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This paper investigates the statistical efficiency of quantile-based distributional reinforcement learning, focusing on distributional policy evaluation to characterize the return distribution under a given policy. By constructing an estimator based on an empirical Markov decision process and establishing a non-asymptotic error bound, the authors demonstrate that the estimation error scales as \(\widetilde{O}(\sqrt{m/n})\), achieving optimal sample efficiency with a convergence rate of \(\sqrt{n}\). Additionally, the study explores the asymptotic behavior of quantile estimators in infinite-dimensional settings, confirming their continued efficiency and providing a foundation for valid statistical inference on quantile-projected return distributions.
Achieving optimal sample efficiency in quantile-based distributional reinforcement learning could revolutionize how we evaluate policies in complex environments.
In this paper, we study quantile-based distributional reinforcement learning from the perspective of statistical efficiency. We focus on distributional policy evaluation, whose goal is to characterize the return distribution, namely the distribution of discounted cumulative rewards under a given policy. To obtain a finite-dimensional representation of the return distribution, we consider the quantile fixed point $\eta_m$ induced by the quantile-projected distributional Bellman equation. Assuming access to a generative model, we construct an estimator $\eta_m^{(n)}$ based on an empirical Markov decision process. For a fixed number of quantiles $m$, we establish a non-asymptotic error bound for $\eta_m^{(n)}$ and $\eta_m$ under the supremum $W_\infty$ metric, showing that the estimation error scales as $\widetilde{O}(\sqrt{m/n})$ with respect to $m$ and $n$. This implies that the quantile-based distributional policy evaluation problem can be solved with sample efficiency, achieving the optimal parametric $\sqrt{n}$ convergence rate. We derive the asymptotic distribution of the quantile parameters $\sqrt{n}(\theta_m^{(n)}-\theta_m)$ and characterize the semiparametric efficiency bound, which is attained by our estimator. Beyond the fixed-dimensional setting, we investigate the asymptotic regime in which the number of quantiles diverges. We characterize the limit covariance structure and show that it matches the semiparametric efficiency bound of the nonparametric model for distributional policy evaluation, showing that quantile-based estimators remain asymptotically efficient in the infinite-dimensional limit. Finally, we establish a Berry--Esseen theorem for smooth functionals $\sqrt{n}(\eta_m^{(n)}(s)-\eta_m(s))f$, thereby providing a foundation for statistically valid inference on functionals of the quantile-projected return distribution.