Abstract
In this paper, we consider a Kullback-Leibler divergence constrained distributionally robust optimization model. This model considers an ambiguity set that consists of all distributions whose Kullback-Leibler divergence to an empirical distribution is bounded. Utilizing the fact that this divergence measure has an exponential cone representation, we obtain the robust counterpart of the Kullback-Leibler divergence constrained distributionally robust optimization problem as a dual exponential cone constrained program under mild assumptions on the underlying optimization problem. The resulting conic reformulation of the original optimization problem can be directly solved by a commercial conic programming solver. We specialize our generic formulation to two classical optimization problems, namely, the Newsvendor Problem and the Uncapacitated Facility Location Problem. Our computational study in an out-of-sample analysis shows that the solutions obtained via the distributionally robust optimization approach yield significantly better performance in terms of the dispersion of the cost realizations while the central tendency deteriorates only slightly compared to the solutions obtained by stochastic programming.
Highlights
Decision making under uncertainty is one of the most challenging tasks in operations research
Two paradigms are predominantly used in the literature to address uncertainty: stochastic programming and robust optimization
The objective function is replaced with an expectation taken with respect to the random elements, and constraints are copied for each scenario
Summary
Decision making under uncertainty is one of the most challenging tasks in operations research. The robust counterpart of KL divergence constrained DRO is proven to be a tractable convex program [26], to the best of our knowledge, its exponential cone representability has not been exploited in the literature before. We consider KL divergence constrained DRO problems and propose their dual exponential cone constrained reformulation under the mild assumption of conic representability. This allows us to solve the corresponding robust counterpart using a conic programming solver such as MOSEK [29]. Our main contribution in this paper is to exploit the exponential cone representation of the KLdivergence to solve DRO problems with ambiguity sets defined using this measure.
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