The variational approach for boundary value problems related to non-linear materials is presented. The approach is based on the introduced integral convexity argument and monotone operator theory. This permits to obtain an existence and uniqueness of the solution within the range of Kachanov’s theory, under natural and general conditions. The introduced argument allows to prove monotonicity of the sequence of potentials on the sequence of iterations. As a result monotonicity of the iteration process for elastoplastic problems is obtained. Theoretical results are illustrated by computational experiments
We discuss a new solution algorithm for solving elastoplastic problems with hardening. The one time-...
For a class of elastic-plastic constitutive laws with nonlinear kinematic and isotropic hardening, t...
Abstract. The computational nonlinear PDEs involve minimisation problems with various striking chall...
A class of elastoplastic relations with non-linear mixed hardening is addressed in the framework of ...
The rate elasto-plastic structural problem with hardening is presented and is cast within the genera...
An extended version of generalized standard elasto-plastic material is considered in the framework o...
The initial boundary value problem of quasistatic elastoplasticity is considered here, as a variatio...
In this diploma thesis, fundamental results on the theory of operator equations are presented. The m...
Summarization: A convex, multilevel decomposition algorithm is proposed in this paper for the soluti...
International audienceThe objective of this article is the modelling and the numerical simulation of...
A thermodynamically consistent formulation of nonlocal plasticity in the framework of the internal v...
Summary. In the last 10–15 years a number of very powerful methods for general convex programming ha...
Variational methods are applied to prove the existence of weak solutions for boundary value problems...
AbstractA thermodynamically consistent formulation of nonlocal plasticity in the framework of the in...
In this talk, a variational model for gradient plasticity is proposed, which is based on an energy f...
We discuss a new solution algorithm for solving elastoplastic problems with hardening. The one time-...
For a class of elastic-plastic constitutive laws with nonlinear kinematic and isotropic hardening, t...
Abstract. The computational nonlinear PDEs involve minimisation problems with various striking chall...
A class of elastoplastic relations with non-linear mixed hardening is addressed in the framework of ...
The rate elasto-plastic structural problem with hardening is presented and is cast within the genera...
An extended version of generalized standard elasto-plastic material is considered in the framework o...
The initial boundary value problem of quasistatic elastoplasticity is considered here, as a variatio...
In this diploma thesis, fundamental results on the theory of operator equations are presented. The m...
Summarization: A convex, multilevel decomposition algorithm is proposed in this paper for the soluti...
International audienceThe objective of this article is the modelling and the numerical simulation of...
A thermodynamically consistent formulation of nonlocal plasticity in the framework of the internal v...
Summary. In the last 10–15 years a number of very powerful methods for general convex programming ha...
Variational methods are applied to prove the existence of weak solutions for boundary value problems...
AbstractA thermodynamically consistent formulation of nonlocal plasticity in the framework of the in...
In this talk, a variational model for gradient plasticity is proposed, which is based on an energy f...
We discuss a new solution algorithm for solving elastoplastic problems with hardening. The one time-...
For a class of elastic-plastic constitutive laws with nonlinear kinematic and isotropic hardening, t...
Abstract. The computational nonlinear PDEs involve minimisation problems with various striking chall...