Standard

Sequential stability of the constant cost dynamic lot size model. / Richter, Knut.

в: International Journal of Production Economics, Том 35, № 1-3, 06.1994, стр. 359-363.

Результаты исследований: Научные публикации в периодических изданияхстатьяРецензирование

Harvard

Richter, K 1994, 'Sequential stability of the constant cost dynamic lot size model', International Journal of Production Economics, Том. 35, № 1-3, стр. 359-363. https://doi.org/10.1016/0925-5273(94)90103-1

APA

Vancouver

Richter K. Sequential stability of the constant cost dynamic lot size model. International Journal of Production Economics. 1994 Июнь;35(1-3):359-363. https://doi.org/10.1016/0925-5273(94)90103-1

Author

Richter, Knut. / Sequential stability of the constant cost dynamic lot size model. в: International Journal of Production Economics. 1994 ; Том 35, № 1-3. стр. 359-363.

BibTeX

@article{08d112f87ad9470ea79d2cb3f58067d6,
title = "Sequential stability of the constant cost dynamic lot size model",
abstract = "The stability region of the dynamic lot size problem understood as the set of cost parameter inputs for which an optimal solution remains valid has been studied in various papers of V{\"o}r{\"o}s and the author. Recently van Hoesel and Wagelmans discussed these results and suggested some numerical improvement. V{\"o}r{\"o}s provided explicity expressions for the boundaries of the cone-like regions. Now it will be studied how the stability region behaves if the time horizon is growing. The stability region will be shown to be non-monotonous, i.e. it may be shrinking, extending or shifting. At the same time there is some monotony connected with the planning horizon property of the dynamic lot size model, i.e. some monotonous behavior can be found for neighbor planning intervals.",
author = "Knut Richter",
year = "1994",
month = jun,
doi = "10.1016/0925-5273(94)90103-1",
language = "English",
volume = "35",
pages = "359--363",
journal = "International Journal of Production Economics",
issn = "0925-5273",
publisher = "Elsevier",
number = "1-3",

}

RIS

TY - JOUR

T1 - Sequential stability of the constant cost dynamic lot size model

AU - Richter, Knut

PY - 1994/6

Y1 - 1994/6

N2 - The stability region of the dynamic lot size problem understood as the set of cost parameter inputs for which an optimal solution remains valid has been studied in various papers of Vörös and the author. Recently van Hoesel and Wagelmans discussed these results and suggested some numerical improvement. Vörös provided explicity expressions for the boundaries of the cone-like regions. Now it will be studied how the stability region behaves if the time horizon is growing. The stability region will be shown to be non-monotonous, i.e. it may be shrinking, extending or shifting. At the same time there is some monotony connected with the planning horizon property of the dynamic lot size model, i.e. some monotonous behavior can be found for neighbor planning intervals.

AB - The stability region of the dynamic lot size problem understood as the set of cost parameter inputs for which an optimal solution remains valid has been studied in various papers of Vörös and the author. Recently van Hoesel and Wagelmans discussed these results and suggested some numerical improvement. Vörös provided explicity expressions for the boundaries of the cone-like regions. Now it will be studied how the stability region behaves if the time horizon is growing. The stability region will be shown to be non-monotonous, i.e. it may be shrinking, extending or shifting. At the same time there is some monotony connected with the planning horizon property of the dynamic lot size model, i.e. some monotonous behavior can be found for neighbor planning intervals.

UR - http://www.scopus.com/inward/record.url?scp=0028443475&partnerID=8YFLogxK

U2 - 10.1016/0925-5273(94)90103-1

DO - 10.1016/0925-5273(94)90103-1

M3 - Article

AN - SCOPUS:0028443475

VL - 35

SP - 359

EP - 363

JO - International Journal of Production Economics

JF - International Journal of Production Economics

SN - 0925-5273

IS - 1-3

ER -

ID: 48976534