Asymptotic normality of the Lk-error of the Grenander estimator
Abstract
We investigate the limit behavior of the Lk-distance between a decreasing density f and its nonparametric maximum likelihood estimator fn for k≥1. Due to the inconsistency of fn at zero, the case k=2.5 turns out to be a kind of transition point. We extend asymptotic normality of the L1-distance to the Lk-distance for 1≤ k<2.5, and obtain the analogous limiting result for a modification of the Lk-distance for k≥2.5. Since the L1-distance is the area between f and fn, which is also the area between the inverse g of f and the more tractable inverse Un of fn, the problem can be reduced immediately to deriving asymptotic normality of the L1-distance between Un and g. Although we lose this easy correspondence for k>1, we show that the Lk-distance between f and fn is asymptotically equivalent to the Lk-distance between Un and g.
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