Testing for the buffered autoregressive processes

This paper investigates a quasi-likelihood ratio (LR) test for the thresholds in buffered autoregressive processes. Under the null hypothesis of no threshold, the LR test statistic converges to a function of a centered Gaussian process. Under local alternatives, this LR test has nontrivial asymptotic power. Furthermore, a bootstrap method is proposed to obtain the critical value for our LR test. Simulation studies and one real example are given to assess the performance of this LR test. The proof in this paper is not standard and can be used in other non-linear time series models.

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Year of publication:	2013-11-25
Authors:	Zhu, Ke ; Yu, Philip L.H. ; Li, Wai Keung
Institutions:	Volkswirtschaftliche Fakultät, Ludwig-Maximilians-Universität München
Subject:	AR(p) model \| Bootstrap method \| Buffered AR(p) model \| Likelihood ratio test \| Marked empirical process \| Threshold AR(p) model

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Extent:	application/pdf
Series:	MPRA Paper.
Type of publication:	Book / Working Paper
Classification:	C1 - Econometric and Statistical Methods: General ; C12 - Hypothesis Testing
Source:	RePEc - Research Papers in Economics

Persistent link: https://www.econbiz.de/10011110083