In this chapter, fractional calculus has been used to account for long-range interactions between material particles. Cohesive forces have been assumed decaying with inverse power law of the absolute distance that yields, as limiting case, an ordinary, fractional differential equation. It is shown that the proposed mathematical formulation is related to a discrete, point-spring model that includes non-local interactions by non-adjacent particles with linear springs with distance-decaying stiffness. Boundary conditions associated to the model coalesce with the well-known kinematic and static constraints and they do not run into divergent behavior. Dynamic analysis has been conducted and both model shapes and natural frequency of the non-loca...
In the paper the generalisation of classical rate independent plasticity using fractional calculus i...
The research of a formulation to model non-local interactions in the mechanical behavior of matter i...
This paper is the generalization to a three dimensional case of a physically-based approach to non-l...
In this chapter, fractional calculus has been used to account for long-range interactions between ma...
Abstract:- Mechanical vibrations of non-local systems with long-range, cohesive, interactions betwee...
A non-local continuum model including long-range forces between non-adjacent volume elements has bee...
AbstractA non-local continuum model including long-range forces between non-adjacent volume elements...
If the attenuation function of strain is expressed as a power law, the formalism of fractional calcu...
This paper aims to formulate the three-dimensional (3D) problem of non-local elasticity in terms of ...
Several enriched continuum mechanics theories have been proposed by the scientific community in orde...
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...
Recently, cohesive zone models (CZMs) have been used to describe the failure and the debonding pheno...
The common models of elastic foundations are provided by supposing that they are composed by elastic...
AbstractThe common models of elastic foundations are provided by supposing that they are composed by...
In the paper the generalisation of classical rate independent plasticity using fractional calculus i...
The research of a formulation to model non-local interactions in the mechanical behavior of matter i...
This paper is the generalization to a three dimensional case of a physically-based approach to non-l...
In this chapter, fractional calculus has been used to account for long-range interactions between ma...
Abstract:- Mechanical vibrations of non-local systems with long-range, cohesive, interactions betwee...
A non-local continuum model including long-range forces between non-adjacent volume elements has bee...
AbstractA non-local continuum model including long-range forces between non-adjacent volume elements...
If the attenuation function of strain is expressed as a power law, the formalism of fractional calcu...
This paper aims to formulate the three-dimensional (3D) problem of non-local elasticity in terms of ...
Several enriched continuum mechanics theories have been proposed by the scientific community in orde...
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...
Recently, cohesive zone models (CZMs) have been used to describe the failure and the debonding pheno...
The common models of elastic foundations are provided by supposing that they are composed by elastic...
AbstractThe common models of elastic foundations are provided by supposing that they are composed by...
In the paper the generalisation of classical rate independent plasticity using fractional calculus i...
The research of a formulation to model non-local interactions in the mechanical behavior of matter i...
This paper is the generalization to a three dimensional case of a physically-based approach to non-l...