A fast, one-equation integration algorithm for the Lemaitre ductile damage model
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Publication:3150143
DOI10.1002/cnm.511zbMath1098.74742OpenAlexW2146885937MaRDI QIDQ3150143
Publication date: 29 September 2002
Published in: Communications in Numerical Methods in Engineering (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1002/cnm.511
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Related Items (4)
An efficient 3D implicit approach for the thermomechanical simulation of elastic-viscoplastic materials submitted to high strain rate and damage ⋮ On the theoretical and numerical modelling of Armstrong-Frederick kinematic hardening in the finite strain regime. ⋮ Analytical solution to the 1D Lemaitre's isotropic damage model and plane stress projected implicit integration procedure ⋮ On the finite element prediction of damage growth and fracture initiation in finitely deforming ductile materials
Uses Software
Cites Work
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- Continuum damage mechanics and local approach to fracture: Numerical procedures
- Comparison of different finite deformation inelastic damage models within multiplicative elastoplasticity for ductile materials
- An implicit integration algorithm for plane stress damage coupled elastoplasticity
- A computational framework for a class of fully coupled models for elastoplastic damage at finite strains with reference to the linearization aspects
- An integration algorithm and the corresponding consistent tangent operator for fully coupled elastoplastic and damage equations
- Numerical implementation and analysis of a class of metal plasticity models coupled with ductile damage
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