Laminar elastic composites with crystallographic symmetry
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[1] V. Zhikov,et al. AVERAGING AND G-CONVERGENCE OF DIFFERENTIAL OPERATORS , 1979 .
[2] V. Zhikov. G-convergence of elliptic operators , 1983 .
[3] M. Gurtin. The Linear Theory of Elasticity , 1973 .
[4] R. N. Thurston. Waves in solids , 1974 .
[5] B. Paul. PREDICTION OF ELASTIC CONSTANTS OF MULTI-PHASE MATERIALS , 1959 .
[6] P. Butler. Point Group Symmetry Applications , 1981 .
[7] S. Shtrikman,et al. A variational approach to the theory of the elastic behaviour of multiphase materials , 1963 .
[8] Gilles A. Francfort,et al. Homogenization and optimal bounds in linear elasticity , 1986 .
[9] Robert V. Kohn,et al. Optimal bounds for the effective energy of a mixture of isotropic, incompressible, elastic materials , 1988 .
[10] D. Bergman,et al. Improved rigorous bounds on the effective elastic moduli of a composite material , 1984 .
[11] Robert Lipton,et al. On the effective elasticity of a two-dimensional homogenised incompressible elastic composite , 1988, Proceedings of the Royal Society of Edinburgh: Section A Mathematics.
[12] J. Ball,et al. Fine phase mixtures as minimizers of energy , 1987 .
[13] Z. Hashin. VISCOSITY OF RIGID PARTICLE SUSPENSIONS , 1969 .
[14] Andrej Cherkaev,et al. On the existence of solutions to some problems of optimal design for bars and plates , 1984 .
[15] R. Kohn,et al. Variational bounds on the effective moduli of anisotropic composites , 1988 .