On the Use of Non-Stationary Policies for Stationary Infinite-Horizon Markov Decision Processes
Abstract
We consider infinite-horizon stationary $\gamma$-discounted Markov Decision Processes, for which it is known that there exists a stationary optimal policy. Using Value and Policy Iteration with some error $\epsilon$ at each iteration, it is well-known that one can compute stationary policies that are $\frac{2\gamma{(1-\gamma)^2}\epsilon$-optimal. After arguing that this guarantee is tight, we develop variations of Value and Policy Iteration for computing non-stationary policies that can be up to $\frac{2\gamma}{1-\gamma}\epsilon$-optimal, which constitutes a significant improvement in the usual situation when $\gamma$ is close to $1$. Surprisingly, this shows that the problem of ``computing near-optimal non-stationary policies'' is much simpler than that of ``computing near-optimal stationary policies''.
Cite
Text
Scherrer and Lesner. "On the Use of Non-Stationary Policies for Stationary Infinite-Horizon Markov Decision Processes." Neural Information Processing Systems, 2012.Markdown
[Scherrer and Lesner. "On the Use of Non-Stationary Policies for Stationary Infinite-Horizon Markov Decision Processes." Neural Information Processing Systems, 2012.](https://mlanthology.org/neurips/2012/scherrer2012neurips-use/)BibTeX
@inproceedings{scherrer2012neurips-use,
title = {{On the Use of Non-Stationary Policies for Stationary Infinite-Horizon Markov Decision Processes}},
author = {Scherrer, Bruno and Lesner, Boris},
booktitle = {Neural Information Processing Systems},
year = {2012},
pages = {1826-1834},
url = {https://mlanthology.org/neurips/2012/scherrer2012neurips-use/}
}