Hoeffding-ANOVA decompositions for symmetric statistics of exchangeable observations
成果类型:
Article
署名作者:
Peccati, G
署名单位:
Universite Paris Saclay; Bocconi University
刊物名称:
ANNALS OF PROBABILITY
ISSN/ISSBN:
0091-1798
DOI:
10.1214/009117904000000405
发表日期:
2004
页码:
1796-1829
关键词:
edgeworth expansion
distributions
摘要:
Consider a (possibly infinite) exchangeable sequence X = {X-n : 1 less than or equal to n < N}, where N is an element of N boolean OR {infinity}, with values in a Borel space (A, A), and note X-n = (X-1,..., X-n). We say that X is Hoeffding decomposable if, for each n, every square integrable, centered and symmetric statistic based on Xn can be written as an orthogonal sum of n U-statistics with degenerated and symmetric kernels of increasing order. The only two examples of Hoeffding decomposable sequences studied in the literature are i.i.d. random variables and extractions without replacement from a finite population. In the first part of the paper we establish a necessary and sufficient condition for an exchangeable sequence to be Hoeffding decomposable, that is, called weak independence. We show that not every exchangeable sequence is weakly independent, and, therefore, that not every exchangeable sequence is Hoeffding decomposable. In the second part we apply our results to a class of exchangeable and weakly independent random vectors X-n((alpha,c)) = (X-1((alpha,c)),..., X-n((alpha,c))) whose law is characterized by a positive and finite measure alpha((.)) on A and by a real constant c. For instance, if c = 0, X-n((alpha,c)) is a vector of i.i.d. random variables with law alpha((.))/alpha(A); if A is finite, alpha((.)) is integer valued and c = -1, X-n((alpha,c)) represents the first n extractions without replacement from a finite population; if c > 0, X-n((alpha,c)) consists of the first n n instants of a generalized Polya urn sequence. For every choice of alpha((.)) and c, the Hoeffding-ANOVA decomposition of a symmetric and square integrable statistic T(X-n((alpha,c))) is explicitly computed in terms of linear combinations of well chosen conditional expectations of T. Our formulae generalize and unify the classic results of Hoeffding [Ann. Math. Statist. 19 (1948) 293-325] for i.i.d. variables, Zhao and Chen [Acta Math. Appl. Sinica 6 (1990) 263-272] and Bloznelis and Gotze [Ann. Statist. 29 (2001) 353-365 and Ann. Probab. 30 (2002) 1238-1265] for finite population statistics. Applications are given to construct infinite weak urn sequences and to characterize the covariance of symmetric statistics of generalized urn sequences.