A uniform L1 law of large numbers for functions of i.i.d. random variables that are translated by a consistent estimator

Abstract

We develop a new L1 law of large numbers where the i-th summand is given by a function h(·) evaluated at Xi - θn, and where θn θn(X1,X2,…,Xn) is an estimator converging in probability to some parameter θ∈ R. Under broad technical conditions, the convergence is shown to hold uniformly in the set of estimators interpolating between θ and another consistent estimator θn. Our main contribution is the treatment of the case where |h| blows up at 0, which is not covered by standard uniform laws of large numbers.