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arxiv: 2511.06233 · v4 · pith:ZKDC2F5Mnew · submitted 2025-11-09 · ⚛️ physics.flu-dyn · cond-mat.soft

Global Buckley--Leverett for Multicomponent Flow in Fractured Media: Isothermal Equation-of-State Coupling and Dynamic Capillarity

Christian Tantardini , Fernando Alonso-Marroquin This is my paper

Pith reviewed 2026-05-21 18:58 UTC · model grok-4.3

classification ⚛️ physics.flu-dyn cond-mat.soft
keywords Buckley-Leverettmulticomponent flowfractured mediaMaxwell-Stefan diffusiondynamic capillarityporous mediacarbon storagegeothermal flow
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The pith

Maxwell-Stefan diffusion paired with dynamic capillarity turns three-phase multicomponent transport into a pseudo-parabolic system that restores a well-posed initial-value problem.

A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.

The paper builds a global Buckley-Leverett framework that keeps the classical decomposition of total flux into phase velocities while folding in equation-of-state phase behavior, multicomponent diffusion, and dynamic capillary pressure. It shows that the added diffusion and capillarity together change the character of the equations so that transport becomes pseudo-parabolic instead of strictly hyperbolic. This change removes the loss of hyperbolicity that has long made three-phase problems ill-posed. The resulting method solves one scalar global-pressure equation per time step, reconstructs the phase fluxes, and marches forward with conservative component balances, all while reducing exactly to ordinary Buckley-Leverett when the extra physics are switched off.

Core claim

The central claim is that the combination of Maxwell-Stefan diffusion and dynamic capillarity renders transport pseudo-parabolic, resolving the loss of strict hyperbolicity that plagues three-phase Buckley-Leverett and ensuring a well-posed initial-value problem. The formulation produces a single global-pressure equation that drives the total Darcy flux together with an exact fractional-flow decomposition of the phase velocities that includes buoyancy and capillary drifts; inertial effects appear as per-phase damping that renormalizes the mobilities. Each time step therefore consists of solving the scalar pressure equation, reconstructing the phase fluxes via the split, and advancing the set

What carries the argument

The global-pressure equation with exact fractional-flow decomposition of phase velocities, made pseudo-parabolic by the addition of Maxwell-Stefan diffusion and dynamic capillarity.

If this is right

  • Each time step reduces to solving one scalar global-pressure equation, reconstructing phase fluxes from the fractional-flow split, and advancing strictly conservative component balances.
  • Axisymmetric cylindrical forms are supplied for radial injection problems that include vertical buoyancy.
  • The entire model collapses exactly to classical Buckley-Leverett whenever the extra physics are turned off.
  • The framework applies directly to carbon storage, geothermal exchange, and contaminant transport in fractured, compositionally complex reservoirs.

Where Pith is reading between the lines

These are editorial extensions of the paper, not claims the author makes directly.

  • The pseudo-parabolic regularization may allow larger time steps in reservoir simulators that currently struggle with three-phase shock formation.
  • The same splitting could be tested in non-isothermal settings to see whether temperature-dependent diffusion further improves stability in geothermal problems.
  • Direct comparison with laboratory core-flood experiments that include measurable capillary pressure dynamics would provide a concrete check on whether the well-posedness gain appears in real data.

Load-bearing premise

The added physics can be inserted into the classical fractional-flow decomposition without creating inconsistencies or demanding extra closure relations.

What would settle it

A numerical test that solves the three-phase system both with and without the Maxwell-Stefan and dynamic-capillarity terms and checks whether only the augmented version produces unique, stable solutions free of the oscillations or non-uniqueness seen in the classical hyperbolic case.

read the original abstract

We present an isothermal Global Buckley--Leverett framework for multicomponent, multiphase flow in porous and fractured media that retains the interpretability of classical Buckley--Leverett while incorporating essential physics: equation of state-based phase behavior, multicomponent Maxwell--Stefan diffusion, dynamic capillarity, stress-sensitive permeability, and non-Darcy fracture flow. The formulation yields a single global-pressure equation driving the total Darcy flux and an exact fractional-flow decomposition of phase velocities with buoyancy and capillary drifts; inertial effects enter as per-phase damping that renormalizes mobilities. Crucially, the combination of Maxwell--Stefan diffusion and dynamic capillarity renders transport pseudo-parabolic, resolving the loss of strict hyperbolicity that plagues three-phase Buckley--Leverett and ensuring a well-posed initial-value problem. In practice, each time step solves the scalar global-pressure equation, reconstructs phase fluxes via the split, and advances strictly conservative component balances; axisymmetric (cylindrical) forms for radial injection with vertical buoyancy are provided. The model reduces exactly to classical Buckley--Leverett when added physics are disabled, making it a practical backbone for carbon storage, geothermal exchange, and contaminant transport in fractured, compositionally complex reservoirs.

Editorial analysis

A structured set of objections, weighed in public.

Desk editor's note, referee report, simulated authors' rebuttal, and a circularity audit. Tearing a paper down is the easy half of reading it; the pith above is the substance, this is the friction.

Referee Report

1 major / 0 minor

Summary. The manuscript develops a Global Buckley-Leverett framework for isothermal multicomponent multiphase flow in porous and fractured media. It incorporates equation-of-state coupling for phase behavior, Maxwell-Stefan diffusion, dynamic capillarity, stress-sensitive permeability, and non-Darcy flow in fractures. The key features are a single scalar global-pressure equation that drives the total Darcy flux, an exact fractional-flow decomposition of the phase velocities including buoyancy and capillary drifts, and the rendering of the transport problem as pseudo-parabolic through the combination of diffusion and dynamic capillarity. This is said to resolve the loss of strict hyperbolicity in three-phase Buckley-Leverett problems and ensure well-posedness. The model is shown to reduce exactly to the classical Buckley-Leverett equations when the additional physics are disabled. Axisymmetric forms for radial injection are also provided.

