Thin-walled beams with a cross-section of arbitrary geometry: derivation of linear theories starting from 3D nonlinear elasticity

Abstract

The subject of this paper is the rigorous derivation of lower dimensional models for a nonlinearly elastic thin-walled beam whose cross-section is given by a thin tubular neighbourhood of a smooth curve. Denoting by h and δh, respectively, the diameter and the thickness of the cross-section, we analyse the case where the scaling factor of the elastic energy is of order εh2, with εh/δh2 → l ∈ [0, +∞). Different linearized models are deduced according to the relative order of magnitude of δh with respect to h.