2017
DOI: 10.1007/s10596-017-9675-7
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Immiscible two-phase Darcy flow model accounting for vanishing and discontinuous capillary pressures: application to the flow in fractured porous media

Abstract: International audienceFully implicit time-space discretizations applied to the two-phase Darcy flow problem lead to the systems of nonlinear equations, which are traditionally solved by some variant of Newton's method. The efficiency of the resulting algorithms heavily depends on the choice of the primary unknowns since Newton's method is not invariant with respect to a nonlinear change of variable. In this regard the role of capillary pressure/saturation relation is paramount because the choice of primary unk… Show more

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Cited by 33 publications
(70 citation statements)
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“…The model could be extended to fracture networks. In this case, additional coupling conditions enforcing the mass conservation and pressure continuity at fracture intersections should be included; see e.g., [17,16].…”
Section: Coupling Conditions the Subproblemsmentioning
confidence: 99%
“…The model could be extended to fracture networks. In this case, additional coupling conditions enforcing the mass conservation and pressure continuity at fracture intersections should be included; see e.g., [17,16].…”
Section: Coupling Conditions the Subproblemsmentioning
confidence: 99%
“…The capillary pressures including different rocktypes at the matrix fracture interface can be taken into account in the framework of the VAG scheme following the usual phase based upwinding of the mobilities as in [25]. An alternative approach is proposed in [31] for two-phase flows in order to capture the jump of the saturations at the matrix fracture interface Γ due to discontinuous capillary pressure curves. These two choices are compared in [32] to a reference solution provided by an equi-dimensional model in the fractures.…”
Section: Hybrid-dimensional Compositional Non-isothermal Darcy Flow Mmentioning
confidence: 99%
“…To focus on compositional nonisothermal features, capillary pressures are not considered in this paper. They could be included following the usual phase based upwinding approach as in [25] or recent ideas developed in [31] for two-phase flows. Let us refer to [32] for a comparison of both approaches in the case of an immiscible two-phase flow using a reference solution provided by the equi-dimensional model in the fractures.…”
Section: Introductionmentioning
confidence: 99%
“…In order to account for a non zero entry pressure for the capillary function P c (S g ), let us choose P c as primary unknown rather than S g and denote by S g (P c ) the inverse of the monotone graph extension of the capillary pressure. As detailed in [2], a switch of variable between S g and P c could also be used in order to account for non invertible capillary functions.…”
Section: Non-isothermal Compositional Two-phase Darcy Flow Modelmentioning
confidence: 99%