Self-Normalized Moderate Deviations for Degenerate U-Statistics

Abstract

In this paper, we study self-normalized moderate deviations for degenerate U-statistics of order 2. Let \Xi, i ≥ 1\ be i.i.d. random variables and consider symmetric and degenerate kernel functions in the form h(x,y)=Σl=1∞ λl gl (x) gl(y), where λl > 0, E gl(X1)=0, and gl (X1) is in the domain of attraction of a normal law for all l ≥ 1. Under the condition Σl=1∞λl<∞ and some truncated conditions for \gl(X1): l ≥ 1\, we show that log P(Σ1 ≤ i ≠ j ≤ nh(Xi, Xj) 1 l<∞λl V2n,l ≥ xn2) - xn2 2 for xn ∞ and xn =o(n), where V2n,l=Σi=1n gl2(Xi). As application, a law of the iterated logarithm is also obtained.