Abstract
An integer programming problem is said to have the integer round-up property if its optimal value is given by the least integer greater than or equal to the optimal value of its linear programming relaxation. In this paper we prove that certain classes of cutting stock problems have the integer round-up property. The proof of these results relies upon the decomposition properties of certain knapsack polyhedra.
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References
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This research was partially supported by National Science Foundation grants ECS-8005350 and 81-13534 to Cornell University.
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Marcotte, O. The cutting stock problem and integer rounding. Mathematical Programming 33, 82–92 (1985). https://doi.org/10.1007/BF01582013
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DOI: https://doi.org/10.1007/BF01582013