Influence of relaxation on filtering microflows under harmonic action on the layer

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Authors:


I.I.Denysiuk, orcid.org/0000-0001-7282-5886, S.I.Subbotin Institute of Geophysics of the National Academy of Sciences of Ukraine, Kyiv, Ukraine, e-mail: vgv_іThis email address is being protected from spambots. You need JavaScript enabled to view it.

I.A.Skurativska*, orcid.org/0000-0001-7129-4980, S.I.Subbotin Institute of Geophysics of the National Academy of Sciences of Ukraine, Kyiv, Ukraine, e-mail: This email address is being protected from spambots. You need JavaScript enabled to view it.

I.V.Bielinskyi, orcid.org/0009-0006-8836-2824, S.I.Subbotin Institute of Geophysics of the National Academy of Sciences of Ukraine, Kyiv, Ukraine, e-mail: This email address is being protected from spambots. You need JavaScript enabled to view it.

O.M.Syzonenko, orcid.org/0000-0002-8449-2481, Institute of Impulse Processes and Technologies of the National Academy of Sciences of Ukraine, Mykolaiv, Ukraine, e-mail: olgasizonenko43@ gmail.com

I.M.Hubar, orcid.org/0000-0002-2822-7288, S.I.Subbotin Institute of Geophysics of the National Academy of Sciences of Ukraine, Kyiv, Ukraine, e-mail: This email address is being protected from spambots. You need JavaScript enabled to view it.

* Corresponding author e-mail: This email address is being protected from spambots. You need JavaScript enabled to view it.


повний текст / full article



Naukovyi Visnyk Natsionalnoho Hirnychoho Universytetu. 2024, (2): 025 - 031

https://doi.org/10.33271/nvngu/2024-2/025



Abstract:



Purpose.
Investigation of the velocity fields of non-equilibrium fluid filtration in a layer under harmonic action on it and assessment of the influence of relaxation effects on the attenuation of the amplitude of initial disturbances within the framework of mathematical modeling of non-equilibrium plane-radial filtration.


Methodology.
A mathematical model of non-equilibrium plane-radial filtration with a generalized dynamic Darcy law in the form of a boundary value problem in a half-space with a harmonic excitation law at its boundary is considered. Based on the exact solutions of the boundary value problem, the attenuation of the amplitude of initial disturbances under the model’s parameters varying and influence of parameters on the size of the disturbed region are investigated.


Findings.
A differential equation modeling non-equilibrium filtration processes in the massif in the cylindrical reference frame was obtained. Using the method of separation of variables, a solution was constructed, bounded at infinity, to the model differential equation subjected to harmonic action at the layer boundary. The solution’s asymptotic approximation was constructed for large values of the argument. Using the asymptotic solution of the boundary value problem, the damping of velocity field during non-equilibrium filtration was analyzed depending on the frequency of the harmonic action, the ratio of the piezoconductivity coefficients of the layer, and the relaxation time. Profiles of the dependences of the size of the influence zone on the model parameters were plotted and the choice of parameters for optimal influence on the bottom-hole zone of the well was analyzed.


Originality.
On the basis of the non-equilibrium filtration model, it is shown that harmonic disturbances applied to the boundary of a semi-infinite layer can penetrate the reservoir over a greater distance under the conditions of manifestation of the relaxation mechanism of the fluid-skeleton interaction, compared to the equilibrium filtration process. Such an effect is observed at a finite interval of disturbance frequencies, while at high frequencies relaxation contributes to a more significant damping of disturbances. In the parametric space of excitation frequency – relaxation time, there is a locus of points that corresponds to the maximum size of influence zone of disturbances.


Practical value.
The obtained results are relevant for research on the impact of wave disturbances on the layer with the aim of intensifying filtration processes, as well as for creation of new wave technologies to increase the extraction of mineral resources from productive layers.



Keywords:
non-equilibrium filtration, Darcy’s generalized law, porous medium, wave action, attenuation, filtration velocity fields

References.


1. Doroshenko,V. M., Prokopiv,V. Y., Rudyi, M. I., & Shcherbiy, R. B. (2013). Prior to the introduction of polymer watering in oil fields of Ukraine. Oil & gas industry of Ukraine, 3, 29-32. ISSN 0548-1414.

2. Nagornyi, V. P., & Denysiuk, I. I. (2012). Impulse methods of hydrocarbon production stimulation: monograph. Kyiv: Esse, 323 p. ISBN 978-966-02-6337-6.

3. Hamidi, H., Mohammadian, E., Junin, R., Rafati, R., Manan, M., Azdarpour, A., & Junid, M. (2014). A technique for evaluating the oil/heavy-oil viscosity changes under ultrasound in a simulated porous medium. Ultrasonics, 54, 655-662. https://doi.org/10.1016/j.ultras.2013.09.006.

4. Dollah, A., Rashid, Z. Z., Othman, N. H., Hussein, N. M., & Yusuf, S. M. (2018). Effects of ultrasonic waves during water-flooding for enhanced oil recovery. International Journal of Engineering and Technology, 7, 232-236. https://doi.org/10.14419/ijet.v7i3.11.16015.

