Pessimism for Offline Linear Contextual Bandits using p Confidence Sets
Abstract
We present a family \π\p 1 of pessimistic learning rules for offline learning of linear contextual bandits, relying on confidence sets with respect to different p norms, where π2 corresponds to Bellman-consistent pessimism (BCP), while π∞ is a novel generalization of lower confidence bound (LCB) to the linear setting. We show that the novel π∞ learning rule is, in a sense, adaptively optimal, as it achieves the minimax performance (up to log factors) against all q-constrained problems, and as such it strictly dominates all other predictors in the family, including π2.
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