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Parametric Integer Programming the Right Hand Side Case

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  • Roy A. Marsten
  • Thomas Morin

Abstract

A family of integer programs is considered whose right-hand-sides lie on a given line segment L. This family is called a parametric integer program (PIP). Solving a (PIP) means finding an optimal solution for every program in the family. It is shown how a simple generalization of the conventional branch-and-bound approach to integer programming makes it possible to solve such a (PIP). The usual bounding test is extended from a comparison of two point values to a comparison of two functions defined on the line segment L. The method is illustrated on a small example and computational results for some larger problems are reported.

Suggested Citation

  • Roy A. Marsten & Thomas Morin, 1975. "Parametric Integer Programming the Right Hand Side Case," NBER Working Papers 0106, National Bureau of Economic Research, Inc.
    • Handle: RePEc:nbr:nberwo:0106
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    References listed on IDEAS

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    1. Yoshiaki Toyoda, 1975. "A Simplified Algorithm for Obtaining Approximate Solutions to Zero-One Programming Problems," Management Science, INFORMS, vol. 21(12), pages 1417-1427, August.
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    1. Efstratios Pistikopoulos & Luis Dominguez & Christos Panos & Konstantinos Kouramas & Altannar Chinchuluun, 2012. "Theoretical and algorithmic advances in multi-parametric programming and control," Computational Management Science, Springer, vol. 9(2), pages 183-203, May.

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