Testing for the equality of integration orders is an important topic in time series analysis because it constitutes an essential step in testing for (fractional) cointegration in the bivariate case. For the multivariate case, there are several versions of cointegration, and the version given in Robinson and Yajima (2002) has received much attention. In this definition, a time series vector is partitioned into several sub-vectors, and the elements in each sub-vector have the same integration order. Furthermore, this time series vector is said to be cointegrated if there exists a cointegration in any of the sub-vectors. Under such a circumstance, testing for the equality of integration orders constitutes an important problem. However, for mul...
Nonstationary fractionally integrated time series may possibly be fractionally cointegrated. In this...
Cointegrated bivariate nonstationary time series are considered in a fractional context, without all...
Cointegrated bivariate nonstationary time series are considered in a fractional context, without all...
Testing for the equality of integration orders is an important topic in time series analysis because...
A necessary condition for two time series to be nontrivially cointegrated is the equality of their r...
We propose in this article a two-step testing procedure of fractional cointegration in macroeconomic...
We propose in this article a two-step testing procedure of fractional cointegration in macroeconomic...
Traditional cointegration analysis asserts that the observed series are unit root processes, but a l...
The convergence rate of the sample mean of fractionally integrated processes is exploited to build ...
We develop a sequence of tests for specifying the cointegrating rank of, possibly fractional, multip...
In this paper we investigate methods for testing the existence of a cointegration relationship among...
In this paper we explore the usefulness of induced-order statistics in the characterization of integ...
This paper shows, analytically and numerically, the effects of a misspecification in the degree of i...
We estimate a multivariate ARFIMA model to illustrate a cointegration testing methodology based on j...
In this paper a nonparametric variance ratio testing approach is proposed for determining the cointe...
Nonstationary fractionally integrated time series may possibly be fractionally cointegrated. In this...
Cointegrated bivariate nonstationary time series are considered in a fractional context, without all...
Cointegrated bivariate nonstationary time series are considered in a fractional context, without all...
Testing for the equality of integration orders is an important topic in time series analysis because...
A necessary condition for two time series to be nontrivially cointegrated is the equality of their r...
We propose in this article a two-step testing procedure of fractional cointegration in macroeconomic...
We propose in this article a two-step testing procedure of fractional cointegration in macroeconomic...
Traditional cointegration analysis asserts that the observed series are unit root processes, but a l...
The convergence rate of the sample mean of fractionally integrated processes is exploited to build ...
We develop a sequence of tests for specifying the cointegrating rank of, possibly fractional, multip...
In this paper we investigate methods for testing the existence of a cointegration relationship among...
In this paper we explore the usefulness of induced-order statistics in the characterization of integ...
This paper shows, analytically and numerically, the effects of a misspecification in the degree of i...
We estimate a multivariate ARFIMA model to illustrate a cointegration testing methodology based on j...
In this paper a nonparametric variance ratio testing approach is proposed for determining the cointe...
Nonstationary fractionally integrated time series may possibly be fractionally cointegrated. In this...
Cointegrated bivariate nonstationary time series are considered in a fractional context, without all...
Cointegrated bivariate nonstationary time series are considered in a fractional context, without all...