Bandit Pareto Set Identification: the Fixed Budget Setting
Kone, Cyrille, Kaufmann, Emilie, Richert, Laura
We study a multi-objective pure exploration problem in a multi-armed bandit model. Each arm is associated to an unknown multi-variate distribution and the goal is to identify the distributions whose mean is not uniformly worse than that of another distribution: the Pareto optimal set. We propose and analyze the first algorithms for the \emph{fixed budget} Pareto Set Identification task. We propose Empirical Gap Elimination, a family of algorithms combining a careful estimation of the ``hardness to classify'' each arm in or out of the Pareto set with a generic elimination scheme. We prove that two particular instances, EGE-SR and EGE-SH, have a probability of error that decays exponentially fast with the budget, with an exponent supported by an information theoretic lower-bound. We complement these findings with an empirical study using real-world and synthetic datasets, which showcase the good performance of our algorithms.
Nov-7-2023
- Country:
- Europe
- United Kingdom > England
- Cambridgeshire > Cambridge (0.04)
- France
- Nouvelle-Aquitaine > Gironde
- Bordeaux (0.04)
- Hauts-de-France > Nord
- Lille (0.04)
- Nouvelle-Aquitaine > Gironde
- United Kingdom > England
- Europe
- Genre:
- Research Report > New Finding (0.92)
- Industry:
- Technology: