Estimating level sets of a distribution function using a plug-in method: a multidimensional extension

Abstract

This paper deals with the problem of estimating the level sets L(c)= \F(x) ≥ c \, with c ∈ (0,1), of an unknown distribution function F on Rd+. A plug-in approach is followed. That is, given a consistent estimator Fn of F, we estimate L(c) by Ln(c)= \Fn(x) ≥ c \$. We state consistency results with respect to the Hausdorff distance and the volume of the symmetric difference. These results can be considered as generalizations of results previously obtained, in a bivariate framework, in Di Bernardino et al. (2011). Finally we investigate the effects of scaling data on our consistency results.