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A semi-infinite hydraulic fracture with leak-off driven by a power-law fluid

Published online by Cambridge University Press:  20 December 2017

E. V. Dontsov*
Affiliation:
Department of Civil and Environmental Engineering, University of Houston, Houston, TX 77204, USA
O. Kresse
Affiliation:
Schlumberger, 110 Schlumberger Drive, MD-2, Sugar Land, TX 77478, USA
*
Email address for correspondence: [email protected]

Abstract

This study investigates the problem of a semi-infinite hydraulic fracture that propagates steadily in a permeable formation. The fracturing fluid rheology is assumed to follow a power-law behaviour, while the leak-off is modelled by Carter’s model. A non-singular formulation is employed to effectively analyse the problem and to construct a numerical solution. The problem under consideration features three limiting analytic solutions that are associated with dominance of either toughness, leak-off or viscosity. Transitions between all the limiting cases are analysed and the boundaries of applicability of all these limiting solutions are quantified. These bounds allow us to determine the regions in the parametric space, in which these limiting solutions can be used. The problem of a semi-infinite fracture, which is considered in this study, provides the solution for the tip region of a hydraulic fracture and can be used in hydraulic fracturing simulators to facilitate solving the moving fracture boundary problem. To cater for such applications, for which rapid evaluation of the solution is necessary, the last part of this paper constructs an approximate closed form solution for the problem and evaluates its accuracy against the numerical solution inside the parametric space.

