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Self-Normalized Moderate Deviations for Degenerate U-Statistics

Probability 2025-01-08 v1

Abstract

In this paper, we study self-normalized moderate deviations for degenerate { UU}-statistics of order 22. Let {Xi,i1}\{X_i, i \geq 1\} be i.i.d. random variables and consider symmetric and degenerate kernel functions in the form h(x,y)=l=1λlgl(x)gl(y)h(x,y)=\sum_{l=1}^{\infty} \lambda_l g_l (x) g_l(y), where λl>0\lambda_l > 0, Egl(X1)=0E g_l(X_1)=0, and gl(X1)g_l (X_1) is in the domain of attraction of a normal law for all l1l \geq 1. Under the condition l=1λl<\sum_{l=1}^{\infty}\lambda_l<\infty and some truncated conditions for {gl(X1):l1}\{g_l(X_1): l \geq 1\}, we show that logP(1ijnh(Xi,Xj)max1l<λlVn,l2xn2)xn22 \text{log} P({\frac{\sum_{1 \leq i \neq j \leq n}h(X_{i}, X_{j})} {\max_{1\le l<\infty}\lambda_l V^2_{n,l} }} \geq x_n^2) \sim - { \frac {x_n^2}{ 2}} for xnx_n \to \infty and xn=o(n)x_n =o(\sqrt{n}), where Vn,l2=i=1ngl2(Xi)V^2_{n,l}=\sum_{i=1}^n g_l^2(X_i). As application, a law of the iterated logarithm is also obtained.

Keywords

Cite

@article{arxiv.2501.03915,
  title  = {Self-Normalized Moderate Deviations for Degenerate U-Statistics},
  author = {Lin Ge and Hailin Sang and Qi-Man Shao},
  journal= {arXiv preprint arXiv:2501.03915},
  year   = {2025}
}

Comments

32 pages

R2 v1 2026-06-28T20:58:56.187Z