Nonasymptotic universal smoothing factors, kernel complexity and Yatracos classes
成果类型:
Article
署名作者:
Devroye, L; Lugosi, G
署名单位:
McGill University; Pompeu Fabra University
刊物名称:
ANNALS OF STATISTICS
ISSN/ISSBN:
0090-5364
发表日期:
1997
页码:
2626-2637
关键词:
摘要:
We introduce a method to select a smoothing factor for kernel density estimation such that, for all densities in all dimensions, the L-1 error of the corresponding kernel estimate is not larger than three times the error of the estimate with the optimal smoothing factor plus a constant times root log n/n, where n is the sample size, and the constant depends only on the complexity of the kernel used in the estimate. The result is nonasymptotic, that is, the bound is valid for each n. The estimate uses ideas from the minimum distance estimation work of Yatracos. As the inequality is uniform with respect to all densities, the estimate is asymptotically minimax optimal (modulo a constant) over many function classes.