Data-Driven Distributionally Robust Optimization Using the Wasserstein Metric: Performance Guarantees and Tractable Reformulations
Delft University of Technology · École Polytechnique Fédérale de Lausanne
Abstract
<p>We consider stochastic programs where the distribution of the uncertain parameters is only observable through a finite training dataset. Using the Wasserstein metric, we construct a ball in the space of (multivariate and non-discrete) probability distributions centered at the uniform distribution on the training samples, and we seek decisions that perform best in view of the worst-case distribution within this Wasserstein ball. The state-of-the-art methods for solving the resulting distributionally robust optimization problems rely on global optimization techniques, which quickly become computationally excruciating. In this paper we demonstrate that, under mild assumptions, the distributionally robust…
Citation impact
- FWCI
- 108.88
- Percentile
- 100%
- References
- 53
Authors
2Topics & keywords
- Wasserstein metric
- Robust optimization
- Mathematical optimization
- Probability distribution
- Mathematics
- Metric (unit)
- Optimization problem
- Probability measure