Bridging of length scales through gradient theory and diffusion equations of dislocations
From MaRDI portal
Publication:704530
DOI10.1016/J.CMA.2003.12.021zbMath1079.74514OpenAlexW1968008683MaRDI QIDQ704530
George Z. Voyiadjis, Robert J. Dorgan
Publication date: 13 January 2005
Published in: Computer Methods in Applied Mechanics and Engineering (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.cma.2003.12.021
Small-strain, rate-independent theories of plasticity (including rigid-plastic and elasto-plastic materials) (74C05) Micromechanical theories (74A60)
Related Items (2)
A micromorphic approach to stress gradient elasticity theory with an assessment of the boundary conditions and size effects ⋮ A thermodynamic approach to non-local damage modelling of concrete
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Remarks on media with microstructures
- On a proposal for a continuum with microstructure
- A model for finite-deformation plasticity
- On the concept of relative and plastic spins and its implications to large deformation theories. II: Anisotropic hardening plasticity
- A variational principle for gradient plasticity
- Computational inelasticity
- A phenomenological theory for strain gradient effects in plasticity
- On the continuum formulation of higher-gradient plasticity for single and polycrystals
- Adiabatic shear banding in high speed machining of Ti-6Al-4V: Experiments and modeling
- The physics of plastic deformation
- Elasticity theory of materials with long range cohesive forces
- On nonlocal elasticity
- On Finite Plastic Flow of Crystalline Solids and Geomaterials
- Nonlocal Continuum Damage, Localization Instability and Convergence
- Fully implicit integration and consistent tangent modulus in elasto‐plasticity
- Harmonic Dispersion Analysis of Incremental Waves in Uniaxially Prestressed Plastic and Viscoplastic Bars, Plates, and Unbounded Media
This page was built for publication: Bridging of length scales through gradient theory and diffusion equations of dislocations
