Email this article Asymptotic of the Solution of the Contact Problem for a Thin Elastic Plate and a Viscoelastic Layer
- Authors: Panasenko G.P.1,2, Elbert A.E.3
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Affiliations:
- National Research University “Moscow Power Engineering Institute”
- University of Lyon
- Institute of Mechanics and Mathematics, Ural Branch
- Issue: Vol 97, No 2 (2018)
- Pages: 109-112
- Section: Mathematics
- URL: https://journal-vniispk.ru/1064-5624/article/view/225469
- DOI: https://doi.org/10.1134/S1064562418020023
- ID: 225469
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Abstract
The contact problem for a thin elastic rigid plate described by the elasticity equations and a viscoelastic layer is solved. The ratio of the thicknesses of the plate and the layer is a small parameter, while the ratio of the Young’s moduli of the layer and the plate is proportional to the cube of this parameter. The asymptotic expansion of the solution is constructed. A theorem on the estimate of the error of asymptotic approximation is formulated. Such problem appears in geophysics, in modeling of the Earth crust–magma interaction.
About the authors
G. P. Panasenko
National Research University “Moscow Power Engineering Institute”; University of Lyon
Author for correspondence.
Email: grigory.panasenko@univ-st-etienne.fr
Russian Federation, Moscow; Lyon
A. E. Elbert
Institute of Mechanics and Mathematics, Ural Branch
Email: grigory.panasenko@univ-st-etienne.fr
Russian Federation, Yekaterinburg
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