Rotting Infinitely Many-armed Bandits

January 31, 2022 ยท Declared Dead ยท ๐Ÿ› International Conference on Machine Learning

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Authors Jung-hun Kim, Milan Vojnovic, Se-Young Yun arXiv ID 2201.12975 Category cs.LG: Machine Learning Cross-listed cs.DS, math.OC, stat.ML Citations 5 Venue International Conference on Machine Learning Last Checked 4 months ago
Abstract
We consider the infinitely many-armed bandit problem with rotting rewards, where the mean reward of an arm decreases at each pull of the arm according to an arbitrary trend with maximum rotting rate $\varrho=o(1)$. We show that this learning problem has an $ฮฉ(\max\{\varrho^{1/3}T,\sqrt{T}\})$ worst-case regret lower bound where $T$ is the horizon time. We show that a matching upper bound $\tilde{O}(\max\{\varrho^{1/3}T,\sqrt{T}\})$, up to a poly-logarithmic factor, can be achieved by an algorithm that uses a UCB index for each arm and a threshold value to decide whether to continue pulling an arm or remove the arm from further consideration, when the algorithm knows the value of the maximum rotting rate $\varrho$. We also show that an $\tilde{O}(\max\{\varrho^{1/3}T,T^{3/4}\})$ regret upper bound can be achieved by an algorithm that does not know the value of $\varrho$, by using an adaptive UCB index along with an adaptive threshold value.
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