N.K. Akhmedov scite author profile

In the paper the axisymmetric problem of elasticity theory is studied for the radially inhomogeneous sphere of small thickness that does not contain any of the poles 0 and [Formula: see text]. Here the case is considered when the elasticity modules vary linearly with respect to the radius. It is assumed that the lateral surface of the sphere is free of stresses, and at the ends of the sphere (at the conical sections) the stresses are set, leaving it in equilibrium. A characteristic equation is obtained and, based on its asymptotic analysis, the existence of three groups of roots is established with respect to the small parameter characterizing the thickness of the sphere. The corresponding homogeneous solutions are constructed, depending on the roots of the characteristic equation. It is shown that the penetrating solution corresponds to the first group of roots. The second group of roots corresponds to the solution of the edge effect type, similar to the edge effect in the applied theory of shells. The third group of roots corresponds to the boundary layer type solution localized in the conical sections. The solution corresponding to the first and second groups of roots determines the internal stress–strain state of the sphere. In the first term of the asymptotic, they can be considered as a solution in the applied theory of shells. The question of satisfying the boundary conditions at the ends (on the conical sections) of the sphere is considered using the variational Lagrange principle.

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Analysis of a three-dimensional problem of the theory of elasticity for an inhomogeneous truncated hollow cone

Akhmedov¹,

Mekhtiyev²

1993

Journal of Applied Mathematics and Mechanics

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Analysis of the structure of the boundary layer in the problem of the torsion of a laminated spherical shell

Akhmedov¹,

Ustinov²

2009

Journal of Applied Mathematics and Mechanics

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Asymptotic analysis of a 3D elasticity problem for a radially inhomogeneous transversally isotropic hollow cylinder

Akhmedov

Akperova

2011

Mech. Solids

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N.K. Akhmedov

Asymptotic analysis of three-dimensional problem of elasticity theory for radially inhomogeneous transversally-isotropic thin hollow spheres

Asymptotic behavior of the solution of an axisymmetric problem of elasticity theory for a sphere with variable elasticity modules

Analysis of a three-dimensional problem of the theory of elasticity for an inhomogeneous truncated hollow cone

Analysis of the structure of the boundary layer in the problem of the torsion of a laminated spherical shell

Asymptotic analysis of a 3D elasticity problem for a radially inhomogeneous transversally isotropic hollow cylinder

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