2020
DOI: 10.1287/opre.2019.1905
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Pseudo-Valid Cutting Planes for Two-Stage Mixed-Integer Stochastic Programs with Right-Hand-Side Uncertainty

Abstract: Cutting planes need not be valid in stochastic integer optimization. Many practical problems under uncertainty, for example, in energy, logistics, and healthcare, can be modeled as mixed-integer stochastic programs (MISPs). However, such problems are notoriously difficult to solve. In “Pseudo-Valid Cutting Planes for Two-Stage Mixed-Integer Stochastic Programs with Right-Hand-Side Uncertainty,” Romeijnders and van der Laan introduce a novel approach to solve two-stage MISPs. Instead of using exact cuts that ar… Show more

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Cited by 4 publications
(6 citation statements)
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“…This error bound converges to zero if the variability of the random parameters in the model increases. Romeijnders and van der Laan [21] derive similar error bounds for convex approximations that fit into a specific framework. In this framework, convex approximations are defined using pseudo-valid cutting planes for the second-stage feasible regions.…”
Section: Introductionmentioning
confidence: 95%
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“…This error bound converges to zero if the variability of the random parameters in the model increases. Romeijnders and van der Laan [21] derive similar error bounds for convex approximations that fit into a specific framework. In this framework, convex approximations are defined using pseudo-valid cutting planes for the second-stage feasible regions.…”
Section: Introductionmentioning
confidence: 95%
“…for some C > 0; see [21,Example 2] for details. Observe that the error bound goes to zero if σ i → ∞ for all i = 1, .…”
Section: Definition 4 For Everymentioning
confidence: 99%
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