Abstract
This paper presents a new method for scaling up multiphase flow properties which properly accounts for boundary conditions on the upscaled cell. The scale-up proposed does not require the simulation of a complete finely-gridded model, instead it calls for assumptions allowing the calculation of the boundary conditions related to each block being scaled up. To upscale a coarse block, we have to assume or determine the proper boundary conditions for that coarse block. To date, most scale-up methods have been based on the assumption of steady-state flow associated with uniform fractional flows over all the boundaries of the coarse block. However, such an assumption is not strictly valid when we consider heterogeneities. The concept of injection tubes is introduced: these are hypothetical streamtubes connecting the injection wellbore to all inlet faces of the fine grid cells constituting the block to be scaled up. Injection tubes allow the capturing of the fine-scale flow behavior of a finely-gridded model at the inlet face of the coarse block without having to simulate that fine grid. We describe how to scale up an entire finely-gridded model sequentially using injection tubes to determine the boundary conditions for two-phase flow. This new scale-up method is able to capture almost exactly the fine-scale two-phase flow behavior, such as saturation distributions, inside each isolated coarse-grid domain. Further, the resultant scaled-up relative permeabilities reproduce accurately the spatially-averaged performance of the finely-gridded model throughout the simulation period. The method has been shown to be applicable not only to viscous-dominated flow but also to flow affected by gravity for reasonable viscous-to-gravity ratios.
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References
Alabert, F. G. and Corre, B.: 1991, Heterogeneity in a complex turbiditic reservoir: Impact on field development, SPE 22902 presented at the 66th Annual Technical Conference and Exhibition of SPE held in Dallas, Texas.
Barker, J. W. and Thiebeau, S.: 1997, A critical review of the use of pseudorelative permeabilities for upscaling, SPE Reservoir Engng.
Batycky, R. P.: 1997, A three-dimensional two-phase field scale streamline Simulator. Ph.D. thesis, Stanford University, Stanford, CA 94305.
Buckley, S. E. and Leverett, M. C.: 1942, Mechanisms of fluid displacement in sands. Trans. Am. Inst. Mining and Metal. Eng. 146, 107–106.
Chu, L., Schatzinger, R. and Tham, M.: 1998, Application of wavelet analysis to upscaling of rock properties, SPE Reservoir Evaluation and Engineering, 75–81.
Coats, K. H., Dempsy, J. R. and Henderson, J.: 1971, The use of vertical equilibrium in two-dimensional simulation of three-dimensional reservoir performance. Soc. Petrol. Eng. J, 63–71.
Deutsch, C. V. and Journel, A. G.: 1998, GSLIB: Geostatistical Software Library and User's Guide. New York, New York: Oxford University Press, Inc. Second Edition.
Durlofsky, L. J.: 1991, Numerical calculations of equivalent grid block tensors for heterogeneous porous media, Water Resour. Res. 27(5), 699–708.
Durlofsky, L. J.: 1997, Use of higher moments for the description of upscaled, process independent relative permeabilities, SPE J. 2(4) (1991), 474–484.
Durlofsky, L. J., Behrens, R. A., Jones, R. C. and Bernath, A.: 1996, Scale up of heterogeneous three dimensional reservoir descriptions, SPE J. 1(3), 313–326.
Ekrann, S. and Aasen, J. O.: 1998, Steady-state upscaling. In: 6th European Conference on the Mathematics of Oil Recovery, Peebles, Scotland.
Ekrann, S. and Dale, M.: 1992, Averaging of Relative Permeability in Heterogeneous Reservoirs. In: P. King (ed.), The Mathematics of Oil Recovery. Oxford, UK. Based on the Proc. Conf. Math. Oil Recovery Organized by the Institute of Mathematics and Its Application in association with the Society of Petroleum Engineers and held at Robinson College, Cambridge in July 1989.
Guzman, R. E., Giordano, D., Fayers, F. J., Godi, A. and Aziz, K.: 1994, The use of dynamic pseudo functions in reservoir simulation, Technical report, Department of Petroleum Engineering, School of Earth Sciences, Stanford University, Stanford, California.
Hearn, C.: 1971, Simulation of stratified waterflooding by pseudo relative permeability curves, J. Pet. Tech., 805–813.
