A data-dependent DKW inequality for regenerative Markov chains
Abstract
We prove a version of the Dvoretzky-Kiefer-Wolfowitz inequality for Markov chains with a regenerative structure. Suppose we have a regenerative Markov chain with stationary distribution . Given a functional on the state space and a confidence level , our result provides a uniform confidence band for the CDF of under based on the empirical CDF. By inversion, we get a confidence band for the quantile function of under . Our bounds are fully explicit and nearly optimal. In addition, they are data-dependent in the following sense: in the formula for the width of the confidence band, the leading term can be computed directly from the sample path without any a priori information about the convergence rate of the chain. A convergence bound is required, but it contributes to the width of the confidence band only through a lower-order term. For this reason, our result is attractive for Markov chains whose convergence rate is much quicker in practice than what can be proved in theory. Data-dependent bounds of this type are called empirical concentration inequalities in the literature. Thus, our result is an empirical concentration inequality for the empirical CDF of given the sample path.
Cite
@article{arxiv.2606.30866,
title = {A data-dependent DKW inequality for regenerative Markov chains},
author = {Daniel Jerison},
journal= {arXiv preprint arXiv:2606.30866},
year = {2026}
}
Comments
21 pages