AbstractLattice models with long-range interactions of power-law type are suggested as a new type of microscopic model for fractional non-local elasticity. Using the transform operation, we map the lattice equations into continuum equation with Riesz derivatives of non-integer orders. The continuum equations that are obtained from the lattice model describe fractional generalization of non-local elasticity models. Particular solutions and correspondent asymptotic of the fractional differential equations for displacement fields are suggested for the static case
Abstract: We consider a general class of discrete nonlinear Schrödinger equations (DNLS) on the latt...
The rapid growth of fields such as metamaterials, composites, architected materials, porous solids, ...
A mechanically-based nonlocal Timoshenko beam model, recently proposed by the authors, hinges on the...
AbstractDiscrete models of dislocations in fractional nonlocal materials are suggested. The proposed...
A relationship between discrete and continuous fractional-order nonlocal elasticity theory is discus...
AbstractA non-local continuum model including long-range forces between non-adjacent volume elements...
Discrete models of dislocations in fractional nonlocal materials are suggested. The proposed models ...
An elastic continuum model with long-range forces is addressed in this study within the context of a...
A non-local continuum model including long-range forces between non-adjacent volume elements has bee...
The mechanically-based model of non-local elasticity with long-range interactions is framed, in this...
International audienceWe introduce positive elastic potentials in the harmonic approximation leading...
We develop physically admissible lattice models in the harmonic approximation which define by Hamilt...
In this chapter, fractional calculus has been used to account for long-range interactions between ma...
Mechanical vibrations of non-local systems with long-range, cohesive, interactions between material ...
In this paper, we consider extensions of the gradient elasticity models proposed earlier by the seco...
Abstract: We consider a general class of discrete nonlinear Schrödinger equations (DNLS) on the latt...
The rapid growth of fields such as metamaterials, composites, architected materials, porous solids, ...
A mechanically-based nonlocal Timoshenko beam model, recently proposed by the authors, hinges on the...
AbstractDiscrete models of dislocations in fractional nonlocal materials are suggested. The proposed...
A relationship between discrete and continuous fractional-order nonlocal elasticity theory is discus...
AbstractA non-local continuum model including long-range forces between non-adjacent volume elements...
Discrete models of dislocations in fractional nonlocal materials are suggested. The proposed models ...
An elastic continuum model with long-range forces is addressed in this study within the context of a...
A non-local continuum model including long-range forces between non-adjacent volume elements has bee...
The mechanically-based model of non-local elasticity with long-range interactions is framed, in this...
International audienceWe introduce positive elastic potentials in the harmonic approximation leading...
We develop physically admissible lattice models in the harmonic approximation which define by Hamilt...
In this chapter, fractional calculus has been used to account for long-range interactions between ma...
Mechanical vibrations of non-local systems with long-range, cohesive, interactions between material ...
In this paper, we consider extensions of the gradient elasticity models proposed earlier by the seco...
Abstract: We consider a general class of discrete nonlinear Schrödinger equations (DNLS) on the latt...
The rapid growth of fields such as metamaterials, composites, architected materials, porous solids, ...
A mechanically-based nonlocal Timoshenko beam model, recently proposed by the authors, hinges on the...