The limit behavior of a periodic assembly of a finite number of elasto-plastic phases is investigated as the period becomes vanishingly small. A limit quasi-static evolution is derived through two-scale convergence techniques. It can be thermodynamically viewed as an elasto-plastic model, albeit with an infinite number of internal variables
In this paper a numerically developed homogenized constitutive relation for the global behaviour of ...
The elasto-plastic quasi-static evolution of a multi-phase material -- a material with a pointwise ...
The introduced notion of locally periodic two-scale convergence allows one to average a wider range ...
We investigate the deformation of heterogeneous plastic materials. The model uses internal variables...
The theory of the two-scale convergence was applied to homogenization of elasto-plastic composites w...
International audienceIn this paper, a consistent theory of homogenization for complex heterogeneous...
We study the asymptotic behavior of a system modeling a composite material made of an elastic period...
This paper is devoted to the two-scale homogenization for a class of rate-independent systems descri...
We study the n-dimensional wave equation with an elasto-plastic nonlinear stress-strain relation. We...
International audienceWe study the asymptotic behavior of a system modeling a composite material mad...
We introduce a model of dynamic visco-elasto-plastic evolution in the linearly elastic regime and pr...
In this work, we investigate the limits of classical homogenization theories pertaining to homogeniz...
Abstract. We introduce a model of dynamic visco-elasto-plastic evolution in the linearly elastic reg...
We demonstrate how the problem of finding the effective property of quasiperiodic constitutive relat...
We discuss existence, uniqueness, regularity, and homogenization results for some nonlinear time-dep...
In this paper a numerically developed homogenized constitutive relation for the global behaviour of ...
The elasto-plastic quasi-static evolution of a multi-phase material -- a material with a pointwise ...
The introduced notion of locally periodic two-scale convergence allows one to average a wider range ...
We investigate the deformation of heterogeneous plastic materials. The model uses internal variables...
The theory of the two-scale convergence was applied to homogenization of elasto-plastic composites w...
International audienceIn this paper, a consistent theory of homogenization for complex heterogeneous...
We study the asymptotic behavior of a system modeling a composite material made of an elastic period...
This paper is devoted to the two-scale homogenization for a class of rate-independent systems descri...
We study the n-dimensional wave equation with an elasto-plastic nonlinear stress-strain relation. We...
International audienceWe study the asymptotic behavior of a system modeling a composite material mad...
We introduce a model of dynamic visco-elasto-plastic evolution in the linearly elastic regime and pr...
In this work, we investigate the limits of classical homogenization theories pertaining to homogeniz...
Abstract. We introduce a model of dynamic visco-elasto-plastic evolution in the linearly elastic reg...
We demonstrate how the problem of finding the effective property of quasiperiodic constitutive relat...
We discuss existence, uniqueness, regularity, and homogenization results for some nonlinear time-dep...
In this paper a numerically developed homogenized constitutive relation for the global behaviour of ...
The elasto-plastic quasi-static evolution of a multi-phase material -- a material with a pointwise ...
The introduced notion of locally periodic two-scale convergence allows one to average a wider range ...