Conjugate Problem for Optimal Placement of Industrial Production Facilities

Article Sidebar

PDF (Русский)
Published: May 10, 2024
DOI: https://doi.org/10.62132/ijdt.v7i2.175
Keywords:
mathematical model, finite-difference method, conjugate problem, atmosphere, harmful substances

Main Article Content

Normakhmad Ravshanov
Tashkent Pediatric Medical Institute
https://orcid.org/0000-0001-6965-7156
Iroda Nabieva
Digital Technologies and Artificial Intelligence Research Institute
Dilshod Karshiev
Tashkent Pediatric Medical Institute

Abstract

A related conjugate problem is to ensure that industrial facilities are optimally located throughout a region, taking into account global and local sanitary standards. The main parameters for the spread of harmful substances are soil erosion, physical and mechanical properties of the released pollutants from industrial facilities, and climatic conditions of the region as a whole. When solving problems related to sanitary-hygienic norms, the optimal placement of industrial facilities can be realized by integrating coupled problems, the advantage of which is to save computational resource and calculation time. To solve this problem, a conservative mathematical algorithm of a high level of accuracy on temporal and spatial variables has been developed.

Article Details

How to Cite
Ravshanov, N., Nabieva, I., & Karshiev, D. (2024). Conjugate Problem for Optimal Placement of Industrial Production Facilities. INTERNATIONAL JOURNAL OF THEORETICAL AND APPLIED ISSUES OF DIGITAL TECHNOLOGIES, 7(2), 15–26. https://doi.org/10.62132/ijdt.v7i2.175
Issue
Vol. 7 No. 2 (2024): International Journal of Theoretical and Applied Issues of Digital Technologies
Section
Articles
Creative Commons License

This work is licensed under a Creative Commons Attribution 4.0 International License.

References

Vozdukh v Tashkente snova «vrednogo» urovnya/Internet-izdaniye «Gaze-ta.uz». – 2024. – Rezhim dostupa: www.gazeta.uz/ru/2024/01/17/air/.

C. Gualtieri, A. Angeloudis, F. Bom-bardelli, S. Jha, T. Stoesser. On the Values for the Turbulent Schmidt Number in Environmental Flows.// Fluids 2017, 2, 17; DOI:10.3390/fluids2020017.

V. M. Khazins, V. V. Shuvalov, S. P. Soloviev. Numerical Modeling of Formation and Rise of Gas and Dust Cloud from Large Scale Commercial Blast-ing.// Atmosphere 2020, 11, 1112; DOI: 10.3390/atmos11101112.

S. Abe, Y. Okagaki, A. Satou, Y. Sibamoto. A numerical investigation on the heat transfer and turbulence production characteristics induced by a swirl spacer in a singletube geometry under single-phase flow condition.// Annals of Nuclear Energy 159 (2021) 108321; DOI:10.1016/j.anucene.2021.108321.

P. V. Amosov, A. A. Baklanov, D. V. Makarov, V. A. Masloboyev. Chislennoye modelirovaniye zagryazneniya atmosfery v podkhodakh sluchaynogo vybora diskretnykh uchastkov pyleniya i pointerval'nogo raspredeleniya razmera pyli. // Vestnik MGTU. 2022. T. 25, № 1. S. 61–73. DOI: DOI:10.21443/1560-9278-2022-25-1-61-73.

S. Torno, J. Torano, M. Menendez, M. Gent. CFD simulation of blasting dust for the design of physical barriers.// Environ Earth Sci (2011) 64:73–83; DOI: 10.1007/s12665-010-0818-6.

N. Ravshanov, D. Sharipov. Advanced mathematical model of transfer and dif-fusion process of harmful substances in the atmospheric boundary layer.// Journal of Advance Research in Computer Science & Engineering. ISSN : 2456-3552. Vol.2. Issue-3. March, 2016. P. 19-28.

I. Kozii, L. Plyatsuk, T. Zhylenko, L. Hurets, Y. Bataltsev, D. Sayenkov. Development of the Turbulent Diffusion Model of Fine Suspended Substances in the Lower Atmosphere Layer.// ISSN 1392–1320 MATERIALS SCIENCE (MEDŽIAGOTYRA). Vol. 28, No. 4. 2022. DOI:10.5755/j02.ms.30223.

N. A. Ponomareva, N. F. Elanskya, A. A. Kirsanovb, O. V. Postylyakova, A. N. Borovskia, Y. M. Verevkinc. Application of Atmospheric Chemical Transport Mod-els to Validation of Pollutant Emissions in Moscow.// ISSN 1024-8560, Atmos-pheric and Oceanic Optics, 2020, Vol. 33, No. 4, P. 362–371. DOI: 10.1134/ S1024856020040090.

