Regime Switching Bandits
Abstract
We study a multi-armed bandit problem where the rewards exhibit regime switching. Specifically, the distributions of the random rewards generated from all arms are modulated by a common underlying state modeled as a finite-state Markov chain. The agent does not observe the underlying state and has to learn the transition matrix and the reward distributions. We propose a learning algorithm for this problem, building on spectral method-of-moments estimations for hidden Markov models, belief error control in partially observable Markov decision processes and upper-confidence-bound methods for online learning. We also establish an upper bound for the proposed learning algorithm where is the learning horizon. Finally, we conduct proof-of-concept experiments to illustrate the performance of the learning algorithm.
Cite
@article{arxiv.2001.09390,
title = {Regime Switching Bandits},
author = {Xiang Zhou and Yi Xiong and Ningyuan Chen and Xuefeng Gao},
journal= {arXiv preprint arXiv:2001.09390},
year = {2021}
}