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Zapiski Nauchnykh Seminarov POMI, 2021, Volume 506, Pages 130–174
(Mi znsl7149)
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A model of a plane deformation state of a two-dimensional plate with small almost periodic clamped parts of the edge
S. A. Nazarova, J. Taskinenb a Institute of Problems of Mechanical Engineering, Russian Academy of Sciences, St. Petersburg
b University of Helsinki, Department of Mathematics and Statistics, Pietari Kalminkatu 5, P. O. Box 68, 00014 Helsinki, Finland
Abstract:
We construct asymptotics, as the small positive parameters $h$ and $\varepsilon$ tend to zero, of the displacement and stress fields in a planar isotropic body whose boundary is rigidly fixed at $h$-periodially posed boundary parts of length $O(h \varepsilon)$. We propose an asymptotic model that involves the Winkler–Robin boundary conditions connecting the displacement vector and the vector of normal stresses at the boundary, and provides acceptable approximation for the solution of the original problem for a wide range of the parameters $h$ and $\varepsilon$. Error estimates are based on various weighted inequalities.
Key words and phrases:
isotropic planar elastic body, small fixation zones, Winkler–Robin boundary conditions, asymptotics, convergence.
Received: 16.09.2021
Citation:
S. A. Nazarov, J. Taskinen, “A model of a plane deformation state of a two-dimensional plate with small almost periodic clamped parts of the edge”, Mathematical problems in the theory of wave propagation. Part 51, Zap. Nauchn. Sem. POMI, 506, POMI, St. Petersburg, 2021, 130–174
Linking options:
https://www.mathnet.ru/eng/znsl7149 https://www.mathnet.ru/eng/znsl/v506/p130
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