English

Conservative Contextual Bandits: Beyond Linear Representations

Machine Learning 2024-12-10 v1 Artificial Intelligence Machine Learning

Abstract

Conservative Contextual Bandits (CCBs) address safety in sequential decision making by requiring that an agent's policy, along with minimizing regret, also satisfies a safety constraint: the performance is not worse than a baseline policy (e.g., the policy that the company has in production) by more than (1+α)(1+\alpha) factor. Prior work developed UCB-style algorithms in the multi-armed [Wu et al., 2016] and contextual linear [Kazerouni et al., 2017] settings. However, in practice the cost of the arms is often a non-linear function, and therefore existing UCB algorithms are ineffective in such settings. In this paper, we consider CCBs beyond the linear case and develop two algorithms CSquareCB\mathtt{C-SquareCB} and CFastCB\mathtt{C-FastCB}, using Inverse Gap Weighting (IGW) based exploration and an online regression oracle. We show that the safety constraint is satisfied with high probability and that the regret of CSquareCB\mathtt{C-SquareCB} is sub-linear in horizon TT, while the regret of CFastCB\mathtt{C-FastCB} is first-order and is sub-linear in LL^*, the cumulative loss of the optimal policy. Subsequently, we use a neural network for function approximation and online gradient descent as the regression oracle to provide O~(KT+K/α)\tilde{O}(\sqrt{KT} + K/\alpha) and O~(KL+K(1+1/α))\tilde{O}(\sqrt{KL^*} + K (1 + 1/\alpha)) regret bounds, respectively. Finally, we demonstrate the efficacy of our algorithms on real-world data and show that they significantly outperform the existing baseline while maintaining the performance guarantee.

Keywords

Cite

@article{arxiv.2412.06165,
  title  = {Conservative Contextual Bandits: Beyond Linear Representations},
  author = {Rohan Deb and Mohammad Ghavamzadeh and Arindam Banerjee},
  journal= {arXiv preprint arXiv:2412.06165},
  year   = {2024}
}
R2 v1 2026-06-28T20:27:22.808Z