Dynamic perfect plasticity and damage in viscoelastic solids

Elisa Davoli (Corresponding author), Tomáš Roubíček, Ulisse Stefanelli

Publications: Contribution to journalArticlePeer Reviewed

Abstract

In this paper we analyze an isothermal and isotropic model for viscoelastic media combining linearized perfect plasticity (allowing for concentration of plastic strain and development of shear bands) and damage effects in a dynamic setting. The interplay between the viscoelastic rheology with inertia, elasto-plasticity, and unidirectional rate-dependent incomplete damage affecting both the elastic and viscous response, as well as the plastic yield stress, is rigorously characterized by showing existence of weak solutions to the constitutive and balance equations of the model. The analysis relies on the notions of plastic-strain measures and bounded-deformation displacements, on sophisticated time-regularity estimates to establish a duality between acceleration and velocity of the elastic displacement, on the theory of rate-independent processes for the energy conservation in the dynamical-plastic part, and on the proof of the strong convergence of the elastic strains. Existence of suitably defined weak solutions (even conserving energy) is proved rather constructively by using a staggered two-step time discretization scheme.

Original languageEnglish
Article numbere201800161
Number of pages27
JournalZeitschrift für Angewandte Mathematik und Mechanik
Volume99
Issue number7
DOIs
Publication statusPublished - Jul 2019

Austrian Fields of Science 2012

  • 101002 Analysis
  • 101028 Mathematical modelling

Keywords

  • APPROXIMATION
  • DENSITY RESULT
  • ELASTOPLASTICITY
  • Kelvin-Voigt viscoelastic rheology
  • MODEL
  • QUASI-STATIC EVOLUTION
  • STRAINS
  • cohesive damage
  • functions of bounded deformation
  • inertia
  • perfect plasticity
  • staggered time discretisation
  • weak solution

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