On the derivation of nonlinear rod theories from three-dimensional elasticity

We show that the nonlinear bending theory of shells arises as a Γ -limit of three-dimensional nonlinear elasticity.

A one-dimensional model of a linearly elastic thin rod is deduced from threedimensional elasticity by regarding the Kirchhoff hypotheses as internal constraints prevailing in a three-dimensional tubular region. It follows from such an assumption that the displacement and the strain fields are linear

We consider the direct approach to the theory of rods, in which the thin body is modelled as a deformable curve with a triad of rigidly rotating orthonormal vectors attached to every material point. In this context, we employ the theory of elastic materials with voids to describe the mechanical beha

The effect of the application of an incremental method is the approximation of the three-dimensional nonlinear equations of finite elasticity by a sequence of linear problems. We give here sufficient conditions which guarantee the convergence of such a method.