Gradient-dependent plasticity can be used to achieve mesh-objective results upon loss of well-posedness of the initial/boundary value problem because of the introduction of strain softening, non-associated flow, and geometric nonlinearity. A prominent class of gradient plasticity models considers a dependence of the yield strength on the Laplacian of the hardening parameter, usually an invariant of the plastic strain tensor. This inclusion causes the consistency condition to become a partial differential equation, in addition to the momentum balance. At the internal moving boundary, one has to impose appropriate boundary conditions on the hardening parameter or, equivalently, on the plastic multiplier. This internal boundary condition can b...
International audienceThe paper is devoted to the numerical implementation of a strain gradient plas...
AbstractThis paper compares and evaluates strain-gradient extensions of the conventional plasticity ...
We elaborate on a generalized plasticity model which belongs to the class of gradient models suggest...
Gradient-dependent plasticity can be used to achieve mesh-objective results upon loss of well-posedn...
Implicit gradient plasticity models incorporate higher-order spatial gradients via an additional Hel...
Gradient enhanced material models can potentially preserve well-posedness of incremental boundary va...
In gradient-dependent plasticity theory, the yield strength depends on the Laplacian of an equivalen...
The initial boundary value problem corresponding to a model of strain gradient plasticity due to [Gu...
The paper presents the theory and the numerics of a thermodynamically consistent formulation of grad...
Classical continuum mechanics theories are largely insufficient in capturing size effects observed i...
Includes bibliographical references (p. [221]-239).An investigation of a model of gradient plasticit...
In this work we discuss a gradient plasticity formulation which relies on the introduction of higher...
In gradient-dependent plasticity theory, the yield, strength depends on the Laplacian of an equivale...
This work presents the theory and the numerics of a thermodynamically consistent formulation of geom...
Summary. The geometrical method for assessment of discontinuous bifurcation condi-tions is extended ...
International audienceThe paper is devoted to the numerical implementation of a strain gradient plas...
AbstractThis paper compares and evaluates strain-gradient extensions of the conventional plasticity ...
We elaborate on a generalized plasticity model which belongs to the class of gradient models suggest...
Gradient-dependent plasticity can be used to achieve mesh-objective results upon loss of well-posedn...
Implicit gradient plasticity models incorporate higher-order spatial gradients via an additional Hel...
Gradient enhanced material models can potentially preserve well-posedness of incremental boundary va...
In gradient-dependent plasticity theory, the yield strength depends on the Laplacian of an equivalen...
The initial boundary value problem corresponding to a model of strain gradient plasticity due to [Gu...
The paper presents the theory and the numerics of a thermodynamically consistent formulation of grad...
Classical continuum mechanics theories are largely insufficient in capturing size effects observed i...
Includes bibliographical references (p. [221]-239).An investigation of a model of gradient plasticit...
In this work we discuss a gradient plasticity formulation which relies on the introduction of higher...
In gradient-dependent plasticity theory, the yield, strength depends on the Laplacian of an equivale...
This work presents the theory and the numerics of a thermodynamically consistent formulation of geom...
Summary. The geometrical method for assessment of discontinuous bifurcation condi-tions is extended ...
International audienceThe paper is devoted to the numerical implementation of a strain gradient plas...
AbstractThis paper compares and evaluates strain-gradient extensions of the conventional plasticity ...
We elaborate on a generalized plasticity model which belongs to the class of gradient models suggest...