Email this article Application of boundary integral equations for analyzing the dynamics of elastic, viscoelastic, and poroelastic bodies
- Authors: Belov A.A.1, Igumnov L.A.1, Litvinchuk S.Y.1, Metrikin V.S.1
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Affiliations:
- Institute of Mechanics
- Issue: Vol 51, No 6 (2016)
- Pages: 677-683
- Section: Article
- URL: https://ogarev-online.ru/0025-6544/article/view/162822
- DOI: https://doi.org/10.3103/S0025654416060078
- ID: 162822
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Abstract
Two approaches (classical and nonclassical) of the boundary integral equation method for solving three-dimensional dynamical boundary value problems of elasticity, viscoelasticity, and poroelasticity are considered. The boundary integral equation model is used for porous materials. The Kelvin–Voigt model and the weakly singular hereditary Abel kernel are used to describe the viscoelastic properties. Both approaches permit solving the dynamic problems exactly not only in the isotropic but also in the anisotropic case. The boundary integral equation solution scheme is constructed on the basis of the boundary element technique. The numerical results obtained by the classical and nonclassical approaches are compared.
About the authors
A. A. Belov
Institute of Mechanics
Email: litvinchuk@mech.unn.ru
Russian Federation, pr. Gagarina 23-6, GSP-1000, Nizhnii Novgorod, 603950
L. A. Igumnov
Institute of Mechanics
Email: litvinchuk@mech.unn.ru
Russian Federation, pr. Gagarina 23-6, GSP-1000, Nizhnii Novgorod, 603950
S. Yu. Litvinchuk
Institute of Mechanics
Author for correspondence.
Email: litvinchuk@mech.unn.ru
Russian Federation, pr. Gagarina 23-6, GSP-1000, Nizhnii Novgorod, 603950
V. S. Metrikin
Institute of Mechanics
Email: litvinchuk@mech.unn.ru
Russian Federation, pr. Gagarina 23-6, GSP-1000, Nizhnii Novgorod, 603950
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