We present a finite element description of Volterra dislocations using a thermal analogue and the integral representation of dislocations through stresses in the context of linear elasticity. Several analytical results are fully recovered for two dimensional edge dislocations. The full fields are reproduced for edge dislocations in isotropic and anisotropic bodies and for different configurations. Problems with dislocations in infinite medium, near free surfaces or bimaterial interfaces are studied. The efficiency of the proposed method is examined in more complex problems such as interactions of dislocations with inclusions, cracks, and multiple dislocation problems. The configurational (Peach-Koehler) force of the dislocations is calculat...
Conserved integrals of the Eshelby type representing energetic forces on dislocations, inclusions, v...
A new technique for the modelling of multiple dislocations based on introducing interior discontinui...
Dislocation models based on the Extended Finite Element Method (XFEM) are developed for thin shells ...
The present work gives a systematic and rigorous implementation of Volterra dislocations in ordinary...
A finite element description of variable core edge dislocations in the context of linear elasticity ...
The present work gives a systematic and rigorous implementation of (edge type) circular Volterra dis...
Articulo de publicacion SCOPUSOn using Noll’s theory of materially uniform but inhomogeneous bodies,...
The present work gives a systematic and rigorous implementation of (edge type) circular Volterra dis...
AbstractThe elastic displacements, stresses and interaction energy of arbitrarily shaped dislocation...
The fully coupled small deformation formulation of the thermal field dislocation mechanics model (Up...
We present a finite element method for the analysis of ductile crystals whose energy depends on the ...
AbstractTransversely isotropic materials or hexagonal crystals are commonly utilized in various engi...
An analytical formulation of the nodal forces induced by a dislocation segment on a surface element ...
International audienceConventional linear elasticity theory predicts the strain fields of a dislocat...
There are two distinct approaches to the description of dislocations in solids. Often discrete dislo...
Conserved integrals of the Eshelby type representing energetic forces on dislocations, inclusions, v...
A new technique for the modelling of multiple dislocations based on introducing interior discontinui...
Dislocation models based on the Extended Finite Element Method (XFEM) are developed for thin shells ...
The present work gives a systematic and rigorous implementation of Volterra dislocations in ordinary...
A finite element description of variable core edge dislocations in the context of linear elasticity ...
The present work gives a systematic and rigorous implementation of (edge type) circular Volterra dis...
Articulo de publicacion SCOPUSOn using Noll’s theory of materially uniform but inhomogeneous bodies,...
The present work gives a systematic and rigorous implementation of (edge type) circular Volterra dis...
AbstractThe elastic displacements, stresses and interaction energy of arbitrarily shaped dislocation...
The fully coupled small deformation formulation of the thermal field dislocation mechanics model (Up...
We present a finite element method for the analysis of ductile crystals whose energy depends on the ...
AbstractTransversely isotropic materials or hexagonal crystals are commonly utilized in various engi...
An analytical formulation of the nodal forces induced by a dislocation segment on a surface element ...
International audienceConventional linear elasticity theory predicts the strain fields of a dislocat...
There are two distinct approaches to the description of dislocations in solids. Often discrete dislo...
Conserved integrals of the Eshelby type representing energetic forces on dislocations, inclusions, v...
A new technique for the modelling of multiple dislocations based on introducing interior discontinui...
Dislocation models based on the Extended Finite Element Method (XFEM) are developed for thin shells ...