Distributionally Robust Optimization with Markovian Data
We study a stochastic program where the probability distribution of the uncertain problem parameters is unknown and only indirectly observed via finitely many correlated samples generated by an unknown Markov chain with d states. We propose a data-driven distributionally robust optimization model to estimate the problem’s objective function and optimal solution. By leveraging results from large deviations theory, we derive statistical guarantees on the quality of these estimators. The underlying worst-case expectation problem is nonconvex and involves O(d^2) decision variables. Thus, it cannot be solved efficiently for large d. By exploiting the structure of this prob- lem, we devise a customized Frank-Wolfe algorithm with convex direction-finding subproblems of size O(d). We prove that this algorithm finds a stationary point efficiently under mild conditions. The efficiency of the method is predicated on a dimensionality reduction enabled by a dual reformulation. Numerical experiments indicate that our approach has better computational and statistical properties than the state-of-the-art methods.
2106.06741
2021
San Diego
Proceedings of Machine Learning Research
139
6493
6503
View record in ArXiv
Published paper
REVIEWED
Event name | Event place | Event date |
Virtual | July 18-24, 2021 | |