In this chapter, we present fv-unsat, a multipoint finite-volume–based solver for unsaturated flow in deformable and nondeformable porous media. The latter is described using the mixed form of Richards’ equation, whereas the former by the equations of unsaturated poroelasticity. The module aims at flexibility, relying heavily on discrete operators and equations, exploiting the automatic differentiation framework provided by the MATLAB Reservoir Simulation Toolbox (MRST). Our examples cover two numerical convergence tests and two three-dimensional practical applications, including the water infiltration process in a nondeformable soil column and a realistic desiccation process of a deformable clay sample using atmospheric boundary conditions...
A stable finite element scheme that avoids pressure oscillations for a three-field Biot’s model in p...
A novel method for simulating multi-phase flow in porous media is presented. The approach is based o...
The development of cell-centered finite volume discretizations for deformation is motivated by the d...
In this chapter, we present fv-unsat, a multipoint finite-volume–based solver for unsaturated flow i...
The Unsaturated Flow In Deformable Porous Media (UFIDPM) plays a crucial role in several academic an...
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...
We propose a multiscale finite volume method (MSFV) for simulation of coupled flow-deformation in he...
AbstractIn this work we consider a mathematical model for two-phase flow in porous media. The fluids...
In this work we consider a mathematical model for two-phase flow in porous media. The fluids are ass...
We introduce a new cell‐centered finite volume discretization for elasticity with weakly enforced sy...
The proposed numerical scheme solves the linear poroelasticity equations, which refers to fluid flow...
We introduce a numerical method for the approximation of linear poroelasticity equations, representi...
A one-dimensional transport model for simulating water flow and solute transport in homogeneous-hete...
This paper further explores fundamental issues on the behaviour of a finite volume technique using s...
A stable finite element scheme that avoids pressure oscillations for a three-field Biot’s model in p...
A novel method for simulating multi-phase flow in porous media is presented. The approach is based o...
The development of cell-centered finite volume discretizations for deformation is motivated by the d...
In this chapter, we present fv-unsat, a multipoint finite-volume–based solver for unsaturated flow i...
The Unsaturated Flow In Deformable Porous Media (UFIDPM) plays a crucial role in several academic an...
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...
We propose a multiscale finite volume method (MSFV) for simulation of coupled flow-deformation in he...
AbstractIn this work we consider a mathematical model for two-phase flow in porous media. The fluids...
In this work we consider a mathematical model for two-phase flow in porous media. The fluids are ass...
We introduce a new cell‐centered finite volume discretization for elasticity with weakly enforced sy...
The proposed numerical scheme solves the linear poroelasticity equations, which refers to fluid flow...
We introduce a numerical method for the approximation of linear poroelasticity equations, representi...
A one-dimensional transport model for simulating water flow and solute transport in homogeneous-hete...
This paper further explores fundamental issues on the behaviour of a finite volume technique using s...
A stable finite element scheme that avoids pressure oscillations for a three-field Biot’s model in p...
A novel method for simulating multi-phase flow in porous media is presented. The approach is based o...
The development of cell-centered finite volume discretizations for deformation is motivated by the d...