Direct density estimation of L-estimates via characteristic functions with applications

In this note we propose a new and novel kernel density estimator for directly estimating the probability and cumulative distribution function of an L-estimate from a single population based on utilizing the theory in Knight (1985) in conjunction with classic inversion theory. This idea is further developed for a kernel density estimator for the difference of L-estimates from two independent populations. The methodology is developed via a “plug-in” approach, but it is distinct from the classic bootstrap methodology in that it is analytically and computationally feasible to provide an exact estimate of the distribution function and thus eliminates the resampling related error. The asymptotic and finite sample properties of our estimators are examined. The procedure is illustrated via generating the kernel density estimate for the Tukey's trimean from a small data set.