English

Higher-order approximation for uncertainty quantification in time series analysis

Statistics Theory 2025-05-26 v3 Statistics Theory

Abstract

For time series with high temporal correlation, the empirical process converges rather slowly to its limiting distribution. Many statistics in change-point analysis, goodness-of-fit testing and uncertainty quantification admit a representation as functionals of the empirical process and therefore inherit its slow convergence. As a result, inference based on the asymptotic distribution of those quantities is significantly affected by relatively small sample sizes. We assess the quality of higher-order approximations of the empirical process by deriving the asymptotic distribution of the corresponding error terms. Based on the limiting distribution of the higher-order terms, we propose a novel approach to calculate confidence intervals for statistical quantities such as the median. In a simulation study, we compare coverage rates and lengths of these confidence intervals with those based on the asymptotic distribution of the empirical process and highlight some benefits of higher-order approximations of the empirical process.

Keywords

Cite

@article{arxiv.2211.01108,
  title  = {Higher-order approximation for uncertainty quantification in time series analysis},
  author = {Annika Betken and Marie-Christine Düker},
  journal= {arXiv preprint arXiv:2211.01108},
  year   = {2025}
}
R2 v1 2026-06-28T05:00:50.740Z