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Asymptotic behaviour of a cylindrical elastic structure periodically reinforced along identical fibers

arXiv:1011.4367 · doi:10.1093/imamat/66.6.567

Abstract

We describe the asymptotic behaviour of a cylindrical elastic body, reinforced along identical $ε$-periodically distributed fibers of size $r_ε$, with $0 < r_ε < ε$, filled in with some different elastic material, when this small parameter $ε$ goes to 0. The case of small deformations and small strains is considered. We exhibit a critical size of the fibers and a critical link between the radius of the fibers and the size of the Lamé coefficients of the reinforcing elastic material. Epi-convergence arguments are used in order to prove this asymptotic behaviour. The proof is essentially based on the construction of appropriate test-functions.