Triantafyllidis, N., and Maker, B. N., 1985, “On the Comparison Between Microscopic and Macroscopic Instability Mechanisms in a Class of Fiber-Reinforced Composites,” ASME J. Appl. Mech., 52 , pp. 794–800.

Geymonat, G., Müller, S., and Triantafyllidis, N., 1993, “Homogenization of Nonlinearly Elastic Materials, Microscopic Bifurcation and Macroscopic Loss of Rank-One Convexity,” Arch. Ration. Mech. Anal., 122 , pp. 231–290.

Triantafyllidis, N., and Bardenhagen, S. G., 1996, “The Influence of Scale Size on the Stability of Periodic Solids and the Role of Associated Higher Order Gradient Continuum Models,” J. Mech. Phys. Solids

[CrossRef], 44 , pp. 1891–1928.

Schraad, M. W., and Triantafyllidis, N., 1997, “Scale Effects in Media With Periodic and Nearly Periodic Microstructures, II—Failure Mechanisms,” ASME J. Appl. Mech., 64 , pp. 763–771.

Triantafyllidis, N., and Bardenhagen, S. G., 1996, “Onset of Failure in Aluminum Honeycombs Under General In-plane Loading,” J. Mech. Phys. Solids

[CrossRef], 46 , pp. 1089–1124.

Nestorović, M., and Triantafyllidis, N., 2004, “Onset of Failure in Finitely Strained Layered Composites Subjected to Combined Normal and Shear Loading,” J. Mech. Phys. Solids, 52 , pp. 941–974.

Gong, L., Kyriakides, S., and Triantafyllidis, N., 2005, “On the Stability of Kelvin Cell Foams Under Compressive Loads,” J. Mech. Phys. Solids, 53 , pp. 771–794.

Hill, R., 1958, “A General Theory of Uniqueness and Stability in Elastic-Plastic Solids,” J. Mech. Phys. Solids

[CrossRef], 6 , pp. 236–249.

Nguyen, Q. S., and Triantafyllidis, N., 1989, “Plastic Bifurcation and Postbifurcation Analysis for Generalized Standard Continua,” J. Mech. Phys. Solids

[CrossRef], 37 , pp. 545–566.

Ball, J. M., 1977, “Convexity Conditions and Existence Theorems in Nonlinear Elasticity,” Arch. Ration. Mech. Anal., 63 , pp. 337–403.

Michel, J. C., 2005, work in preparation for publication.

Biot, M. A., 1965, "*Mechanics of Incremental Deformation*", Wiley, New York.

Abeyaratne, R., and Triantafyllidis, N., 1984, “An Investigation of Localization in a Porous Elastic Material Using Homogenization Theory,” ASME J. Appl. Mech., 51 , pp. 481–486.

Lopez-Pamiez, O., and Ponte-Castañeda, P., 2004, “Second-Order Estimates for the Macroscopic Response and Loss of Ellipticity in Porous Rubbers at Large Deformations,” J. Exp. Zool., 76 , pp. 247–287.

Lopez-Pamiez, O., and Ponte-Castañeda, P., 2003, “Second-Order Estimates for the Macroscopic for the Large Deformation Response of Particle Reinforced Rubbers,” C. R. Mec., 331 , pp. 1–8.