Concentration inequalities and asymptotic results for ratio type empirical processes
成果类型:
Article
署名作者:
Gine, Evarist; Koltchinskii, Vladimir
署名单位:
University of Connecticut; University of New Mexico
刊物名称:
ANNALS OF PROBABILITY
ISSN/ISSBN:
0091-1798
DOI:
10.1214/009117906000000070
发表日期:
2006
页码:
1143-1216
关键词:
CENTRAL-LIMIT-THEOREM
margin distributions
Consistency
bounds
rates
estimators
MODULI
vapnik
摘要:
Let F be a class of measurable functions on a measurable space (S, S) with values in [0, 1] and let [GRAPHICS] be the empirical measure based on an i.i.d. sample (X-1,..., X-n) from a probability distribution P on (S, S). We study the behavior of suprema of the following type: [GRAPHICS] where sigma(p)f >= Var(p)(1/2) f and phi is a continuous, strictly increasing function with phi(0) = 0. Using Talagrand's concentration inequality for empirical processes, we establish concentration inequalities for such suprema and use them to derive several results about their asymptotic behavior, expressing the conditions in terms of expectations of localized suprema of empirical processes. We also prove new bounds for expected values of sup-norms of empirical processes in terms of the largest sigma(p)f and the L-2(P) norm of the envelope of the function class, which are especially suited for estimating localized suprema. With this technique, we extend to function classes most of the known results on ratio type suprema of empirical processes, including some of Alexander's results for VC classes of sets. We also consider applications of these results to several important problems in nonparametric statistics and in learning theory (including general excess risk bounds in empirical risk minimization and their versions for L-2-regression and classification and ratio type bounds for margin distributions in classification).
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