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Moscow University Mechanics Bulletin

, Volume 74, Issue 5, pp 103–110 | Cite as

Splitting of Initial Boundary Value Problems in Anisotropic Linear Elasticity Theory

  • M. U. NikabadzeEmail author
Article
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Abstract

The splitting of initial boundary value problems in the theories of elasticity is considered for some anisotropic media. In particular, the initial boundary value problems of the micropolar classical theory of elasticity are represented using the tensor-block matrix operators (or tensor operators). In the case of isotropic micropolar elastic media known also as isotropic or transversally isotropic classical media, we propose the tensor-block matrix operators of algebraic cofactors corresponding to the tensor-block matrix operators of the initial boundary value problems, which allows us to split these problems.

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Notes

Acknowledgments

This work was supported by the Shota Rustaveli National Science Foundation (project no. DI-2016-41).

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Copyright information

© Allerton Press, Inc. 2019

Authors and Affiliations

  1. 1.Faculty of Mechanics and MathematicsMoscow State UniversityMoscowRussia

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