Improved Path-length Regret Bounds for Bandits
This work addresses theoretical limitations in online learning algorithms for bandit problems, offering incremental improvements in regret bounds that are relevant for researchers in machine learning optimization.
The paper tackles the problem of improving path-length regret bounds for multi-armed and linear bandits, showing that a previous bound is optimal for adaptive adversaries and developing new algorithms that achieve better bounds for certain cases, such as with a smaller path-length measure or for oblivious adversaries when path-length is large.
We study adaptive regret bounds in terms of the variation of the losses (the so-called path-length bounds) for both multi-armed bandit and more generally linear bandit. We first show that the seemingly suboptimal path-length bound of (Wei and Luo, 2018) is in fact not improvable for adaptive adversary. Despite this negative result, we then develop two new algorithms, one that strictly improves over (Wei and Luo, 2018) with a smaller path-length measure, and the other which improves over (Wei and Luo, 2018) for oblivious adversary when the path-length is large. Our algorithms are based on the well-studied optimistic mirror descent framework, but importantly with several novel techniques, including new optimistic predictions, a slight bias towards recently selected arms, and the use of a hybrid regularizer similar to that of (Bubeck et al., 2018). Furthermore, we extend our results to linear bandit by showing a reduction to obtaining dynamic regret for a full-information problem, followed by a further reduction to convex body chasing. We propose a simple greedy chasing algorithm for squared 2-norm, leading to new dynamic regret results and as a consequence the first path-length regret for general linear bandit as well.