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Statistics of Robust Optimization: A Generalized Empirical Likelihood Approach

Author

Listed:
  • John C. Duchi

    (Department of Electrical Engineering and Statistics, Stanford University, Stanford, California 94305)

  • Peter W. Glynn

    (Department of Management Science and Engineering, Stanford University, Stanford, California 94305)

  • Hongseok Namkoong

    (Decision, Risk, and Operations Division, Columbia Business School, New York City, NY 10027)

Abstract

We study statistical inference and distributionally robust solution methods for stochastic optimization problems, focusing on confidence intervals for optimal values and solutions that achieve exact coverage asymptotically. We develop a generalized empirical likelihood framework—based on distributional uncertainty sets constructed from nonparametric f -divergence balls—for Hadamard differentiable functionals, and in particular, stochastic optimization problems. As consequences of this theory, we provide a principled method for choosing the size of distributional uncertainty regions to provide one- and two-sided confidence intervals that achieve exact coverage. We also give an asymptotic expansion for our distributionally robust formulation, showing how robustification regularizes problems by their variance. Finally, we show that optimizers of the distributionally robust formulations we study enjoy (essentially) the same consistency properties as those in classical sample average approximations. Our general approach applies to quickly mixing stationary sequences, including geometrically ergodic Harris recurrent Markov chains.

Suggested Citation

  • John C. Duchi & Peter W. Glynn & Hongseok Namkoong, 2021. "Statistics of Robust Optimization: A Generalized Empirical Likelihood Approach," Mathematics of Operations Research, INFORMS, vol. 46(3), pages 946-969, August.
    • Handle: RePEc:inm:ormoor:v:46:y:2021:i:3:p:946-969
    DOI: 10.1287/moor.2020.1085
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