Higher-order improvements of a computationally attractive k-step bootstrap for extremum estimators
成果类型:
Article
署名作者:
Andrews, DWK
署名单位:
Yale University
刊物名称:
ECONOMETRICA
ISSN/ISSBN:
0012-9682
DOI:
10.1111/1468-0262.00271
发表日期:
2002
页码:
119-162
关键词:
block bootstrap
stationary
VALUES
摘要:
This paper establishes the higher-order equivalence of the k-step bootstrap, introduced recently by Davidson and MacKinnon (1999), and the standard bootstrap. The k-step bootstrap is a very attractive alternative computationally to the standard bootstrap for statistics based on nonlinear extremum estimators, such as generalized method of moment and maximum likelihood estimators. The paper also extends results of Hall and Horowitz (1996) to provide new results regarding the higher-order improvements of the standard bootstrap and the k-step bootstrap for extremum estimators (compared to procedures based on first-order asymptotics). The results of the paper apply to Newton-Raphson (NR), default NR, line-search NR, and Gauss-Newton k-step bootstrap procedures. The results apply to the nonparametric iid bootstrap and nonoverlapping and overlapping block bootstraps. The results cover symmetric and equal-tailed two-sided t tests and confidence intervals, one-sided t tests and confidence intervals, Wald tests and confidence regions, and J tests of over-identifying restrictions.
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