Scaling of Multiphase Flow in Simple Heterogeneous Porous Media

Zhou, Dengen; Fayers, F.J.; Orr, Franklin M.

doi:10.2118/27833-pa

Cited by 97 publications

(90 citation statements)

References 24 publications

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“…A first set of dimensionless numbers required to comprehensively characterize flow is obtained from a dimensionless form of the flow equations, following the commonly termed 'inspectional analysis', which has been previously applied to homogeneous (Shook et al 1992) and simple layered porous media (Zhou et al 1997). Guided by asymptotic flow solutions discussed in this work, we replace some of the obtained numbers by equivalent numbers to provide deeper insight into key flow features such as the shock-front velocity ratio or the crossflow behavior.…”

Section: Appendix 1: Derivation Of Governing Dimensionless Numbersmentioning

confidence: 99%

Viscous Crossflow in Layered Porous Media

et al. 2017

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We examine the effect of viscous forces on the displacement of one fluid by a second, immiscible fluid along parallel layers of contrasting porosity, absolute permeability and relative permeability. Flow is characterized using five dimensionless numbers and the dimensionless storage efficiency, so results are directly applicable, regardless of scale, to geologic carbon storage. The storage efficiency is numerically equivalent to the recovery efficiency, applicable to hydrocarbon production. We quantify the shock-front velocities at the leading edge of the displacing phase using asymptotic flow solutions obtained in the limits of no crossflow and equilibrium crossflow. The shock-front velocities can be used to identify a fast layer and a slow layer, although in some cases the shock-front velocities are identical even though the layers have contrasting properties. Three crossflow regimes are identified and defined with respect to the fast and slow shock-front mobility ratios, using both theoretical predictions and confirmation from numerical flow simulations. Previous studies have identified only two crossflow regimes. Contrasts in porosity and relative permeability exert a significant influence on contrasts in the shock-front velocities and on storage efficiency, in addition to previously examined contrasts in absolute permeability. Previous studies concluded that the maximum storage efficiency is obtained for unit permeability ratio; this is true only if there are no contrasts in porosity and relative permeability. The impact of crossflow on storage efficiency depends on the mobility ratio evaluated across the fast shock-front and on the time at which the efficiency is measured.

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Section: Appendix 1: Derivation Of Governing Dimensionless Numbersmentioning

confidence: 99%

Viscous Crossflow in Layered Porous Media

et al. 2017

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“…The methodology is similar to the commonly termed "inspectional analysis", which has been previously applied to homogeneous (Shook et al 1992) and simple layered porous media (Zhou et al 1997).…”

Section: Appendix 1: Derivation Of Governing Dimensionless Numbersmentioning

confidence: 99%

Capillary Heterogeneity Trapping and Crossflow in Layered Porous Media

et al. 2017

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We examine the effect of capillary and viscous forces on the displacement of one fluid by a second, immiscible fluid across and along parallel layers of contrasting porosity, and relative permeability, as well as previously explored contrasts in absolute permeability and capillary pressure. We consider displacements with wetting, intermediate-wetting and non-wetting injected phases. Flow is characterized using six independent dimensionless numbers and a dimensionless storage efficiency, which is numerically equivalent to the recovery efficiency. Results are directly applicable to geologic carbon storage and hydrocarbon production. We predict how the capillary-viscous force balance influences storage efficiency as a function of a small number of key dimensionless parameters, and provide a framework to support mechanistic interpretations of complex field or experimental data, and numerical model predictions, through the use of simple dimensionless models. When flow is directed across layers, we find that capillary heterogeneity traps the non-wetting phase, regardless of whether it is the injected or displaced phase. However, minimal trapping occurs when the injected phase is intermediate-wetting or when high-permeability layers contain a smaller moveable volume of fluid than low-permeability layers. A dimensionless capillary-to-viscous number defined using the layer thickness rather than the more commonly used system length is most relevant to predict capillary heterogeneity trapping. When flow is directed along layers, we show that, regardless of wettability, increasing capillary crossflow reduces the distance between the leading edges of the injected phase in each layer and increases storage efficiency. This may be counter-intuitive when the injected phase is non-wetting. Crossflow has a significant impact on storage efficiency only when high-permeability layers contain a smaller moveable volume of fluid than low-permeability layers. In that case, capillary heterogeneity traps the wetting phase, regardless of whether it is the injected or displaced phase. B Yacine Debbabi

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“…The definition used in this paper again differs from previously used numbers (e.g. Zhou et al 1997) as we account for contrasts in the relative permeability end-points between layers. The effective aspect ratio R L typically varies over the …”

Section: Scaling Analysismentioning

confidence: 99%

Impact of the Buoyancy–Viscous Force Balance on Two-Phase Flow in Layered Porous Media

et al. 2018

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Motivated by geological carbon storage and hydrocarbon recovery, the effect of buoyancy and viscous forces on the displacement of one fluid by a second immiscible fluid, along parallel and dipping layers of contrasting permeability, is characterized using five independent dimensionless numbers and a dimensionless storage or recovery efficiency. Application of simple dimensionless models shows that increased longitudinal buoyancy effects increase storage efficiency by reducing the distance between the leading edges of the injected phase in each layer and decreasing the residual displaced phase saturation behind the leading edge of the displacing phase. Increased transverse buoyancy crossflow increases storage efficiency if it competes with permeability layering effects, but reduces storage efficiency otherwise. When both longitudinal and transverse buoyancy effects are varied simultaneously, a purely geometrical dip angle group defines whether changes in storage efficiency are dominated by changes in the longitudinal or transverse buoyancy effects. In the limit of buoyancy-segregated flow, we report an equivalent, unidimensional flow model which allows rapid prediction of storage efficiency. The model presented accounts for both dip and layering, thereby generalizing earlier work which accounted for each of these but not both together. We suggest that the predicted storage efficiency can be used to compare and rank geostatistical realizations, and complements earlier heterogeneity measures which are applicable in the viscous limit.

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Scaling of Multiphase Flow in Simple Heterogeneous Porous Media

Cited by 97 publications

References 24 publications

Viscous Crossflow in Layered Porous Media

Viscous Crossflow in Layered Porous Media

Capillary Heterogeneity Trapping and Crossflow in Layered Porous Media

Impact of the Buoyancy–Viscous Force Balance on Two-Phase Flow in Layered Porous Media

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