5. Khan, N., Pu, C., Li, X., He, Y., Zhang, L., & Jing, C. (2017). Permeability recovery of damaged water sensitive core using ultrasonic waves. Ultrasonics Sonochemistry, 38, 381-389. https://doi.org/10.1016/j.ultsonch.2017.03.034.

6. Manga, M., Beresnev, I., Brodsky, E. E., Elkhoury, J. E., Elsworth, D., Ingebritsen, S. E., Mays, D. C., & Wang, C. Y. (2012). Changes in permeability caused by transient stresses: Field observations, experiments and mechanisms. Reviews of Geophysics, 50, RG 2004. https://doi.org/10.1029/2011RG000382.

7. Hamidi, H., Rafati, R., Junin, R. B., & Manan, M. A. (2012). A role of ultrasonic frequency and power on oil mobilization in underground petroleum reservoirs. Journal of Petroleum Exploration and Production Technology, 2, 29-36.

8. Bazhaluk, Y. M., Karpash, O. M., Klymyshin, Ya. D., Hutak, O. I., & Khudin, N. V. (2012). Increased oil recovering by acting on the layers by elastic vibrations packages. Oil and gas business, 3, 185-198. ISSN 2073-0128.

9. Abdukamalov, O. A., Serebryakova, I. N., & Tastemirov, A. R. (2017). Experience of shock action for bottomhole zone treatment of injection wells in the fields of Western Kazakhstan. SOCAR Proceedings, 1, 62-69.

10. Hutak, O. I. (2011). Experimental studies of the influence of elastic oscillations on the change of oil filtration of a water mixture. Scientific Bulletin IFNTUNG, 3(29), 53-56. ISSN 1993-9965.

11. Perez-Arancibia, C., Godoy, E., & Duran, M. (2018). Modeling and simulation of an acoustic well stimulation method. Wave Motion, 77, 224-228. https://doi.org/10.1016/j.wavemoti.2017.12.005.

12. Yakovlev, V. V., Tkachenko, V. A., Bondar, V. V., Nikitin, V. A., Verba, Yu. V., & Zdolnik, G. P. (2015). Resonance treatment of horizontal branched wells by hydraulic impulse action. Acoustic Bulletin, 17(3), 32-42.

13. Oudina, A., & Djelouah, H. (2010). Propagation of ultrasonic waves in viscous fluids. Wave Propagation in Materials for Modern Applications (A. Petrin, Ed.), Ch.15, 293-306. Rijeka: IntechOpen. https://doi.org/10.5772/6857.

14. Denysiuk, I. I., Lemeshko, V. A., & Polyakovska, T. S. (2019). Computer modeling of fluid filtration in slab’s porous medium for creating wave technologies of intensification hydrocarbon extraction. Scientific notes of V. I. Vernadsky Taurida National University, 30(69), 3, 25-30. https://doi.org/10.32838/2663-5941/2019.3-2/05.

15. Chovnyuk, Yu., Dovgalyuk, V., Sklyarenko, O., & Peftieva, I. (2019). Mathematical modeling of the viscose fluid speed field in filtration channels of capillary – porous bodies under the action of harmonic waves. Modern technology, materials and design in construction, 2, 96-113. https://doi.org/10.31649/2311-1429-2019-2-96-113.

16. Banerjee, A., Pasupuleti, S., & Singh, M. K. (2021). Influence of fluid viscosity and flow transition over non-linear filtration through porous media. Journal Earth System Sciences, 130, 201. https://doi.org/10.1007/s12040-021-01686-z.

17. Danylenko, V. A., Danevych, T. B., Makarenko, O. S., Vladimi­rov, V. A., & Skurativskyi, S. I. (2011). Self-organization in nonlocal non-equilibrium media. Kyiv: Subbotin Institute of Geophysics, NAS of Ukraine. ISBN: 978-966-02-6088-7.

18. Skurativskyi, S. I., & Skurativska, I. A. (2019). Solutions of the model of liquid and gas filtration in the elastic mode with dynamic filtration law. Ukrainian Journal of Physics, 64(1), 19-26. https://doi.org/10.15407/ujpe64.1.19.

19. Denysiuk, I. I., Skurativska, I. A., & Hubar, I. M. (2023). Attenuation of velocity fields during non-equilibrium filtration in a half-space medium for harmonic action on it. Journal of Physical Studies, 27(3), 3801. https://doi.org/10.30970/jps.27.3801.

20. Arfken, G. B., Weber, H. J., & Harris, F. E. (2012). Mathematical methods for physicists. Academic Press, 1205. ISBN: 978-0-12-384654-9. https://doi.org/10.1016/C2009-0-30629-7.

21. Hamidi, H., Haddad, A. S., Otumudia, E. W., Rafati, R., Mohammadian, E., Azdarpour, A., …, & Tanujaya, E. (2021). Recent applications of ultrasonic waves in improved oil recovery: A review of techniques and results. Ultrasonics, 110, 106288. https://doi.org/10.1016/j.ultras.2020.106288.

 

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