Abstract
Abstract Johansen’s (2000. “A Bartlett Correction Factor for Tests of on the Cointegrating Relations.” Econometric Theory 16: 740–78) Bartlett correction factor for the LR test of linear restrictions on cointegrated vectors is derived under the i.i.d. Gaussian assumption for the innovation terms. However, the distribution of most data relating to financial variables is fat-tailed and often skewed; there is therefore a need to examine small sample inference procedures that require weaker assumptions for the innovation term. This paper suggests that using the non-parametric bootstrap to approximate a Bartlett-type correction provides a statistic that does not require specification of the innovation distribution and can be used by applied econometricians to perform a small sample inference procedure that is less computationally demanding than it’s analytical counterpart. The procedure involves calculating a number of bootstrap values of the LR test statistic and estimating the expected value of the test statistic by the average value of the bootstrapped LR statistic. Simulation results suggest that the inference procedure has good finite sample property and is less dependent on the parameter space of the data generating process.
Highlights
The procedure for estimating and testing cointegrating relationships described in Johansen (2006) is available in virtually all econometric software packages and is widely used in applied research
We focus on the pseudo-data generated by Algorithm 2 since the consistency of the bootstrap procedure proposed in Algorithm 1 is derived in Canepa (2016)
It is well known that the Bartlett correction factor is designed to bring the actual size of asymptotic tests close to their respective nominal size, but it may lead to a loss in power
Summary
The procedure for estimating and testing cointegrating relationships described in Johansen (2006) is available in virtually all econometric software packages and is widely used in applied research. Simulation results presented by Johansen (2000) suggests that applying this type of correction to the LR test statistic dramatically reduces the finite sample size distortion problem. It is a well-known stylized fact that GARCH-type models fit well to stock market returns (see Boswijk et al 2016; Engle and Rangel 2008; Harvey et al 2016; among others) Against this background, in this paper we built on Canepa (2016) and investigate if the bootstrap Bartlett corrected LR test can be used to reduce the size distortion problem in situations where an analytical solution is difficult or does not work well.
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