Let {Xi}i=−∞∞ be a sequence of random vectors and $Y_{in}=f_{in}(\mathcal{X}_{i,\ell})$ be zero mean block-variables where $\mathcal{X}_{i,\ell}=(X_{i},\ldots,X_{i+\ell-1})$ , i≥1, are overlapping blocks of length ℓ and where fin are Borel measurable functions. This paper establishes valid joint asymptotic expansions of general orders for the joint distribution of the sums ∑i=1nXi and ∑i=1nYin under weak dependence conditions on the sequence {Xi}i=−∞∞ when the block length ℓ grows to infinity. In contrast to the classical Edgeworth expansion results where the terms in the expansions are given by powers of n−1/2, the expansions derived here are mixtures of two series, one in powers of n−1/2 and the other in powers of $[\frac{n}{\ell}]^{-1/2}$ . Applications of the main results to (i) expansions for Studentized statistics of time series data and (ii) second order correctness of the blocks of blocks bootstrap method are given.
@article{1185458986,
author = {Lahiri, S. N.},
title = {Asymptotic expansions for sums of block-variables under weak dependence},
journal = {Ann. Statist.},
volume = {35},
number = {1},
year = {2007},
pages = { 1324-1350},
language = {en},
url = {http://dml.mathdoc.fr/item/1185458986}
}
Lahiri, S. N. Asymptotic expansions for sums of block-variables under weak dependence. Ann. Statist., Tome 35 (2007) no. 1, pp. 1324-1350. http://gdmltest.u-ga.fr/item/1185458986/