English

Bandit Phase Retrieval

Machine Learning 2021-06-07 v2 Machine Learning Statistics Theory Methodology Statistics Theory

Abstract

We study a bandit version of phase retrieval where the learner chooses actions (At)t=1n(A_t)_{t=1}^n in the dd-dimensional unit ball and the expected reward is At,θ2\langle A_t, \theta_\star\rangle^2 where θRd\theta_\star \in \mathbb R^d is an unknown parameter vector. We prove that the minimax cumulative regret in this problem is Θ~(dn)\smash{\tilde \Theta(d \sqrt{n})}, which improves on the best known bounds by a factor of d\smash{\sqrt{d}}. We also show that the minimax simple regret is Θ~(d/n)\smash{\tilde \Theta(d / \sqrt{n})} and that this is only achievable by an adaptive algorithm. Our analysis shows that an apparently convincing heuristic for guessing lower bounds can be misleading and that uniform bounds on the information ratio for information-directed sampling are not sufficient for optimal regret.

Keywords

Cite

@article{arxiv.2106.01660,
  title  = {Bandit Phase Retrieval},
  author = {Tor Lattimore and Botao Hao},
  journal= {arXiv preprint arXiv:2106.01660},
  year   = {2021}
}
R2 v1 2026-06-24T02:47:04.443Z