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Convergence of equilibria for bending-torsion models of rods with inhomogeneities

Published online by Cambridge University Press:  24 January 2019

Matthäus Pawelczyk*
Affiliation:
FB Mathematik, TU Dresden, 0 1062 Dresden, Germany ([email protected])

Abstract

We prove that, in the limit of vanishing thickness, equilibrium configurations of inhomogeneous, three-dimensional non-linearly elastic rods converge to equilibrium configurations of the variational limit theory. More precisely, we show that, as $h\searrow 0$, stationary points of the energy , for a rod $\Omega _h\subset {\open R}^3$ with cross-sectional diameter h, subconverge to stationary points of the Γ-limit of , provided that the bending energy of the sequence scales appropriately. This generalizes earlier results for homogeneous materials to the case of materials with (not necessarily periodic) inhomogeneities.

Type
Research Article
Copyright
Copyright © Royal Society of Edinburgh 2019

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