Pessimistic Bilevel Optimization
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We study a variant of the pessimistic bilevel optimization problem, which comprises constraints that must be satisfied for any optimal solution of a subordinate (lower-level) optimization problem. We present conditions that guarantee the existence of optimal solutions in such a problem, and we characterize the computational complexity of various subclasses of the problem. We then focus on problem instances that may lack convexity, but that satisfy a certain independence property. We develop convergent approximations for these instances, and we derive an iterative solution scheme that is reminiscent of the discretization techniques used in semi-infinite programming. We also present a computational study that illustrates the numerical behavior of our algorithm on standard benchmark instances.
Date issued
2013-02Department
Massachusetts Institute of Technology. Department of Mechanical EngineeringJournal
SIAM Journal on Optimization
Publisher
Society for Industrial and Applied Mathematics
Citation
Wiesemann, Wolfram, Angelos Tsoukalas, Polyxeni-Margarita Kleniati, and Berç Rustem. “Pessimistic Bilevel Optimization.” SIAM Journal on Optimization 23, no. 1 (February 27, 2013): 353-380. © 2013, Society for Industrial and Applied Mathematics
Version: Final published version
ISSN
1052-6234
1095-7189