Logarithmic regret bounds for continuous-time average-reward Markov decision processes
Machine Learning
2024-07-03 v4 Optimization and Control
Machine Learning
Abstract
We consider reinforcement learning for continuous-time Markov decision processes (MDPs) in the infinite-horizon, average-reward setting. In contrast to discrete-time MDPs, a continuous-time process moves to a state and stays there for a random holding time after an action is taken. With unknown transition probabilities and rates of exponential holding times, we derive instance-dependent regret lower bounds that are logarithmic in the time horizon. Moreover, we design a learning algorithm and establish a finite-time regret bound that achieves the logarithmic growth rate. Our analysis builds upon upper confidence reinforcement learning, a delicate estimation of the mean holding times, and stochastic comparison of point processes.
Cite
@article{arxiv.2205.11168,
title = {Logarithmic regret bounds for continuous-time average-reward Markov decision processes},
author = {Xuefeng Gao and Xun Yu Zhou},
journal= {arXiv preprint arXiv:2205.11168},
year = {2024}
}