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Dimension reduction is used to derive the energy of non simple materials grade two thin films. Relaxation and convergence lead to a limit defined on a suitable space of bi-dimensional Young measures. The underlying ``deformation'' in the limit model takes into account the Cosserat theory.
A 3D-2D dimension reduction for −Δ is obtained. A power law approximation from −Δ as → 1 in terms of -convergence, duality and asymptotics for least gradient functions has also been provided.
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