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Approximation of dynamic and quasi-static evolutions in elasto-plasticity by cap models

Abstract : This work is devoted to the analysis of elasto-plasticity models arising in soil mechanics. Contrary to the typical models mainly used for metals, it is required here to take into account plastic dilatancy due to the sensitivity of granular materials to hydrostatic pressure. The yield criterion thus depends on the mean stress and the elasticity domain is unbounded and not invariant in the direction of hydrostatic matrices. In the mechanical literature, so-called cap models have been introduced, where the elasticity domain is cut in the direction of hydrostatic stresses by means of a strain-hardening yield surface, called a cap. The purpose of this article is to study the well-posedness of plasticity models with unbounded elasticity sets in dynamical and quasi-static regimes. An asymptotic analysis as the cap is moved to in nity is also performed, which enables one to recover solutions to the uncapped model of perfect elasto-plasticity.
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https://hal.archives-ouvertes.fr/hal-00796980
Contributor : Jean-François Babadjian Connect in order to contact the contributor
Submitted on : Thursday, April 4, 2013 - 3:14:17 PM
Last modification on : Wednesday, December 9, 2020 - 3:12:01 PM
Long-term archiving on: : Friday, July 5, 2013 - 4:18:31 AM

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  • HAL Id : hal-00796980, version 2

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Jean-François Babadjian, Maria Giovanna Mora. Approximation of dynamic and quasi-static evolutions in elasto-plasticity by cap models. Quarterly of Applied Mathematics, American Mathematical Society, 2015, 73, pp.265-316. ⟨hal-00796980v2⟩

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