Let
y
t
be a seasonal process such that
y
t
= (1 + 0.2B)(1
−
0.8B12)_
t,
where
_
_
= 1.
(a) Find the coefficients
_
j
of the AR(_) expansion of the process.
(b) Plot the theoretical ACF of
y
t.
(c) Plot the theoretical PACF of this process.
(d) Find the spectral density of this process and plotted it.
Let fxtg be the seasonal process
(1 0:7B2)xt = (1 + :3B2)zt;
where fztg is WN (0; 1).
(a) Find the coe_cients f jg of the representation xt =
P1 j=0 jztj .
(b) Find and plot the _rst _ve components of the ACF of the process
fxtg.
(c) Simulate 400 observations from this model. Plot the series and calculate
the ACF and PACF.
(d) Based on the previous question, estimate the parameters of the simulated
series via maximum likelihood estimation.