Berry-Esseen bounds for self-normalized sums of locally dependent random variables

Zhang, Zhuo-Song

2024-08-01

10.1007/s11425-023-2189-9

SCIENCE CHINA-MATHEMATICS   影响因子和分区

1674-7283

1869-1862

The Berry-Esseen bound provides an upper bound on the Kolmogorov distance between a random variable and the normal distribution. In this paper, we establish Berry-Esseen bounds with optimal rates for self-normalized sums of locally dependent random variables, assuming only a second-moment condition. Our proof leverages Stein's method and introduces a novel randomized concentration inequality, which may also be of independent interest for other applications. Our main results have applied to self-normalized sums of m-dependent random variables and graph dependency models.

Berry-Esseen bounds self-normalized sums local dependence m-dependence graph dependency

SCI

英语

第一 ; 通讯

Singapore Ministry of Education Academic Research Fund Tier 2[MOE2018-T2-2-076]

Mathematics

Mathematics, Applied ; Mathematics

WOS:001303679400001

SCIENCE PRESS

Web of Science

Southern Univ Sci & Technol, Dept Stat & Data Sci, Shenzhen 518055, Peoples R China

Zhang, Zhuo-Song. Berry-Esseen bounds for self-normalized sums of locally dependent random variables[J]. SCIENCE CHINA-MATHEMATICS,2024.

Zhang, Zhuo-Song.(2024).Berry-Esseen bounds for self-normalized sums of locally dependent random variables.SCIENCE CHINA-MATHEMATICS.

Zhang, Zhuo-Song."Berry-Esseen bounds for self-normalized sums of locally dependent random variables".SCIENCE CHINA-MATHEMATICS (2024).