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Robust solutions of Linear Programming problems contaminated with uncertain data

Mathematical Programming volume 88pages 411–424 (2000)Cite this article

Abstract.

Optimal solutions of Linear Programming problems may become severely infeasible if the nominal data is slightly perturbed. We demonstrate this phenomenon by studying 90 LPs from the well-known NETLIB collection. We then apply the Robust Optimization methodology (Ben-Tal and Nemirovski [1–3]; El Ghaoui et al. [5, 6]) to produce “robust” solutions of the above LPs which are in a sense immuned against uncertainty. Surprisingly, for the NETLIB problems these robust solutions nearly lose nothing in optimality.

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Authors and Affiliations

  1. Faculty of Industrial Engineering and Management, Technion – Israel Institute of Technology, 32000 Haifa, Israel, e-mail: (morbt,nemirovs)@ie.technion.ac.il, , , , , , IL

    Aharon Ben-Tal & Arkadi Nemirovski

Authors
  1. Aharon Ben-Tal
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  2. Arkadi Nemirovski
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Received: July 1999 / Accepted: May 2000¶Published online July 20, 2000

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Ben-Tal, A., Nemirovski, A. Robust solutions of Linear Programming problems contaminated with uncertain data. Math. Program. 88, 411–424 (2000). https://doi.org/10.1007/PL00011380

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  • DOI: https://doi.org/10.1007/PL00011380

Keywords

  • Program Problem
  • Linear Program Problem
  • Robust Optimization
  • Uncertain Data
  • Robust Solution