Transmission problems in the theory of elastic hemitropic materials
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Publication:3502170
DOI10.1080/00036810701714198zbMath1136.74018OpenAlexW2038936475WikidataQ58138042 ScholiaQ58138042MaRDI QIDQ3502170
David Natroshvili, Avtandil Gachechiladze, Roland Gachechiladze, Ioannis G. Stratis
Publication date: 22 May 2008
Published in: Applicable Analysis (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/00036810701714198
Existence of solutions of dynamical problems in solid mechanics (74H20) Uniqueness of solutions of dynamical problems in solid mechanics (74H25) Elastic materials (74B99) Regularity of solutions of dynamical problems in solid mechanics (74H30)
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Cites Work
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- Theory of function spaces
- Noncentrosymmetry in micropolar elasticity
- Steady state oscillation problems in the theory of elasticity for chiral materials
- Size-dependent elastic fields of embedded inclusions in isotropic chiral solids
- Pseudo-differential boundary problems in Lp, spaces
- The elastic field outside an ellipsoidal inclusion
- Boundary Integral Operators on Lipschitz Domains: Elementary Results
- Non ‐ Classical Mixed Interface Problems for Anisotropic Bodies
- Microcontinuum Field Theories
- Mathematical problems of the theory of elasticity of chiral materials for Lipschitz domains
- Singular Integrals and Boundary Value Problems
- Elastic and viscoelastic behavior of chiral materials
- The Green formula and layer potentials
