On adaptive wavelet estimation of a class of weighted densities

Abstract

We investigate the estimation of a weighted density taking the form g=w(F)f, where f denotes an unknown density, F the associated distribution function and w is a known (non-negative) weight. Such a class encompasses many examples, including those arising in order statistics or when g is related to the maximum or the minimum of N (random or fixed) independent and identically distributed () random variables. We here construct a new adaptive non-parametric estimator for g based on a plug-in approach and the wavelets methodology. For a wide class of models, we prove that it attains fast rates of convergence under the Lp risk with p 1 (not only for p = 2 corresponding to the mean integrated squared error) over Besov balls. The theoretical findings are illustrated through several simulations.