Bandits with Single-Peaked Preferences and Limited Resources

Abstract

We study an online stochastic matching problem in which an algorithm sequentially matches U users to K arms, aiming to maximize cumulative reward over T rounds under budget constraints. Without structural assumptions, computing the optimal matching is NP-hard, making online learning computationally infeasible. To overcome this barrier, we focus on single-peaked preferences -- a well-established structure in social choice theory, where users' preferences are unimodal with respect to a common order over arms. We devise an efficient algorithm for the offline budgeted matching problem, and leverage it into an efficient online algorithm with a regret of O(UKT2/3). Our approach relies on a novel PQ tree-based order approximation method. If the single-peaked structure is known, we develop an efficient UCB-like algorithm that achieves a regret bound of O(UTK).

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