Near-Optimal Regret for KL-Regularized Multi-Armed Bandits

Abstract

Recent studies have shown that reinforcement learning with KL-regularized objectives can enjoy faster rates of convergence or logarithmic regret, in contrast to the classical T-type regret in the unregularized setting. However, the statistical efficiency of online learning with respect to KL-regularized objectives remains far from completely characterized, even when specialized to multi-armed bandits (MABs). We address this problem for MABs via a sharp analysis of KL-UCB using a novel peeling argument, which yields a O(η K2T) upper bound: the first high-probability regret bound with linear dependence on K. Here, T is the time horizon, K is the number of arms, η-1 is the regularization intensity, and O hides all logarithmic factors except those involving T. The near-tightness of our analysis is certified by the first non-constant lower bound (η K T), which follows from subtle hard-instance constructions and a tailored decomposition of the Bayes prior. Moreover, in the low-regularization regime (i.e., large η), we show that the KL-regularized regret for MABs is η-independent and scales as (KT). Overall, our results provide a thorough understanding of KL-regularized MABs across all regimes of η and yield nearly optimal bounds in terms of K, η, and T.

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