Mathematical Model of a Two-Factor Transportation Problem With Weighting Coefficients

Vakaliuk, T. A.; Chyzhmotria, O. V.; Semerikov, S. O.; Mintii, I. S.

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Поле DC	Значення	Мова
dc.contributor.author	Vakaliuk, T. A.	-
dc.contributor.author	Chyzhmotria, O. V.	-
dc.contributor.author	Semerikov, S. O.	-
dc.contributor.author	Mintii, I. S.	-
dc.date.accessioned	2023-12-09T19:26:23Z	-
dc.date.available	2023-12-09T19:26:23Z	-
dc.date.issued	2023-11-27	-
dc.identifier.citation	Vakaliuk T. A. Mathematical Model of a Two-Factor Transportation Problem With Weighting Coefficients / T. A. Vakaliuk, O. V. Chyzhmotria, S. O. Semerikov, I. S. Mintii // 2023 IEEE 18th International Conference on Computer Science and Information Technologies (CSIT), Lviv, Ukraine. – 2023. – P. 1-6. – DOI : 10.1109/CSIT61576.2023.10324171	uk_UA
dc.identifier.isbn	979-8-3503-6046-2	-
dc.identifier.isbn	979-8-3503-6045-5	-
dc.identifier.isbn	979-8-3503-6047-9	-
dc.identifier.issn	2766-3639	-
dc.identifier.issn	2766-3655	-
dc.identifier.uri	https://doi.org/10.1109/CSIT61576.2023.10324171	-
dc.identifier.uri	http://ds.knu.edu.ua/jspui/handle/123456789/5175	-
dc.description	[1] O. Pavlenko, D. Velykodnyi, O. Lavrentieva, and S. Filatov, “The Procedures of Logistic Transport Systems Simulation into the Petri Nets Environment,” CEUR Workshop Proceedings, vol. 2732, pp. 854–868, 2020. [2] V. Aulin, A. Hrynkiv, O. Lyashuk, Y. Vovk, S. Lysenko, D. Holub, T. Zamota, A. Pankov, M. Sokol, V. Ratynskyi, and O. Lavrentieva, “Increasing the Functioning Efficiency of the Working Warehouse of the “UVK Ukraine” Company Transport and Logistics Center,” Communications - Scientific Letters of the University of Zilina, vol. 22, no. 2, pp. 3–14, 2020. [3] S. O. Semerikov, T. A. Vakaliuk, I. S. Mintii, and S. O. Didkivska, “Challenges facing distance learning during martial law: results of a survey of Ukrainian students,” Educational Technology Quarterly, Oct. 2023. [Online]. Available: https://doi.org/10.55056/etq.637 [4] A. Burduk and K. Musiał, “Optimization of chosen transport task by using generic algorithms,” in Computer Information Systems and Industrial Management, K. Saeed and W. Homenda, Eds. Cham: Springer International Publishing, 2016, pp. 197–205. [5] V. Prifti, I. Dervishi, K. Dhoska, I. Markja, and A. Pramono, “Minimization of transport costs in an industrial company through linear programming,” IOP Conference Series: Materials Science and Engineering, vol. 909, no. 1, p. 012040, dec 2020. [6] P. C. Pop, C. Sabo, B. Biesinge, B. Hu, and G. R. Raidl, “Solving the two-stage fixed-charge transportation problem with a hybrid genetic algorithm,” Carpathian Journal of Mathematics, vol. 33, no. 3, pp. 364–370, 2017. [7] O. Chyzhmotria, O. Chyzhmotria, and T. A. Vakaliuk, “Algorithm of Analysis and Conversion of Input Data of a Two-factor Multivariative Transport Problem with Weight Coefficients,” in Proceedings of The Fourth International Workshop on Computer Modeling and Intelligent Systems (CMIS-2021), Zaporizhzhia, Ukraine, April 27, 2021, ser. CEUR Workshop Proceedings, S. Subbotin, Ed. CEUR-WS.org, 2021, vol. 2864, pp. 455–464. [Online]. Available: https://ceur-ws.org/Vol-2864/paper40.pdf [8] P. Pandian and G. Natarajan, “Solving Two Stage Transportation Problems,” in Control, Computation and Information Systems, P. Balasubramaniam, Ed. Berlin, Heidelberg: Springer, 2011, pp. 159–165. [9] E. Garajová and M. Rada, “Interval transportation problem: feasibility, optimality and the worst optimal value,” Central European Journal of Operations Research, vol. 31, no. 3, pp. 769–790, Sep 2023. [10] O. Cosma, P. C. Pop, and C. Sabo, “An Efficient Hybrid Genetic Algorithm for Solving a Particular Two-Stage Fixed-Charge Transportation Problem,” in Hybrid Artificial Intelligent Systems, H. Pérez Garcı́a, L. Sánchez González, M. Castejón Limas, H. Quintián Pardo, and E. Corchado Rodrı́guez, Eds. Cham: Springer, 2019, pp. 157–167. [11] Y. Deng, Y. Zheng, and J. Li, “Route optimization model in collaborative logistics network for mixed transportation problem considered cost discount based on GATS,” Journal of Ambient Intelligence and Humanized Computing, vol. 10, no. 1, pp. 409–416, Jan 2019. [12] M. R. Islam, M. R. Mahmud, and R. M. Pritom, “Transportation scheduling optimization by a collaborative strategy in supply chain management with TPL using chemical reaction optimization,” Neural Computing and Applications, vol. 32, no. 8, pp. 3649–3674, Apr 2020. [13] S. Gupta, H. Garg, and S. Chaudhary, “Parameter estimation and optimization of multi-objective capacitated stochastic transportation problem for gamma distribution,” Complex & Intelligent Systems, vol. 6, no. 3, pp. 651–667, Oct 2020. [Online]. Available: https://doi.org/10.1007/s40747-020-00156-1 [14] P. I. Stetsiuk, O. P. Bysaha, and S. S. Tregubenko, “Two-stage transportation problem with constraint on the number of intermediate locations,” Computer mathematics, vol. 2, pp. 119–128, 2018	uk_UA
dc.description.abstract	The article presents a two-factor transportation problem with weighting coefficients, which is formulated as a problem of finding the most profitable plan for the transportation of homogeneous cargo from points of departure to points of consumption in the conditions of two factors and the presence of weighting coefficients. The task is to develop a mathematical model of this problem. It is proposed to use the method of reducing the initial problem to the form of a classical transportation problem for the use of any of the existing solution algorithms in the future. The content of the developed step-by-step algorithm for reducing a two-factor transportation problem with weighting coefficients to the form of a classical transportation problem is presented, and the corresponding general scheme is given. The conclusions are drawn and the advantages of developing a software product for solving a two-factor transportation problem with weighting coefficients using the developed method are argued.	uk_UA
dc.language.iso	en	uk_UA
dc.publisher	IEEE	uk_UA
dc.subject	transportation problem	uk_UA
dc.subject	mathematical model	uk_UA
dc.subject	tariff matrix	uk_UA
dc.subject	factor	uk_UA
dc.subject	weighting coefficient	uk_UA
dc.subject	transportation plan	uk_UA
dc.title	Mathematical Model of a Two-Factor Transportation Problem With Weighting Coefficients	uk_UA
dc.type	Article	uk_UA
dc.identifier.doi	10.1109/CSIT61576.2023.10324171	-
local.submitter.email	semerikov@ccjourn...	uk_UA
Розташовується у зібраннях:	Кафедра професійної та соціально-гуманітарної освіти

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