Elastic field and effective moduli of periodic composites with arbitrary inhomogeneity distribution
This paper develops a semi-analytic model for periodically structured composites, of which each period contains an arbitrary distribution of particles/fibers or inhomogeneities in a three-dimensional space. The inhomogeneities can be of arbitrary shape and have multiple phases. The model is develope...
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sg-ntu-dr.10356-982922020-03-07T13:22:18Z Elastic field and effective moduli of periodic composites with arbitrary inhomogeneity distribution Zhou, Kun School of Mechanical and Aerospace Engineering This paper develops a semi-analytic model for periodically structured composites, of which each period contains an arbitrary distribution of particles/fibers or inhomogeneities in a three-dimensional space. The inhomogeneities can be of arbitrary shape and have multiple phases. The model is developed using the Equivalent Inclusion Method in conjunction with a fast Fourier Transform algorithm and the Conjugate Gradient Method. The interactions among inhomogeneities within one computational period are fully taken into account. An accurate knowledge of the stress field of the composite is obtained by setting the computational period to contain one or more structural periods of the composite. The effective moduli of the composite are calculated from average stresses and elastic strains. The model is used to analyze the stress field and effective moduli of anisotropic composites that have cubic symmetry. It shows that the bulk and shear moduli predicted by the present model are well located within the Hashin-Shtrikman bounds. The study also shows that the stress field of the composite can be significantly affected by the distribution of inhomogeneities even though the effective moduli are not affected much. 2013-07-26T02:59:04Z 2019-12-06T19:53:16Z 2013-07-26T02:59:04Z 2019-12-06T19:53:16Z 2011 2011 Journal Article Zhou, K. (2012). Elastic field and effective moduli of periodic composites with arbitrary inhomogeneity distribution. Acta Mechanica, 223(2), 293-308. https://hdl.handle.net/10356/98292 http://hdl.handle.net/10220/12353 10.1007/s00707-011-0559-y en Acta mechanica © 2011 Springer-Verlag. |
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This paper develops a semi-analytic model for periodically structured composites, of which each period contains an arbitrary distribution of particles/fibers or inhomogeneities in a three-dimensional space. The inhomogeneities can be of arbitrary shape and have multiple phases. The model is developed using the Equivalent Inclusion Method in conjunction with a fast Fourier Transform algorithm and the Conjugate Gradient Method. The interactions among inhomogeneities within one computational period are fully taken into account. An accurate knowledge of the stress field of the composite is obtained by setting the computational period to contain one or more structural periods of the composite. The effective moduli of the composite are calculated from average stresses and elastic strains. The model is used to analyze the stress field and effective moduli of anisotropic composites that have cubic symmetry. It shows that the bulk and shear moduli predicted by the present model are well located within the Hashin-Shtrikman bounds. The study also shows that the stress field of the composite can be significantly affected by the distribution of inhomogeneities even though the effective moduli are not affected much. |
| author2 |
School of Mechanical and Aerospace Engineering |
| author_facet |
School of Mechanical and Aerospace Engineering Zhou, Kun |
| format |
Article |
| author |
Zhou, Kun |
| spellingShingle |
Zhou, Kun Elastic field and effective moduli of periodic composites with arbitrary inhomogeneity distribution |
| author_sort |
Zhou, Kun |
| title |
Elastic field and effective moduli of periodic composites with arbitrary inhomogeneity distribution |
| title_short |
Elastic field and effective moduli of periodic composites with arbitrary inhomogeneity distribution |
| title_full |
Elastic field and effective moduli of periodic composites with arbitrary inhomogeneity distribution |
| title_fullStr |
Elastic field and effective moduli of periodic composites with arbitrary inhomogeneity distribution |
| title_full_unstemmed |
Elastic field and effective moduli of periodic composites with arbitrary inhomogeneity distribution |
| title_sort |
elastic field and effective moduli of periodic composites with arbitrary inhomogeneity distribution |
| publishDate |
2013 |
| url |
https://hdl.handle.net/10356/98292 http://hdl.handle.net/10220/12353 |
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