Elastic properties of two-dimensional two-phase composites with isotropic phases
Abstract
Formal series of powers of Fourier coefficients for the effective elastic constants of a heterogeneous material (Herring's series) are considered. It is demonstrated that, on their basis, all the known exact solutions of an elastic problem for a two-dimensional two-phase composite can be found. It is also shown how a full renormalization of the series for the inverse bulk modulus can be carried out. A general expression for Young's modulus is deduced, leading to considerable simplifications in some special cases. All results have been obtained without any restrictions on the Fourier coefficients of local parameters of the composite.
- Publication:
-
Mechanics of Composite Materials
- Pub Date:
- December 2010
- DOI:
- 10.1007/s11029-010-9168-4
- Bibcode:
- 2010MCM....46..513A
- Keywords:
-
- microstructure;
- composite;
- heterogeneous material;
- elastic properties