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A Journal of Russian Academy of Sciences		 Founded
in January 1966
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IssuesArchive of Issues2022-8pp.1953-1957

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V.A. Eremeyev, "On Strong Ellipticity and Infinitesimal Stability in Third-Order Nonlinear Strain Gradient Elasticity," Mech. Solids. 57 (8), 1953-1957 (2022)
Year 2022 Volume 57 Number 8 Pages 1953-1957
DOI 10.3103/S002565442208012X
Title On Strong Ellipticity and Infinitesimal Stability in Third-Order Nonlinear Strain Gradient Elasticity
Author(s) V.A. Eremeyev (University of Cagliari, Cagliari, 09124 Italy; Lobachevsky National Research Nizhny Novgorod State University, Nizhny Novgorod, 603105 Russia, eremeyev.victor@gmail.com)
Abstract The article formulates sufficient conditions for infinitesimal stability of affine deformation for Dirichlet-type boundary conditions using third-order nonlinear gradient elasticity theory. The conditions consist of three inequalities associated with strong ellipticity of the equilibrium equations.
Keywords strain gradient elasticity theory, strong ellipticity, infinitesimal stability
Received 21 February 2022Revised 06 August 2022Accepted 18 August 2022
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