Fast UCB-type algorithms for stochastic bandits with heavy and super heavy symmetric noise
Dorn, Yuriy, Katrutsa, Aleksandr, Latypov, Ilgam, Pudovikov, Andrey
–arXiv.org Artificial Intelligence
In this study, we propose a new method for constructing UCB-type algorithms for stochastic multi-armed bandits based on general convex optimization methods with an inexact oracle. We derive the regret bounds corresponding to the convergence rates of the optimization methods. We propose a new algorithm Clipped-SGD-UCB and show, both theoretically and empirically, that in the case of symmetric noise in the reward, we can achieve an $O(\log T\sqrt{KT\log T})$ regret bound instead of $O\left (T^{\frac{1}{1+\alpha}} K^{\frac{\alpha}{1+\alpha}} \right)$ for the case when the reward distribution satisfies $\mathbb{E}_{X \in D}[|X|^{1+\alpha}] \leq \sigma^{1+\alpha}$ ($\alpha \in (0, 1])$, i.e. perform better than it is assumed by the general lower bound for bandits with heavy-tails. Moreover, the same bound holds even when the reward distribution does not have the expectation, that is, when $\alpha<0$.
arXiv.org Artificial Intelligence
Feb-10-2024
- Country:
- Asia > Russia (0.05)
- Europe
- United Kingdom > England
- Cambridgeshire > Cambridge (0.04)
- Russia > Central Federal District
- Moscow Oblast > Moscow (0.05)
- United Kingdom > England
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- Research Report (1.00)
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