English

Structured Linear Contextual Bandits: A Sharp and Geometric Smoothed Analysis

Machine Learning 2020-02-27 v1 Statistics Theory Machine Learning Statistics Theory

Abstract

Bandit learning algorithms typically involve the balance of exploration and exploitation. However, in many practical applications, worst-case scenarios needing systematic exploration are seldom encountered. In this work, we consider a smoothed setting for structured linear contextual bandits where the adversarial contexts are perturbed by Gaussian noise and the unknown parameter θ\theta^* has structure, e.g., sparsity, group sparsity, low rank, etc. We propose simple greedy algorithms for both the single- and multi-parameter (i.e., different parameter for each context) settings and provide a unified regret analysis for θ\theta^* with any assumed structure. The regret bounds are expressed in terms of geometric quantities such as Gaussian widths associated with the structure of θ\theta^*. We also obtain sharper regret bounds compared to earlier work for the unstructured θ\theta^* setting as a consequence of our improved analysis. We show there is implicit exploration in the smoothed setting where a simple greedy algorithm works.

Keywords

Cite

@article{arxiv.2002.11332,
  title  = {Structured Linear Contextual Bandits: A Sharp and Geometric Smoothed Analysis},
  author = {Vidyashankar Sivakumar and Zhiwei Steven Wu and Arindam Banerjee},
  journal= {arXiv preprint arXiv:2002.11332},
  year   = {2020}
}
R2 v1 2026-06-23T13:54:11.516Z