# ARIMA structure

I am trying to find the best model structure using the AIC criteria. I already know that d=1 and D=1 with a seasonal component equal to 12. So:

best.order<-c(0,0,0)
best.aic<-Inf
n <- length(x1)
for (i in 0:2) for (j in 0:2)  {
fit <- arima(log(x1), c(i, 1, j),seasonal = list(order = c(i, 1, j), period = 12),method="CSS-ML")
fit.aic <- -2 * fit\$loglik + (log(n) + 1) * length(fit\$coef)
if (fit.aic < best.aic) {
best.order <- c(i,1,j)
best.arma <- arima(resid(fit), order=best.order)
best.aic <-fit.aic
}
}

And it gives me this result:

best.arima
Call:
arima(x = resid(fit), order = best.order, seasonal = list(order = best.order,
period = 12), method = "CSS-ML")

Coefficients:
ma1     sma1
-0.9275  -0.8904
s.e.   0.0899   0.4776

sigma^2 estimated as 0.0005297:  log likelihood = 143.67,  aic = -281.34

Which is completely different from :

auto.arima(log(x1),d=1,D=1)
ARIMA(1,1,1)

Coefficients:
ar1      ma1
0.4238  -0.8984
s.e.  0.1202   0.0489

sigma^2 estimated as 0.006367:  log likelihood=84.98
AIC=-163.96   AICc=-163.63   BIC=-156.93

Which is the correct result?

-
Does your best.aic compare with the AIC returned by arima? – Gavin Simpson Apr 2 '13 at 14:58
What do you mean by that? sorry. – R_user Apr 2 '13 at 15:05
Well you are computing the AIC by hand whilst arima() (or it's print method) will be computing if for you. So does the value in best.aic that you computed match the value reported in the output give when you print best.arima. If it doesn't match then you are not computing the AIC correctly and that may be sufficient to account for the differences. – Gavin Simpson Apr 2 '13 at 15:19
Ah, sorry, ignore me. I see you mean the coefficient estimates are different too. – Gavin Simpson Apr 2 '13 at 15:19
Although, why are you comparing the output of arima(resid(fit)) with the output of auto.arima(log(x1)) - those don't look like the same input data to me? – Gavin Simpson Apr 2 '13 at 15:20