Title of article
Variational asymptotic homogenization of temperature-dependent heterogeneous materials under finite temperature changes
Author/Authors
Teng، نويسنده , , Chong and Yu، نويسنده , , Wenbin and Chen، نويسنده , , Ming Y.، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2012
Pages
11
From page
2439
To page
2449
Abstract
The variational asymptotic method is used to construct a thermomechanical model for homogenizing heterogeneous materials made of temperature-dependent constituents subject to finite temperature changes with the restriction that the strain is small. First, we presented the derivation for a Helmholtz free energy suitable for finite temperature changes using basic thermodynamics concepts. Then we used this energy to construct a thermomechanical micromechanics model, extending our previous work which was restricted to small temperature changes. The new model is implemented in the computer code VAMUCH using the finite element method for the purpose of handling real heterogeneous materials with arbitrary periodic microstructures. A few examples including binary composites, fiber reinforced composites, and particle reinforced composites are used to demonstrate the application of this model and the errors introduced by assuming small temperature changes when they are not necessarily small.
Keywords
Thermoelasticity , Temperature-dependent properties , Finite temperature changes , Variational asymptotic method , VAMUCH
Journal title
International Journal of Solids and Structures
Serial Year
2012
Journal title
International Journal of Solids and Structures
Record number
1401960
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