On the estimation of smooth densities by strict probability densities at optimal rates in sup-norm

Abstract

It is shown that the variable bandwidth density estimator proposed by McKay (1993a and b) following earlier findings by Abramson (1982) approximates density functions in C4( Rd) at the minimax rate in the supremum norm over bounded sets where the preliminary density estimates on which they are based are bounded away from zero. A somewhat more complicated estimator proposed by Jones McKay and Hu (1994) to approximate densities in C6( R) is also shown to attain minimax rates in sup norm over the same kind of sets. These estimators are strict probability densities.