Limit Theory for Cointegrated Systems with Moderately Integrated and Moderately Explosive Regressors

An asymptotic theory is developed for multivariate regression in cointegrated systems whose variables are moderately integrated or moderately explosive in the sense that they have autoregressive roots of the form rho(ni) = 1 + c(i)/n(alpha), involving moderate deviations from unity when alpha is an...

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Main Authors: Magdalinos, Tassos, Peter C. B. PHILLIPS
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Language:English
Published: Institutional Knowledge at Singapore Management University 2009
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Online Access:https://ink.library.smu.edu.sg/soe_research/1808
https://ink.library.smu.edu.sg/context/soe_research/article/2807/viewcontent/Limit_theory_Moderately_Regressors_sv.pdf
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spelling sg-smu-ink.soe_research-28072020-01-11T01:02:21Z Limit Theory for Cointegrated Systems with Moderately Integrated and Moderately Explosive Regressors Magdalinos, Tassos Peter C. B. PHILLIPS, An asymptotic theory is developed for multivariate regression in cointegrated systems whose variables are moderately integrated or moderately explosive in the sense that they have autoregressive roots of the form rho(ni) = 1 + c(i)/n(alpha), involving moderate deviations from unity when alpha is an element of (0, 1) and c(i) is an element of R are constant parameters. When the data are moderately integrated in the stationary direction (with c(i) < 0), it is shown that least squares regression is consistent and asymptotically normal but suffers from significant bias, related to simultaneous equations bias. In the moderately explosive case (where c(i) > 0) the limit theory is mixed normal with Cauchy-type tail behavior, and the rate of convergence is explosive, as in the case of a moderately explosive scalar autoregression (Phillips and Magdalinos, 2007, Journal of Econometrics 136, 115-130). Moreover, the limit theory applies without any distributional assumptions and for weakly dependent errors under conventional moment conditions, so an invariance principle holds, unlike the well-known case of an explosive autoregression. This theory validates inference in cointegrating regression with mildly explosive regressors. The special case in which the regressors themselves have a common explosive component is also considered. 2009-04-01T07:00:00Z text application/pdf https://ink.library.smu.edu.sg/soe_research/1808 info:doi/10.1017/S0266466608090154 https://ink.library.smu.edu.sg/context/soe_research/article/2807/viewcontent/Limit_theory_Moderately_Regressors_sv.pdf http://creativecommons.org/licenses/by-nc-nd/4.0/ Research Collection School Of Economics eng Institutional Knowledge at Singapore Management University Central limit theory Cointegration Di⁄usion Explosive process Invariance principle Mixed normality Moderate deviations Unit root distribution Weak dependence Econometrics
institution Singapore Management University
building SMU Libraries
continent Asia
country Singapore
Singapore
content_provider SMU Libraries
collection InK@SMU
language English
topic Central limit theory
Cointegration
Di⁄usion
Explosive process
Invariance principle
Mixed normality
Moderate deviations
Unit root distribution
Weak dependence
Econometrics
spellingShingle Central limit theory
Cointegration
Di⁄usion
Explosive process
Invariance principle
Mixed normality
Moderate deviations
Unit root distribution
Weak dependence
Econometrics
Magdalinos, Tassos
Peter C. B. PHILLIPS,
Limit Theory for Cointegrated Systems with Moderately Integrated and Moderately Explosive Regressors
description An asymptotic theory is developed for multivariate regression in cointegrated systems whose variables are moderately integrated or moderately explosive in the sense that they have autoregressive roots of the form rho(ni) = 1 + c(i)/n(alpha), involving moderate deviations from unity when alpha is an element of (0, 1) and c(i) is an element of R are constant parameters. When the data are moderately integrated in the stationary direction (with c(i) < 0), it is shown that least squares regression is consistent and asymptotically normal but suffers from significant bias, related to simultaneous equations bias. In the moderately explosive case (where c(i) > 0) the limit theory is mixed normal with Cauchy-type tail behavior, and the rate of convergence is explosive, as in the case of a moderately explosive scalar autoregression (Phillips and Magdalinos, 2007, Journal of Econometrics 136, 115-130). Moreover, the limit theory applies without any distributional assumptions and for weakly dependent errors under conventional moment conditions, so an invariance principle holds, unlike the well-known case of an explosive autoregression. This theory validates inference in cointegrating regression with mildly explosive regressors. The special case in which the regressors themselves have a common explosive component is also considered.
format text
author Magdalinos, Tassos
Peter C. B. PHILLIPS,
author_facet Magdalinos, Tassos
Peter C. B. PHILLIPS,
author_sort Magdalinos, Tassos
title Limit Theory for Cointegrated Systems with Moderately Integrated and Moderately Explosive Regressors
title_short Limit Theory for Cointegrated Systems with Moderately Integrated and Moderately Explosive Regressors
title_full Limit Theory for Cointegrated Systems with Moderately Integrated and Moderately Explosive Regressors
title_fullStr Limit Theory for Cointegrated Systems with Moderately Integrated and Moderately Explosive Regressors
title_full_unstemmed Limit Theory for Cointegrated Systems with Moderately Integrated and Moderately Explosive Regressors
title_sort limit theory for cointegrated systems with moderately integrated and moderately explosive regressors
publisher Institutional Knowledge at Singapore Management University
publishDate 2009
url https://ink.library.smu.edu.sg/soe_research/1808
https://ink.library.smu.edu.sg/context/soe_research/article/2807/viewcontent/Limit_theory_Moderately_Regressors_sv.pdf
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