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Точные штрафные функции в задаче выбора оптимального оптового заказа в условиях быстрого колебания спроса. / Буре, Владимир Мансурович; Карелин, Владимир Витальевич; Полякова, Людмила Николаевна.

In: ВЕСТНИК САНКТ-ПЕТЕРБУРГСКОГО УНИВЕРСИТЕТА. СЕРИЯ 10: ПРИКЛАДНАЯ МАТЕМАТИКА, ИНФОРМАТИКА, ПРОЦЕССЫ УПРАВЛЕНИЯ, Vol. 17, No. 4, 2021, p. 397-408.

Research output: Contribution to journalArticlepeer-review

Harvard

Буре, ВМ, Карелин, ВВ & Полякова, ЛН 2021, 'Точные штрафные функции в задаче выбора оптимального оптового заказа в условиях быстрого колебания спроса', ВЕСТНИК САНКТ-ПЕТЕРБУРГСКОГО УНИВЕРСИТЕТА. СЕРИЯ 10: ПРИКЛАДНАЯ МАТЕМАТИКА, ИНФОРМАТИКА, ПРОЦЕССЫ УПРАВЛЕНИЯ, vol. 17, no. 4, pp. 397-408. https://doi.org/10.21638/11701/SPBU10.2021.408

APA

Буре, В. М., Карелин, В. В., & Полякова, Л. Н. (2021). Точные штрафные функции в задаче выбора оптимального оптового заказа в условиях быстрого колебания спроса. ВЕСТНИК САНКТ-ПЕТЕРБУРГСКОГО УНИВЕРСИТЕТА. СЕРИЯ 10: ПРИКЛАДНАЯ МАТЕМАТИКА, ИНФОРМАТИКА, ПРОЦЕССЫ УПРАВЛЕНИЯ, 17(4), 397-408. https://doi.org/10.21638/11701/SPBU10.2021.408

Vancouver

Буре ВМ, Карелин ВВ, Полякова ЛН. Точные штрафные функции в задаче выбора оптимального оптового заказа в условиях быстрого колебания спроса. ВЕСТНИК САНКТ-ПЕТЕРБУРГСКОГО УНИВЕРСИТЕТА. СЕРИЯ 10: ПРИКЛАДНАЯ МАТЕМАТИКА, ИНФОРМАТИКА, ПРОЦЕССЫ УПРАВЛЕНИЯ. 2021;17(4):397-408. https://doi.org/10.21638/11701/SPBU10.2021.408

Author

Буре, Владимир Мансурович ; Карелин, Владимир Витальевич ; Полякова, Людмила Николаевна. / Точные штрафные функции в задаче выбора оптимального оптового заказа в условиях быстрого колебания спроса. In: ВЕСТНИК САНКТ-ПЕТЕРБУРГСКОГО УНИВЕРСИТЕТА. СЕРИЯ 10: ПРИКЛАДНАЯ МАТЕМАТИКА, ИНФОРМАТИКА, ПРОЦЕССЫ УПРАВЛЕНИЯ. 2021 ; Vol. 17, No. 4. pp. 397-408.

BibTeX

@article{4e13c5497710471888871dccc72cbd5a,
title = "Точные штрафные функции в задаче выбора оптимального оптового заказа в условиях быстрого колебания спроса",
abstract = "The current article discusses a different situation in the market, when there is a rush demand for a new product followed by a sharp drop in demand. The trading company uses the following scheme for the wholesale order of goods. The ordered product is divided into two parts, and the first batch of goods arrives immediately, it is sold over a certain period of time [0, T1]. The second batch of goods is delivered at the time T, but at the time interval [0, T]. This batch is sold at a discount and is completely sold out. Time T corresponds to the end of the sale of the entire product. The time points T1,T are selected by the trading firm from the condition of maximizing income. The need to consider such a wholesale order scheme is related to the fact that, firstly, the warehouses of the trading firms have limited capacity and cannot accommodate all the ordered goods, and secondly, a manufacturer may not offer the entire ordered batch of goods, since not all goods can be produced at the initial (zero) point of time immediately after receiving the order. At the time T1, the trading company completely sells the first batch of goods and receives financial resources, part of which is paid to the manufacturer. At the moment of time T, the complete sale of all purchased goods is completed. The choice of time points T1 and T allow to determine the volume of the first batch of ordered goods and the total volume of product ordered from the manufacturer. In the article, a mathematical model is proposed that makes it possible to choose the optimal ordering strategy for a trading company in the conditions of excessive growth of demand for the new product in time τ 1,τ2 at some unknown point in time and τ* € [τ3,τ4], and the subsequent sharp drop in demand in the period of time [τ3, τ4] due to the saturation of the market with a new product. Four possible variants of optimization problems are considered. A method of exact penalty function is suggested, which allows one to find their solutions.",
keywords = "Discount, Inventory level, Maximin, Method of exact penalty functions, Random demand, Rush demand, Shortage of goods",
author = "Буре, {Владимир Мансурович} and Карелин, {Владимир Витальевич} and Полякова, {Людмила Николаевна}",
note = "Funding Information: This work was supported by the Russian Foundation for Basic Research (project N 20-07-0108). Publisher Copyright: {\textcopyright} 2021 Saint Petersburg State University. All rights reserved.",
year = "2021",
doi = "10.21638/11701/SPBU10.2021.408",
language = "русский",
volume = "17",
pages = "397--408",
journal = " ВЕСТНИК САНКТ-ПЕТЕРБУРГСКОГО УНИВЕРСИТЕТА. ПРИКЛАДНАЯ МАТЕМАТИКА. ИНФОРМАТИКА. ПРОЦЕССЫ УПРАВЛЕНИЯ",
issn = "1811-9905",
publisher = "Издательство Санкт-Петербургского университета",
number = "4",

