Saved in:
Bibliographic Details
Main Authors: Miglioli, Cesare, Awan, Jordan
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2510.20755
Tags: Add Tag
No Tags, Be the first to tag this record!
_version_ 1866908838696845312
author Miglioli, Cesare
Awan, Jordan
author_facet Miglioli, Cesare
Awan, Jordan
contents U-statistics are a fundamental class of estimators that generalize the sample mean and underpin much of nonparametric statistics. Although extensively studied in both statistics and probability, key challenges remain: their high computational cost - addressed partly through incomplete U-statistics - and their non-standard asymptotic behavior in the degenerate case, which typically requires resampling methods for hypothesis testing. This paper presents a novel perspective on U-statistics, grounded in hypergraph theory and combinatorial designs. Our approach bypasses the traditional Hoeffding decomposition, the main analytical tool in this literature but one that is highly sensitive to degeneracy. By characterizing the dependence structure of a U-statistic, we derive a Berry-Esseen bound valid for incomplete U-statistics of deterministic designs, yielding conditions under which Gaussian limiting distributions can be established even in degenerate cases and when the order diverges. We also introduce efficient algorithms to construct incomplete U-statistics based on equireplicate designs, a subclass of deterministic designs that, in certain cases, achieve minimum variance. Beyond its theoretical contributions, our framework provides a systematic way to construct permutation-free counterparts to tests based on degenerate U-statistics, as demonstrated in experiments with kernel-based tests using the Maximum Mean Discrepancy and the Hilbert-Schmidt Independence Criterion.
format Preprint
id arxiv_https___arxiv_org_abs_2510_20755
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Incomplete U-Statistics of Equireplicate Designs: Berry-Esseen Bound and Efficient Construction
Miglioli, Cesare
Awan, Jordan
Statistics Theory
Combinatorics
Methodology
Machine Learning
U-statistics are a fundamental class of estimators that generalize the sample mean and underpin much of nonparametric statistics. Although extensively studied in both statistics and probability, key challenges remain: their high computational cost - addressed partly through incomplete U-statistics - and their non-standard asymptotic behavior in the degenerate case, which typically requires resampling methods for hypothesis testing. This paper presents a novel perspective on U-statistics, grounded in hypergraph theory and combinatorial designs. Our approach bypasses the traditional Hoeffding decomposition, the main analytical tool in this literature but one that is highly sensitive to degeneracy. By characterizing the dependence structure of a U-statistic, we derive a Berry-Esseen bound valid for incomplete U-statistics of deterministic designs, yielding conditions under which Gaussian limiting distributions can be established even in degenerate cases and when the order diverges. We also introduce efficient algorithms to construct incomplete U-statistics based on equireplicate designs, a subclass of deterministic designs that, in certain cases, achieve minimum variance. Beyond its theoretical contributions, our framework provides a systematic way to construct permutation-free counterparts to tests based on degenerate U-statistics, as demonstrated in experiments with kernel-based tests using the Maximum Mean Discrepancy and the Hilbert-Schmidt Independence Criterion.
title Incomplete U-Statistics of Equireplicate Designs: Berry-Esseen Bound and Efficient Construction
topic Statistics Theory
Combinatorics
Methodology
Machine Learning
url https://arxiv.org/abs/2510.20755