ADAPTATION TO LOWEST DENSITY REGIONS WITH APPLICATION TO SUPPORT RECOVERY
成果类型:
Article
署名作者:
Patschkowski, Tim; Rohde, Angelika
署名单位:
Ruhr University Bochum
刊物名称:
ANNALS OF STATISTICS
ISSN/ISSBN:
0090-5364
DOI:
10.1214/15-AOS1366
发表日期:
2016
页码:
255-287
关键词:
Adaptive Estimation
nonparametric-estimation
Oracle Inequalities
Minimax
regression
selection
BOUNDARY
rates
摘要:
A scheme for locally adaptive bandwidth selection is proposed which sensitively shrinks the bandwidth of a kernel estimator at lowest density regions such as the support boundary which are unknown to the statistician. In case of a Holder continuous density, this locally minimax-optimal bandwidth is shown to be smaller than the usual rate, even in case of homogeneous smoothness. Some new type of risk bound with respect to a density-dependent standardized loss of this estimator is established. This bound is fully nonasymptotic and allows to deduce convergence rates at lowest density regions that can be substantially faster than n(-1/2). It is complemented by a weighted minimax lower bound which splits into two regimes depending on the value of the density. The new estimator adapts into the second regime, and it is shown that simultaneous adaptation into the fastest regime is not possible in principle as long as the Holder exponent is unknown. Consequences on plug-in rules for support recovery are worked out in detail. In contrast to those with classical density estimators, the plug-in rules based on the new construction are minimax-optimal, up to some logarithmic factor.