In this article, limit theory is established for a general class of generalized autoregressive conditional heteroskedasticity models given by epsilon(t) = sigma(t)eta(t) and sigma(t) = f (sigma(t-1), sigma(t-2),..., sigma(t-p), sigma(t-1), sigma(t-2),..., sigma(t-q)), when {epsilon(t)} is a process with just barely infinite variance, that is, {epsilon(t)} is a process with infinite variance but in the domain of normal attraction. In particular, we show that under some regular conditions, converges weakly to a Gaussian process. Applications of the asymptotic results to statistical inference, such as unit root test and sample autocorrelation, are also investigated. The obtained result fills in a gap between the classical infinite variance and finite variance in the literature. Further, when applying our limiting result to DickeyFuller (DF) test in a unit root model with integrated generalized autoregressive conditional heteroskedasticity (IGARCH) errors, it just confirms the simulation result of Kourogenis and Pittis (2008) that the DF statistics with IGARCH errors converges in law to the standard DF distribution.

• 出版日期2012-1
• 单位浙江大学