The biharmonic optimal support problem
Abstract
We establish a -convergence result for of a thin nonlinearly elastic 3D-plate of thickness which is assumed to be glued to a support region in the 2D-plane over the -2D-neighborhood of a given closed set . In the regime of very small vertical forces we identify the -limit as being the bi-harmonic energy, with Dirichlet condition on the gluing region , following a general strategy by Friesecke, James, and M\"uller that we have to adapt in presence of the glued region. Then we introduce a shape optimization problem that we call "optimal support problem" and which aims to find the best glued plate. In this problem the bi-harmonic energy is optimized among all possible glued regions that we assume to be connected and for which we penalize the length. By relating the dual problem with Griffith almost-minimizers, we are able to prove that any minimizer is regular outside a set of Hausdorff dimension strictly less then one.
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Cite
@article{arxiv.2404.00689,
title = {The biharmonic optimal support problem},
author = {Antoine Lemenant and Mohammad Reza Pakzad},
journal= {arXiv preprint arXiv:2404.00689},
year = {2024}
}
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41 pages