I will describe a multiscale asymptotic framework for the analysis of the macroscopic behaviour of periodic
two-material composites with high contrast in a finite-strain setting. I will start by introducing the nonlinear
description of a composite consisting of a stiff material matrix and soft, periodically distributed inclusions. I shall then focus
on the loading regimes when the applied load is small or of order one in terms of the period of the composite structure.
I will show that this corresponds to the situation when the displacements on the stiff component are situated in the vicinity
of a rigid-body motion. This allows to replace, in the homogenisation limit, the nonlinear material law of the stiff component
by its linearised version. As a main result, I derive (rigorously in the spirit of $\Gamma$-convergence) a limit functional
that allows to establish a precise two-scale expansion for minimising sequences. This is joint work with M. Cherdantsev and
S. Neukamm.