Microsoft Research335 тыс
Опубликовано 12 декабря 2022, 20:34
2022 Data-driven Optimization Workshop: Adaptive Best-of-Both-Worlds Algorithm for Heavy-Tailed Multi-Armed Bandits
Speaker: Longbo Huang, Tsinghua University
We generalize the concept of heavy-tailed multi-armed bandits to adversarial environments, and develop robust best-of-both-worlds algorithms for heavy-tailed multi-armed bandits (MAB), where losses have α-th moments bounded by σ^α, while the variances may not exist. Specifically, we design an algorithm HTINF, when the heavy-tail parameters α and σ are known to the agent, HTINF simultaneously achieves the optimal regret for both stochastic and adversarial environments, without knowing the actual environment type a-priori. When α and σ are unknown, HTINF achieves a log𝑇-style instance-dependent regret in stochastic cases and o(T) no-regret guarantee in adversarial cases. We further develop an algorithm AdaTINF, achieving O(σK^(1-1/α) T^(1/α)) minimax optimal regret even in adversarial settings, without prior knowledge on α and σ. This result matches the known regret lower-bound (Bubeck et al., 2013), which assumed a stochastic environment and α and σ are both known. To our knowledge, the proposed HTINF algorithm is the first to enjoy a best-of-both-worlds regret guarantee, and AdaTINF is the first algorithm that can adapt to both α and σ to achieve optimal gap-indepedent regret bound in classical heavy-tailed stochastic MAB setting and our novel adversarial formulation.
Speaker: Longbo Huang, Tsinghua University
We generalize the concept of heavy-tailed multi-armed bandits to adversarial environments, and develop robust best-of-both-worlds algorithms for heavy-tailed multi-armed bandits (MAB), where losses have α-th moments bounded by σ^α, while the variances may not exist. Specifically, we design an algorithm HTINF, when the heavy-tail parameters α and σ are known to the agent, HTINF simultaneously achieves the optimal regret for both stochastic and adversarial environments, without knowing the actual environment type a-priori. When α and σ are unknown, HTINF achieves a log𝑇-style instance-dependent regret in stochastic cases and o(T) no-regret guarantee in adversarial cases. We further develop an algorithm AdaTINF, achieving O(σK^(1-1/α) T^(1/α)) minimax optimal regret even in adversarial settings, without prior knowledge on α and σ. This result matches the known regret lower-bound (Bubeck et al., 2013), which assumed a stochastic environment and α and σ are both known. To our knowledge, the proposed HTINF algorithm is the first to enjoy a best-of-both-worlds regret guarantee, and AdaTINF is the first algorithm that can adapt to both α and σ to achieve optimal gap-indepedent regret bound in classical heavy-tailed stochastic MAB setting and our novel adversarial formulation.
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