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Multiscale finite-volume method for compressible multiphase flow in porous media.(English)Zbl 1220.76049

J. Comput. Phys.216, No. 2, 616-636 (2006).

Summary: The Multiscale Finite-Volume (MSFV) method has been recently developed and tested for multiphase-flow problems with simplified physics (i.e. incompressible flow without gravity and capillary effects) and proved robust, accurate and efficient. However, applications to practical problems necessitate extensions that enable the method to deal with more complex processes. In this paper we present a modified version of the MSFV algorithm that provides a suitable and natural framework to include additional physics. The algorithm consists of four main steps: computation of the local basis functions, which are used to extract the coarse-scale effective transmissibilities; solution of the coarse-scale pressure equation; reconstruction of conservative fine-scale fluxes; and solution of the transport equations. Within this framework, we develop a MSFV method for compressible multiphase flow. The basic idea is to compute the basis functions as in the case of incompressible flow such that they remain independent of the pressure. The effects of compressibility are taken into account in the solution of the coarse-scale pressure equation and, if necessary, in the reconstruction of the fine-scale fluxes. We consider three models with an increasing level of complexity in the flux reconstruction and test them for highly compressible flows (tracer transport in gas flow, imbibition and drainage of partially saturated reservoirs, depletion of gas–water reservoirs, and flooding of oil–gas reservoirs). We demonstrate that the MSFV method provides accurate solutions for compressible multiphase flow problems. Whereas slightly compressible flows can be treated with a very simple model, a more sophisticate flux reconstruction is needed to obtain accurate fine-scale saturation fields in highly compressible flows.

Cited in73 Documents

MSC:

76M12	Finite volume methods applied to problems in fluid mechanics
76N99	Compressible fluids and gas dynamics
76S05	Flows in porous media; filtration; seepage
76T99	Multiphase and multicomponent flows

Keywords:

compressibility;multiscale methods;finite-volume methods;multiphase flow in porous media;reservoir simulation

Cite Review PDF

Full Text:DOI

References:

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[6]	Dagan, G., Flow and Transport in Porous Formations (1989), Springer-Verlag: Springer-Verlag New York
[7]	Gautier, Y.; Blunt, M. J.; Christie, M. A., Nested girding and streamline-based simulation for fast reservoir performance prediction, Comput. Geosci., 3, 295-320 (1999) ·Zbl 0968.76059
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This reference list is based on information provided by the publisher or from digital mathematics libraries. Its items are heuristically matched to zbMATH identifiers and may contain data conversion errors. In some cases that data have been complemented/enhanced by data from zbMATH Open. This attempts to reflect the references listed in the original paper as accurately as possible without claiming completeness or a perfect matching.