A dual-tube model for gas dynamics in fractured nanoporous shale formations

Lunati, Ivan; Lee, S. H.

doi:10.1017/jfm.2014.519

Cited by 31 publications

(63 citation statements)

References 27 publications

(30 reference statements)

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“…The MFR obtained from the Boltzmann equation is a key parameter in the generalized Reynolds equation to describe gas-film lubrication problems such as the gas slide bearing (Fukui & Kaneko 1987, 1990Cercignani, Lampis & Lorenzani 2007), as well as in the upscaling methods used to predict the gas permeability of ultra-tight shale strata (Darabi et al 2012;Mehmani, Prodanović & Javadpour 2013;Lunati & Lee 2014;Ma et al 2014).…”

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confidence: 99%

Non-equilibrium dynamics of dense gas under tight confinement

Liu

Reese

et al. 2016

J. Fluid Mech.

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The force-driven Poiseuille flow of dense gases between two parallel plates is investigated through the numerical solution of the generalized Enskog equation for two-dimensional hard discs. We focus on the competing effects of the mean free path λ, the channel width L and the disc diameter σ . For elastic collisions between hard discs, the normalized mass flow rate in the hydrodynamic limit increases with L/σ for a fixed Knudsen number (defined as Kn = λ/L), but is always smaller than that predicted by the Boltzmann equation. Also, for a fixed L/σ , the mass flow rate in the hydrodynamic flow regime is not a monotonically decreasing function of Kn but has a maximum when the solid fraction is approximately 0.3. Under ultra-tight confinement, the famous Knudsen minimum disappears, and the mass flow rate increases with Kn, and is larger than that predicted by the Boltzmann equation in the free-molecular flow regime; for a fixed Kn, the smaller L/σ is, the larger the mass flow rate. In the transitional flow regime, however, the variation of the mass flow rate with L/σ is not monotonic for a fixed Kn: the minimum mass flow rate occurs at L/σ ≈ 2-3. For inelastic collisions, the energy dissipation between the hard discs always enhances the mass flow rate. Anomalous slip velocity is also found, which decreases with increasing Knudsen number. The mechanism for these exotic behaviours is analysed.

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confidence: 99%

Non-equilibrium dynamics of dense gas under tight confinement

Liu

Reese

et al. 2016

J. Fluid Mech.

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“…GRI permeability acquisition) because it does not take into account slip flow and Knudsen (and Fickian) diffusion through the pore space and kerogen [32], [21], and [33]; however, we expect that…”

Section: Fluid Flow Simulations With the Lattice-boltzmann Methodsmentioning

confidence: 99%

Assessing the utility of FIB-SEM images for shale digital rock physics

Kelly

El-Sobky

Torres‐Verdín

et al. 2016

Advances in Water Resources

216

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“…Further, if the porous media was a strong adsorbent and the pore diameter was nano-scale, the bulk transport of gas molecules would be strongly influenced by the adsorption potential of the walls, and surface diffusion would became dominant [17,23,29]. For pure gas diffusing in porous media [20,72], the formulas of the above three diffusion types were displayed in Eqs. (11)-(13):…”

Section: Comparison Of Diffusion Coefficient and Mechanismmentioning

confidence: 99%

“…Considering the large percentages of adsorbed gas, its flow behavior has become one of the key transport mechanisms which needed deep research. Reservoir simulations also demonstrated that both the well productivity and accumulative production of shale gas reservoirs would present a remarkable increase if the output of adsorbed gas were involved [19][20][21].…”

Section: Introductionmentioning

confidence: 98%