We investigate the deformation of heterogeneous plastic materials. The model uses internal variables and kinematic hardening, elastic and plastic strain are used in an infinitesimal strain theory. For periodic material properties with periodicity length scale h>0, we obtain the limiting system as h tends to 0. The limiting two-scale plasticity model coincides with well-known effective models. Our direct approach relies on abstract tools from two-scale convergence (regarding convex functionals and monotone operators) and on higher order estimates for solution sequences
We investigate corrector estimates for the solutions of a thermoelasticity problem posed in a highly...
The introduced notion of locally periodic two-scale convergence allows one to average a wider range ...
We demonstrate how the problem of finding the effective property of quasiperiodic constitutive relat...
We investigate the deformation of heterogeneous plastic materials. The model uses internal variable...
The theory of the two-scale convergence was applied to homogenization of elasto-plastic composites w...
Using the tool of two-scale convergence, we provide a rigorous mathematical setting for the homogeni...
Using the tool of two-scale convergence, we provide a rigorous mathematical setting for the homogeni...
The limit behavior of a periodic assembly of a finite number of elasto-plastic phases is investigat...
International audienceIn this paper, a consistent theory of homogenization for complex heterogeneous...
We study the n-dimensional wave equation with an elasto-plastic nonlinear stress-strain relation. We...
We study the asymptotic behavior of a system modeling a composite material made of an elastic period...
AbstractWithin the framework of isotropic strain gradient plasticity, a rate-independent constitutiv...
We revisit the homogenization process for a heterogeneous small strain gradient plasticity model con...
International audienceWe study the asymptotic behavior of a system modeling a composite material mad...
Plasticity equations describe the deformations e.g. of metal [1, 3]. As in elasticity, one describes...
We investigate corrector estimates for the solutions of a thermoelasticity problem posed in a highly...
The introduced notion of locally periodic two-scale convergence allows one to average a wider range ...
We demonstrate how the problem of finding the effective property of quasiperiodic constitutive relat...
We investigate the deformation of heterogeneous plastic materials. The model uses internal variable...
The theory of the two-scale convergence was applied to homogenization of elasto-plastic composites w...
Using the tool of two-scale convergence, we provide a rigorous mathematical setting for the homogeni...
Using the tool of two-scale convergence, we provide a rigorous mathematical setting for the homogeni...
The limit behavior of a periodic assembly of a finite number of elasto-plastic phases is investigat...
International audienceIn this paper, a consistent theory of homogenization for complex heterogeneous...
We study the n-dimensional wave equation with an elasto-plastic nonlinear stress-strain relation. We...
We study the asymptotic behavior of a system modeling a composite material made of an elastic period...
AbstractWithin the framework of isotropic strain gradient plasticity, a rate-independent constitutiv...
We revisit the homogenization process for a heterogeneous small strain gradient plasticity model con...
International audienceWe study the asymptotic behavior of a system modeling a composite material mad...
Plasticity equations describe the deformations e.g. of metal [1, 3]. As in elasticity, one describes...
We investigate corrector estimates for the solutions of a thermoelasticity problem posed in a highly...
The introduced notion of locally periodic two-scale convergence allows one to average a wider range ...
We demonstrate how the problem of finding the effective property of quasiperiodic constitutive relat...