}

RIS

TY - JOUR

T1 - Точные штрафные функции в задаче выбора оптимального оптового заказа в условиях быстрого колебания спроса

AU - Буре, Владимир Мансурович

AU - Карелин, Владимир Витальевич

AU - Полякова, Людмила Николаевна

N1 - Funding Information: This work was supported by the Russian Foundation for Basic Research (project N 20-07-0108). Publisher Copyright: © 2021 Saint Petersburg State University. All rights reserved.

PY - 2021

Y1 - 2021

N2 - The current article discusses a different situation in the market, when there is a rush demand for a new product followed by a sharp drop in demand. The trading company uses the following scheme for the wholesale order of goods. The ordered product is divided into two parts, and the first batch of goods arrives immediately, it is sold over a certain period of time [0, T1]. The second batch of goods is delivered at the time T, but at the time interval [0, T]. This batch is sold at a discount and is completely sold out. Time T corresponds to the end of the sale of the entire product. The time points T1,T are selected by the trading firm from the condition of maximizing income. The need to consider such a wholesale order scheme is related to the fact that, firstly, the warehouses of the trading firms have limited capacity and cannot accommodate all the ordered goods, and secondly, a manufacturer may not offer the entire ordered batch of goods, since not all goods can be produced at the initial (zero) point of time immediately after receiving the order. At the time T1, the trading company completely sells the first batch of goods and receives financial resources, part of which is paid to the manufacturer. At the moment of time T, the complete sale of all purchased goods is completed. The choice of time points T1 and T allow to determine the volume of the first batch of ordered goods and the total volume of product ordered from the manufacturer. In the article, a mathematical model is proposed that makes it possible to choose the optimal ordering strategy for a trading company in the conditions of excessive growth of demand for the new product in time τ 1,τ2 at some unknown point in time and τ* € [τ3,τ4], and the subsequent sharp drop in demand in the period of time [τ3, τ4] due to the saturation of the market with a new product. Four possible variants of optimization problems are considered. A method of exact penalty function is suggested, which allows one to find their solutions.

AB - The current article discusses a different situation in the market, when there is a rush demand for a new product followed by a sharp drop in demand. The trading company uses the following scheme for the wholesale order of goods. The ordered product is divided into two parts, and the first batch of goods arrives immediately, it is sold over a certain period of time [0, T1]. The second batch of goods is delivered at the time T, but at the time interval [0, T]. This batch is sold at a discount and is completely sold out. Time T corresponds to the end of the sale of the entire product. The time points T1,T are selected by the trading firm from the condition of maximizing income. The need to consider such a wholesale order scheme is related to the fact that, firstly, the warehouses of the trading firms have limited capacity and cannot accommodate all the ordered goods, and secondly, a manufacturer may not offer the entire ordered batch of goods, since not all goods can be produced at the initial (zero) point of time immediately after receiving the order. At the time T1, the trading company completely sells the first batch of goods and receives financial resources, part of which is paid to the manufacturer. At the moment of time T, the complete sale of all purchased goods is completed. The choice of time points T1 and T allow to determine the volume of the first batch of ordered goods and the total volume of product ordered from the manufacturer. In the article, a mathematical model is proposed that makes it possible to choose the optimal ordering strategy for a trading company in the conditions of excessive growth of demand for the new product in time τ 1,τ2 at some unknown point in time and τ* € [τ3,τ4], and the subsequent sharp drop in demand in the period of time [τ3, τ4] due to the saturation of the market with a new product. Four possible variants of optimization problems are considered. A method of exact penalty function is suggested, which allows one to find their solutions.

KW - Discount

KW - Inventory level

KW - Maximin

KW - Method of exact penalty functions

KW - Random demand

KW - Rush demand

KW - Shortage of goods

UR - http://www.scopus.com/inward/record.url?scp=85125294874&partnerID=8YFLogxK

U2 - 10.21638/11701/SPBU10.2021.408

DO - 10.21638/11701/SPBU10.2021.408

M3 - статья

AN - SCOPUS:85125294874

VL - 17

SP - 397

EP - 408

JO - ВЕСТНИК САНКТ-ПЕТЕРБУРГСКОГО УНИВЕРСИТЕТА. ПРИКЛАДНАЯ МАТЕМАТИКА. ИНФОРМАТИКА. ПРОЦЕССЫ УПРАВЛЕНИЯ

JF - ВЕСТНИК САНКТ-ПЕТЕРБУРГСКОГО УНИВЕРСИТЕТА. ПРИКЛАДНАЯ МАТЕМАТИКА. ИНФОРМАТИКА. ПРОЦЕССЫ УПРАВЛЕНИЯ

SN - 1811-9905

IS - 4

ER -

ID: 91832276