Gunnar Bårdsen and Ragnar Nymoen 885gy=2
2
+1.7
2
gx−0.5
2
μgy= 1 +0.85gx−0.25μ.We can therefore write the mean-approximated, or stylized, dynamic model as:yt= 1 +0.85xt−0.25(
y− 4 x)
t− 1.
To illustrate, the dynamic behavior of the model and its mean approximation
are shown in Figure 17.4. The upper panel shows the dynamic, or period, responses
inytto a unit change inxt−i. The lower panel shows the cumulative, or interim,
response. The graphs illustrate how the cyclical behavior – due to complex roots –
is averaged out in the stylized representation.
3Dynamic multipliersCumulative (interim) multipliersFull model Simplifed model2
1
0
–140 5 10 15 203210
0 5 10 15 20Full model Simplifed modelFigure 17.4 The dynamic responses of the example model and its mean approximation
Note that all that is done is to exploit so-called growth coefficients (see Patterson
and Ryding, 1984; Patterson, 1987). The steady-state growth:
gy= 4 gx