Significance. If the central derivations hold, this work provides a valuable extension of classical Buckley-Leverett theory that retains interpretability and computational simplicity while adding essential physics for realistic reservoir simulations. The exact reduction property and the pseudo-parabolic regularization are particularly useful for applications in carbon storage, geothermal systems, and contaminant transport in compositionally complex fractured reservoirs. The framework could serve as a practical backbone for more detailed models.

major comments (1)
  1. The abstract and formulation claim that dynamic capillarity (introduced as a rate-dependent correction to capillary pressure) combines with Maxwell-Stefan diffusion to render transport pseudo-parabolic while preserving an exact fractional-flow decomposition that leaves a strictly scalar global-pressure equation. However, the rate-dependent term proportional to ∂s/∂t is not necessarily aligned with the total-velocity direction. Please provide the explicit steps in the momentum-balance derivation showing how this term is absorbed into the fractional-flow split without residual coupling or redefinition of global pressure. If an additional closure is required, this should be stated.

Simulated Author's Rebuttal

1 responses · 0 unresolved

We thank the referee for their careful and constructive review of our manuscript. The single major comment raises a valid question about the precise handling of the dynamic capillarity term in the momentum balance. We address this point directly below and will incorporate additional explicit derivation steps in the revised version to improve clarity.

read point-by-point responses

  1. Referee: The abstract and formulation claim that dynamic capillarity (introduced as a rate-dependent correction to capillary pressure) combines with Maxwell-Stefan diffusion to render transport pseudo-parabolic while preserving an exact fractional-flow decomposition that leaves a strictly scalar global-pressure equation. However, the rate-dependent term proportional to ∂s/∂t is not necessarily aligned with the total-velocity direction. Please provide the explicit steps in the momentum-balance derivation showing how this term is absorbed into the fractional-flow split without residual coupling or redefinition of global pressure. If an additional closure is required, this should be stated.

    Authors: We appreciate the referee highlighting this important detail. In the derivation, the phase momentum balances begin from the extended Darcy law incorporating dynamic capillarity: u_α = −λ_α K (∇p_α − ρ_α g ∇z + ∇p_c^eq(s) + ∇(τ(s) ∂s/∂t)). The global pressure P is defined via the mobility-weighted sum ∇P ≡ ∑_α (λ_α/λ_t) ∇p_α, which absorbs all equilibrium capillary gradients into the definition of P while leaving the total velocity u_t = −λ_t K ∇P + buoyancy correction. The rate-dependent term τ ∂s/∂t is excluded from this weighting and is instead collected into the capillary-drift velocity that appears inside the fractional-flow functions. Specifically, the phase velocity decomposition reads u_α = f_α u_t + f_α λ_t K (buoyancy + capillary-drift terms), where the dynamic contribution enters the drift as an additional diffusive flux proportional to ∇(τ ∂s/∂t) and is therefore moved to the right-hand side of the component transport equations. Because ∂s/∂t is evaluated from the saturation field at the previous time level (or solved implicitly within the transport step), it does not feed back into the scalar global-pressure solve. The resulting transport operator is pseudo-parabolic through the combined Maxwell–Stefan diffusion and dynamic-capillarity terms, while the advective fractional-flow split remains exact and the pressure equation stays strictly scalar. No additional closure is required. We will add a new appendix containing the full algebraic steps of this momentum-balance derivation to make the absorption explicit. revision: yes

Circularity Check

0 steps flagged

No significant circularity; derivation extends classical Buckley-Leverett without self-referential reduction

full rationale

The provided abstract and description state that the model reduces exactly to classical Buckley-Leverett when added physics are disabled, establishing the core global-pressure equation and fractional-flow decomposition as an external benchmark rather than a self-derived construct. No equations, self-citations, or fitted parameters are shown that would make the pseudo-parabolic resolution or hyperbolicity claim tautological by construction. The incorporation of Maxwell-Stefan diffusion and dynamic capillarity is presented as an additive extension preserving the scalar global-pressure structure, with no evidence of ansatz smuggling, uniqueness imported from authors, or renaming of known results. This keeps the derivation chain independent and self-contained against the classical reference.

Axiom & Free-Parameter Ledger

0 free parameters · 2 axioms · 0 invented entities

The framework rests on standard porous-media assumptions (Darcy-type flux, fractional-flow decomposition, isothermal conditions) plus the claim that the added transport terms produce a well-posed pseudo-parabolic system; no free parameters or new entities are introduced in the abstract.

axioms (2)
  • domain assumption Isothermal conditions throughout the domain
    Stated explicitly in the title and abstract as the setting for the EOS coupling.
  • domain assumption Existence of a global pressure that drives total Darcy flux while allowing exact fractional-flow split
    Central structural assumption of the Global Buckley-Leverett formulation.

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Forward citations

Cited by 2 Pith papers

Reviewed papers in the Pith corpus that reference this work. Sorted by Pith novelty score.

  1. Nonisothermal global-pressure exactness in fractured multiphase flow with evolving fracture aperture

    physics.flu-dyn 2026-04 unverdicted novelty 7.0

    A new mixed saturation-temperature compatibility condition is derived for exact global-pressure equivalence in nonisothermal multiphase fractured flow, with numerical benchmarks confirming regimes where exactness hold...

  2. Porous-Medium Scaling of CO$_2$ Plume Footprint Growth

    physics.flu-dyn 2026-03 unverdicted novelty 7.0

    CO2 plume footprints grow according to porous-medium scaling, with explicit formulas for thickness b(r,t)/H, edge R(t), and core a(t) that recover Barenblatt behavior after shut-in or under constant injection.

Reference graph

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