Inference 1: In a cointegrated system with two time series, the innovations
sequences derived from the common trend components must be perfectly
correlated. (Correlation value must be +1 or –1).
Let us denote the innovation sequences derived from the common trends of
the two series as. Recall from Chapter 2 that the innovation se-
quence for a random walk is obtained by differencing it. The innovation se-
quences shown here are therefore the result of differencing nytandnzt,
respectively. In equation form, we have
(6.3)According to the common trends model, the common trends must be iden-
tical up to a scalar.
(6.4)Now, if we require
(6.5)it follows from simple algebra on Equations 6.4 and 6.5 that
(6.6)This means that the innovations derived from the common trends must also
be identical up to a scalar. Incidentally, the scalar also happens to be the
cointegration coefficient g. Now, if two variables are identical up to a scalar
(in this case the cointegration coefficient), they must be perfectly correlated.
If the cointegration coefficient is positive, then the correlation value is +1. If
it is negative, then the correlation value is –1.
Thus, in a cointegrated system the innovation sequences derived from
the common trends must be perfectly correlated.
Inference 2: The cointegration coefficient may be obtained by a regression
of the innovation sequences of the common trends against each other.
Based on the preceding discussion we have a linear relationship between the
innovation sequences given as
rryztt=γ (6.7)rryztt++ 11 =γnnyztt++ 11 =γnnyztt=γnnr
nnryyy
zzzttt
ttt++
++−=
−=
11
11rryztt and88 STATISTICAL ARBITRAGE PAIRS