This paper studies a vectorial problem in the calculus of variations arising in the theory of martensitic microstructure. The functional has an integral representation where the integrand is a nonconvex function of the gradient with exactly four minima. We prove that the Young measure corresponding to a minimising sequence is homogeneous and unique for certain linear boundary conditions. We also consider the singular perturbation of the problem by higher-order gradients. We study an example of microstructure involving infinite sequential lamination and calculate its energy and length scales in the zero limit of the perturbation
We consider a minimization problem for a one-homogeneous functional, under the constraint that funct...
The effective macroscopic behaviour of most materials depends significantly on the structure exhibit...
An important class of finite-strain elastoplasticity is based on the multiplicative decomposition of...
We introduce a new concept, the Young measure on micro-patterns, to study singularly perturbed varia...
We study some variational problems involving energy densities (functions that have to be minimized) ...
AbstractWe propose a model of a multi-material with strong interface, whose thickness and stiffness ...
The goal of this paper is to describe the oscillatory microstructure that can emerge from minimizing...
A variational problem arising as a model in martensitic phase transformation including surface ener...
Summary.: This paper addresses the numerical approximation of microstructures in crystalline phase t...
Energy functionals describing phase transitions in crystalline solids are often non-quasiconvex and ...
Abstract: "Validity of the Young measure representation is useful in the study of microstructure of ...
International audienceThis paper addresses the theoretical prediction of the quasiconvex hull of ene...
International audienceThis paper addresses the theoretical prediction of the quasiconvex hull of ene...
Martensitic microstructures are studied using variational models based on nonlinear elasticity. Some...
An important class of finite-strain elastoplasticity is based on the multiplicative decomposition of...
We consider a minimization problem for a one-homogeneous functional, under the constraint that funct...
The effective macroscopic behaviour of most materials depends significantly on the structure exhibit...
An important class of finite-strain elastoplasticity is based on the multiplicative decomposition of...
We introduce a new concept, the Young measure on micro-patterns, to study singularly perturbed varia...
We study some variational problems involving energy densities (functions that have to be minimized) ...
AbstractWe propose a model of a multi-material with strong interface, whose thickness and stiffness ...
The goal of this paper is to describe the oscillatory microstructure that can emerge from minimizing...
A variational problem arising as a model in martensitic phase transformation including surface ener...
Summary.: This paper addresses the numerical approximation of microstructures in crystalline phase t...
Energy functionals describing phase transitions in crystalline solids are often non-quasiconvex and ...
Abstract: "Validity of the Young measure representation is useful in the study of microstructure of ...
International audienceThis paper addresses the theoretical prediction of the quasiconvex hull of ene...
International audienceThis paper addresses the theoretical prediction of the quasiconvex hull of ene...
Martensitic microstructures are studied using variational models based on nonlinear elasticity. Some...
An important class of finite-strain elastoplasticity is based on the multiplicative decomposition of...
We consider a minimization problem for a one-homogeneous functional, under the constraint that funct...
The effective macroscopic behaviour of most materials depends significantly on the structure exhibit...
An important class of finite-strain elastoplasticity is based on the multiplicative decomposition of...