$V$-statistics and Variance Estimation
Abstract
This paper develops a general framework for analyzing asymptotics of -statistics. Previous literature on limiting distribution mainly focuses on the cases when with fixed kernel size . Under some regularity conditions, we demonstrate asymptotic normality when grows with by utilizing existing results for -statistics. The key in our approach lies in a mathematical reduction to -statistics by designing an equivalent kernel for -statistics. We also provide a unified treatment on variance estimation for both - and -statistics by observing connections to existing methods and proposing an empirically more accurate estimator. Ensemble methods such as random forests, where multiple base learners are trained and aggregated for prediction purposes, serve as a running example throughout the paper because they are a natural and flexible application of -statistics.
Cite
@article{arxiv.1912.01089,
title = {$V$-statistics and Variance Estimation},
author = {Zhengze Zhou and Lucas Mentch and Giles Hooker},
journal= {arXiv preprint arXiv:1912.01089},
year = {2020}
}
Comments
This version supersedes the previous technical report titled "Asymptotic Normality and Variance Estimation For Supervised Ensembles". Extensive simulations are added and we also provide a more detailed discussion on the bias phenomenon in variance estimation