English

Multi-Armed Bandits with Interference

Machine Learning 2024-07-17 v2 Machine Learning

Abstract

Experimentation with interference poses a significant challenge in contemporary online platforms. Prior research on experimentation with interference has concentrated on the final output of a policy. The cumulative performance, while equally crucial, is less well understood. To address this gap, we introduce the problem of {\em Multi-armed Bandits with Interference} (MABI), where the learner assigns an arm to each of NN experimental units over a time horizon of TT rounds. The reward of each unit in each round depends on the treatments of {\em all} units, where the influence of a unit decays in the spatial distance between units. Furthermore, we employ a general setup wherein the reward functions are chosen by an adversary and may vary arbitrarily across rounds and units. We first show that switchback policies achieve an optimal {\em expected} regret O~(T)\tilde O(\sqrt T) against the best fixed-arm policy. Nonetheless, the regret (as a random variable) for any switchback policy suffers a high variance, as it does not account for NN. We propose a cluster randomization policy whose regret (i) is optimal in {\em expectation} and (ii) admits a high probability bound that vanishes in NN.

Keywords

Cite

@article{arxiv.2402.01845,
  title  = {Multi-Armed Bandits with Interference},
  author = {Su Jia and Peter Frazier and Nathan Kallus},
  journal= {arXiv preprint arXiv:2402.01845},
  year   = {2024}
}
R2 v1 2026-06-28T14:36:39.018Z