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Existence of a solution for a nonlinearly elastic plane membrane “under tension”

Published online by Cambridge University Press:  15 August 2002

Daniel Coutand*
Affiliation:
Université Pierre et Marie Curie, Laboratoire d'Analyse Numérique, 4 Place Jussieu, 75252 Paris, France. [email protected].
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Abstract

A justification of the two-dimensional nonlinear “membrane”equations for a plate made of a Saint Venant-Kirchhoff material hasbeen given by Fox et al. [9] by means of the method of formal asymptotic expansions applied to the three-dimensional equations of nonlinear elasticity. This model, which retains the material-frame indifference of the originalthree dimensional problem in the sense that its energy density isinvariant under the rotations of ${\mathbb{R}}^3$ , is equivalent to finding thecritical points of a functional whose nonlinear part depends on the firstfundamental form of the unknown deformed surface. We establish here an existence result for these equations in the case of themembrane submitted to a boundary condition of “tension”, and we show that thesolution found in our analysis is injective and is the unique minimizer of thenonlinear membrane functional, which is not sequentially weakly lowersemi-continuous.We also analyze the behaviour of the membrane when the “tension” goes toinfinityand we conclude that a “well-extended” membrane may undergo largeloadings.

Type
Research Article
Copyright
© EDP Sciences, SMAI, 1999

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