Many solids, when sufficiently strained, exhibit a change in deformation pattern from one which is relatively smooth and slowly varying to one which is concentrated in a narrow zone, i.e., localized deformation. This occurs when it is energetically more favorable to intensely deform a small region of the solid than to deform the entire solid more uniformly. The attributes of localized deformation, in particular the zone size, depend strongly on the properties in the small region which is intensely deformed, i.e., the properties of the microstructure. Higher order gradient continuum theories have often been proposed as models for solids that exhibit localization of deformation. These models incorporate a length scale for the localized deform...
Materials with a sparse, periodic lattice microstructure exhibit excellent mechanical performance co...
In this chapter, two different strain gradient plasticity models based on nonconvex plastic energies...
Various deformation models incorporating higher-order gradients are discussed and their implications...
localization of deformation (in the form of shear bands) at sufficiently high levels of strain, are ...
Higher order gradient continuum theories have often been proposed as models for solids that exhibit ...
One dimensional discrete systems, such as axial lattices, may be investigated by using some enriched...
International audienceIn the context of architected materials, it has been observed that both long-w...
Classical continuum models, i.e. continuum models that do not incorporate an internal length scale, ...
In the context of architected materials, it has been observed that both long-wavelength instabilitie...
The buckling and post-buckling behavior of a nonlinear discrete repetitive system, the discrete elas...
Various deformation models incorporating higher-order gradients are discussed and their implications...
Continuum-atomistic modelling denotes a mixed approach combining the usual framework of continuum me...
Material instabilities play an important role in many engineering problems because they trigger zone...
The use of higher-order strain-gradient models in mechanics is studied. First, existing second-gradi...
This paper develops a geometrically linear formulation of higher gradient plasticity of single and p...
Materials with a sparse, periodic lattice microstructure exhibit excellent mechanical performance co...
In this chapter, two different strain gradient plasticity models based on nonconvex plastic energies...
Various deformation models incorporating higher-order gradients are discussed and their implications...
localization of deformation (in the form of shear bands) at sufficiently high levels of strain, are ...
Higher order gradient continuum theories have often been proposed as models for solids that exhibit ...
One dimensional discrete systems, such as axial lattices, may be investigated by using some enriched...
International audienceIn the context of architected materials, it has been observed that both long-w...
Classical continuum models, i.e. continuum models that do not incorporate an internal length scale, ...
In the context of architected materials, it has been observed that both long-wavelength instabilitie...
The buckling and post-buckling behavior of a nonlinear discrete repetitive system, the discrete elas...
Various deformation models incorporating higher-order gradients are discussed and their implications...
Continuum-atomistic modelling denotes a mixed approach combining the usual framework of continuum me...
Material instabilities play an important role in many engineering problems because they trigger zone...
The use of higher-order strain-gradient models in mechanics is studied. First, existing second-gradi...
This paper develops a geometrically linear formulation of higher gradient plasticity of single and p...
Materials with a sparse, periodic lattice microstructure exhibit excellent mechanical performance co...
In this chapter, two different strain gradient plasticity models based on nonconvex plastic energies...
Various deformation models incorporating higher-order gradients are discussed and their implications...