This paper deals with necessary conditions and sufficient conditions for a weak local minimum of the energy of a hyperelastic body. We consider anisotropic bodies of arbitrary shape, subject to prescribed displacements on a given portion of the boundary. As an example, we consider the uniaxial stretching of a cylinder, in the two cases of compressible and incompressible material. In both cases we find that there is a continuous path across the natural state, made of local energy minimizers. For the Blatz-Ko compressible material and for the Mooney-Rivlin incompressible material, explicit estimates of the minimizing path are given and compared with those available in the literature
We prove the existence of energy-minimizing configurations for a two-dimensional, variational model ...
We deal with a model for an elastic material with a cohesive crack along a prescribed fracture set. ...
The energy functional of linear elasticity is obtained as Gamma-limit of suitable rescalings of the ...
The natural (stress-free) state of an elastic body is usually assumed to be a global energy minimiz...
In this communication we anticipate some results of a research in progress, whose purpose is to find...
New necessary conditions for energy-minimizing states of an incompressible, elastic body are found. ...
Abstract Consider a three-dimensional, homogeneous, compressible, hyperelastic body that occupies a ...
We study the stable configurations of a thin three-dimensional weakly prestrained rod subject to a t...
In this communication, we present a recent necessary and sufficient condition for the existence of a...
A limit elastic energy for the pure traction problem is derived from re-scaled nonlinear energies of...
We provide an approximation result for the pure traction problem of linearized elasticity in terms o...
Abstract Regularity properties for (local) minimizers of elastic energies have been challenging math...
We consider the problem of minimizing the bending or elastic energy among Jordan curves confined in ...
We show that the elastic energy of a closed curve has a minimizer among all plane simple regular clo...
We consider a double-layered prestrained elastic rod in the limit of vanishing cross section. For th...
We prove the existence of energy-minimizing configurations for a two-dimensional, variational model ...
We deal with a model for an elastic material with a cohesive crack along a prescribed fracture set. ...
The energy functional of linear elasticity is obtained as Gamma-limit of suitable rescalings of the ...
The natural (stress-free) state of an elastic body is usually assumed to be a global energy minimiz...
In this communication we anticipate some results of a research in progress, whose purpose is to find...
New necessary conditions for energy-minimizing states of an incompressible, elastic body are found. ...
Abstract Consider a three-dimensional, homogeneous, compressible, hyperelastic body that occupies a ...
We study the stable configurations of a thin three-dimensional weakly prestrained rod subject to a t...
In this communication, we present a recent necessary and sufficient condition for the existence of a...
A limit elastic energy for the pure traction problem is derived from re-scaled nonlinear energies of...
We provide an approximation result for the pure traction problem of linearized elasticity in terms o...
Abstract Regularity properties for (local) minimizers of elastic energies have been challenging math...
We consider the problem of minimizing the bending or elastic energy among Jordan curves confined in ...
We show that the elastic energy of a closed curve has a minimizer among all plane simple regular clo...
We consider a double-layered prestrained elastic rod in the limit of vanishing cross section. For th...
We prove the existence of energy-minimizing configurations for a two-dimensional, variational model ...
We deal with a model for an elastic material with a cohesive crack along a prescribed fracture set. ...
The energy functional of linear elasticity is obtained as Gamma-limit of suitable rescalings of the ...