Calculation of the Residual Stress Field of the Thin Circular Plate under Unsteady Thermal Action

Evgeniy Dats; Sergey Mokrin; Evgeniy Murashkin

doi:10.4028/www.scientific.net/KEM.685.37

Paper Titles

Multiscale Simulation of Cold Axisymmetric Deformation Processes
p.18

Control Problem for Unsteady Magnetohydrodynamic Flow of Viscous Heat Conducting Fluid
p.23

Mathematical Modeling of the Technological Process of Residual Stresses Relief in Metals at Low-Temperature Exposure
p.27

Steady Flow of Incompressible Elastic-Plastic Medium in a Spherical Matrix at Variable Loads
p.32

Calculation of the Residual Stress Field of the Thin Circular Plate under Unsteady Thermal Action
p.37

Numerical Analysis of Inverse Extremum Problems for the Nonlinear Nonstationary Diffusion-Reaction Equation
p.42

Pressure Losses of Power-Law Fluid Flow through an Axisymmetric Sudden Contraction
p.47

The Mathematical Model of Reflection and Refraction of the Longitudinal Shock Wave at the Interface of Two Nonlinear Elastic Media
p.51

Numerical Analysis of 2D Cloaking Problems Using Homogeneus Materials
p.56

HomeKey Engineering MaterialsKey Engineering Materials Vol. 685Calculation of the Residual Stress Field of the...

Calculation of the Residual Stress Field of the Thin Circular Plate under Unsteady Thermal Action

Abstract:

The dimensional problem of a formation of the residual stresses in the thin circular elastoplastic plate under the given thermal action was analytically solved. The generalized Prandtl-Reuss thermoelastoplastic model was used. The effect of the non-stationary temperature gradient on the residual stresses field formation was investigated under the condition that the yield stress depends on a temperature. The borders of the irreversible deformation domain and unloading domain were computed. The level of residual stresses was calculated.

You might also be interested in these eBooks

High Technology: Research and Applications 2015

View Preview

Info:

Periodical:

Key Engineering Materials (Volume 685)

Pages:

37-41

DOI:

https://doi.org/10.4028/www.scientific.net/KEM.685.37

Citation:

Cite this paper

Online since:

February 2016

Authors:

Evgeniy Dats, Sergey Mokrin*, Evgeniy Murashkin

Keywords:

Heat Conduction, Plasticity, Residual Strains, Residual Stresses, Thermal Stresses

Export:

RIS, BibTeX

Price:

Permissions CCC:

Request Permissions

Permissions PLS:

Request Permissions

Сopyright:

Citation:

* - Corresponding Author

References

[1] N.N. Rykalin, Calculation of Thermal Processes in Wending, Mashinostroenie, Moscow. 1951. [in Russian].

Google Scholar

[2] A.A. Burenin, E.P. Dats, E.V. Murashkin, Formation of the Residual Stress Field under Local Thermal Action, Mechanics of Solids. 49 (2014) 218-224.

DOI: 10.3103/s0025654414020113

Google Scholar

[3] Y. Orcan, U. Gamer, Elastic-Plastic deformation of centrally heated cylinder, Acta Mechanica. 90 (1991) 61–80.

DOI: 10.1007/bf01177400

Google Scholar

[4] A. Kovacs, Residual Stresses in Thermally Loaded Shrink Fits, Periodica Polytechnica, Ser. Mech. Eng. 40 (1996) 103-112.

Google Scholar

[5] M. Bengeri, W. Mack, The influence of the temperature dependence of the yield stress on the stress distribution in a thermally assembled elasticoplastic shrink fit, Acta Mechanica. 103 (1993) 243-257.

DOI: 10.1007/bf01180229

Google Scholar

[6] B.A. Boley, J.H. Weiner, Theory of Thermal Stresses, Wiley, New York, (1960).

Google Scholar

[7] H.S. Carslaw, J.C. Jager, Conduction of Heat in Solids, Clarendon Press, Oxford, (1959).

Google Scholar

[8] A.P. Babichev, N.A. Babushkina et al, Physical Values: Handbook, Energomatizdat. Moscow, 1991. [in Russian].

Google Scholar