When is exponential asymptotic optimality achievable in average-reward restless bandits?
- URL: http://arxiv.org/abs/2405.17882v1
- Date: Tue, 28 May 2024 07:08:29 GMT
- Title: When is exponential asymptotic optimality achievable in average-reward restless bandits?
- Authors: Yige Hong, Qiaomin Xie, Yudong Chen, Weina Wang,
- Abstract summary: We show that our policy isally optimal with an $O(exp(-C N))$ optimality gap for an $N$-armed problem.
Our policy is the first to achieve exponential optimality under the above set of easy-to-verify assumptions, whereas prior work either requires a strong Global Attractor assumption or only achieves an $O(sqrtN)$ optimality gap.
- Score: 11.41663079285674
- License: http://creativecommons.org/licenses/by/4.0/
- Abstract: We consider the discrete-time infinite-horizon average-reward restless bandit problem. We propose a novel policy that maintains two dynamic subsets of arms: one subset of arms has a nearly optimal state distribution and takes actions according to an Optimal Local Control routine; the other subset of arms is driven towards the optimal state distribution and gradually merged into the first subset. We show that our policy is asymptotically optimal with an $O(\exp(-C N))$ optimality gap for an $N$-armed problem, under the mild assumptions of aperiodic-unichain, non-degeneracy, and local stability. Our policy is the first to achieve exponential asymptotic optimality under the above set of easy-to-verify assumptions, whereas prior work either requires a strong Global Attractor assumption or only achieves an $O(1/\sqrt{N})$ optimality gap. We further discuss the fundamental obstacles in significantly weakening our assumptions. In particular, we prove a lower bound showing that local stability is fundamental for exponential asymptotic optimality.
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