Abstract
In this paper, a dual-porosity model of nonisothermal fluid filtration in naturally fractured reservoir is constructed. Based on the proposed model, the influence of filtration and thermophysical parameters of naturally fractured reservoir on the curves of temperature, pressure and their derivatives at the bottomhole of a vertical well is investigated.
This is a preview of subscription content, log in via an institution to check access.
REFERENCES
E. B. Chekaluk, Thermodynamics of an Oil Reservoir (Nedra, Moscow, 1965) [in Russian].
G. I. Barenblatt, Yu. P. Zheltov, and I. N. Kochina, ‘‘On the basic concepts of the theory of filtration of homogeneous liquids in fractured rocks,’’ Zh. Prikl. Math. Mekh. 24, 852–864 (1960).
K. S. Basniev, I. N. Kochina, and V. M. Maksimov, Underground Hydromechanics (Nedra, Moscow, 1993) [in Russian].
T. D. van Golf-Racht, Fundamentals of Fractured Reservoir Engineering (Elsevier Scientific, Amsterdam, 1982).
E. S. Romm, Filtration Properties of Fractured Rocks (Nedra, Moscow, 1966) [in Russian].
M. Vasilyeva, M. Babaei, E. T. Chung, et al., ‘‘Multiscale modeling of heat and mass transfer in fractured media for enhanced geothermal systems applications,’’ Appl. Math. Model. 67, 159–178 (2019).
H. Kazemi, ‘‘Pressure transient analysis of naturally fractured reservoirs with uniform fracture distribution,’’ Soc. Pet. Eng. J. 9, 451–462 (1969).
C. Wei, S. Cheng, J. She, et al., ‘‘Numerical study on the heat transfer behavior in naturally fractured reservoirs and applications for reservoir characterization and geothermal energy development,’’ J. Pet. Sci. Eng. 202, 108560 (2021).
A. A. Afanasyev, ‘‘Structure of a temperature front in a fractured porous medium,’’ Fluid Dyn. 55, 915–924 (2020).
K. Pruess and T. N. Narasimhan, ‘‘A practical method for modeling fluid and heat flow in fractured porous media,’’ Soc. Pet. Eng. J. 25, 14–26 (1985).
J. E. Warren and P. J. Root, ‘‘The behavior of naturally fractured reservoirs,’’ Soc. Pet. Eng. J. 3, 245–255 (1963).
R. C. Earlougher, Jr., Advances in Well Test Analysis (Soc. Pet. Eng. AIME, TX, 1977).
E. R. Badertdinova, M. Kh. Khairullin, M. N. Shamsiev, and R. M. Khairullin, ‘‘Numerical method for solving the inverse problem of nonisothermal filtration,’’ Lobachevskii J. Math. 40, 718–723 (2019).
G. DaPrat, Well Test Analysis for Fractured Reservoir Evaluation, Vol. 27 of Developments in Petroleum Science (Elsevier, Amsterdam, 1990).
H. Stehfest, ‘‘Algorithm 368: Numerical inversion of Laplace transforms,’’ Commun. ACM 13, 47–49 (1970).
Funding
This work has been supported by Russian Science Foundation, project no. 23-19-00144, https://rscf.ru/project/23-19-00144/
Author information
Authors and Affiliations
Corresponding authors
Ethics declarations
The authors of this work declare that they have no conflicts of interest.
Additional information
Publisher’s Note.
Pleiades Publishing remains neutral with regard to jurisdictional claims in published maps and institutional affiliations.
(Submitted by D. A. Gubaidullin )
Rights and permissions
About this article
Cite this article
Shamsiev, M.N., Khairullin, M.K., Morozov, P.E. et al. Nonisothermal Fluid Filtration to a Vertical Well in Naturally Fractured Reservoir. Lobachevskii J Math 44, 4478–4482 (2023). https://doi.org/10.1134/S1995080223100360
Received:
Revised:
Accepted:
Published:
Issue Date:
DOI: https://doi.org/10.1134/S1995080223100360