Linear Submodular Maximization with Bandit Feedback
Abstract
Submodular optimization with bandit feedback has recently been studied in a variety of contexts. In a number of real-world applications such as diversified recommender systems and data summarization, the submodular function exhibits additional linear structure. We consider developing approximation algorithms for the maximization of a submodular objective function , where . It is assumed that we have value oracle access to the functions , but the coefficients are unknown, and can only be accessed via noisy queries. We develop algorithms for this setting inspired by adaptive allocation algorithms in the best-arm identification for linear bandit, with approximation guarantees arbitrarily close to the setting where we have value oracle access to . Finally, we empirically demonstrate that our algorithms make vast improvements in terms of sample efficiency compared to algorithms that do not exploit the linear structure of on instances of move recommendation.
Cite
@article{arxiv.2407.02601,
title = {Linear Submodular Maximization with Bandit Feedback},
author = {Wenjing Chen and Victoria G. Crawford},
journal= {arXiv preprint arXiv:2407.02601},
year = {2024}
}