In this PhD thesis, we propose a theoretical framework for studying referential and spatial evolutions in nonlinear elasticity. We use the referential evolution-- considering an evolving reference configuration-- to formulate a geometric theory of anelasticity. Indeed, an anelasticity source (such as temperature, defects, or growth) can manifest itself such that the body would fail to find a relaxed state in the Euclidean physical space. However, a reference configuration should by essence be stress-free so that one can properly quantify the strain with respect to it-- and the stress by means of a constitutive equation. Identifying the reference configuration with an abstract manifold-- material manifold-- allows for a rational constructio...
This dissertation is a general theoretical study of modeling material behavior and of how anisotropi...
The objective of this contribution is the formulation and algorithmic treatment of a phenomenologica...
In this note we consider 1D problems within the context of a new class of elastic bodies. Under suit...
Many thin three-dimensional elastic bodies can be reduced to elastic shells: two-dimensional elastic...
Elasticity is the prototype of constitutive models in Continuum Mechanics. In the nonlinear range, t...
A description of texture evolution at large strain plasticity is developed. Texture evolution is def...
We derive geometrically linearized theories for incompressible materials from nonlinear elasticity t...
A phenomenological model for evolving anisotropy at large strains is presented. The model is formula...
In this chapter the basic equations of nonlinear elasticity theory needed for the analysis of the el...
We present a theoretical framework for studying a large class of elastic and anelastic problems in n...
AbstractA phenomenological model for evolving anisotropy at large strains is presented. The model is...
The paper discusses a constitutive model for finite deformation anisotropic elasto-plasticity, withi...
We present a geometric theory of nonlinear solids with distributed dislocations. In this theory the ...
The phenomenological approach to the modelling of the mechanical response of arteries usually assume...
The evolution of a distribution of material inhomogeneities (defects, dislo-cations, etc.) is invest...
This dissertation is a general theoretical study of modeling material behavior and of how anisotropi...
The objective of this contribution is the formulation and algorithmic treatment of a phenomenologica...
In this note we consider 1D problems within the context of a new class of elastic bodies. Under suit...
Many thin three-dimensional elastic bodies can be reduced to elastic shells: two-dimensional elastic...
Elasticity is the prototype of constitutive models in Continuum Mechanics. In the nonlinear range, t...
A description of texture evolution at large strain plasticity is developed. Texture evolution is def...
We derive geometrically linearized theories for incompressible materials from nonlinear elasticity t...
A phenomenological model for evolving anisotropy at large strains is presented. The model is formula...
In this chapter the basic equations of nonlinear elasticity theory needed for the analysis of the el...
We present a theoretical framework for studying a large class of elastic and anelastic problems in n...
AbstractA phenomenological model for evolving anisotropy at large strains is presented. The model is...
The paper discusses a constitutive model for finite deformation anisotropic elasto-plasticity, withi...
We present a geometric theory of nonlinear solids with distributed dislocations. In this theory the ...
The phenomenological approach to the modelling of the mechanical response of arteries usually assume...
The evolution of a distribution of material inhomogeneities (defects, dislo-cations, etc.) is invest...
This dissertation is a general theoretical study of modeling material behavior and of how anisotropi...
The objective of this contribution is the formulation and algorithmic treatment of a phenomenologica...
In this note we consider 1D problems within the context of a new class of elastic bodies. Under suit...