Elastoplastic Equilibrium of a Hollow Thick-Walled Radially Inhomogeneous Ball

Vladimir I. Andreev

doi:10.4028/www.scientific.net/KEM.805.198

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HomeKey Engineering MaterialsKey Engineering Materials Vol. 805Elastoplastic Equilibrium of a Hollow Thick-Walled...

Elastoplastic Equilibrium of a Hollow Thick-Walled Radially Inhomogeneous Ball

Abstract:

The article deals with the axisymmetric elastoplastic problem for a hollow thick-walled ball (plane deformed state), loaded from the inside and outside by uniform pressures proportional to one parameter. The material is considered to be perfectly plastic, with the elastic modulus and yield strength generally are arbitrary functions of the radius. In addition, the material is considered to be incompressible in both plastic and elastic zones. On the basis of the criteria for the plasticity of Huber - Mises and Tresca - Saint-Venant, the radius at which the first plastic deformations occur is determined. It is shown that, depending on the functions of the inhomogeneity of elastic and plastic parameters and loads, the occurrence of plastic deformations is possible both on the surfaces and on the inner walls of the ball.

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Periodical:

Key Engineering Materials (Volume 805)

Pages:

198-203

DOI:

https://doi.org/10.4028/www.scientific.net/KEM.805.198

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Online since:

June 2019

Authors:

Vladimir I. Andreev*

Keywords:

Elasticity, Inhomogeneity, Perfect Plasticity, Plasticity Criteria

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References

[1] G. B. Kolchin, The Planar problems of the theory of elasticity of the inhomogeneous bodies, Stiinta, Kishinev, (1977).

Google Scholar

[2] V. A. Lomakin, Theory of elasticity of inhomogeneous bodies, Moscow state University, Moscow, (1976).

Google Scholar

[3] V. I. Andreev, Some problems and methods of mechanics of inhomogeneous bodies, ASV, Moscow, (2002).

Google Scholar

[4] W. Olszak, W. Urbanowski, J. Rychlewski. Sprężysto-plastyczny gruboscienny walec niejednorodny pod działaniem parcia wewnetrznego i siły podłużnej, Arch. mech. stos., VII 3 (1955) 315-336.

Google Scholar

[5] V. Olszak, J. Rychlewski, W. Urbanowski, The Theory of plasticity of inhomogeneous bodies, Mir, Moscow, (1964).

Google Scholar

[6] V. I. Andreev, E. V. Barmenkova, The modeling of the real building object by using the model of a two-layer beam of variable rigidity, AMM, 204-208 (2012) 3596-3599.

DOI: 10.4028/www.scientific.net/amm.204-208.3596

Google Scholar

[7] N. Tsybin, R. Turusov, V. Andreev and A. Kolesnikov, Stress-strain state of a three-layer rod. Comparison of the results of analytical and numerical calculations with the experiment, Matec Web of Conferences, 196 (2018) 01057.

DOI: 10.1051/matecconf/201819601057

Google Scholar

[8] V. I. Andreev, Mechanics of inhomogeneous bodies, YURAYT, Moscow, (2015).

Google Scholar