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A note on the MIR closure and basic relaxations of polyhedra
Authors:Sanjeeb Dash  Christian Raack
Affiliation:
  • a IBM Research, United States
  • b ZIB, Germany
  • Abstract:Anderson et al. (2005) [1] show that for a polyhedral mixed integer set defined by a constraint system Axb, along with integrality restrictions on some of the variables, any split cut is in fact a split cut for a basic relaxation, i.e., one defined by a subset of linearly independent constraints. This result implies that any split cut can be obtained as an intersection cut. Equivalence between split cuts obtained from simple disjunctions of the form xj≤0 or xj≥1 and intersection cuts was shown earlier for 0/1-mixed integer sets by Balas and Perregaard (2002) [4]. We give a short proof of the result of Anderson, Cornuéjols and Li using the equivalence between mixed integer rounding (MIR) cuts and split cuts.
    Keywords:Cutting planes   Split cuts   Intersection cuts   Mixed integer rounding   Split closure
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