Erratum to: Polyhedral approximation of ellipsoidal uncertainty sets via extended formulations: a computational case study (Computational Management Science, (2016), 13, 2, (151-193), 10.1007/s10287-015-0243-0)

Bärmann A, Heidt A, Martin A, Pokutta S, Thurner C (2017)

Publication Type: Journal article, Erratum

Publication year: 2017

Journal

Book Volume: 14

Pages Range: 293-296

Journal Issue: 2

DOI: 10.1007/s10287-016-0269-y

Abstract

The purpose of this erratum is to correct a signing error in the statement of the inner approximation of the second-order cone Lⁿpresented in Bärmann et al. (2016). In Bärmann et al. (2016), we developed a construction for the inner approximation of Lⁿbased on the ideas of Ben-Tal and Nemirovski (2001) and Glineur (2000). We showed—using the same decomposition as in the aforementioned papers—that it suffices to find an inner approximation of L², which in turn can be obtained from an inner approximation of the unit ball B² ⊂ R². However, in the statement of the latter two approximations, there was a signing error which we would like to correct here.

Authors with CRIS profile

Involved external institutions

Georgia Institute of Technology United States (USA) (US)

How to cite

APA:

Bärmann, A., Heidt, A., Martin, A., Pokutta, S., & Thurner, C. (2017). Erratum to: Polyhedral approximation of ellipsoidal uncertainty sets via extended formulations: a computational case study (Computational Management Science, (2016), 13, 2, (151-193), 10.1007/s10287-015-0243-0). Computational Management Science, 14(2), 293-296. https://dx.doi.org/10.1007/s10287-016-0269-y

MLA:

Bärmann, Andreas, et al. "Erratum to: Polyhedral approximation of ellipsoidal uncertainty sets via extended formulations: a computational case study (Computational Management Science, (2016), 13, 2, (151-193), 10.1007/s10287-015-0243-0)." Computational Management Science 14.2 (2017): 293-296.

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