Johansen test

Template:Short description In statistics, the Johansen test,^[1] named after Søren Johansen, is a procedure for testing cointegration of several, say k, I(1) time series.^[2] This test permits more than one cointegrating relationship so is more generally applicable than the Engle-Granger test which is based on the Dickey–Fuller (or the augmented) test for unit roots in the residuals from a single (estimated) cointegrating relationship.^[3]

There are two types of Johansen test, either with trace or with eigenvalue, and the inferences might be a little bit different.^[4] The null hypothesis for the trace test is that the number of cointegration vectors is r = r* < k, vs. the alternative that r = k. Testing proceeds sequentially for r* = 1,2, etc. and the first non-rejection of the null is taken as an estimate of r. The null hypothesis for the "maximum eigenvalue" test is as for the trace test but the alternative is r = r* + 1 and, again, testing proceeds sequentially for r* = 1,2,etc., with the first non-rejection used as an estimator for r.

Just like a unit root test, there can be a constant term, a trend term, both, or neither in the model. For a general VAR(p) model:

${\displaystyle X_t=\mu +\mathrm{\Phi }{D}_t+{\mathrm{\Pi }}_p{X}_{t-p}+\cdots +{\mathrm{\Pi }}_1{X}_{t-1}+e_t,t=1,\dots ,T}$

There are two possible specifications for error correction: that is, two vector error correction models (VECM):

1. The longrun VECM:

${\displaystyle \mathrm{\Delta }{X}_t=\mu +\mathrm{\Phi }{D}_t+\mathrm{\Pi }{X}_{t-p}+{\mathrm{\Gamma }}_{p-1}\mathrm{\Delta }{X}_{t-p+1}+\cdots +{\mathrm{\Gamma }}_1\mathrm{\Delta }{X}_{t-1}+{\epsilon }_t,t=1,\dots ,T}$

where

${\displaystyle {\mathrm{\Gamma }}_i={\mathrm{\Pi }}_1+\cdots +{\mathrm{\Pi }}_i-I,i=1,\dots ,p-1.}$

2. The transitory VECM:

${\displaystyle \mathrm{\Delta }{X}_t=\mu +\mathrm{\Phi }{D}_t+\mathrm{\Pi }{X}_{t-1}-{\displaystyle \sum _{j=1}^{p-1}}{\mathrm{\Gamma }}_j\mathrm{\Delta }{X}_{t-j}+{\epsilon }_t,t=1,\cdots ,T}$

where

${\displaystyle {\mathrm{\Gamma }}_i=({\mathrm{\Pi }}_{i+1}+\cdots +{\mathrm{\Pi }}_p),i=1,\dots ,p-1.}$

The two are the same. In both VECM,

${\displaystyle \mathrm{\Pi }={\mathrm{\Pi }}_1+\cdots +{\mathrm{\Pi }}_p-I.}$

Inferences are drawn on Π, and they will be the same, so is the explanatory power.Template:Cn

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