AbstractIt is shown that second-order homogenization of a Cauchy-elastic dilute suspension of randomly distributed inclusions yields an equivalent second gradient (Mindlin) elastic material. This result is valid for both plane and three-dimensional problems and extends earlier findings by Bigoni and Drugan [Bigoni, D., Drugan, W.J., 2007. Analytical derivation of Cosserat moduli via homogenization of heterogeneous elastic materials. J. Appl. Mech. 74, 741–753] from several points of view: (i) the result holds for anisotropic phases with spherical or circular ellipsoid of inertia; (ii) the displacement boundary conditions considered in the homogenization procedure is independent of the characteristics of the material; (iii) a perfect energy ...
The literature in the field of higher-order homogenization is mainly focused on 2-D models aimed at ...
International audienceA stress-gradient material model was recently proposed by Forest and Sab [Mech...
New prescriptions are proposed for the ‘reference’ fields in the context of the ‘second-order’ nonli...
AbstractStarting from a Cauchy elastic composite with a dilute suspension of randomly distributed in...
Through a second-order homogenization procedure, the explicit relation is obtained between the non-l...
Mindlin second-gradient elastic properties from dilute two-phase Cauchy-elastic composite
The homogenization results obtained by Bacca et al. (Mindlin second-gradient elas-tic properties fro...
Mindlin second-gradient elastic properties from dilute two-phase Cauchy-elastic composite
International audienceA computational homogenization method to determine the effective parameters of...
A heterogeneous Cauchy elastic material may display micromechanical effects that can be modeled in a...
The Green's function and Eshelby tensors of an infinite linear isotropic second gradient continuum a...
AbstractThe different forms of second order elasticity operators, in Mindlin’s strain-gradient elast...
The literature in the field of higher-order homogenization is mainly focused on 2-D models aimed at ...
The aim of this paper is to derive an integral representation formula for the effective elasticity t...
We present explicit upper bound estimates of the microstructural length used in simple gradient elas...
The literature in the field of higher-order homogenization is mainly focused on 2-D models aimed at ...
International audienceA stress-gradient material model was recently proposed by Forest and Sab [Mech...
New prescriptions are proposed for the ‘reference’ fields in the context of the ‘second-order’ nonli...
AbstractStarting from a Cauchy elastic composite with a dilute suspension of randomly distributed in...
Through a second-order homogenization procedure, the explicit relation is obtained between the non-l...
Mindlin second-gradient elastic properties from dilute two-phase Cauchy-elastic composite
The homogenization results obtained by Bacca et al. (Mindlin second-gradient elas-tic properties fro...
Mindlin second-gradient elastic properties from dilute two-phase Cauchy-elastic composite
International audienceA computational homogenization method to determine the effective parameters of...
A heterogeneous Cauchy elastic material may display micromechanical effects that can be modeled in a...
The Green's function and Eshelby tensors of an infinite linear isotropic second gradient continuum a...
AbstractThe different forms of second order elasticity operators, in Mindlin’s strain-gradient elast...
The literature in the field of higher-order homogenization is mainly focused on 2-D models aimed at ...
The aim of this paper is to derive an integral representation formula for the effective elasticity t...
We present explicit upper bound estimates of the microstructural length used in simple gradient elas...
The literature in the field of higher-order homogenization is mainly focused on 2-D models aimed at ...
International audienceA stress-gradient material model was recently proposed by Forest and Sab [Mech...
New prescriptions are proposed for the ‘reference’ fields in the context of the ‘second-order’ nonli...