Autoregressive Model is Special Case of Linear Filter Model

Theorem
Let $S$ be a stochastic process based on an equispaced time series.

Let the values of $S$ at timestamps $t, t - 1, t - 2, \dotsc$ be $z_t, z_{t - 1}, z_{t - 2}, \dotsc$

Let $\tilde z_t, \tilde z_{t - 1}, \tilde z_{t - 2}, \dotsc$ be deviations from a constant mean level $\mu$:
 * $\tilde z_t = z_t - \mu$

Let $a_t, a_{t - 1}, a_{t - 2}, \dotsc$ be a sequence of independent shocks at timestamps $t, t - 1, t - 2, \dotsc$

Let $M$ be an autoregessive model on $S$ of order $p$:


 * $(1): \quad \tilde z_t = \phi_1 \tilde z_{t - 1} + \phi_2 \tilde z_{t - 2} + \dotsb + \phi_p \tilde z_{t - p} + a_t$

Then $M$ is a special case of a linear filter model.

Proof
We can eliminate $\tilde z_{t - 1}$ from the of $(1)$ by substituting:


 * $\tilde z_{t - 1} = \phi_1 \tilde z_{t - 2} + \phi_2 \tilde z_{t - 3} + \dotsb + \phi_p \tilde z_{t - p - 1} + a_{t - 1}$

Similarly we can substitute for $\tilde z_{t - 2}$, and so on.

Eventually we get an infinite series in $a_{t - j}$.

Hence:
 * $\map \phi B \tilde z_t = a_t$

is equivalent to:
 * $\tilde z_t = \map \psi B a_t$

such that:
 * $\map \psi B = \map {\phi^{-1} } B$

Hence the result by definition of linear filter model.