International audienceWe give a new derivation, based on the complementary energy formulation, of a simplified model for a multi-structure made up of two anisotropic hyper-elastic bodies connected by a thin strong material layer. The model is obtained by identifying the Mosco limit of the stored complementary energy functional when the thickness is of order ε and the stiffness of order 1/ε where ε is a positive real adimensional parameter. In order to prove the existence of the displacement associated with the stress we use a suitable weak version of the Saint-Venant compatibility condition also known as Donati's theorem
We show how bilateral, linear, elastic foundations (i.e., Winkler foundations) often regarded as heu...
The complementary variational problem is studied for thin elastic shells undergoing large deflection...
AbstractWe derive a plate theory for (possibly slightly stressed) heterogeneous multilayers in the r...
International audienceWe give a new derivation, based on the complementary energy formulation, of a ...
(will be inserted by the editor) Variational convergences of dual energy functionals for elastic mat...
In a recent paper, we deduced a new energy functional for pure traction problems in elasticity, as t...
The energy functional of linear elasticity is obtained as Gamma-limit of suitable rescalings of the ...
We are concerned in this work with the asymptotic behavior of an assemblage whose components are a t...
AbstractWe propose a model of a multi-material with strong interface, whose thickness and stiffness ...
The development of novel high-tech materials is a critical aspect of the engineering sciences and ha...
summary:The problem of a unilateral contact between elastic bodies with an apriori bounded contact z...
A limit elastic energy for the pure traction problem is derived from re-scaled nonlinear energies of...
In my thesis, we derive a two dimensional energy model for deformations of unloaded elastic films as...
Linear elasticity can be rigorously derived from finite elasticity under the assumption of small loa...
summary:A weak solution to the boundary-value problems both in the Mindlin's theory of elasticity wi...
We show how bilateral, linear, elastic foundations (i.e., Winkler foundations) often regarded as heu...
The complementary variational problem is studied for thin elastic shells undergoing large deflection...
AbstractWe derive a plate theory for (possibly slightly stressed) heterogeneous multilayers in the r...
International audienceWe give a new derivation, based on the complementary energy formulation, of a ...
(will be inserted by the editor) Variational convergences of dual energy functionals for elastic mat...
In a recent paper, we deduced a new energy functional for pure traction problems in elasticity, as t...
The energy functional of linear elasticity is obtained as Gamma-limit of suitable rescalings of the ...
We are concerned in this work with the asymptotic behavior of an assemblage whose components are a t...
AbstractWe propose a model of a multi-material with strong interface, whose thickness and stiffness ...
The development of novel high-tech materials is a critical aspect of the engineering sciences and ha...
summary:The problem of a unilateral contact between elastic bodies with an apriori bounded contact z...
A limit elastic energy for the pure traction problem is derived from re-scaled nonlinear energies of...
In my thesis, we derive a two dimensional energy model for deformations of unloaded elastic films as...
Linear elasticity can be rigorously derived from finite elasticity under the assumption of small loa...
summary:A weak solution to the boundary-value problems both in the Mindlin's theory of elasticity wi...
We show how bilateral, linear, elastic foundations (i.e., Winkler foundations) often regarded as heu...
The complementary variational problem is studied for thin elastic shells undergoing large deflection...
AbstractWe derive a plate theory for (possibly slightly stressed) heterogeneous multilayers in the r...