Adversarial Contextual Bandits Go Kernelized
Abstract
We study a generalization of the problem of online learning in adversarial linear contextual bandits by incorporating loss functions that belong to a reproducing kernel Hilbert space, which allows for a more flexible modeling of complex decision-making scenarios. We propose a computationally efficient algorithm that makes use of a new optimistically biased estimator for the loss functions and achieves near-optimal regret guarantees under a variety of eigenvalue decay assumptions made on the underlying kernel. Specifically, under the assumption of polynomial eigendecay with exponent , the regret is , where denotes the number of rounds and the number of actions. Furthermore, when the eigendecay follows an exponential pattern, we achieve an even tighter regret bound of . These rates match the lower bounds in all special cases where lower bounds are known at all, and match the best known upper bounds available for the more well-studied stochastic counterpart of our problem.
Cite
@article{arxiv.2310.01609,
title = {Adversarial Contextual Bandits Go Kernelized},
author = {Gergely Neu and Julia Olkhovskaya and Sattar Vakili},
journal= {arXiv preprint arXiv:2310.01609},
year = {2023}
}