Type
JFM Papers
Copyright
© 2017 Cambridge University Press 

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References

Batchelor, G. 1967 An Introduction to Fluid Dynamics. Cambridge University Press.Google Scholar
Ben-Naceur, K. 1989 Modeling of hydraulic fractures. In Reservoir Stimulation (ed. Economies, M. & Nolte, K.). Prentice Hall.Google Scholar
Carter, E. D. 1957 Optimum fluid characteristics for fracture extension. In Drilling and Production Practices (ed. Howard, G. C. & Fast, C. R.), pp. 261270. American Petroleum Institute.Google Scholar
Desroches, J., Detournay, E., Lenoach, B., Papanastasiou, P., Pearson, J. R. A., Thiercelin, M. & Cheng, A. H.-D. 1994 The crack tip region in hydraulic fracturing. Proc. R. Soc. Lond. A 447, 3948.Google Scholar
Detournay, E. 2016 Mechanics of hydraulic fractures. Annu. Rev. Fluid Mech. 48, 31139.Google Scholar
Detournay, E. & Garagash, D. 2003 The tip region of a fluid-driven fracture in a permeable elastic solid. J. Fluid Mech. 494, 132.Google Scholar
Dontsov, E. & Peirce, A. 2015b A non-singular integral equation formulation to analyze multiscale behaviour in semi-infinite hydraulic fractures. J. Fluid Mech. 781, R1.Google Scholar
Dontsov, E. V. 2016a An approximate solution for a penny-shaped hydraulic fracture that accounts for fracture toughness, fluid viscosity, and leak-off. R. Soc. Open Sci. 3, 160737.Google Scholar
Dontsov, E. V. 2016b Propagation regimes of buoyancy-driven hydraulic fractures with solidification. J. Fluid Mech. 797, 128.Google Scholar
Dontsov, E. V. 2016c Tip region of a hydraulic fracture driven by a laminar-to-turbulent fluid flow. J. Fluid Mech. 797, R2.Google Scholar
Dontsov, E. V. 2017 An approximate solution for a plane strain hydraulic fracture that accounts for fracture toughness, fluid viscosity, and leak-off. Intl J. Fract. 205, 221237.Google Scholar
Dontsov, E. V. & Peirce, A. P. 2015a Incorporating Viscous, Toughness, and Intermediate Regimes of Propagation into enhanced Pseudo-3D Model. In Proceedings 49th U.S. Rock Mechanics Symposium, San Francisco, CA, USA, ARMA-2015-297. American Rock Mechanics Association.Google Scholar
Dontsov, E. V. & Peirce, A. P. 2016 Implementing a universal tip asymptotic solution into an implicit level set algorithm (ILSA) for multiple parallel hydraulic fractures. In Proceedings 50th U.S. Rock Mechanics/Geomechanics Symposium, 26–29 June, Houston, Texas, ARMA-2016-268. American Rock Mechanics Association.Google Scholar
Dontsov, E. V. & Peirce, A. P. 2017 A multiscale implicit level set algorithm (ILSA) to model hydraulic fracture propagation incorporating combined viscous, toughness, and leak-off asymptotics. Comput. Meth. Appl. Mech. Engng 313, 5384.Google Scholar
Economides, M. J. & Nolte, K. G. 2000 Reservoir Stimulation, 3rd edn. John Wiley & Sons.Google Scholar
Garagash, D. & Detournay, E. 2000 The tip region of a fluid-driven fracture in an elastic medium. Trans. ASME J. Appl. Mech. 67, 183192.Google Scholar
Garagash, D. I., Detournay, E. & Adachi, J. I. 2011 Multiscale tip asymptotics in hydraulic fracture with leak-off. J. Fluid Mech. 669, 260297.Google Scholar
Gomez, D.2016. A non-singular integral equation formulation of permeable semi-infinite hydraulic fractures driven by shear-thinning fluids. Master’s thesis, The University of British Columbia.Google Scholar
Gordeliy, E. & Peirce, A. P. 2013 Implicit level set schemes for modeling hydraulic fractures using the xfem. Comput. Meth. Appl. Mech. Engng 266, 125143.Google Scholar
Hills, D. A., Kelly, P. A., Dai, D. N. & Korsunsky, A. M. 1996 Solution of crack problems, The Distributed Dislocation Technique, Solid Mechanics and its Applications, vol. 44. Kluwer.Google Scholar
Kovalyshen, Y. & Detournay, E. 2013 Propagation of a semi-infinite hydraulic fracture in a poroelastic medium. Poromechanics V 431437.Google Scholar
Legarth, B., Huenges, E. & Zimmermann, G. 2005 Hydraulic fracturing in a sedimentary geothermal reservoir: results and implications. Intl J. Rock Mech. Min. Sci. 42, 10281041.Google Scholar
Lenoach, B. 1995 The crack tip solution for hydraulic fracturing in a permeable solid. J. Mech. Phys. Solids 43, 10251043.Google Scholar
Linkov, A. M. 2015 The particle velocity, speed equation and universal asymptotics for the efficient modelling of hydraulic fractures. Z. Angew. Math. Mech. 79, 5463.Google Scholar
Lister, J. R. 1990 Buoyancy-driven fluid fracture: the effects of material toughness and of low-viscosity precursors. J. Fluid Mech. 210, 263280.Google Scholar
Madyarova, M. V.2003. Fluid-driven penny-shaped fracture in elastic medium. Master’s thesis, University of Minnesota.Google Scholar
Peirce, A. & Detournay, E. 2008 An implicit level set method for modeling hydraulically driven fractures. Comput. Meth. Appl. Mech. Engng 197, 28582885.Google Scholar
Peirce, A. P. 2015 Modeling multi-scale processes in hydraulic fracture propagation using the implicit level set algorithm. Comput. Meth. Appl. Mech. Engng 283, 881908.Google Scholar
Rice, J. R. 1968 Mathematical analysis in the mechanics of fracture. In Fracture: An Advanced Treatise (ed. Liebowitz, H.), vol. II, 3, pp. 191311. Academic.Google Scholar
Roper, S. M. & Lister, J. R. 2007 Buoyancy-driven crack propagation: the limit of large fracture toughness. J. Fluid Mech. 580, 359380.Google Scholar
Spence, D., Sharp, P. & Turcotte, D. 1987 Buoyancy-driven crack propagation: a mechanism for magma migration. J. Fluid Mech. 174, 135153.Google Scholar
Spence, D. & Turcotte, D. 1985 Magma-driven propagation of cracks. J. Geophys. Res. 90, 575580.Google Scholar
Tsai, V. C. & Rice, J. R. 2010 A model for turbulent hydraulic fracture and application to crack propagation at glacier beds. J. Geophys. Res. 115, F03007.Google Scholar