Hewett, T. A. and Archer, R. A.: 1997, Scale-averaged effective flow properties for coarse-grid reservoir simulation, SPE 37988 presented at the 1997 SPE Reservoir Simulation Symposium held in Dallas, Texas.
Hewett, T. A. and Behrens, R. A.: 1991, Scaling laws in reservoir simulation and their use in a hybrid finite difference/streamtube approach to simulating the effects of permeability heterogeneity, In: L. W. Lake, H. B. Carrol Jr., and T. C. Wesson (eds), Reservoir Characterization II. San Diego, California 92101, pp. 402–441.
Hewett, T. A., Suzuki, K. and Christie, M. A.: 1998, Analytical calculation of coarse-grid corrections for use in pseudofunctions, SPE J.
Jacks, H., Smith, O. and Mattax, C.: 1973, The modeling of a three-dimensional reservoir with a two-dimensional reservoir simulator – The use of dynamic pseudo functions, Soc. Petrol. Eng. J. 175–85.
Kossack, C. A., Aasen, J. and Opdal, S. T.: 1990, Scaling up heterogeneities with pseudofunctions, SPE Formation Evaluation.
Kumar, A. T. and Jerauld, G. R.: 1996, Impacts of scale-up on fluid flow from plug to gridb-lock scale in reservoir rock, SPE 35452 presented at the 1996 SPE/DOE Tenth Symposium on Improved Oil Recovery held in Tulsa, Oklahoma.
Kyte, J. R. and Berry, D. W.: 1975, New pseudo functions to control numerical dispersion, Soc. Petrol. Eng. J. 269–76.
Lasseter, T. J., Waggoner, J. R. and Lake, L. W.: Reservoir heterogeneities and their influence on ultimate recovery, In: L. W. Lake and H. B. Carrol Jr. (eds), Reservoir Characterization. Orlando, Florida.
Li, D., Cullick, A. S. and Lake, L. W.: 1996, Scaleup of reservoir-model relative permeability with a global method, SPE Reservoir Engineering 149–157.
Pickup, G. E. and Sorbie, K. S.: 1996, The scaleup of two-phase flow in porous media using phase permeability tensor, SPE J. 1(4), 369–381.
Pickup, G. E. and Stephen, K. D.: 1996, Steady-state scale-up methods, In: The Sixth Europ. Conf. Math. Oil Recovery, Peebles, Scotland, 8–11 September 1988. C-29.
Saad, N., Cullick, A. and Honarpour, M.: 1995, Effective relative permeability in scale-up and simulation, SPE 29592 presented at the 1995 SPE Rocky Mountain Regional/Low-Permeability Reservoirs Symposium, Denver, CO, U.S.A.
Stone, H. L.: 1991, Rigorous black oil pseudo functions, SPE 21207 presented at the 11th SPE Symposium on Reservoir Simulation held in Anaheim, California.
Suzuki, K.: 1999, Scale-up of relative permeabilities of isolated gridblocks accounting for boundary effects, Ph.D. Thesis, Submitted to the Department of Petroleum Engineering, Stanford University, Stanford, CA 94305.
Suzuki, K. and Hewett, T. A. Scale-up of relative permeabilities of isolated gridblocks accounting for boundary effects: 2D-to-2D sequential upscaling method, In: 1999 Annual Meeting Proceedings, Volume 1, Stanford Center for Reservoir Forecasting, Stanford University, Stanford, CA, May 1999.
Suzuki, K. and Hewett, T. A.: 1999, Scale-up of relative permeabilities of isolated gridb-locks accounting for boundary effects, Paper SPE 51938 presented at the 1999 SPE Reservoir Simulation Symposium held in Houston, Texas.
Wallstrom, T. C., Hou, S., Christie, M. A., Durlofsky, L. J. and Sharp, D. H.: 1999, Application of a New Two-Phase Upscaling Technique to Realistic Reservoir Cross Sections, SPE 51939 presented at the 1999 SPE Reservoir Simulation Symposium held in Houston, Texas.
Yamada, T. and Hewett, T. A.: 1998, Coupled gridding and upscaling using streamfunctions, In Situ 22(4), 373–413.
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Suzuki, K., Hewett, T.A. Sequential Upscaling Method. Transport in Porous Media 46, 179–212 (2002). https://doi.org/10.1023/A:1015039815258
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DOI: https://doi.org/10.1023/A:1015039815258