Meta-learning with Stochastic Linear Bandits
Abstract
We investigate meta-learning procedures in the setting of stochastic linear bandits tasks. The goal is to select a learning algorithm which works well on average over a class of bandits tasks, that are sampled from a task-distribution. Inspired by recent work on learning-to-learn linear regression, we consider a class of bandit algorithms that implement a regularized version of the well-known OFUL algorithm, where the regularization is a square euclidean distance to a bias vector. We first study the benefit of the biased OFUL algorithm in terms of regret minimization. We then propose two strategies to estimate the bias within the learning-to-learn setting. We show both theoretically and experimentally, that when the number of tasks grows and the variance of the task-distribution is small, our strategies have a significant advantage over learning the tasks in isolation.
Cite
@article{arxiv.2005.08531,
title = {Meta-learning with Stochastic Linear Bandits},
author = {Leonardo Cella and Alessandro Lazaric and Massimiliano Pontil},
journal= {arXiv preprint arXiv:2005.08531},
year = {2020}
}