Benders, Metric and Cutset Inequalities for Multicommodity Capacitated Network Design

Benders, Metric and Cutset Inequalities for Multicommodity Capacitated Network Design. Costa, A. M., Cordeau, J., & Gendron, B. Computational Optimization and Applications, 42:371–392, 2009.
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Solving multicommodity capacitated network design problems is a hard task that requires the use of several strategies like relaxing some constraints and strengthening the model with valid inequalities. In this paper, we compare three sets of inequalities that have been widely used in this context: Benders, metric and cutset inequalities. We show that Benders inequalities associated to extreme rays are metric inequalities. We also show how to strengthen Benders inequalities associated to non-extreme rays to obtain metric inequalities. We show that cutset inequalities are Benders inequalities, but not necessarily metric inequalities. We give a necessary and sufficient condition for a cutset inequality to be a metric inequality. Computational experiments show the effectiveness of strengthening Benders and cutset inequalities to obtain metric inequalities.

@article{costa09benders,
  title = {Benders, Metric and Cutset Inequalities for~Multicommodity Capacitated Network~Design},
  author = {Costa, A. M. and Cordeau, J.-F. and Gendron, B.},
  year = {2009},
  journal = {Computational Optimization and Applications},
  volume = {42},
  pages = {371--392},
  issn = {1573-2894},
  doi = {10.1007/s10589-007-9122-0},
  urldate = {2021-05-10},
  abstract = {Solving multicommodity capacitated network design problems is a hard task that requires the use of several strategies like relaxing some constraints and strengthening the model with valid inequalities. In this paper, we compare three sets of inequalities that have been widely used in this context: Benders, metric and cutset inequalities. We show that Benders inequalities associated to extreme rays are metric inequalities. We also show how to strengthen Benders inequalities associated to non-extreme rays to obtain metric inequalities. We show that cutset inequalities are Benders inequalities, but not necessarily metric inequalities. We give a necessary and sufficient condition for a cutset inequality to be a metric inequality. Computational experiments show the effectiveness of strengthening Benders and cutset inequalities to obtain metric inequalities.},
  copyright = {All rights reserved},
  langid = {english},
  file = {/Users/acosta/Zotero/storage/XU4WXNZF/Costa et al. - 2009 - Benders, metric and cutset inequalities for multic.pdf}
}

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