New Classes of Facets for Complementarity Knapsack ProblemsOpen Website

Alberto Del Pia, Jeff T. Linderoth, Haoran Zhu

Published: 01 Jan 2022, Last Modified: 28 Apr 2023ISCO 2022Readers: Everyone
Abstract: The complementarity knapsack problem (CKP) is a knapsack problem with real-valued variables and complementarity conditions between pairs of its variables. We extend the polyhedral studies of De Farias et al. for CKP, by proposing three new families of cutting-planes that are all obtained from a combinatorial concept known as a pack. Sufficient conditions for these inequalities to be facet-defining, based on the concept of a maximal switching pack, are also provided. Moreover, we answer positively a conjecture by De Farias et al. about the separation complexity of the inequalities introduced in their work.
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