The development of cell-centered finite volume discretizations for deformation is motivated by the desire for a compatible approach with the discretization of fluid flow in deformable porous media. We express the conservation of momentum in the finite volume sense, and introduce three approximations methods for the cell-face stresses. The discretization method is developed for general grids in one to three spatial dimensions, and leads to a global discrete system of equations for the displacement vector in each cell, after which the stresses are calculated based on a local expression. The method allows for anisotropic, heterogeneous and discontinuous coefficients. The novel finite volume discretization is justified through numerical validat...
The original publication is available at www.springerlink.comInternational audienceThis paper presen...
We introduce a numerical method for the approximation of linear poroelasticity equations, representi...
We construct a stabilized finite-element method to compute flow and finitestrain deformations in an ...
The development of cell-centered finite volume discretizations for deformation is motivated by the d...
Cell-centered finite volume methods are prevailing in numerical simulation of flow in porous media. ...
We introduce a new cell‐centered finite volume discretization for elasticity with weakly enforced sy...
We present a cell-centered finite volume method for the fully coupled discretization of single-phase...
We propose a multiscale finite volume method (MSFV) for simulation of coupled flow-deformation in he...
When modelling fluid fl ow in subsurface, the impact of solid deformation on fluid fl ow is often ov...
In this paper we discuss a new discretization for the Biot equations. The discretization treats the ...
We propose a multiscale finite volume method (MSFV) for simulation of coupled flow-deformation in he...
We show convergence of a cell-centered finite volume discretization for linear elasticity. The discr...
This paper further explores fundamental issues on the behaviour of a finite volume technique using s...
The demand for accurate and efficient simulations in order to test the geomechanical effects is a re...
The coupled equations of Biot's poroelasticity, consisting of stress equilibrium and fluid mass bala...
The original publication is available at www.springerlink.comInternational audienceThis paper presen...
We introduce a numerical method for the approximation of linear poroelasticity equations, representi...
We construct a stabilized finite-element method to compute flow and finitestrain deformations in an ...
The development of cell-centered finite volume discretizations for deformation is motivated by the d...
Cell-centered finite volume methods are prevailing in numerical simulation of flow in porous media. ...
We introduce a new cell‐centered finite volume discretization for elasticity with weakly enforced sy...
We present a cell-centered finite volume method for the fully coupled discretization of single-phase...
We propose a multiscale finite volume method (MSFV) for simulation of coupled flow-deformation in he...
When modelling fluid fl ow in subsurface, the impact of solid deformation on fluid fl ow is often ov...
In this paper we discuss a new discretization for the Biot equations. The discretization treats the ...
We propose a multiscale finite volume method (MSFV) for simulation of coupled flow-deformation in he...
We show convergence of a cell-centered finite volume discretization for linear elasticity. The discr...
This paper further explores fundamental issues on the behaviour of a finite volume technique using s...
The demand for accurate and efficient simulations in order to test the geomechanical effects is a re...
The coupled equations of Biot's poroelasticity, consisting of stress equilibrium and fluid mass bala...
The original publication is available at www.springerlink.comInternational audienceThis paper presen...
We introduce a numerical method for the approximation of linear poroelasticity equations, representi...
We construct a stabilized finite-element method to compute flow and finitestrain deformations in an ...