Maxima of partial sums indexed by geometrical structures

Tiefeng Jiang

doi:10.1214/aop/1039548374

Maxima of partial sums indexed by geometrical structures

Tiefeng Jiang

Statistics (Twin Cities)

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Abstract

The maxima of partial sums indexed by squares and rectangles over lattice points and random cubes are studied in this paper. For some of these problems, the dimension (d = 1, d = 2 and d ≥ 3) significantly affects the limit behavior of the maxima. However, for other problems, the maxima behave almost the same as their one-dimensional counterparts. The tools for proving these results are large deviations, the Chen-Stein method, number theory and inequalities of empirical processes.

Original language	English (US)
Pages (from-to)	1854-1892
Number of pages	39
Journal	Annals of Probability
Volume	30
Issue number	4
DOIs	https://doi.org/10.1214/aop/1039548374
State	Published - Oct 2002

Keywords

Chen-Stein method
Inequalities of empirical processes
Large deviations
Maxima
Number theory

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AB - The maxima of partial sums indexed by squares and rectangles over lattice points and random cubes are studied in this paper. For some of these problems, the dimension (d = 1, d = 2 and d ≥ 3) significantly affects the limit behavior of the maxima. However, for other problems, the maxima behave almost the same as their one-dimensional counterparts. The tools for proving these results are large deviations, the Chen-Stein method, number theory and inequalities of empirical processes.

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KW - Inequalities of empirical processes

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KW - Maxima

KW - Number theory

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Maxima of partial sums indexed by geometrical structures

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