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Finite thermoelastoplasticity and creep under small elastic strains

Publication at Faculty of Mathematics and Physics |
2019

Abstract

A mathematical model for an elastoplastic continuum subject to large strains is presented. The inelastic response is modelled within the frame of rate-dependent gradient plasticity for non-simple materials.

Heat diffuses through the continuum by the Fourier law in the actual deformed configuration. Inertia makes the nonlinear problem hyperbolic.

The modelling assumption of small elastic Green-Lagrange strains is combined in a thermodynamically consistent way with the possibly large displacements and large plastic strain. The model is amenable to a rigorous mathematical analysis.

The existence of suitably defined weak solutions and a convergence result for Galerkin approximations is proved.