Robinson, Peter M. and Hualde, J.
(2003)
Cointegration in fractional systems with unknown integration orders.
Econometrica, 71 (6).
pp. 1727-1766.
ISSN 0012-9682
Abstract
Cointegrated bivariate nonstationary time series are considered in a fractional context, without allowance for deterministic trends. Both the observable series and the cointegrating error can be fractional processes. The familiar situation in which the respective integration orders are 1 and 0 is nested, but these values have typically been assumed known. We allow one or more of them to be unknown real values, in which case Robinson and Marinucci (1997,2001) have justified least squares estimates of the cointegrating vector, as well as narrow-band frequency-domain estimates, which may be less biased. While consistent, these estimates do not always have optimal convergence rates, and they have non-standard limit distributional behaviour. We consider estimates formulated in the frequency domain, that consequently allow for a wide variety of (parametric) autocorrelation in the short memory input series, as well as time-domain estimates based on autoregressive transformation. Both can be interpreted as approximating generalized least squares and Gaussian maximum likelihood estimates. The estimates share the same limiting distribution, having mixed normal asymptotics (yielding Wald test statistics with χ2 null limit distributions), irrespective of whether the integration orders are known or unknown, subject in the latter case to their estimation with adequate rates of convergence. The parameters describing the short memory stationary input series are √n-consistently estimable, but the assumptions imposed on these series are much more general than ones of autoregressive moving average type. A Monte Carlo study of finite-sample performance is included.
Item Type: |
Article
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Official URL: |
http://www.blackwellpublishing.com/journal.asp?ref... |
Additional Information: |
This is an electronic version of an Article published in Econometrica 71(6) pp. 1727-1766 © [2003] Blackwell Publishing. LSE has developed LSE Research Online so that users may access research output of the School. Copyright © and Moral Rights for the papers on this site are retained by the individual authors and/or other copyright owners. Users may download and/or print one copy of any article(s) in LSE Research Online to facilitate their private study or for non-commercial research. You may not engage in further distribution of the material or use it for any profit-making activities or any commercial gain. You may freely distribute the URL (http://eprints.lse.ac.uk) of the LSE Research Online website. |
Divisions: |
Economics |
Subjects: |
Q Science > QA Mathematics |
Date Deposited: |
15 Feb 2008 |
Last Modified: |
11 Dec 2024 22:40 |
URI: |
http://eprints.lse.ac.uk/id/eprint/293 |
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