We discuss existence, uniqueness, regularity, and homogenization results for some nonlinear time-dependent material models. One of the methods for proving existence and uniqueness is the so-called energetic formulation, based on a global stability condition and on an energy balance. As for the two-scale homogenization we use the recently developed method of periodic unfolding and periodic folding. We also take advantage of the abstract Γ-convergence theory for rate-independent evolutionary problems
International audienceThe mathematical tools for the up-scaling from micro to macro in periodic medi...
We study the stochastic and periodic homogenization 1-homogeneous convex functionals. We prove some ...
This article focuses on computational multiscale methods for the mechanical response of nonlinear he...
We discuss existence, uniqueness, regularity, and homogenization results for some nonlinear time-dep...
This paper is devoted to the two-scale homogenization for a class of rate-independent systems descri...
This book is about the explicit elimination of fast oscillatory scales in dynamical systems, which i...
In a first part we consider evolutionary systems given as generalized gradient systems and discuss v...
The limit behavior of a periodic assembly of a finite number of elasto-plastic phases is investigat...
We discuss rate-independent engineering models for the multi-dimensional behaviour of ferroelectric ...
We present a variant of the Cahn-Hilliard energy model for immiscible fluids which incorporates the ...
A higher-order homogenization method for linear elastic structures is proposed. While most existing ...
This article focuses on computational multiscale methods for the mechanical response of nonlinear he...
Abstract. This article is devoted to the study of the asymptotic behavior of the zero-energy deforma...
International audiencePhysical reliability of the known asymptotic homogenization models of periodic...
Computational homogenization is nowadays one of the most active research topics in computational mec...
International audienceThe mathematical tools for the up-scaling from micro to macro in periodic medi...
We study the stochastic and periodic homogenization 1-homogeneous convex functionals. We prove some ...
This article focuses on computational multiscale methods for the mechanical response of nonlinear he...
We discuss existence, uniqueness, regularity, and homogenization results for some nonlinear time-dep...
This paper is devoted to the two-scale homogenization for a class of rate-independent systems descri...
This book is about the explicit elimination of fast oscillatory scales in dynamical systems, which i...
In a first part we consider evolutionary systems given as generalized gradient systems and discuss v...
The limit behavior of a periodic assembly of a finite number of elasto-plastic phases is investigat...
We discuss rate-independent engineering models for the multi-dimensional behaviour of ferroelectric ...
We present a variant of the Cahn-Hilliard energy model for immiscible fluids which incorporates the ...
A higher-order homogenization method for linear elastic structures is proposed. While most existing ...
This article focuses on computational multiscale methods for the mechanical response of nonlinear he...
Abstract. This article is devoted to the study of the asymptotic behavior of the zero-energy deforma...
International audiencePhysical reliability of the known asymptotic homogenization models of periodic...
Computational homogenization is nowadays one of the most active research topics in computational mec...
International audienceThe mathematical tools for the up-scaling from micro to macro in periodic medi...
We study the stochastic and periodic homogenization 1-homogeneous convex functionals. We prove some ...
This article focuses on computational multiscale methods for the mechanical response of nonlinear he...