Non-Euclidean elasticity for rods and almost isometric embeddings of geodesic tubes

Abstract

We consider a geodesic γ of length 2L in an oriented Riemannian manifold ( M, g) and a thin tube *h around γ of radius h. We study an 'elastic' energy per unit volume Eh(u) of maps u from *h into another oriented Riemannian manifold ( M, g). The energy Eh is based on the squared distance of the differentials du from the set of orientation preserving linear maps between the corresponding tangent spaces. We prove a compactness result for sequences of maps uh for which h-4 Eh(uh) remains bounded and we study the -Limit of h-4 Eh(uh) as h 0 with respect to a suitable notion of convergence for uh that involves certain blow-ups in the radial direction. This -convergence result ge\-ne\-ra\-lizes work by Mora and M\"uller on the limiting energy of thin rods in the Euclidean setting. We also obtain an expression for the minimum of the limiting energy as a specific quadratic functional in the difference of the pullbacks of the curvature tensors of M and M along the curves γ and u γ, respectively, thus answering a question by Maor and Shachar, J. Elasticity 134 (2019), pp. 149--173.

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