Numerical simulation of dislocation motion in disordered crystals with high Peierls relief is performed. A sharp drop in dislocation mobility in the region of weak external fields is revealed. When pulse loading is applied, the dislocation mobility decreases as the pulse frequency increases. It is shown that the dislocation mobility drop under the action of both stationary and pulse external forces results from sublinearity in kink propagation in a random force field.Une simulation numérique du mouvement de dislocations dans des cristaux désordonnés avec de hautes barrières de Peierls est présentée. Une chute brutale de la mobilité des dislocations dans la région des champs externes faibles est révélée. Quand la charge impulsionnelle est ap...
This thesis consists of two parts. The first part explores a 2-d edge dislocation model to demonstra...
The dynamics of large amounts of dislocations governs the plastic response of crystalline materials....
<p>This thesis consists of two parts. The first part explores a 2-d edge dislocation model to demons...
Numerical simulation of dislocation motion in disordered crystals with high Peierls relief is perfor...
The motion of an overdamped string in a periodic potential under the action of an external driving f...
The aim of this contribution is to present the current state of our research in the field of numeric...
Introduction The aim of this contribution is to present the current state of our re-search in the fi...
Isolated kinks on thermally fluctuating edge, and edge dislocations in bcc iron are simulated under ...
A phase-field model of a crystalline material is introduced to develop the necessary theoretical fra...
Prediction of the plastic deformation behavior of single crystals based on the collective dynamics o...
We introduce a dislocation density tensor and derive its kinematic evolution law from a phase field ...
We consider a lattice dynamics model of a straight screw dislocation moving in a simple cubic lattic...
The dislocation content of each active slip system in a crystal is defined by its Dislocation Densit...
We consider a simple discrete model for screw dislocations in crystals. Using a variational discrete...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Nuclear Engineering, 2001.Vita.Incl...
This thesis consists of two parts. The first part explores a 2-d edge dislocation model to demonstra...
The dynamics of large amounts of dislocations governs the plastic response of crystalline materials....
<p>This thesis consists of two parts. The first part explores a 2-d edge dislocation model to demons...
Numerical simulation of dislocation motion in disordered crystals with high Peierls relief is perfor...
The motion of an overdamped string in a periodic potential under the action of an external driving f...
The aim of this contribution is to present the current state of our research in the field of numeric...
Introduction The aim of this contribution is to present the current state of our re-search in the fi...
Isolated kinks on thermally fluctuating edge, and edge dislocations in bcc iron are simulated under ...
A phase-field model of a crystalline material is introduced to develop the necessary theoretical fra...
Prediction of the plastic deformation behavior of single crystals based on the collective dynamics o...
We introduce a dislocation density tensor and derive its kinematic evolution law from a phase field ...
We consider a lattice dynamics model of a straight screw dislocation moving in a simple cubic lattic...
The dislocation content of each active slip system in a crystal is defined by its Dislocation Densit...
We consider a simple discrete model for screw dislocations in crystals. Using a variational discrete...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Nuclear Engineering, 2001.Vita.Incl...
This thesis consists of two parts. The first part explores a 2-d edge dislocation model to demonstra...
The dynamics of large amounts of dislocations governs the plastic response of crystalline materials....
<p>This thesis consists of two parts. The first part explores a 2-d edge dislocation model to demons...