Stochastic Linear Bandits Robust to Adversarial Attacks
Abstract
We consider a stochastic linear bandit problem in which the rewards are not only subject to random noise, but also adversarial attacks subject to a suitable budget (i.e., an upper bound on the sum of corruption magnitudes across the time horizon). We provide two variants of a Robust Phased Elimination algorithm, one that knows and one that does not. Both variants are shown to attain near-optimal regret in the non-corrupted case , while incurring additional additive terms respectively having a linear and quadratic dependency on in general. We present algorithm independent lower bounds showing that these additive terms are near-optimal. In addition, in a contextual setting, we revisit a setup of diverse contexts, and show that a simple greedy algorithm is provably robust with a near-optimal additive regret term, despite performing no explicit exploration and not knowing .
Cite
@article{arxiv.2007.03285,
title = {Stochastic Linear Bandits Robust to Adversarial Attacks},
author = {Ilija Bogunovic and Arpan Losalka and Andreas Krause and Jonathan Scarlett},
journal= {arXiv preprint arXiv:2007.03285},
year = {2020}
}