GAUSSIAN APPROXIMATION FOR NONSTATIONARY TIME SERIES WITH OPTIMAL RATE AND EXPLICIT CONSTRUCTION
成果类型:
Article
署名作者:
Bonnerjee, Soham; Karmakar, Sayar; Wu, Wei Biao
署名单位:
University of Chicago; State University System of Florida; University of Florida
刊物名称:
ANNALS OF STATISTICS
ISSN/ISSBN:
0090-5364
DOI:
10.1214/24-AOS2436
发表日期:
2024
页码:
2293-2317
关键词:
finite exponential moments
varying coefficient models
invariance-principle
quadratic-forms
multidimensional version
linear-models
tail probabilities
structural-change
confidence bands
large deviations
摘要:
Statistical inference for time series such as curve estimation for time- varying models or testing for existence of a change point have garnered significant attention. However, these works are generally restricted to the assumption of independence and/or stationarity at its best. The main obstacle is that the existing Gaussian approximation results for nonstationary processes only provide an existential proof, and thus they are difficult to apply. In this paper, we provide two clear paths to construct such a Gaussian approximation for nonstationary series. While the first one is theoretically more natural, the second one is practically implementable. Our Gaussian approximation results are applicable for a very large class of nonstationary time series, obtain optimal rates and yet have good applicability. Building on such approximations, we also show theoretical results for change-point detection and simultaneous inference in presence of nonstationary errors. Finally, we substantiate our theoretical results with simulation studies and real data analysis.