One-dimensional viscoelastic von Kármán theories derived from nonlinear thin-walled beams

Abstract: We derive an effective one-dimensional limit from a three-dimensional Kelvin-Voigt model for viscoelastic thin-walled beams, in which the elastic and the viscous stress tensor comply with a frame-indifference principle. The limiting system of equations comprises stretching, bending, and twisting both in the elastic and the viscous stress. It coincides with the model already identified via [24] and [26] by a successive dimension reduction, first from 3D to a 2D theory for von Kármán plates and then from 2D to a… Show more

“…Ever since its appearance, this rigidity result has had numerous applications in dimension-reduction problems providing a thorough understanding of thin elastic materials. We refer the reader to the by far nonexhaustive list [1,2,20,26,34,35,36,39,40,41,48,51,52,53,57,58,59,60,61,65,66] for references.…”

From atomistic systems to linearized continuum models for elastic materials with voids

“…Ever since its appearance, this rigidity result has had numerous applications in dimension-reduction problems providing a thorough understanding of thin elastic materials. We refer the reader to the by far nonexhaustive list [1,2,20,26,34,35,36,39,40,41,48,51,52,53,57,58,59,60,61,65,66] for references.…”

From atomistic systems to linearized continuum models for elastic materials with voids