A COMPANION TO Theoretical Econometrics
ARMA Type Models: Multivariate
The above discussion of the AR( p) and MA(q) models can be extended to the case where the observable process is a vector {Zt, t Є T}, Zt : (m x 1). This stochastic vector process is said to be second-order stationary if:
E(Z t) = p, cov(Z t, Z t-T) = E((Z t - p)(Z t_T - p)T) = I (t).
Note that I (t) is not symmetric since aij (t) = а;ї(-т); see Hamilton (1994).
The ARMA representations for the vector process {Zt, t Є T} take the form:
VAR( p): Z t = a 0 + A1Z t-1 + A2Z t-2 + ... + ApZ t-p +
VMA(q):. Z t = p + фlЄt-l + ф2^ t-2 + ... + фч£^ч + єt,
VARMA(p, q): Z t = Y0 + A1Zt-1 + ... + ApZt-p + ®1£t-1 + ... + £t-q + e t,
where the vector error process is of the form: et ~ NI(0, Q).
In direct analogy to the univariate case, the probabilistic assumptions are:
(28.27)
Looking at the above representations from the PR perspective we need to translate 1e-4e into assumptions in terms of the observable vector {Zt, t Є T}.
