Title of article
FULLY MODIFIED ESTIMATION OF SEASONALLY COINTEGRATED PROCESSES
Author/Authors
GREGOIR، STE´PHANE نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2010
Pages
38
From page
1491
To page
1528
Abstract
We extend the framework of the fully modified, ordinary least squares (OLS) estimator
introduced by Phillips and Hansen (1990) to the case of seasonally cointegrated
processes at a given frequency. First we extend a weak convergence result of sample
covariance matrices (Phillips, 1988) to the case of seasonal unit roots. Using a
complex number framework, we then show that we can take into account the constraints
that exist in a situation of seasonal cointegration as illustrated in Gregoir
(1999a) and derive estimates of the cointegration vectors that allow for asymptotic
normal inference. This allows us to propose a test whose null hypothesis is the existence
of seasonal cointegration. A Monte Carlo exercise investigates the finite sample
properties of this test procedure. The paper closes with the analysis of situations
in which there exist more than one frequency at which seasonal cointegration can be
observed
Journal title
ECONOMETRIC THEORY
Serial Year
2010
Journal title
ECONOMETRIC THEORY
Record number
653377
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