Discrete element model for the analysis of fluid-saturated fractured poro-plastic medium based on sharp crack representation with embedded strong discontinuities

“…Note that when ISO units are used, the elasticity constants are of the order of 10 9 Pa, whereas the Biot effective stress coefficient is between 0 and 1 and the coefficient 1/M is about of the order of about 10 −9 Pa −1 , resulting into ill-conditioning of the global matrix. To avoid this issue, we adopt GPa unit for pressure and elasticity constants, and 10 9 kg for mass as suggested in [55,43].…”

“…The earliest work on numerical modeling of hydraulic fracturing can be traced back to Boone and Ingraffea [6], who combined the finite element method and the finite difference method to solve the poroelasticity problem, where the fracture was modeled by a cohesive zone on an assumed crack path. Since then, several methods have been developed to simulate the hydraulic fracturing or crack propagation in fluidsaturated porous media such as the cohesive zone model, adaptive meshing strategies [45,46], approaches based on lattice, particle models, or discrete elements [12,51,19,52,20,43], extended finite element method (XFEM) for geometrically linear setting [13,44,37,36,21], or XFEM for nonlinear setting at finite strains [23].…”

Phase field modeling of hydraulic fracturing with interfacial damage in highly heterogeneous fluid-saturated porous media

“…Note that when ISO units are used, the elasticity constants are of the order of 10 9 Pa, whereas the Biot effective stress coefficient is between 0 and 1 and the coefficient 1/M is about of the order of about 10 −9 Pa −1 , resulting into ill-conditioning of the global matrix. To avoid this issue, we adopt GPa unit for pressure and elasticity constants, and 10 9 kg for mass as suggested in [55,43].…”

“…The earliest work on numerical modeling of hydraulic fracturing can be traced back to Boone and Ingraffea [6], who combined the finite element method and the finite difference method to solve the poroelasticity problem, where the fracture was modeled by a cohesive zone on an assumed crack path. Since then, several methods have been developed to simulate the hydraulic fracturing or crack propagation in fluidsaturated porous media such as the cohesive zone model, adaptive meshing strategies [45,46], approaches based on lattice, particle models, or discrete elements [12,51,19,52,20,43], extended finite element method (XFEM) for geometrically linear setting [13,44,37,36,21], or XFEM for nonlinear setting at finite strains [23].…”

Phase field modeling of hydraulic fracturing with interfacial damage in highly heterogeneous fluid-saturated porous media

“…The presence of the voids determines a small degradation of the stiffness of the material, as it is shown in Fig. 24(b), and they have almost no effect on the reduction of the material strength, contrarily to what has been found in the case of bi-phase materials in which the voids represent a significant fraction of the material [76][77][78]. In the model a very small percentage of the voids has been adopted, since the occluded porosity resulting from the drying of the cement paste has been considered embedded in the mortar.…”

A concrete homogenisation technique at meso-scale level accounting for damaging behaviour of cement paste and aggregates

“…It should also be mentioned that the current treatment of the smeared approach is among the very few approaches which exist for modeling diffuse fracturing scenarios in heterogeneous materials. In extremely brittle cases where fracturing involves a distinct propagating crack, more robust discrete fracture simulation frameworks such as extended FEM (XFEM) or the embedded discontinuity FEM (ED‐FEM) (see, eg, Saksala et al and Nikolic et al for modeling fracturing in fluid saturated rocks and rocks under dynamic loading) can be used.…”

Numerical modeling of fracturing in permeable rocks via a micromechanical continuum model