D. Kim, M. Chin, H. Bian, Q. Tan, M. E. Brown, T. Zheng, R. You, T. Diehl, P. Ginoux, T. Kucsera. The effect of the dynamic surface bareness on dust source function, emission, and distribution.// journal of geophysical research: atmospheres, vol. 118, P.871–886, DOI:10.1029/2012jd017907, 2013.

O. I. Sedlyarov, Ye. S. Borodina. Modelirovaniye rasprostraneniya zagryaznyayushchikh veshchestv v prizemnom sloye atmosfery s uchetom vliyaniya zastroyki i rel'yefa mestnosti. // Promyshlennyye protsessy i tekhnologii. 2022. T. 2. № 2(4) 9. DOI: 10.37816/2713-0789-2022-2-2(4)-8-25.

F. G. Olivardia, Q. Zhang, T. Matsuo, H. Shimadera, A. Kondo. Analysis of Pollu-tant Dispersion in a Realistic Urban Street Canyon Using Coupled CFD and Chemical Reaction Modeling. // Atmosphere 2019, 10, 479; DOI:10.3390/atmos10090479.

S.S. Timofeyeva, T.V. Botirov, M.N. Musayev, A.A. Boboyev Matematicheskaya model' i monitoring zagryazneniya prizemnogo sloya atmosfery gornopromyshlennogo regiona. // Journal of Advances in Engineering Technology Vol.2(4) 2021.

S. Kurakbayeva, A. Kalbayeva, A. Brenera, E. Musirepovab, S. Akhmetova. Mathematical Modeling the Relaxation Impact of Water Pollutions in the System of Reservoirs under the One-time Emissions through a Broken Dam.// Chemical engineering transactions. Vol. 82, P. 355-360, 2020. DOI: 10.3303/CET2082060.

D. Liu, S. Kenjeres. Google-earth based visualizations for environmental flows and pollutant dispersion in urban areas.// Int. J. Environ. Res. Public Health 2017. DOI:10.3390/ijerph14030247.

S. Thabet, T. H. Thabit. Computational Fluid Dynamics: Science of the Future.// International Journal of Research and Engineering. ISSN: 2348-7860 (O). Vol. 5 No. 6. June 2018. P. 430-433. DOI: 10.21276/ijre.2018.5.6.2.

A. Laganà, A. Riganelli. Computational Reaction and Molecular Dynamics: from Simple Systems and Rigorous Methods to Large Systems and Approx-imate Methods.// Reaction and Molecu-lar Dynamics. P. 1–12. 2000.

YU.I. Solov'yev, YU.I. Bulygin, D.A. Koronchik. Konechno-elementnoye modelirovaniye protsessov massoperenosa zagryazneniy v proizvodstvennoy srede s uchetom zavikhreniy vozdushnykh potokov. // Vestnik DGTU. - 2012. - № 6.

B.CH. Meskhi, Ye.I. Maslov., A.N. Solov'yev, YU.I. Bulygin, D.A. Koronchik. Matematicheskoye i eksperimental'noye modelirovaniye protsessov rasprostraneniya oksidov ugleroda i izbyt-kov teploty v gazovozdushnoy srede pomeshcheniya. // Vestnik DGTU. - 2011. - T.11, № 6. - C. 862-874.

N.Ravshanov, F.Muradov, D.Akhmedov. Mathematical software to study the harmful substances diffusion in the atmosphere. // Ponte. – 2018. – Vol. 74. – No. 8/1. – P. 171-179. – DOI: 10.21506/ j.ponte.2018.8.13.

N.Ravshanov, T.Shafiyev, N.Tashtemirova. Nelineynaya matematicheskaya model' dlya monitoringa i prognozirovaniya protsessa rasprostraneniya aerozol'nykh chastits v atmosfere. // Vestnik TUIT. – 2019. – №2(50). – S. 45-60

T.Shafiev, Sh.Nazarov. Studies of the influence of vegetation cover on the pro-cess of transfer and diffusion of harmful substances in the atmosphere. //E3S Web of Conferences. – EDP Sciences, 2023. – Т. 431. – С. 01059. P.1-11. DOI:10.1051/ e3sconf/202343101059. (№3; Scopus; IF=0.28).

SH.E.Nazarov, O.C.Zhuraboyeva. Matematicheskaya model' i effektivnyy chislennyy algoritm dlya monitoringa i prognozirovaniya kontsentratsii vrednykh veshchestv v atmosfere s uchotom zakhvata chastits rastitel'nosti. // Problemy vychislitel'noy i prikladnoy matematiki. – 2022. – №5(43). s.72-84. (05.00.00; № 23).

G. I. Marchuk. Matematicheskoye modelirovaniye v probleme okruzhayushchey sredy/ M.: Izd. «Nauka» 1982g. 310 s.