Best-of-Both-Worlds Algorithms for Partial Monitoring
Abstract
This study considers the partial monitoring problem with k-actions and d-outcomes and provides the first best-of-both-worlds algorithms, whose regrets are favorably bounded both in the stochastic and adversarial regimes. In particular, we show that for non-degenerate locally observable games, the regret is O(m2 k4 (T) (k T) / ) in the stochastic regime and O(m k2/3 T (T) k) in the adversarial regime, where T is the number of rounds, m is the maximum number of distinct observations per action, is the minimum suboptimality gap, and k is the number of Pareto optimal actions. Moreover, we show that for globally observable games, the regret is O(cG2 (T) (k T) / 2) in the stochastic regime and O((cG2 (T) (k T))1/3 T2/3) in the adversarial regime, where cG is a game-dependent constant. We also provide regret bounds for a stochastic regime with adversarial corruptions. Our algorithms are based on the follow-the-regularized-leader framework and are inspired by the approach of exploration by optimization and the adaptive learning rate in the field of online learning with feedback graphs.
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