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Main Author: Martin, A
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2410.07188
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author Martin, A
author_facet Martin, A
contents Commonly, for homogenization of fibrous media, fibers are approximated by ellipsoidal inclusions. Indeed, the solution of Eshelby's problem for an ellipsoid is well-known analytically. However, for a cylinder, the analytical solution is not easy to compute, and the internal field is not uniform (which makes the Hill tensor useless). We here propose to give some tools for computing main homogenization schemes based on Eshelby's problem, for finite circular cylinders. This document is also a companion to [1], where homogenization schemes like Dilute Scheme, Mori-Tanaka scheme [2] and Ponte Casta{ñ}eda and Willis scheme [3] are used.
format Preprint
id arxiv_https___arxiv_org_abs_2410_07188
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Eshelby-based homogenization schemes with finite circular cylinders
Martin, A
Classical Physics
Commonly, for homogenization of fibrous media, fibers are approximated by ellipsoidal inclusions. Indeed, the solution of Eshelby's problem for an ellipsoid is well-known analytically. However, for a cylinder, the analytical solution is not easy to compute, and the internal field is not uniform (which makes the Hill tensor useless). We here propose to give some tools for computing main homogenization schemes based on Eshelby's problem, for finite circular cylinders. This document is also a companion to [1], where homogenization schemes like Dilute Scheme, Mori-Tanaka scheme [2] and Ponte Casta{ñ}eda and Willis scheme [3] are used.
title Eshelby-based homogenization schemes with finite circular cylinders
topic Classical Physics
url https://arxiv.org/abs/2410.07188