Asymptotic properties of U-processes under long-range dependence

Abstract

Let (Xi)i≥ 1 be a stationary mean-zero Gaussian process with covariances (k)=(X1Xk+1) satisfying: (0)=1 and (k)=k-D L(k) where D is in (0,1) and L is slowly varying at infinity. Consider the U-process \Un(r),\; r∈ I\ defined as Un(r)=1n(n-1)Σ1≤ i≠ j≤ n\1\G(Xi,Xj)≤ r\\; , where I is an interval included in and G is a symmetric function. In this paper, we provide central and non-central limit theorems for Un. They are used to derive the asymptotic behavior of the Hodges-Lehmann estimator, the Wilcoxon-signed rank statistic, the sample correlation integral and an associated scale estimator. The limiting distributions are expressed through multiple Wiener-It\o integrals.