Abstract
Suppose that the (normalised) partial sum of a stationary sequence converges to a standard normal random variable. Given sufficiently moments, when do we have a rate of convergence of in the uniform metric, in other words, when do we have the optimal Berry-Esseen bound? We study this question in a quite general framework and find the (almost) sharp dependence conditions. The result applies to many different processes and dynamical systems. As specific, prominent examples, we study functions of the doubling map 2x mod 1, the left random walk on the general linear group and functions of linear processes.
Acknowledgements
I would like to thank Christophe Cuny, Kasun Fernando and Florence Merlevède for constructive comments and pointing out references. Special thanks to the reviewers for their very helpful remarks and suggestions, significantly improving the quality of this note.
Citation
Moritz Jirak. "A Berry-Esseen bound with (almost) sharp dependence conditions." Bernoulli 29 (2) 1219 - 1245, May 2023. https://doi.org/10.3150/22-BEJ1496
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