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Autori principali: Balitactac, C., Canzani, Y., Hallyburton, R. S., Mott, J., Rodriguez, C.
Natura: Preprint
Pubblicazione: 2025
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Accesso online:https://arxiv.org/abs/2508.05453
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author Balitactac, C.
Canzani, Y.
Hallyburton, R. S.
Mott, J.
Rodriguez, C.
author_facet Balitactac, C.
Canzani, Y.
Hallyburton, R. S.
Mott, J.
Rodriguez, C.
contents We derive a class of two-dimensional shell energies for thin elastic bodies exhibiting small-length scale effects modeled via strain-gradient elasticity. Building on the final author's earlier work on plate models, the kinetic and stored surface energies arise as the leading cubic order-in-thickness expressions for three-dimensional kinetic energies with velocity-gradient effects and a broad class of isotropic stored energies, each possessing an intrinsic length scale $\ell$. These include both classical Toupin-Mindlin and more recent dilatational strain-gradient elastic stored energies. A key insight of this work is that consistent asymptotic reductions of strain-gradient theories necessarily begin at cubic order-in-thickness due to the natural scaling assumption $\ell = O(h)$ where $h$ is the thickness of the body. In the limit as the intrinsic length scales vanish, the theory reduces to Koiter's classical shell energy. We illustrate the theory using the shell energy derived from dilatational strain-gradient elasticity, computing the body force, edge tractions and edge double force densities required to support a variety of finite deformations.
format Preprint
id arxiv_https___arxiv_org_abs_2508_05453
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Shell energies derived from three-dimensional isotropic strain-gradient elasticity
Balitactac, C.
Canzani, Y.
Hallyburton, R. S.
Mott, J.
Rodriguez, C.
Mathematical Physics
We derive a class of two-dimensional shell energies for thin elastic bodies exhibiting small-length scale effects modeled via strain-gradient elasticity. Building on the final author's earlier work on plate models, the kinetic and stored surface energies arise as the leading cubic order-in-thickness expressions for three-dimensional kinetic energies with velocity-gradient effects and a broad class of isotropic stored energies, each possessing an intrinsic length scale $\ell$. These include both classical Toupin-Mindlin and more recent dilatational strain-gradient elastic stored energies. A key insight of this work is that consistent asymptotic reductions of strain-gradient theories necessarily begin at cubic order-in-thickness due to the natural scaling assumption $\ell = O(h)$ where $h$ is the thickness of the body. In the limit as the intrinsic length scales vanish, the theory reduces to Koiter's classical shell energy. We illustrate the theory using the shell energy derived from dilatational strain-gradient elasticity, computing the body force, edge tractions and edge double force densities required to support a variety of finite deformations.
title Shell energies derived from three-dimensional isotropic strain-gradient elasticity
topic Mathematical Physics
url https://arxiv.org/abs/2508.05453