English

Estimation and Inference in Distributional Reinforcement Learning

Machine Learning 2025-11-13 v2 Machine Learning

Abstract

In this paper, we study distributional reinforcement learning from the perspective of statistical efficiency. We investigate distributional policy evaluation, aiming to estimate the complete return distribution (denoted ηπ\eta^\pi) attained by a given policy π\pi. We use the certainty-equivalence method to construct our estimator η^π\hat\eta^\pi, given a generative model is available. In this circumstance we need a dataset of size O~(SAε2p(1γ)2p+2)\widetilde O\left(\frac{|\mathcal{S}||\mathcal{A}|}{\varepsilon^{2p}(1-\gamma)^{2p+2}}\right) to guarantee the pp-Wasserstein metric between η^π\hat\eta^\pi and ηπ\eta^\pi less than ε\varepsilon with high probability. This implies the distributional policy evaluation problem can be solved with sample efficiency. Also, we show that under different mild assumptions a dataset of size O~(SAε2(1γ)4)\widetilde O\left(\frac{|\mathcal{S}||\mathcal{A}|}{\varepsilon^{2}(1-\gamma)^{4}}\right) suffices to ensure the Kolmogorov metric and total variation metric between η^π\hat\eta^\pi and ηπ\eta^\pi is below ε\varepsilon with high probability. Furthermore, we investigate the asymptotic behavior of η^π\hat\eta^\pi. We demonstrate that the ``empirical process'' n(η^πηπ)\sqrt{n}(\hat\eta^\pi-\eta^\pi) converges weakly to a Gaussian process in the space of bounded functionals on Lipschitz function class (FW)\ell^\infty(\mathcal{F}_{\text{W}}), also in the space of bounded functionals on indicator function class (FKS)\ell^\infty(\mathcal{F}_{\text{KS}}) and bounded measurable function class (FTV)\ell^\infty(\mathcal{F}_{\text{TV}}) when some mild conditions hold. Our findings give rise to a unified approach to statistical inference of a wide class of statistical functionals of ηπ\eta^\pi.

Keywords

Cite

@article{arxiv.2309.17262,
  title  = {Estimation and Inference in Distributional Reinforcement Learning},
  author = {Liangyu Zhang and Yang Peng and Jiadong Liang and Wenhao Yang and Zhihua Zhang},
  journal= {arXiv preprint arXiv:2309.17262},
  year   = {2025}
}
R2 v1 2026-06-28T12:36:08.142Z