Damage and size effects in elastic solids: A homogenization approach

Abstract: The paper presents a new procedure to construct micro-mechanical damage models able to describe size effects in solids. The new approach is illustrated in the case of brittle materials. We use homogenization based on two-scale asymptotic developments to describe the overall behavior of a damaged elastic body starting from an explicit description of elementary volumes with micro-cracks. An appropriate micro-mechanical energy analysis is proposed leading to a damage evolution law that incorporates stiffness degr… Show more

“…In [11] the influence of the movement of abutments on the collapse mechanism of two dimensional stone arches was investigated, by developing discrete finite element models. 18 Young's modulus has been considered equal to 23GPa, Poisson' s ratio 0.2 and density 2000 kg/m3. The tensile strength of the structure is considered equal to 0.5MPa.…”

“…According to numerical homogenization, a unit cell is explicitly solved and the results are then used for the determination of the parameters of a macroscopic constitutive law [18]. From another point of view, multi-level computational homogenization incorporates a concurrent analysis of both the macro and the microstructure, in a nested multi-scale approach [19][20][21].…”

Numerical Analysis of Masonry Structures, Taking Into Account Measured Geometric and Material Data

“…In [11] the influence of the movement of abutments on the collapse mechanism of two dimensional stone arches was investigated, by developing discrete finite element models. 18 Young's modulus has been considered equal to 23GPa, Poisson' s ratio 0.2 and density 2000 kg/m3. The tensile strength of the structure is considered equal to 0.5MPa.…”

“…According to numerical homogenization, a unit cell is explicitly solved and the results are then used for the determination of the parameters of a macroscopic constitutive law [18]. From another point of view, multi-level computational homogenization incorporates a concurrent analysis of both the macro and the microstructure, in a nested multi-scale approach [19][20][21].…”

Numerical Analysis of Masonry Structures, Taking Into Account Measured Geometric and Material Data

“…Here a macroscopic constitutive model is assumed and the parameters of the model are computed from the microstructure. Among many other we refer to the studies by Nakamura and Pettermann and Suresh [100], Suresh [87], Christman et al [29], van der Sluis et al [133], and extensions to composite materials were conducted in [32,60,1,70,106].…”

A computational library for multiscale modeling of material failure

“…According to numerical homogenization, a unit cell is explicitly solved and the resulting average quantities are then used for the determination of the parameters of a macroscopic constitutive law [4,5].…”

A multi-scale computational method including contact for the analysis of damage in composite materials