Abstract
Here we study the discrete lot-sizing problem with an initial stock variable and an associated variable upper bound constraint. This problem is of interest in its own right, and is also a natural relaxation of the constant capacity lot-sizing problem with upper bounds and fixed charges on the stock variables. We show that the convex hull of solutions of the discrete lot-sizing problem is obtained as the intersection of two simpler sets, one a pure integer set and the other a mixing set with a variable upper bound constraint. For these two sets we derive both inequality descriptions and polynomial-size extended formulations of their respective convex hulls. Finally we carry out some limited computational tests on single-item constant capacity lot-sizing problems with upper bounds and fixed charges on the stock variables in which we use the extended formulations derived above to strengthen the initial mixed-integer programming formulations.
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Copyright © 2010 Society for Industrial and Applied Mathematics.
History
Submitted: 4 March 2009
Accepted: 13 May 2010
Published online: 4 August 2010
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Cited By
- A branch-and-cut algorithm for an assembly routing problemEuropean Journal of Operational Research, Vol. 282, No. 3 | 1 May 2020
- Single-item dynamic lot-sizing problems: An updated surveyEuropean Journal of Operational Research, Vol. 263, No. 3 | 1 Dec 2017
- Formulations and heuristics for the multi-item uncapacitated lot-sizing problem with inventory boundsInternational Journal of Production Research, Vol. 55, No. 2 | 9 August 2016
- Erratum: Lot-Sizing with Stock Upper Bounds and Fixed ChargesSIAM Journal on Discrete Mathematics, Vol. 25, No. 2 | 29 June 2011
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