We investigate the Active Clustering Problem (ACP). A learner interacts with an N-armed stochastic bandit with d-dimensional subGaussian feedback. There exists a hidden partition of the arms into K groups, such that arms within the same group, share the same mean vector. The learner's task is to uncover this hidden partition with the smallest budget - i.e., the least number of observation - and with a probability of error smaller than a prescribed constant δ. In this paper, (i) we derive a non-asymptotic lower bound for the budget, and (ii) we introduce the computationally efficient ACB algorithm, whose budget matches the lower bound in most regimes. We improve on the performance of a uniform sampling strategy. Importantly, contrary to the batch setting, we establish that there is no computation-information gap in the active setting.
@article{arxiv.2406.11485,
title = {Active clustering with bandit feedback},
author = {Victor Thuot and Alexandra Carpentier and Christophe Giraud and Nicolas Verzelen},
journal= {arXiv preprint arXiv:2406.11485},
year = {2024}
}