Lipschitz Bandit Optimization with Improved Efficiency
Abstract
We consider the Lipschitz bandit optimization problem with an emphasis on practical efficiency. Although there is rich literature on regret analysis of this type of problem, e.g., [Kleinberg et al. 2008, Bubeck et al. 2011, Slivkins 2014], their proposed algorithms suffer from serious practical problems including extreme time complexity and dependence on oracle implementations. With this motivation, we propose a novel algorithm with an Upper Confidence Bound (UCB) exploration, namely Tree UCB-Hoeffding, using adaptive partitions. Our partitioning scheme is easy to implement and does not require any oracle settings. With a tree-based search strategy, the total computational cost can be improved to for the first iterations. In addition, our algorithm achieves the regret lower bound up to a logarithmic factor.
Cite
@article{arxiv.1904.11131,
title = {Lipschitz Bandit Optimization with Improved Efficiency},
author = {Xu Zhu},
journal= {arXiv preprint arXiv:1904.11131},
year = {2019}
}
Comments
The papers have been removed and we refer the readers to arXiv:1901.09277. arXiv admin note: author list truncated