CRAMER-TYPE MODERATE DEVIATION THEOREMS FOR NONNORMAL APPROXIMATION

被引：6

作者：

Shao, Qi-Man ^{[1
,2
]}

Zhang, Mengchen ^{[3
]}

Zhang, Zhuo-Song ^{[2
,4
]}

机构：

[1] Southern Univ Sci & Technol, Dept Stat & Data Sci, Shenzhen, Guangdong, Peoples R China

[2] Chinese Univ Hong Kong, Dept Stat, Hong Kong, Peoples R China

[3] Hong Kong Univ Sci & Technol, Dept Math, Hong Kong, Peoples R China

[4] Natl Univ Singapore, Dept Stat & Appl Probabil, Singapore, Singapore

来源：

ANNALS OF APPLIED PROBABILITY | 2021年 / 31卷 / 01期

关键词：

Moderate deviation; nonnormal approximation; Stein's method; Curie-Weiss model; imitative monomer-dimer mean-field model; STEINS METHOD; STATISTICAL-THEORY;

D O I：

10.1214/20-AAP1589

中图分类号：

O21 [概率论与数理统计]; C8 [统计学];

学科分类号：

020208 ; 070103 ; 0714 ;

摘要：

A Cramer-type moderate deviation theorem quantifies the relative error of the tail probability approximation. It provides a criterion whether the limiting tail probability can be used to estimate the tail probability under study. Chen, Fang and Shao (2013) obtained a general Cramer-type moderate result using Stein's method when the limiting was a normal distribution. In this paper, Cramer-type moderate deviation theorems are established for nonnormal approximation under a general Stein identity, which is satisfied via the exchangeable pair approach and Stein's coupling. In particular, a Cramer-type moderate deviation theorem is obtained for the general Curie-Weiss model and the imitative monomer-dimer mean-field model.

引用

页码：247 / 283

页数：37

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