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Asymptotic Anytime-Valid Inference for U-statistics

Statistics Theory 2026-05-19 v2 Methodology Statistics Theory

Abstract

We study asymptotic anytime-valid confidence sequences for degree-two U-statistics under continuous monitoring. In the nondegenerate case, Hoeffding's projection reduces the problem to a time-uniform central limit theory for the partial sums of the first-order projection, while the canonical remainder is shown to be negligible under mild moment assumptions. A leave-one-out jackknife estimator then yields a fully data-driven procedure, leading to confidence sequences with asymptotic coverage guarantee for the parameter of interest. In the degenerate case, we show that the U-statistic is approximated by a centered quadratic Gaussian-chaos rather than by a simple Gaussian, which poses significant challenges for sequential inference. To address this issue, we novelly develop the Spectrally Allocated Gaussian-chaos Excursion (SAGE) boundary, and then provide plug-in implementations based on truncated spectrum estimation with consistency guarantees. The resulting widths can attain the expected time-uniform optimal rates: loglogn/n\sqrt{\log\log n/n} in the nondegenerate regime and loglogn/n\log\log n/n in the degenerate regime. Several widely used U-statistics are discussed within the proposed framework, and numerical experiments further support the validity of the derived theory.

Keywords

Cite

@article{arxiv.2605.14692,
  title  = {Asymptotic Anytime-Valid Inference for U-statistics},
  author = {Leheng Cai and Qirui Hu and Weijia Li},
  journal= {arXiv preprint arXiv:2605.14692},
  year   = {2026}
}