2011
DOI: 10.2139/ssrn.1853428
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Robust Solutions of Optimization Problems Affected by Uncertain Probabilities

Abstract: In this paper we focus on robust linear optimization problems with uncertainty regions defined by φ-divergences (for example, chi-squared, Hellinger, Kullback-Leibler). We show how uncertainty regions based on φ-divergences arise in a natural way as confidence sets if the uncertain parameters contain elements of a probability vector. Such problems frequently occur in, for example, optimization problems in inventory control or finance that involve terms containing moments of random variables, expected utility, … Show more

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Cited by 257 publications
(548 citation statements)
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“…Note that (26) is a system of linear constraints that scales polynomially in the description of problem (2). The next result shows that the restriction to Markov ambiguity sets in Theorem 7 is necessary.…”
Section: Individual Chance Constraintsmentioning
confidence: 86%
See 4 more Smart Citations
“…Note that (26) is a system of linear constraints that scales polynomially in the description of problem (2). The next result shows that the restriction to Markov ambiguity sets in Theorem 7 is necessary.…”
Section: Individual Chance Constraintsmentioning
confidence: 86%
“…We now study chance constrained programs of the form (2), where the safety of the underlying system can be actively enhanced by adjusting the design decisions x ∈ R N . It turns out that the tractability of (2) is intimately related to the number of rows J of the technology matrix S(x) and the right-hand side vector t(x).…”
Section: Chance Constrained Programmingmentioning
confidence: 99%
See 3 more Smart Citations