DECOUPLING INEQUALITIES FOR THE TAIL PROBABILITIES OF MULTIVARIATE U-STATISTICS
成果类型:
Article
署名作者:
DELAPENA, VH; MONTGOMERYSMITH, SJ
署名单位:
University of Missouri System; University of Missouri Columbia
刊物名称:
ANNALS OF PROBABILITY
ISSN/ISSBN:
0091-1798
DOI:
10.1214/aop/1176988291
发表日期:
1995
页码:
806-816
关键词:
random-variables
摘要:
In this paper we present a decoupling inequality that shows that multivariate U-statistics can be studied as sums of(conditionally) independent random variables. This result has important implications in several areas of probability and statistics including the study of random graphs and multiple stochastic integration. More precisely, we get the following result: Let {X(j)} be a sequence of independent random variables on a measurable space (L, S) and let {X(i)((j))}, j = 1,..., k, be k independent copies of (X(i)). Let fi(1)i(2)...i(k) be families of functionsof k variables taking (S x ... x S) into a Banach space (B, I II). Then, for all n greater than or equal to k greater than or equal to 2, t > 0, there exist numerical constants C-k depending on k only so that GRAPHICS GRAPHICS The reverse bound holds if, in addition, the following symmetry condition holds almost surely: GRAPHICS for all permutations pi of (1,...,k).
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