This work aims at linking the levels of the continuum crystal plasticity with that of discrete dislocations. First, some former results about the kinematics of discrete dislocations are recalled. Then the fields at the continuum level are constructed by averaging the corresponding fields at the dislocation level. Under the assumptions of small elastic strains, small lattice curvature at the dislocation level and statistical homogeneity at the scale of the representative volume element the classical forms of the balance equations for the continuous fields can be retrieved. In addition, a multiplicative decomposition the deformation gradient in an elastic part and an irreversible part is achieved. While the elastic strains are assumed to be s...
This article is concerned with the development of a discrete theory of crystal elasticity and disloc...
We develop a nonlinear, three-dimensional phase field model for crystal plasticity which accounts fo...
Continuum frameworks of dislocation-based plasticity theories are gaining prominence in the research...
The plastic deformation of metals is the result of the motion and interaction of dislocations, line ...
We have recently proposed a nonlocal continuum crystal plasticity theory that is based on a statisti...
I discuss various mathematical constructions that combine together to provide a natural setting for ...
A two-dimensional nonlocal version of continuum crystal plasticity theory is proposed, which is base...
The objective of this contribution is a geometrically non-linear formulation of the continuum theory...
Conventional continuum mechanics models of inelastic deformation processes axe size scale independen...
Conventional continuum mechanics models of inelastic deformation processes are size scale independen...
This article is concerned with the development of a discrete theory of crystal elasticity and disloc...
Plastic deformation of crystalline solids is of both scientific and techno-logical interest. Over a ...
Crystal plasticity is governed by the motion of lattice dislocations. Although continuum theories of...
Thesis (Ph.D.), School of Mechanical and Materials Engineering, Washington State UniversityClassical...
This article is concerned with the development of a discrete theory of crystal elasticity and disloc...
We develop a nonlinear, three-dimensional phase field model for crystal plasticity which accounts fo...
Continuum frameworks of dislocation-based plasticity theories are gaining prominence in the research...
The plastic deformation of metals is the result of the motion and interaction of dislocations, line ...
We have recently proposed a nonlocal continuum crystal plasticity theory that is based on a statisti...
I discuss various mathematical constructions that combine together to provide a natural setting for ...
A two-dimensional nonlocal version of continuum crystal plasticity theory is proposed, which is base...
The objective of this contribution is a geometrically non-linear formulation of the continuum theory...
Conventional continuum mechanics models of inelastic deformation processes axe size scale independen...
Conventional continuum mechanics models of inelastic deformation processes are size scale independen...
This article is concerned with the development of a discrete theory of crystal elasticity and disloc...
Plastic deformation of crystalline solids is of both scientific and techno-logical interest. Over a ...
Crystal plasticity is governed by the motion of lattice dislocations. Although continuum theories of...
Thesis (Ph.D.), School of Mechanical and Materials Engineering, Washington State UniversityClassical...
This article is concerned with the development of a discrete theory of crystal elasticity and disloc...
We develop a nonlinear, three-dimensional phase field model for crystal plasticity which accounts fo...
Continuum frameworks of dislocation-based plasticity theories are gaining prominence in the research...