On residual empirical processes of stochastic regression models with applications to time series
成果类型:
Article
署名作者:
Lee, S; Wei, CZ
署名单位:
Seoul National University (SNU); Academia Sinica - Taiwan
刊物名称:
ANNALS OF STATISTICS
ISSN/ISSBN:
0090-5364
发表日期:
1999
页码:
237-261
关键词:
WEAK-CONVERGENCE
parameters
摘要:
Motivated by Gaussian tests for a time series, we are led to investigate the asymptotic behavior of the residual empirical processes of stochastic regression models. These models cover the fixed design regression models as well as general AR(q) models. Since the number of the regression coefficients is allowed to grow as the sample size increases, the obtained results are also applicable to nonlinear regression and stationary AR(infinity) models. In this paper, we first derive an oscillation-like result for the residual empirical process. Then, we apply this result to autoregressive time series. In particular, for a stationary AR(infinity) process, we are able to determine the order of the number of coefficients of a fitted AR(q(n)) model and obtain the limiting Gaussian processes. For an unstable AR(q) process, we show that if the characteristic polynomial has a unit root 1, then the limiting process is no longer Gaussian. For the explosive case, one of our side results also provides a short proof for the Brownian bridge results given by Koul and Levental.