In this paper, we consider extensions of the gradient elasticity models proposed earlier by the second author to describe materials with fractional non-locality and fractality using the techniques developed recently by the first author. We derive a generalization of three-dimensional continuum gradient elasticity theory, starting from integral relations and assuming a weak non-locality of power-law type that gives constitutive relations with fractional Laplacian terms, by utilizing the fractional Taylor series in wave-vector space. In the sequel, we consider more general field equations with fractional derivatives of non-integer order to describe nonlinear elastic effects for gradient materials with power-law long-range interactions in the ...
In this paper we derive and solve nonlocal elasticity a model describing the elastic behavior of com...
Discrete models of dislocations in fractional nonlocal materials are suggested. The proposed models ...
This paper aims to formulate the three-dimensional (3D) problem of non-local elasticity in terms of ...
A relationship between discrete and continuous fractional-order nonlocal elasticity theory is discus...
This short chapter provides a fractional generalization of gradient mechanics, an approach (original...
After a brief review on the ability of continuum gradient elasticity (GradEla) to eliminate singular...
Creep and relaxation tests, performed on various materials like polymers, rubbers and so on are well...
An introductory discussion on a (weakly non-local) gradient generalization of some one-dimensional e...
n a previous paper [Comput. Methods Appl. Mech. Eng. 191 (2001) 3], the framework for the mechanics ...
Several enriched continuum mechanics theories have been proposed by the scientific community in orde...
This paper builds on the recently begun extension of continuum thermomechanics to fractal porous med...
International audienceWe introduce positive elastic potentials in the harmonic approximation leading...
One dimensional discrete systems, such as axial lattices, may be investigated by using some enriched...
The research of a formulation to model non-local interactions in the mechanical behavior of matter i...
The rapid growth of fields such as metamaterials, composites, architected materials, porous solids, ...
In this paper we derive and solve nonlocal elasticity a model describing the elastic behavior of com...
Discrete models of dislocations in fractional nonlocal materials are suggested. The proposed models ...
This paper aims to formulate the three-dimensional (3D) problem of non-local elasticity in terms of ...
A relationship between discrete and continuous fractional-order nonlocal elasticity theory is discus...
This short chapter provides a fractional generalization of gradient mechanics, an approach (original...
After a brief review on the ability of continuum gradient elasticity (GradEla) to eliminate singular...
Creep and relaxation tests, performed on various materials like polymers, rubbers and so on are well...
An introductory discussion on a (weakly non-local) gradient generalization of some one-dimensional e...
n a previous paper [Comput. Methods Appl. Mech. Eng. 191 (2001) 3], the framework for the mechanics ...
Several enriched continuum mechanics theories have been proposed by the scientific community in orde...
This paper builds on the recently begun extension of continuum thermomechanics to fractal porous med...
International audienceWe introduce positive elastic potentials in the harmonic approximation leading...
One dimensional discrete systems, such as axial lattices, may be investigated by using some enriched...
The research of a formulation to model non-local interactions in the mechanical behavior of matter i...
The rapid growth of fields such as metamaterials, composites, architected materials, porous solids, ...
In this paper we derive and solve nonlocal elasticity a model describing the elastic behavior of com...
Discrete models of dislocations in fractional nonlocal materials are suggested. The proposed models ...
This paper aims to formulate the three-dimensional (3D) problem of non-local elasticity in terms of ...