We consider material bodies exhibiting a response function for free energy, which depends on both the strain and its gradient. Toupin–Mindlin’s gradient elasticity is characterized by Cauchy stress tensors, which are given by space-like Euler–Lagrange derivative of the free energy with respect to the strain. The present paper aims at developing a first version of gradient elasticity of non-Toupin–Mindlin’s type, i.e., a theory employing Cauchy stress tensors, which are not necessarily expressed as Euler–Lagrange derivatives. This is accomplished in the framework of non-conventional thermodynamics. A one-dimensional boundary value problem is solved in detail in order to illustrate the differences of the present theory with Toupin–Mindlin’s g...
We outline a procedure for obtaining solutions of certain boundary value problems of a recently prop...
The nonlocal strain gradient elasticity theory is being widely used to address structural problems a...
Within the strain gradient elasticity we discuss the dynamic boundary conditions taking into account...
We consider material bodies exhibiting a response function for free energy, which depends on both th...
AbstractA stress gradient elasticity theory is developed which is based on the Eringen method to add...
International audienceA stress gradient continuum theory is presented that fundamentally differs fro...
A closed set of Eulerian evolution equations for nonisothermal finite isotropic and anisotropic elas...
A gradient plasticity theory for small deformations is presented within the framework of nonlocal co...
We discuss the problem of finding strain function whose gradient coincides with a given stress-s...
International audienceA new stress-gradient elasticity theory has recently been proposed by Forest &...
A gradient theory of grade two based on an axiomatic conception of a nonlocal continuum theory for m...
Generalized continua exhibiting gradient effects are addressed through a method grounded on the ener...
Artículo de publicación ISISome simple boundary value problems are studied, for a new class of elast...
We outline a procedure for obtaining solutions of certain boundary value problems of a recently prop...
The nonlocal strain gradient elasticity theory is being widely used to address structural problems a...
Within the strain gradient elasticity we discuss the dynamic boundary conditions taking into account...
We consider material bodies exhibiting a response function for free energy, which depends on both th...
AbstractA stress gradient elasticity theory is developed which is based on the Eringen method to add...
International audienceA stress gradient continuum theory is presented that fundamentally differs fro...
A closed set of Eulerian evolution equations for nonisothermal finite isotropic and anisotropic elas...
A gradient plasticity theory for small deformations is presented within the framework of nonlocal co...
We discuss the problem of finding strain function whose gradient coincides with a given stress-s...
International audienceA new stress-gradient elasticity theory has recently been proposed by Forest &...
A gradient theory of grade two based on an axiomatic conception of a nonlocal continuum theory for m...
Generalized continua exhibiting gradient effects are addressed through a method grounded on the ener...
Artículo de publicación ISISome simple boundary value problems are studied, for a new class of elast...
We outline a procedure for obtaining solutions of certain boundary value problems of a recently prop...
The nonlocal strain gradient elasticity theory is being widely used to address structural problems a...
Within the strain gradient elasticity we discuss the dynamic boundary conditions taking into account...