Smooth discrimination analysis
成果类型:
Article
署名作者:
Mammen, E; Tsybakov, AB
署名单位:
Ruprecht Karls University Heidelberg; Centre National de la Recherche Scientifique (CNRS); CNRS - National Institute for Mathematical Sciences (INSMI); Sorbonne Universite; Universite Paris Cite
刊物名称:
ANNALS OF STATISTICS
ISSN/ISSBN:
0090-5364
发表日期:
1999
页码:
1808-1829
关键词:
minimum contrast estimators
density contour
CONVERGENCE
bounds
rates
RISK
sets
摘要:
Discriminant analysis for two data sets in R-d with probability densities f and g can be based on the estimation of the set G = {x:f(x) greater than or equal to g(x)}. We consider applications where it is appropriate to assume that the region G has a smooth boundary or belongs to another nonparametric class of sets. In particular, this assumption makes sense if discrimination is used as a data analytic tool. Decision rules based on minimization of empirical risk over the whole class of sets and over sieves are considered. Their rates of convergence are obtained. We show that these rules achieve optimal rates for estimation of G and optimal rates of convergence for Bayes risks. An interesting conclusion is that the optimal rates for Bayes risks can be very fast, in particular, faster than the parametric root-n rate. These fast rates cannot be guaranteed for plug-in rules.