This is a kind of drive, as worthy of training the clairvoyance of analysts as the famous three-body problem of celestial mechanics." At that time, this problem was the subject of a prize from the Paris Academy of Sciences, that was intended for the one who solved the Lamé problem. Despite this, to date, no solution has been found even for a static case of this problem, not to mention the complicated version of the problem.
Keywords	parallelepiped, Lame equation, nonstationary waves, Laplace transform
Received	10 July 2022	Revised	15 December 2022	Accepted	06 January 2023
Link to Fulltext	https://link.springer.com/article/10.3103/S0025654423600137
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