English

Decoupling Inequalities for the Tail Probabilities of Multivariate U-statistics

Functional Analysis 2008-02-03 v2

Abstract

In this paper the following result, which allows one to decouple U-Statistics in tail probability, is proved in full generality. Theorem 1. Let XiX_i be a sequence of independent random variables taking values in a measure space SS, and let fi1...ikf_{i_1...i_k} be measurable functions from SkS^k to a Banach space BB. Let (Xi(j))(X_i^{(j)}) be independent copies of (Xi)(X_i). The following inequality holds for all t0t \ge 0 and all n2n\ge 2, P(1i1...iknfi1...ik(Xi1,...,Xik)t) P(||\sum_{1\le i_1 \ne ... \ne i_k \le n} f_{i_1 ... i_k}(X_{i_1},...,X_{i_k}) || \ge t) \qquad\qquad CkP(Ck1i1...iknfi1...ik(Xi1(1),...,Xik(k))t). \qquad\qquad\le C_k P(C_k||\sum_{1\le i_1 \ne ... \ne i_k \le n} f_{i_1 ... i_k}(X_{i_1}^{(1)},...,X_{i_k}^{(k)}) || \ge t) . Furthermore, the reverse inequality also holds in the case that the functions {fi1...ik}\{f_{i_1... i_k}\} satisfy the symmetry condition fi1...ik(Xi1,...,Xik)=fiπ(1)...iπ(k)(Xiπ(1),...,Xiπ(k)) f_{i_1 ... i_k}(X_{i_1},...,X_{i_k}) = f_{i_{\pi(1)} ... i_{\pi(k)}}(X_{i_{\pi(1)}},...,X_{i_{\pi(k)}}) for all permutations π\pi of {1,...,k}\{1,...,k\}. Note that the expression i1...iki_1 \ne ... \ne i_k means that irisi_r \ne i_s for rsr\ne s. Also, CkC_k is a constant that depends only on kk.

Keywords

Cite

@article{arxiv.math/9309211,
  title  = {Decoupling Inequalities for the Tail Probabilities of Multivariate U-statistics},
  author = {Victor H. de la Peña and Stephen J. Montgomery-Smith},
  journal= {arXiv preprint arXiv:math/9309211},
  year   = {2008}
}