Wasserstein Distributionally Robust Bayesian Optimization with Continuous Context
About
We address the challenge of sequential data-driven decision-making under context distributional uncertainty. This problem arises in numerous real-world scenarios where the learner optimizes black-box objective functions in the presence of uncontrollable contextual variables. We consider the setting where the context distribution is uncertain but known to lie within an ambiguity set defined as a ball in the Wasserstein distance. We propose a novel algorithm for Wasserstein Distributionally Robust Bayesian Optimization that can handle continuous context distributions while maintaining computational tractability. Our theoretical analysis combines recent results in self-normalized concentration in Hilbert spaces and finite-sample bounds for distributionally robust optimization to establish sublinear regret bounds that match state-of-the-art results. Through extensive comparisons with existing approaches on both synthetic and real-world problems, we demonstrate the simplicity, effectiveness, and practical applicability of our proposed method.
Related benchmarks
| Task | Dataset | Result | Rank | |
|---|---|---|---|---|
| Bayesian Optimization | Hartmann Complicated | Final Cumulative Expected Regret75.35 | 9 | |
| Bayesian Optimization | Modified Branin | Final Cumulative Regret685 | 9 | |
| Bayesian Optimization | Portfolio Uniform | Final Cumulative Regret347.4 | 9 | |
| Bayesian Optimization | Portfolio Normal | Final Cumulative Expected Regret448.9 | 9 | |
| Bayesian Optimization | Ackley | Final Cumulative Expected Regret269.2 | 9 | |
| Bayesian Optimization | Hartmann | Cumulative Regret66.9 | 9 | |
| Bayesian Optimization | Newsvendor | Cumulative Regret10.44 | 9 | |
| Bayesian Optimization | Three-Hump Camel | Final Cumulative Regret3.15 | 9 | |
| Bayesian Optimization | Six-Hump Camel | Final Cumulative Regret107.7 | 9 |