Central limit theorem and the bootstrap for [formula omitted]-statistics of strongly mixing data

Abstract

The asymptotic normality of U -statistics has so far been proved for iid data and under various mixing conditions such as absolute regularity, but not for strong mixing. We use a coupling technique introduced in 1983 by Bradley [R.C. Bradley, Approximation theorems for strongly mixing random variables, Michigan Math. J. 30 (1983),69–81] to prove a new generalized covariance inequality similar to Yoshihara’s [K. Yoshihara, Limiting behavior of U -statistics for stationary, absolutely regular processes, Z. Wahrsch. Verw. Gebiete 35 (1976), 237–252]. It follows from the Hoeffding-decomposition and this inequality that U -statistics of strongly mixing observations converge to a normal limit if the kernel of the U -statistic fulfills some moment and continuity conditions. The validity of the bootstrap for U -statistics has until now only been established in the case of iid data (see [P.J. Bickel, D.A. Freedman, Some asymptotic theory for the bootstrap, Ann. Statist. 9 (1981), 1196–1217]. For mixing data, Politis and Romano [D.N. Politis, J.P. Romano, A circular block resampling procedure for stationary data, in: R. Lepage, L. Billard (Eds.), Exploring the Limits of Bootstrap, Wiley, New York, 1992, pp. 263–270] proposed the circular block bootstrap, which leads to a consistent estimation of the sample mean’s distribution. We extend these results to U -statistics of weakly dependent data and prove a CLT for the circular block bootstrap version of U -statistics under absolute regularity and strong mixing. We also calculate a rate of convergence for the bootstrap variance estimator of a U -statistic and give some simulation results.